$true || $ nat || 0.897664347317
$ natural || $ nat || 0.872984414992
<= || lt || 0.846362541915
$ real || $ nat || 0.839711956918
*101 zero3 0[01] (((#hash#)12 NAT) 1) (0. F_Complex) a_Type RetSP Im30 1_NN FALSE0 (0. Z_2) NAT 0c || nat1 || 0.838149061604
$ ordinal || $ nat || 0.822726740027
one0 RetIC Rea0 Ser0 unit3 (1. Z_2) TRUE 0_NN non_op VertexSelector 1[01] an_Adj 1 (1_ F_Complex) 1r ({..}2 k5_ordinal1) (((#hash#)11 NAT) 1) (elementary_tree NAT) ({..}2 {}) || nat1 || 0.809499585708
c= || le || 0.8089845254
<= || le || 0.808029505756
op0 k5_ordinal1 {} || nat1 || 0.74818237255
one0 RetIC Rea0 Ser0 unit3 (1. Z_2) TRUE 0_NN non_op VertexSelector 1[01] an_Adj 1 (1_ F_Complex) 1r ({..}2 k5_ordinal1) (((#hash#)11 NAT) 1) (elementary_tree NAT) ({..}2 {}) || (nat2 nat1) || 0.741729690925
are_equipotent || lt || 0.740018848467
(<= NAT) || (lt nat1) || 0.719941488023
$ ext-real || $ nat || 0.710035711178
c= || lt || 0.705752881764
$ complex || $ nat || 0.677197747032
op0 k5_ordinal1 {} || (nat2 nat1) || 0.675223554676
are_equipotent || le || 0.643707697993
*101 zero3 0[01] (((#hash#)12 NAT) 1) (0. F_Complex) a_Type RetSP Im30 1_NN FALSE0 (0. Z_2) NAT 0c || (nat2 nat1) || 0.640346207492
c=0 || le || 0.546881290564
<= || divides || 0.545219778338
$ (& (~ empty0) (& (~ constant) (& (circular (carrier (TOP-REAL 2))) (& special (& unfolded (& s.c.c. (& standard0 (FinSequence (carrier (TOP-REAL 2)))))))))) || $ nat || 0.536355549663
$ integer || $ nat || 0.510538478546
$ Relation-like || $ nat || 0.478478351974
-0 || nat2 || 0.446512862116
exp1 || times || 0.444905101497
$ (& ordinal natural) || $ nat || 0.443756395746
(<= 1) || (lt nat1) || 0.443732169577
$ (& Relation-like Function-like) || $ nat || 0.442584174691
succ1 || nat2 || 0.442466255416
+^1 || plus || 0.418288860795
-\1 || minus || 0.417139794334
- || minus || 0.402828329157
min || pred || 0.401886794672
$ (& (~ empty0) universal0) || $ nat || 0.386889080913
* || times || 0.385013713932
#bslash##slash#0 || plus || 0.372086481898
(are_equipotent {}) || (lt nat1) || 0.371298762232
+ || plus || 0.363577275741
$ (& Relation-like (& Function-like FinSequence-like)) || $ nat || 0.361195730251
$ cardinal || $ nat || 0.34716255944
$ ext-real-membered || $ nat || 0.3404489324
(are_equipotent BOOLEAN) || prime || 0.339200234543
c= || divides || 0.335086556189
-Root0 || sigma_div || 0.333247219482
$ (& (~ empty0) Tree-like) || $ nat || 0.330907129638
$ complex-membered || $ nat || 0.329602615489
^20 || pred || 0.32247534408
+ || times || 0.319830126499
|^|^ || exp || 0.313459626145
$ quaternion || $ nat || 0.31005140621
(are_equipotent NAT) || (lt nat1) || 0.30747515126
exp1 || exp || 0.304465198028
(<= NAT) || prime || 0.300463744722
op0 k5_ordinal1 {} || bool1 || 0.295993835616
c=0 || lt || 0.2944053105
(are_equipotent 1) || (lt nat1) || 0.293762111796
ALL || primeb || 0.282542946393
mod^ || mod || 0.272871973453
$ boolean || $ nat || 0.271656864551
#slash##bslash#0 || times || 0.265969876607
*^ || plus || 0.264603658753
div0 || gcd || 0.263937371836
$ rational || $ nat || 0.26114518589
#bslash#4 || minus || 0.259098339987
#bslash##slash#0 || times || 0.255860355539
(are_equipotent 1) || (lt (nat2 nat1)) || 0.252831026389
divides4 || divides || 0.246903306181
$ (& natural (~ v8_ordinal1)) || $ nat || 0.24583585399
divides || le || 0.245622838444
*101 zero3 0[01] (((#hash#)12 NAT) 1) (0. F_Complex) a_Type RetSP Im30 1_NN FALSE0 (0. Z_2) NAT 0c || bool1 || 0.245403555861
(<= NAT) || (lt (nat2 nat1)) || 0.242742758612
*^ || times || 0.237964643406
$ (& (~ empty-yielding0) (& v1_matrix_0 (FinSequence (*0 (carrier (TOP-REAL 2)))))) || $ nat || 0.23391001719
#slash# || times || 0.232925376193
. || frac || 0.231345156313
-exponent || exp || 0.231298154047
^20 || is_one || 0.230306635693
#slash##bslash#0 || plus || 0.228218970761
[:..:] || times || 0.224982018095
$ (& being_simple_closed_curve (Element (bool (carrier (TOP-REAL 2))))) || $ nat || 0.221705166016
(are_equipotent NAT) || (lt (nat2 nat1)) || 0.216822881597
{..}2 || nat2 || 0.212419520233
op0 k5_ordinal1 {} || bool2 || 0.209288285215
cosh || smallest_factor || 0.20821597573
-\1 || plus || 0.206872629492
SDSub_Add_Carry || defactorize_aux || 0.20624775024
$ (& (~ empty0) (& (compact0 (TOP-REAL 2)) (Element (bool (carrier (TOP-REAL 2)))))) || $ nat || 0.204683984739
$ (& ZF-formula-like (FinSequence omega)) || $ nat || 0.201729846292
-infty0 || nat1 || 0.196827631952
divides0 || divides || 0.194900579215
$true || $ (=> nat bool) || 0.191343518969
card || nat2 || 0.190489064047
$ (Element (bool MC-wff)) || $ nat || 0.18999691617
sinh || smallest_factor || 0.189317392445
c= || reflect || 0.188715389467
<*> || nat2 || 0.188653394205
+61 || times || 0.186765438082
|^ || exp || 0.185090638044
+ || minus || 0.184934962851
divides0 || le || 0.18301337953
*1 || pred || 0.1796689105
#quote# || smallest_factor || 0.179108818843
c< || lt || 0.178841337413
(carrier R^1) +infty0 REAL || nat1 || 0.178469667502
a_Term EdgeSelector 2 (({..}3 k5_ordinal1) 1) || moebius || 0.176202938855
-60 || minus || 0.175684541819
-level || moebius_aux || 0.174937144602
ind || defactorize_aux || 0.174044721246
divides || divides || 0.171053482447
^20 || nat2 || 0.166119189292
#bslash#4 || gcd || 0.166080034985
Trivial-addLoopStr || nat1 || 0.164885313256
+` || plus || 0.163814317572
is_finer_than || le || 0.163414608981
-exponent || times || 0.162558065876
CHK || div || 0.162439439284
(0. SCMPDS) (0. SCM+FSA) (0. SCM) omega || nat1 || 0.161419295532
<*..*>4 || nat2 || 0.160929125949
$ natural || $ (=> nat bool) || 0.160686932033
(are_equipotent {}) || decidable || 0.159698909387
dyadic || fact || 0.158898435212
SetPrimes || nat2 || 0.158337100425
-\1 || div || 0.15723147869
~4 || nat2 || 0.155122115126
#bslash#4 || exp || 0.153646932745
#bslash#+#bslash# || eqb || 0.15306010981
+^1 || times || 0.152732693488
$ (& Relation-like (& Function-like complex-valued)) || $ Z || 0.152562561443
are_equipotent || divides || 0.152167114263
<= || Zlt || 0.151750139038
exp1 || log || 0.15136067232
one0 RetIC Rea0 Ser0 unit3 (1. Z_2) TRUE 0_NN non_op VertexSelector 1[01] an_Adj 1 (1_ F_Complex) 1r ({..}2 k5_ordinal1) (((#hash#)11 NAT) 1) (elementary_tree NAT) ({..}2 {}) || QO || 0.151011564614
divides0 || lt || 0.150549657578
Z_3 || nat1 || 0.150475788362
BOOLEAN || bool1 || 0.150245951104
*2 || times || 0.149750537061
-^ || minus || 0.14890551674
is_cofinal_with || le || 0.14829409318
op0 k5_ordinal1 {} || QO || 0.146646389332
numerator || smallest_factor || 0.146473526792
#bslash##slash#0 || minus || 0.145978274848
$ (& (~ empty0) (& real-bounded (Element (bool REAL)))) || $ nat || 0.143208911079
\&\12 || primeb || 0.143184628996
min2 || gcd || 0.142934543951
epsilon_ || nat2 || 0.142090854973
max || plus || 0.141872782967
angle || smart_nth_prime || 0.141249093493
(rng (carrier (TOP-REAL 2))) || fact || 0.140326472059
GoB || (times (nat2 (nat2 nat1))) || 0.140306064502
#slash# || exp || 0.139938141718
Elements || fact || 0.139255337969
(L~ 2) || pred || 0.139036551143
$true || $ Z || 0.13765051748
the_subsets_of_card || bc || 0.137408730258
^0 || plus || 0.134723613413
FALSE || bool2 || 0.134463868243
(<= 1) || (lt (nat2 nat1)) || 0.133780080881
len || fact || 0.133434987077
$ ((Element2 REAL) (REAL0 3)) || $ nat || 0.132837213116
dyadic || nth_prime || 0.13272170055
mlt0 || times_f || 0.132703954829
k1_numpoly1 || nat2 || 0.132594441226
c= || Zlt || 0.1325710854
MajP || plus || 0.132521313686
$ QC-alphabet || $ nat || 0.131601227377
$ (& LTL-formula-like (FinSequence omega)) || $ nat || 0.131410714888
$ (& natural prime) || $ nat || 0.130199148117
$ (& real-bounded (Element (bool REAL))) || $ nat || 0.129500320014
*101 zero3 0[01] (((#hash#)12 NAT) 1) (0. F_Complex) a_Type RetSP Im30 1_NN FALSE0 (0. Z_2) NAT 0c || QO || 0.129486065294
$ integer || $ nat_fact || 0.128887478753
$ (& (~ empty) (& infinite0 1-sorted)) || $ nat || 0.127694365022
a_Term EdgeSelector 2 (({..}3 k5_ordinal1) 1) || (nat2 (nat2 nat1)) || 0.12768935425
op0 k5_ordinal1 {} || Z1 || 0.127042688348
$ (~ empty0) || $ nat || 0.126057187806
elementary_tree || Z2 || 0.12504559609
meets || divides || 0.124856374861
{..}2 || Z2 || 0.12467295897
#hash#Q || times || 0.124464742531
BooleLatt || monomio || 0.12328684782
are_equipotent0 || le || 0.122698263142
elementary_tree || nat2 || 0.122500281862
$ (& (~ trivial) (FinSequence (carrier (TOP-REAL 2)))) || $ nat || 0.121680499261
*109 || times || 0.121171314666
Union2 || order || 0.120994509675
$ (& (~ empty0) (& ProbFinS (FinSequence REAL))) || $ nat || 0.120800963295
.|. || times || 0.120207081308
union0 || pred || 0.120171541738
*109 || exp || 0.120062468609
$ (Element HP-WFF) || $ nat || 0.119966932415
#slash##bslash#0 || gcd || 0.119152580696
$ (& Relation-like (& Function-like (& real-valued FinSequence-like))) || $ nat || 0.118520901728
#bslash#4 || plus || 0.118072807438
$ (& Relation-like (& (-defined omega) (& Function-like (& (~ empty0) initial0)))) || $ nat || 0.117591746139
$ (Element (bool HP-WFF)) || $ nat || 0.117053530333
meets || reflect || 0.116530897176
(are_equipotent {}) || prime || 0.116491376561
- || plus || 0.116441073335
proj1 || (exp (nat2 (nat2 nat1))) || 0.116397849826
ind1 || S_mod || 0.115915244822
exp7 || exp || 0.115549712513
divides || lt || 0.115379313303
-infty0 || (nat2 nat1) || 0.114551329345
(<= NAT) || decidable || 0.11445053252
$ (& (~ empty) (& infinite0 (& reflexive (& transitive (& antisymmetric (& with_suprema (& with_infima RelStr))))))) || $ nat_fact || 0.114198582844
({..}3 {}) || costante || 0.113461581536
* || plus || 0.113301820702
(<= 1) || prime || 0.112444834823
$ (Subfield k11_gaussint) || $ nat || 0.111955560373
||....||2 || defactorize_aux || 0.111941745839
OSSubSort0 || order || 0.111795070016
k3_fuznum_1 || defactorize_aux || 0.111658940974
|^5 || nat2 || 0.111540246737
min2 || plus || 0.1114675137
k3_fuznum_1 || pi_p0 || 0.111087928806
((|[..]|1 NAT) NAT) || nat2 || 0.110757198272
Arg || nth_prime || 0.110693218156
#slash# || plus || 0.11017060189
meets || lt || 0.109966081922
sgn || primeb || 0.10981801712
*` || times || 0.109005076284
$ ordinal || $ (=> nat bool) || 0.108904781972
*2 || plus || 0.108751887812
(are_equipotent {}) || sorted_gt || 0.107964113669
(<= (-0 1)) || (lt nat1) || 0.107937358249
min2 || times || 0.107733199459
$ (& (finite-ind $V_(& TopSpace-like TopStruct)) (Element (bool (carrier $V_(& TopSpace-like TopStruct))))) || $ nat || 0.107509858667
bseq || Z_of_nat || 0.107131284683
$ (& TopSpace-like TopStruct) || $ nat_fact || 0.107066003359
Lim || pred || 0.106861656825
(-0 1) || bool2 || 0.106364260843
.55 || index_of || 0.105997154453
gcd || plus || 0.105868447794
$ (Element (carrier (TOP-REAL 2))) || $ nat || 0.105807608175
i_n_e || teta || 0.105797901764
i_s_e || teta || 0.105797901764
i_n_w || teta || 0.105797901764
i_s_w || teta || 0.105797901764
i_e_s || teta || 0.105629685922
i_w_s || teta || 0.105629685922
is_subformula_of1 || le || 0.105360011919
$ (& Petri PT_net_Str) || $ nat || 0.105291606745
(#hash#)12 || mod || 0.105183484418
max || times || 0.104999655368
$ (& Relation-like (& Function-like (& FinSequence-like real-valued))) || $ nat || 0.104763410675
proj1 || nat2 || 0.104221037113
$ (Element (carrier $V_(& (~ empty) (& infinite0 (& reflexive (& transitive (& antisymmetric (& with_suprema (& with_infima RelStr))))))))) || $ nat || 0.104024448135
$ (& (~ empty) MultiGraphStruct) || $ nat || 0.103890989655
one0 RetIC Rea0 Ser0 unit3 (1. Z_2) TRUE 0_NN non_op VertexSelector 1[01] an_Adj 1 (1_ F_Complex) 1r ({..}2 k5_ordinal1) (((#hash#)11 NAT) 1) (elementary_tree NAT) ({..}2 {}) || bool1 || 0.103802067263
is_transitive_in || le || 0.103594800254
$ (Walk $V_(& Relation-like (& (-defined omega) (& Function-like (& infinite (& [Graph-like] (& [Weighted] nonnegative-weighted))))))) || $ nat || 0.103459991988
c=0 || divides || 0.103263271985
||....||2 || pi_p0 || 0.102981041391
*1 || nat2 || 0.102784628983
idseq || monomio || 0.102607685834
i_e_n || teta || 0.101729803974
i_w_n || teta || 0.101729803974
+61 || plus || 0.101318585148
dyadic || teta || 0.101305577741
$ (& Relation-like (& (~ empty0) (& Function-like FinSequence-like))) || $ nat || 0.101193737725
. || defactorize_aux || 0.101148492172
are_c=-comparable || cmp_cases || 0.101009531357
|1 || max || 0.100848169301
-0 || Qopp0 || 0.100807457206
proj4_4 || (exp (nat2 (nat2 nat1))) || 0.100293711332
$ (& (~ v8_ordinal1) (Element omega)) || $ nat || 0.100173486235
c=0 || Zlt || 0.100015806914
alef || nat2 || 0.0997290997321
$ (& (~ empty0) (& being_simple_closed_curve (Element (bool (carrier (TOP-REAL 2)))))) || $ nat || 0.0996313996681
PFuncs || bc || 0.0990948903159
$ (& Function-like (Element (bool (([:..:] REAL) REAL)))) || $ (=> nat nat) || 0.0987295082373
ChangeVal_2 || plus || 0.0985924704589
denominator || nat2 || 0.0983381008808
$ (& Relation-like (& (-defined omega) (& Function-like (& infinite (& [Graph-like] (& [Weighted] nonnegative-weighted)))))) || $ nat_fact || 0.0983319506343
-SD_Sub || nat2 || 0.0979037388865
+*1 || plus || 0.0978932599588
k1_numpoly1 || nth_prime || 0.0978598335233
delta1 || defactorize_aux || 0.0976903238288
height0 || defactorize_aux || 0.0975936533443
*50 || nat2 || 0.0972803780878
.cost() || defactorize_aux || 0.0969844708684
is_reflexive_in || le || 0.0969389529969
exp1 || plus || 0.0967710753659
UNIVERSE || nat2 || 0.0961237868296
$ (& (~ empty0) (& infinite Tree-like)) || $ nat || 0.0956438450693
min2 || minus || 0.0954956162456
delta1 || pi_p0 || 0.0952541669444
Card0 || pred || 0.094572540267
nextcard || nth_prime || 0.0945519361092
(-0 1) || Q10 || 0.0943531283591
#hash#Q || exp || 0.0942215646641
k1_numpoly1 || fact || 0.0940755388002
- || div || 0.0937274587315
height0 || pi_p0 || 0.0936232423027
*101 zero3 0[01] (((#hash#)12 NAT) 1) (0. F_Complex) a_Type RetSP Im30 1_NN FALSE0 (0. Z_2) NAT 0c || Z1 || 0.0935967259708
Col || costante || 0.093454573064
CHK || minus || 0.0925429582144
gcd || times || 0.0924101512645
the_transitive-closure_of || nat2 || 0.0919610146168
len3 || defactorize_aux || 0.0917672198816
is_finer_than || divides || 0.0916737391036
.cost() || pi_p0 || 0.091493230066
depth0 || order || 0.0912522400621
(-->1 omega) || plus || 0.0911829871402
a_Term EdgeSelector 2 (({..}3 k5_ordinal1) 1) || nat1 || 0.0910538743505
#slash##bslash#0 || minus || 0.090786806421
-59 || nat2 || 0.0906867283598
* || exp || 0.0905179857842
nextcard || fact || 0.090298174595
#bslash#0 || leb || 0.090172999823
#bslash#4 || times || 0.0901093681592
is_strictly_quasiconvex_on || bijn || 0.0899519308859
(<= 1) || decidable || 0.0896486259709
(. absreal) || smallest_factor || 0.0896182839839
bool || nat2 || 0.0892129847786
$ (Element (bool (Subformulae $V_(& LTL-formula-like (FinSequence omega))))) || $ nat || 0.0889872089219
$ (& polyhedron_1 (& polyhedron_2 (& polyhedron_3 PolyhedronStr))) || $ nat || 0.088981969848
++0 || times || 0.0889493764927
*` || plus || 0.0885822386178
len3 || pi_p0 || 0.088260839044
On || pred || 0.0881704807341
root-tree || nat2 || 0.0881333070104
c=0 || nat_compare || 0.0876313694665
the_subsets_of_card || exp || 0.0875754491747
-60 || bc || 0.0870049509853
SubSort0 || order || 0.0869066238861
$ (& interval (Element (bool REAL))) || $ nat || 0.0867115631345
Toler_on_subsets || nth_prime || 0.0866339708583
Normal_forms_on || nth_prime || 0.0866339708583
-\ || div || 0.0866075107003
-3 || Zopp || 0.086558801403
len || nat2 || 0.086437428652
|....|2 || nth_prime || 0.0863081180532
<= || permut || 0.0861950882236
*^ || gcd || 0.0861755497199
a_Term EdgeSelector 2 (({..}3 k5_ordinal1) 1) || (nat2 nat1) || 0.0857053787971
#quote#40 || Z_of_nat || 0.0856998744583
Arg || primeb || 0.085588726085
(* <i>) || monomio || 0.085575176483
#slash##quote#2 || times_f || 0.0855194064191
$ (& Relation-like (& (-defined omega) (& Function-like (& infinite (& [Graph-like] finite))))) || $ nat || 0.0854978943606
-\1 || leb || 0.0854858043995
((#slash#. COMPLEX) cos_C) || costante || 0.0854410913089
$ (& (~ empty0) ext-real-membered) || $ nat || 0.0849929857831
-SD_Sub || nth_prime || 0.0848989841927
-SD_Sub_S || nth_prime || 0.0848989841927
^40 || fact || 0.0846046951376
len || nth_prime || 0.0844363272805
#slash##slash##slash# || times || 0.0843648740266
[....[0 || leb || 0.0839556815601
]....]0 || leb || 0.0839556815601
Toler_on_subsets || fact || 0.0836703095402
Normal_forms_on || fact || 0.0836703095402
CHK || leb || 0.0836115426453
1q || frac || 0.0834737520048
|^|^ || times || 0.0834331111674
-SD0 || nth_prime || 0.0833221129414
|....|2 || fact || 0.0832802222069
are_equipotent || nat_compare || 0.0824384741208
are_equipotent0 || lt || 0.0822883314126
*1 || nth_prime || 0.0821430632254
-polytopes || mod || 0.0820491401181
#bslash#+#bslash# || ltb || 0.0818978955777
|^25 || exp || 0.0817926729961
$ (& Relation-like (& Function-like (& real-valued FinSequence-like))) || $ nat_fact || 0.0817729446814
(<= 2) || (lt (nat2 nat1)) || 0.0816265678103
(<= 1) || sorted_gt || 0.0815268876026
Catalan || nth_prime || 0.0812640683504
the_set_of_l2ComplexSequences || defactorize_aux || 0.0812466688224
$ (& TopSpace-like TopStruct) || $ nat || 0.0812224017764
min2 || mod || 0.0811674632545
cos || nth_prime || 0.08103960126
sin || nth_prime || 0.0810244022532
-^ || plus || 0.0810176946616
-SD_Sub || fact || 0.0810026731526
-SD_Sub_S || fact || 0.0810026731526
#bslash#0 || div || 0.0808748661135
$ TopStruct || $ nat || 0.0806240296153
$ (& (~ empty) (& reflexive (& transitive (& antisymmetric RelStr)))) || $ nat || 0.0804789910058
Rank || nth_prime || 0.0801360486696
*1 || fact || 0.0799192216629
$ (Division $V_(& (~ empty0) (& closed_interval (Element (bool REAL))))) || $ nat || 0.0798004872344
i_e_s || fact || 0.0797827450094
i_w_s || fact || 0.0797827450094
i_n_e || fact || 0.0797827450094
i_s_e || fact || 0.0797827450094
i_n_w || fact || 0.0797827450094
i_s_w || fact || 0.0797827450094
-SD0 || fact || 0.0796172851904
*50 || nth_prime || 0.0795864566188
HFuncs || nth_prime || 0.0795864566188
proj1_3 || nat2 || 0.0792659207729
proj4_4 || nat2 || 0.0791405239598
*1 || smallest_factor || 0.0789861366155
$ (Element (carrier $V_(& (~ empty) (& right_complementable (& Abelian (& add-associative (& right_zeroed (& discerning0 (& reflexive3 (& vector-distributive1 (& scalar-distributive1 (& scalar-associative1 (& scalar-unital1 (& ComplexNormSpace-like CNORMSTR)))))))))))))) || $ nat || 0.0788457472397
**4 || times || 0.078816411323
~4 || pred || 0.0785224880059
vol || fact || 0.0783222957437
(. sinh1) || nat2 || 0.0782929500788
#bslash##slash#0 || gcd || 0.078136801234
one0 RetIC Rea0 Ser0 unit3 (1. Z_2) TRUE 0_NN non_op VertexSelector 1[01] an_Adj 1 (1_ F_Complex) 1r ({..}2 k5_ordinal1) (((#hash#)11 NAT) 1) (elementary_tree NAT) ({..}2 {}) || Q10 || 0.0777303946169
the_set_of_l2ComplexSequences || pi_p0 || 0.0775712344525
i_e_n || fact || 0.0775245515912
i_w_n || fact || 0.0775245515912
*50 || fact || 0.0773899514681
HFuncs || fact || 0.0773899514681
IRRAT || leb || 0.0773524053416
$ (& Relation-like (& Function-like real-valued)) || $ nat || 0.0772533716468
Edges_Out0 || order || 0.0771202413074
Edges_In0 || order || 0.0771202413074
Catalan || fact || 0.0771135868561
$ complex-membered || $ nat_fact || 0.077019017421
$ (Element (carrier $V_(& (~ empty) (& right_complementable (& Abelian (& add-associative (& right_zeroed (& vector-distributive1 (& scalar-distributive1 (& scalar-associative1 (& scalar-unital1 (& ComplexUnitarySpace-like CUNITSTR)))))))))))) || $ nat || 0.0769655345973
$ (& Relation-like (& Function-like (& T-Sequence-like infinite))) || $ nat || 0.0767639814408
frac || nth_prime || 0.0767335806526
||....||3 || defactorize_aux || 0.0765652995509
in || lt || 0.0762699376092
0* || nat2 || 0.0762146154055
$ (Element (bool $V_(& (~ empty0) infinite))) || $ nat || 0.0761796806622
id0 || smallest_factor || 0.0754798027621
k4_numpoly1 || bc || 0.0754686166626
**5 || times || 0.0754257618545
$ (Element omega) || $ nat || 0.0754091031809
-root || exp || 0.0752447056565
union0 || defactorize || 0.0751510940238
(are_equipotent {}) || (lt (nat2 nat1)) || 0.0751303444953
Left_Cosets || order || 0.0749650107759
**6 || bc || 0.0748723484052
-41 || S_mod || 0.0746804936331
i_e_s || nth_prime || 0.0746606731078
i_w_s || nth_prime || 0.0746606731078
i_n_e || nth_prime || 0.0746606731078
i_s_e || nth_prime || 0.0746606731078
i_n_w || nth_prime || 0.0746606731078
i_s_w || nth_prime || 0.0746606731078
-SD || (times (nat2 (nat2 nat1))) || 0.0741759453828
$ (& (-valued (([....] NAT) 1)) (& Function-like (& ((quasi_total $V_(~ empty0)) REAL) (Element (bool (([:..:] $V_(~ empty0)) REAL)))))) || $ nat || 0.074116991859
-roots_of_1 || fact || 0.0739689840381
mod^ || exp || 0.0738021634153
exp2 || derivative || 0.0736871506374
Shift0 || max || 0.0736332066558
fsloc || Z2 || 0.0735125461964
frac || fact || 0.073351641407
numerator || (exp (nat2 (nat2 nat1))) || 0.0732459584799
$ (& (~ empty0) constituted-DTrees) || $ nat || 0.0730488429552
||....||3 || pi_p0 || 0.0730174884622
$ (Element (carrier $V_(& (~ empty) (& right_complementable (& Abelian (& add-associative (& right_zeroed (& vector-distributive (& scalar-distributive (& scalar-associative (& scalar-unital (& discerning0 (& reflexive3 (& RealNormSpace-like NORMSTR)))))))))))))) || $ nat || 0.0728552177775
is_strongly_quasiconvex_on || permut || 0.0725804227484
Lim || nat2 || 0.0723728346698
i_e_n || nth_prime || 0.0723286618165
i_w_n || nth_prime || 0.0723286618165
- || bc || 0.0723141537249
^40 || nth_prime || 0.0721712214067
len || teta || 0.0721380226857
carrier || fact || 0.0720480791129
carrier || pred || 0.0720135949443
|....|2 || nat2 || 0.0719501143131
prob || defactorize_aux || 0.0717975711397
*0 || nat2 || 0.0716314686811
PFuncs || exp || 0.0715922101027
is_differentiable_in || divides || 0.071319894546
meets || le || 0.0713124735838
free_magma || max || 0.0712287056637
$ (Element (carrier $V_(& (~ empty) (& right_complementable (& Abelian (& add-associative (& right_zeroed (& vector-distributive (& scalar-distributive (& scalar-associative (& scalar-unital (& RealUnitarySpace-like UNITSTR)))))))))))) || $ nat || 0.0710962594805
-0 || S_mod || 0.071034517626
$ (& Relation-like (& Function-like (& real-valued FinSequence-like))) || $ Z || 0.0710206636141
|^8 || filter0 || 0.0709674438973
k1_matrix_0 || (exp (nat2 (nat2 nat1))) || 0.0706602520311
k2_int_8 || primeb || 0.070545825341
RED || mod || 0.0703086735613
FirstLoc || Z3 || 0.0702563184879
SubstitutionSet || times || 0.0699632500275
$true || $true || 0.0697697605683
|->0 || defactorize_aux || 0.0697426868153
Toler_on_subsets || teta || 0.0696939261245
Normal_forms_on || teta || 0.0696939261245
|` || max || 0.0695266507723
$ (& Relation-like (& Function-like complex-valued)) || $ nat_fact || 0.0695122626183
(. cosh1) || B1 || 0.0691217800408
$ real-membered0 || $ nat || 0.0690525069968
divides || reflect || 0.0689490503347
(<= NAT) || sorted_gt || 0.0688936068501
#slash##bslash#0 || mod || 0.0687311919077
min0 || Z3 || 0.0686139346722
id0 || sqrt || 0.0684731031832
On || nat2 || 0.0684185036537
id0 || prim || 0.0682245748886
(#hash#)20 || times_f || 0.0682128779131
*56 || length || 0.0681765004903
denominator || (times (nat2 (nat2 nat1))) || 0.0681095020858
is_cofinal_with || cmp_cases || 0.0680507891049
prob || pi_p0 || 0.0679502924637
k1_integr20 || fact || 0.0678221083416
|....|2 || smallest_factor || 0.0678052724556
^8 || plus || 0.0677180028092
(<= NAT) || good_cache_spec || 0.0676633155856
]....[1 || leb || 0.0676258890757
$ (& (~ empty) (& infinite0 (& reflexive (& transitive (& antisymmetric (& with_suprema (& with_infima RelStr))))))) || $ (=> nat bool) || 0.0675794121113
-SD_Sub || teta || 0.0675406121052
-SD_Sub_S || teta || 0.0675406121052
$ (& (~ empty) (& Group-like (& associative multMagma))) || $true || 0.0674741803546
$ (& Relation-like (& non-empty (& (-valued $V_(& (~ empty0) universal0)) (& T-Sequence-like (& Function-like (DOMAIN-yielding $V_(& (~ empty0) universal0))))))) || $ (finite_enumerable $V_$true) || 0.067431301561
$ Relation-like || $ (=> nat bool) || 0.06743068914
<= || cmp_cases || 0.0673519882934
{..}0 || transpose || 0.0672960460736
(. signum) || primeb || 0.0672572972853
sproduct || nat2 || 0.0670446225958
tolerates || le || 0.0670292211612
++1 || times || 0.0669455758979
$ (& Relation-like (& (-defined omega) (& Function-like (& (~ empty0) infinite)))) || $ nat || 0.0667185975425
dyadic || nat2 || 0.0666207740497
#quote#38 || Zopp || 0.0665159387147
div || plus || 0.0664379214779
are_equipotent || minus || 0.0664273256557
(#slash# 1) || Z_of_nat || 0.0663718929921
QC-symbols || fact || 0.0663500303725
free_magma_carrier || nat2 || 0.0663464715848
-SD0 || teta || 0.0660220827587
$ (& Function-like (& ((quasi_total omega) REAL) (& eventually-nonnegative (Element (bool (([:..:] omega) REAL)))))) || $ nat || 0.066019641458
gcd0 || gcd || 0.0659772329528
|(..)| || pi_p0 || 0.0659430106855
underlay || defactorize || 0.0659352490383
meets || cmp_cases || 0.0658944456687
(-->1 COMPLEX) || plus || 0.0657878163516
--1 || times || 0.065752616098
compose || max || 0.0656307615061
the_subsets_of_card || plus || 0.0655780424874
fsloc || fraction1 || 0.0655524707144
abs8 || Zopp || 0.0654858556191
$ (& (~ infinite) cardinal) || $ nat || 0.0652955919713
-\1 || gcd || 0.0652754189257
is_differentiable_in || le || 0.0651339330306
-7 || plus || 0.0650930740692
-\ || minus || 0.0650189455574
(UBD 2) || (exp (nat2 (nat2 nat1))) || 0.0649805970677
|^ || plus || 0.064972774053
id7 || nat2 || 0.0646014317082
0q || plus || 0.0644730249134
pi4 || times || 0.0643844398313
-CycleSet || fact || 0.0642306113491
c=0 || minus || 0.0641648580309
proj2_4 || nat2 || 0.0641286735138
proj1_4 || nat2 || 0.0641286735138
proj3_4 || nat2 || 0.0641286735138
#slash#10 || bc || 0.0639391208619
((#slash#. COMPLEX) sin_C) || pred || 0.0638341749957
{..}2 || derivative || 0.0638296523878
$ (& (non-empty0 $V_(& (~ empty) (& infinite0 (& (~ void) (& Circuit-like (& monotonic ManySortedSign)))))) (& (finite-yielding $V_(& (~ empty) (& infinite0 (& (~ void) (& Circuit-like (& monotonic ManySortedSign)))))) (MSAlgebra $V_(& (~ empty) (& infinite0 (& (~ void) (& Circuit-like (& monotonic ManySortedSign)))))))) || $ (finite_enumerable $V_$true) || 0.0638246258455
{..}18 || nat2 || 0.0638220386174
#bslash#+#bslash# || leb || 0.0637419764082
$ ext-real-membered || $ nat_fact || 0.0636400970338
id0 || pred || 0.0635750770742
len || (exp (nat2 (nat2 nat1))) || 0.063553257092
^omega || nth_prime || 0.0633626482705
**4 || plus || 0.0631966301041
$ ConwayGame-like || $ nat || 0.0631217268616
free_magma_carrier || pred || 0.0630259805657
*101 zero3 0[01] (((#hash#)12 NAT) 1) (0. F_Complex) a_Type RetSP Im30 1_NN FALSE0 (0. Z_2) NAT 0c || compare2 || 0.0629248181595
-^ || times || 0.0629028805849
+ || exp || 0.0629003934335
*50 || teta || 0.062893294134
HFuncs || teta || 0.062893294134
\&\2 || gcd || 0.0628288423779
Catalan || teta || 0.062827103076
^omega || fact || 0.0626185313728
k1_ltlaxio3 || nat2 || 0.0625075083783
cos || fact || 0.062495905979
sin || fact || 0.0624846526582
Rank || nat2 || 0.0623938067106
carrier || defactorize || 0.0623410581888
#slash##slash##slash#0 || times || 0.0623027557194
$ (& (compact0 (TOP-REAL 2)) (& with_the_max_arc (Element (bool (carrier (TOP-REAL 2)))))) || $ nat || 0.0622894393249
+^1 || gcd || 0.0620511242215
c< || le || 0.0619848136524
$ (& LTL-formula-like (FinSequence omega)) || $ nat_fact || 0.0619431827751
$ (& Relation-like (& (-defined omega) (& Function-like (& infinite (& [Graph-like] (& [Weighted] nonnegative-weighted)))))) || $ (=> nat bool) || 0.0618444385347
$ (& Relation-like (& Function-like complex-valued)) || $ nat || 0.0617838384265
sech || nat2 || 0.0617208319325
|....| || fact || 0.0617173158966
$ (& Relation-like (& Function-like (& (~ constant) (& (~ empty0) (& real-valued FinSequence-like))))) || $ nat || 0.0615672804817
*56 || order || 0.0614519078439
free_magma_mult || C2 || 0.0613577709793
--2 || times || 0.0613491143615
*^ || exp || 0.0613439441793
op0 k5_ordinal1 {} || (Z_of_nat nat1) || 0.0613022232616
#bslash#+#bslash# || minus || 0.0612231003042
k1_integr20 || nth_prime || 0.0612166658267
^40 || nat2 || 0.0612092500518
CompleteSGraph || nat2 || 0.0611066989741
(<= ((* 2) P_t)) || prime || 0.0607639069353
the_rank_of0 || pred || 0.0606355819984
**5 || plus || 0.060592676112
free_magma_mult || B_split2 || 0.060499871789
MajP || times || 0.0603188892322
Arg || fact || 0.0602527566426
proj2_4 || pred || 0.0601905091758
proj1_4 || pred || 0.0601905091758
proj3_4 || pred || 0.0601905091758
-->0 || minus || 0.06016272117
- || gcd || 0.0600560758497
.|. || nat_compare || 0.0600466052089
(are_equipotent NAT) || sorted_gt || 0.0598886037822
width || fact || 0.0593534136316
$ (& (~ empty) (& right_complementable (& Abelian (& add-associative (& right_zeroed (& discerning0 (& reflexive3 (& vector-distributive1 (& scalar-distributive1 (& scalar-associative1 (& scalar-unital1 (& ComplexNormSpace-like CNORMSTR)))))))))))) || $ nat_fact || 0.0592469471865
$ (& (~ empty) (& right_complementable (& Abelian (& add-associative (& right_zeroed (& vector-distributive1 (& scalar-distributive1 (& scalar-associative1 (& scalar-unital1 (& ComplexUnitarySpace-like CUNITSTR)))))))))) || $ nat_fact || 0.0592314328794
frac || teta || 0.0591451349621
the_transitive-closure_of || pred || 0.0591007846172
$ (& ordinal natural) || $ (=> nat bool) || 0.0590856702367
seq_id0 || Z_of_nat || 0.0590745217597
one0 RetIC Rea0 Ser0 unit3 (1. Z_2) TRUE 0_NN non_op VertexSelector 1[01] an_Adj 1 (1_ F_Complex) 1r ({..}2 k5_ordinal1) (((#hash#)11 NAT) 1) (elementary_tree NAT) ({..}2 {}) || (nat2 (nat2 nat1)) || 0.0588598980529
$ (Element (bool (^omega0 $V_$true))) || $ (list $V_$true) || 0.0587784507629
RelIncl0 || smallest_factor || 0.0587765976529
\&\2 || times || 0.0587484049664
is_finer_than || lt || 0.0586085110173
-0 || Z_of_nat || 0.0585880592079
seq_id || Z_of_nat || 0.0585476680555
k1_integr20 || teta || 0.05849686676
LeftComp || B || 0.0584743578697
(carrier R^1) +infty0 REAL || (nat2 nat1) || 0.0583951913427
[....]5 || ltb || 0.0583065398244
#slash# || frac || 0.0582484654608
k1_ltlaxio3 || pred || 0.0581584462306
Fin || nat2 || 0.0581509277812
SubstitutionSet || plus || 0.0581255071058
^21 || Zopp || 0.0580787589015
\not\11 || A || 0.0578528824655
*101 zero3 0[01] (((#hash#)12 NAT) 1) (0. F_Complex) a_Type RetSP Im30 1_NN FALSE0 (0. Z_2) NAT 0c || (Z_of_nat nat1) || 0.0576402605127
Entropy || fact || 0.0576008481547
<*..*>4 || factorize || 0.0575369847216
-Root || exp || 0.0574947466705
mod^ || bc || 0.0574799340378
proj1 || fact || 0.057421536643
|^|^ || mod || 0.0573600797356
proj1_3 || pred || 0.0573311947761
the_rank_of0 || nat2 || 0.0571894123949
varcl || nat2 || 0.057115718568
ApproxIndex || fact || 0.0569987810115
Edges || nat2 || 0.0569811165954
degree || nth_prime || 0.0568852812391
TWOELEMENTSETS || nat2 || 0.056865007763
-^ || exp || 0.0568403522234
carrier || derivative || 0.0567373326744
$ integer || $ (=> nat bool) || 0.0567369734013
-\1 || divides_b || 0.0567328820326
|(..)| || mod || 0.0567221771035
depth || index_of || 0.0566561320819
*50 || pred || 0.0565960207313
SetPrimes || pred || 0.0565202604225
nextcard || teta || 0.0562273535579
gcd || mod || 0.0561123535212
intloc || Z3 || 0.0560842845474
succ0 || (exp (nat2 (nat2 nat1))) || 0.05587690116
k1_numpoly1 || teta || 0.0557105292075
$ (& Relation-like Function-like) || $ (=> nat bool) || 0.055698377953
quasi_orders || le || 0.0556105850351
(. arccosec1) || A\ || 0.0555944512886
(. arcsec2) || A\ || 0.0555944512886
(. arcsec1) || A\ || 0.0555944512886
(. arccosec2) || A\ || 0.0555944512886
exp1 || mod || 0.0552685003062
*\33 || times || 0.0552188643619
$ (& (~ empty0) infinite) || $ nat_fact || 0.0552188214528
mod1 || minus || 0.0550587587919
OSSubSort || index_of || 0.0550396325179
1q || times || 0.0549767037775
Rev0 || compare_invert || 0.0548600611715
is_symmetric_in || le || 0.0548353534653
-CycleSet || teta || 0.0548244147249
op0 k5_ordinal1 {} || compare2 || 0.0547908781581
$ (& GG (& EE G_Net)) || $ nat || 0.0546726868241
$ (& Relation-like (& (-defined (carrier SCM+FSA)) (& Function-like (& (-compatible ((the_Values_of (card3 3)) SCM+FSA)) (total (carrier SCM+FSA)))))) || $ nat || 0.0546693210234
is_strictly_convex_on || permut || 0.0545244587612
|10 || frac || 0.0544949191954
Union || pred || 0.0544690279463
CnPos || nat2 || 0.0543154879545
CompleteSGraph || pred || 0.0542928112053
$ (& (~ empty0) (& closed_interval (Element (bool REAL)))) || $ nat_fact || 0.0541832697569
free_magma || bc || 0.0541548399377
(<= 2) || (lt nat1) || 0.0541052421837
VERUM2 FALSUM ((<*..*>1 omega) NAT) || nat1 || 0.0541003135413
sproduct || fact || 0.0540920146088
$ (& (~ empty) (& right_complementable (& Abelian (& add-associative (& right_zeroed (& vector-distributive (& scalar-distributive (& scalar-associative (& scalar-unital (& RealUnitarySpace-like UNITSTR)))))))))) || $ nat_fact || 0.0540557869194
CompleteRelStr || factorize || 0.0540484413363
numerator || (times (nat2 (nat2 nat1))) || 0.0539839000964
+infty || nat1 || 0.0539088937186
SubSort || index_of || 0.0538604049719
$ (& Relation-like (& Function-like DecoratedTree-like)) || $ nat || 0.0538243631217
$ (Element (carrier $V_(& (~ empty) MultiGraphStruct))) || $ (finite_enumerable $V_$true) || 0.05378801964
abs || nat2 || 0.0537874279241
$ (& (~ empty) (& right_complementable (& Abelian (& add-associative (& right_zeroed (& vector-distributive (& scalar-distributive (& scalar-associative (& scalar-unital (& discerning0 (& reflexive3 (& RealNormSpace-like NORMSTR)))))))))))) || $ nat_fact || 0.0537607007672
div || exp || 0.053682841953
(<= 4) || (le (nat2 (nat2 nat1))) || 0.0536784731993
Funcs || plus || 0.0536612972166
(. sinh0) || A\ || 0.05362566739
(are_equipotent NAT) || prime || 0.0535664792914
Lim || smallest_factor || 0.0535615384834
symplexes || fact || 0.0535605916256
free_magma || exp || 0.0535508304112
SpStSeq || (times (nat2 (nat2 nat1))) || 0.0535250141247
PFuncs || times || 0.053444103982
$ (& (normal0 $V_(& (~ empty) (& Group-like (& associative multMagma)))) (Subgroup $V_(& (~ empty) (& Group-like (& associative multMagma))))) || $ (finite_enumerable $V_$true) || 0.0533828982313
diameter || fact || 0.0533812424441
-Terms || order || 0.0533441020772
epsilon_ || pred || 0.0532989598293
is_antisymmetric_in || le || 0.0532723077557
(are_equipotent NAT) || decidable || 0.0531556224148
partially_orders || le || 0.0530293403109
first_epsilon_greater_than || pred || 0.0528356363003
({..}2 NAT) || (nat2 nat1) || 0.052694996901
-| || minus || 0.052656912452
|--0 || minus || 0.052656912452
INTERSECTION0 || gcd || 0.0526406927161
f_escape || pred || 0.0526223778456
f_entrance || pred || 0.0526223778456
f_exit || pred || 0.0526223778456
f_enter || pred || 0.0526223778456
$ (Element (carrier $V_(& (~ empty) (& Group-like (& associative multMagma))))) || $ $V_$true || 0.0525799817018
first_epsilon_greater_than || nat2 || 0.0525279618951
QC-symbols || nth_prime || 0.0525109126845
++2 || defactorize_aux || 0.0524508259636
First*NotIn || nat2 || 0.0522147220608
degree || fact || 0.0521231202881
Lucas || nat2 || 0.0520561098358
mod || bc || 0.0519405959243
nextcard || nat2 || 0.0518017972513
(dom (carrier SCM+FSA)) || fact || 0.0517950656326
varcl || pred || 0.0516396193638
is_proper_subformula_of0 || le || 0.051632754052
RelIncl0 || sqrt || 0.051613238718
|....|2 || teta || 0.0515884663746
--3 || defactorize_aux || 0.0514612675353
-CycleSet || nth_prime || 0.051402920402
RelIncl0 || prim || 0.0513673549347
~17 || compare_invert || 0.0513581430163
Fib || nat2 || 0.0513560775369
TWOELEMENTSETS || pred || 0.0513452370993
[:..:] || plus || 0.051342072059
CL || pred || 0.0512978112901
(-->0 omega) || A\ || 0.0512463009879
P_cos || nat2 || 0.051226911826
(. sinh1) || A\ || 0.0512252342614
#slash#10 || mod || 0.0511431029603
Entropy || nth_prime || 0.0509507128189
r1_int_8 || le || 0.0509335189541
FirstNotIn || nat2 || 0.0509267268736
(<*..*>1 (carrier (TOP-REAL 2))) || smallest_factor || 0.0508895431383
div || minus || 0.0508787038037
seq0 || bc || 0.0508189870108
$ real || $ (=> nat bool) || 0.0507102197884
k4_numpoly1 || frac || 0.0506932461916
is_SetOfSimpleGraphs_of || le || 0.0505517111321
Edges || pred || 0.0505476538205
(-0 1) || nat1 || 0.0505096029836
(<= P_t) || prime || 0.0504627725797
[#bslash#..#slash#] || nat2 || 0.0504067146451
-49 || plus || 0.0502983867646
*71 || fact || 0.0502914082786
is_quasiconvex_on || bijn || 0.0500590602096
(. P_sin) || nat2 || 0.0500424691964
|^|^ || bc || 0.0499505975999
(]....]0 -infty0) || B1 || 0.0499173869211
#quote# || Qopp0 || 0.0499064289375
1*0 || A\ || 0.0497744491445
TOP-REAL || nat2 || 0.0497400432195
SubstitutionSet || list_n_aux || 0.0497194132447
cosh0 || C1 || 0.0496806689073
con_class1 || order || 0.049678093355
dl. || A\ || 0.0495339266471
Center || fact || 0.049494759228
{..}2 || factorize || 0.0494442142625
FreeSort || index_of || 0.0493797651063
choose0 || mod || 0.0493262911891
$ (& (~ trivial) natural) || $ nat || 0.0492643634831
*101 zero3 0[01] (((#hash#)12 NAT) 1) (0. F_Complex) a_Type RetSP Im30 1_NN FALSE0 (0. Z_2) NAT 0c || bool2 || 0.0492198747573
|_2 || min || 0.0491800341189
max+1 || C1 || 0.0491454998675
~3 || nat2 || 0.049124546308
sproduct || nth_prime || 0.0491138271845
are_equipotent || cmp_cases || 0.0491127058597
$ (& natural (& prime Safe)) || $ nat || 0.0491038440452
denominator || fact || 0.0489871006596
]....[1 || le || 0.0489581488162
k5_moebius2 || fact || 0.0488585326296
dyadic || Z2 || 0.048777095234
Leaves || A || 0.0487258901467
RED || min || 0.048674405395
k4_numpoly1 || mod || 0.048643975736
-roots_of_1 || nth_prime || 0.0482259525557
(elementary_tree 1) || nat1 || 0.0482176933615
#bslash#+#bslash# || plus || 0.0481814698824
free_magma_carrier || C1 || 0.0481573053447
#slash# || nat_compare || 0.0481103741653
^omega || teta || 0.0480556884326
QC-symbols || teta || 0.0480541782838
((|[..]|1 NAT) NAT) || A\ || 0.0478855904211
carrier || Z_of_nat || 0.0478376082385
(carrier R^1) +infty0 REAL || (Z_of_nat nat1) || 0.0478126107562
*99 || Zplus || 0.0478084675439
Edges_Out || index_of || 0.047744986744
Edges_In || index_of || 0.047744986744
(0. G_Quaternion) 0q0 || (nat2 nat1) || 0.0477053855808
(carrier R^1) +infty0 REAL || Z1 || 0.0476535062877
]....[1 || lt || 0.047519674749
-49 || minus || 0.0473657927112
(.5 dist14) || bc || 0.0473300913012
-DiscreteTop || plus || 0.0471855981236
Entropy || teta || 0.0471813185929
$ ((Element2 REAL) (REAL0 $V_natural)) || $ (=> nat bool) || 0.047097144968
vol || nth_prime || 0.0470247748307
(|^ 2) || nat2 || 0.0470054567976
[....[0 || bc || 0.0470007279861
]....]0 || bc || 0.0470007279861
$ (& infinite0 RelStr) || $ nat || 0.0469971709236
Arg || teta || 0.0469499266523
|_2 || mod || 0.0469048223389
-30 || Zopp || 0.0468908087049
RelIncl0 || pred || 0.0468669808769
++0 || plus || 0.046785707564
$ natural || $ (=> $V_$true bool) || 0.0467728375175
**6 || exp || 0.0467573121001
$ (& infinite (Element (bool FinSeq-Locations))) || $ nat || 0.0467239599684
[....]5 || leb || 0.0467121683019
$ (& integer (~ even)) || $ nat || 0.046670683697
#bslash##slash#0 || Zplus || 0.0466524307586
*71 || nth_prime || 0.0466224304393
-Root || mod || 0.0465932985359
width || teta || 0.046576005615
#quote#0 || compare_invert || 0.046555014586
ApproxIndex || nth_prime || 0.0464818771515
(<= (-0 1)) || (lt (nat2 nat1)) || 0.0464585964344
FixedUltraFilters || teta || 0.0464207772397
^0 || times || 0.0464080973265
one0 RetIC Rea0 Ser0 unit3 (1. Z_2) TRUE 0_NN non_op VertexSelector 1[01] an_Adj 1 (1_ F_Complex) 1r ({..}2 k5_ordinal1) (((#hash#)11 NAT) 1) (elementary_tree NAT) ({..}2 {}) || bool2 || 0.0463925889198
]....[1 || bc || 0.0463664529963
-root || mod || 0.0462576683443
#slash##slash##slash#0 || plus || 0.0461667908121
intloc || fraction2 || 0.0461475860552
CnIPC || nat2 || 0.0460811752926
commutators0 || index_of || 0.046026194453
<%..%> || nat2 || 0.0460058947481
con_class0 || order || 0.0459306967901
idsym || Z2 || 0.0458977113769
(<*> REAL) || (nat2 nat1) || 0.0458452980197
|_2 || gcd || 0.0458084647916
CnCPC || nat2 || 0.0457940385742
(((.1 HP-WFF) (bool0 HP-WFF)) k4_ltlaxio3) || nth_prime || 0.0457843100728
$ natural || $ nat_fact || 0.0457827856213
In_Power || nat2 || 0.0457772030552
k1_numpoly1 || pred || 0.0457521156596
(. sinh0) || B1 || 0.0456373168282
width || nth_prime || 0.0455946292227
$ (~ empty0) || $ nat_fact || 0.0455941871452
+ || gcd || 0.0455491600811
is_Rcontinuous_in || bijn || 0.0454496313582
is_Lcontinuous_in || bijn || 0.0454496313582
(*32 3) || bc || 0.0453613731717
max || minus || 0.04533800733
exp1 || bc || 0.0453250095387
ProperPrefixes || nat2 || 0.045228109854
#bslash#0 || minus || 0.0451698116172
Tarski-Class || nat2 || 0.0451133149463
card0 || fact || 0.0450907052753
meet || primeb || 0.0450680133544
exp7 || mod || 0.0449830950896
Collapse || max || 0.0449528967854
RED || exp || 0.0449390559075
max-1 || C2 || 0.0448559394354
CnS4 || nat2 || 0.0448136081831
sup4 || fact || 0.0447904951345
-below0 || index_of || 0.0446143740327
CatSign0 || factorize || 0.0444892355766
union0 || nat2 || 0.0444589656552
(([..] {}) {}) || nat1 || 0.0444381492096
max-1 || B_split2 || 0.0443588266784
k4_numpoly1 || exp || 0.0443255002923
Radix || nat2 || 0.0442978934152
Lim || sqrt || 0.0441871527793
#hash#N || bc || 0.0439828513647
Lim || prim || 0.0438821487682
(. sinh1) || B1 || 0.0438514406589
$ (& natural (~ even)) || $ nat || 0.0438436581058
mod || mod || 0.0438040843489
.order() || fact || 0.0437502748976
Trivial-addLoopStr || (nat2 nat1) || 0.0437385802577
-- || nat2 || 0.0436828000994
$ (& Relation-like (& Function-like (& T-Sequence-like Ordinal-yielding))) || $ nat || 0.0436801063317
$ (& (~ empty) (& (~ degenerated) (& right_complementable (& almost_left_invertible (& Abelian (& add-associative (& right_zeroed (& well-unital (& distributive (& associative (& commutative doubleLoopStr))))))))))) || $ nat || 0.0436207187845
R_id || nat1 || 0.043619708275
$ (& (~ trivial) (& Relation-like (& Function-like FinSequence-like))) || $ nat || 0.0436124923187
are_congruent_mod || congruent || 0.0435627281712
ApproxIndex || teta || 0.0435555664487
CircleIso || (Z_of_nat nat1) || 0.0434296772204
-6 || QO || 0.0434296772204
.:0 || max || 0.0434262408271
<%..%> || factorize || 0.043403328251
--6 || defactorize_aux || 0.0433538251872
--4 || defactorize_aux || 0.0433538251872
|....| || Z_of_nat || 0.0433210392896
$ (Element (bool REAL)) || $ nat || 0.0433161570377
P_cos || B1 || 0.0433091871185
$ (& LTL-formula-like (FinSequence omega)) || $ (=> nat bool) || 0.0433067664602
-59 || compare_invert || 0.043303529117
proj4_4 || pred || 0.0432848119916
(. arccosec1) || B1 || 0.0432492959225
(. arcsec2) || B1 || 0.0432492959225
(. arcsec1) || B1 || 0.0432492959225
(. arccosec2) || B1 || 0.0432492959225
#slash#10 || exp || 0.0432030908472
(. arcsin) || A\ || 0.0431256616542
(. cosh1) || A\ || 0.0431147012885
([..] {}3) || nat2 || 0.043110051358
-tree0 || plus || 0.0430402318649
symplexes || teta || 0.0429986490244
<N< || le || 0.0429798943832
is_strongly_quasiconvex_on || bijn || 0.0429738649805
PFuncs || plus || 0.0429716471743
elementary_tree || Z3 || 0.042817279627
$ (Element 0) || $ nat || 0.0428146866408
-BinarySequence || plus || 0.042768610532
#quote#10 || max || 0.0427091457669
-level || bc || 0.0426559803718
++3 || defactorize_aux || 0.0426119241573
(0. G_Quaternion) 0q0 || nat1 || 0.0426054563587
dl. || B1 || 0.0426028460959
(. arcsin0) || A\ || 0.0425959936035
disjoin || nat2 || 0.0425602236966
~4 || compare_invert || 0.0425576396469
({..}18 NAT) || (nat2 nat1) || 0.0425493992989
$ (& infinite (Element (bool Int-Locations))) || $ nat || 0.0425432303271
Fin || pred || 0.0425137516055
*58 || Zplus || 0.0424693764027
vol || teta || 0.0423980936278
dl. || nat2 || 0.0423899481004
. || plus || 0.0423100395758
$ (& (~ empty0) (& (compact0 (TOP-REAL 2)) (& (~ horizontal) (& (~ vertical) (Element (bool (carrier (TOP-REAL 2)))))))) || $ nat || 0.0423068847362
Fib || pred || 0.0422927529657
card || nth_prime || 0.0422363443589
!8 || Z2 || 0.0421987968938
#quote##quote# || nat2 || 0.042170990212
Center || nth_prime || 0.0421368693359
divides4 || le || 0.0421048846228
|^5 || pred || 0.0419440125994
-Root || bc || 0.0418854496405
proj4_4 || Z_of_nat || 0.0418542007598
(-root tau) || C1 || 0.0418518696336
$ (& (~ empty) (& right_complementable (& Abelian (& add-associative (& right_zeroed (& vector-distributive1 (& scalar-distributive1 (& scalar-associative1 (& scalar-unital1 (& ComplexUnitarySpace-like CUNITSTR)))))))))) || $ (=> nat bool) || 0.0417793000095
|^|^ || log || 0.0417569270915
+17 || compare_invert || 0.0416444284107
sproduct || teta || 0.0415767410932
[#bslash#..#slash#] || pred || 0.0414912177784
exp7 || bc || 0.0414512932525
symplexes || nth_prime || 0.0412800056567
..0 || minus || 0.0412006788001
-0 || (exp (nat2 (nat2 nat1))) || 0.0410172016305
sinh || B_split2 || 0.0408919105315
(are_equipotent {}) || sorted_lt || 0.0408859466221
sinh || C2 || 0.0408760297088
l_add0 || nat1 || 0.0408466644806
Toler_on_subsets || nat2 || 0.0408267268632
Normal_forms_on || nat2 || 0.0408267268632
*101 zero3 0[01] (((#hash#)12 NAT) 1) (0. F_Complex) a_Type RetSP Im30 1_NN FALSE0 (0. Z_2) NAT 0c || CASE || 0.0408062415474
proj1 || pred || 0.0406213737936
cosh0 || B_split1 || 0.0406065856394
!7 || bc || 0.0405726203635
@44 || leb || 0.0405692401364
<*>0 || nat2 || 0.0404811035017
-->0 || Zplus || 0.0404545459803
$ SimpleGraph-like || $ nat || 0.0404477293858
(-root 2) || Z2 || 0.0403723842461
+48 || nat2 || 0.0403473317669
{..}2 || Z_of_nat || 0.0403282597963
succ1 || nth_prime || 0.0403230857707
#hash#Q || log || 0.0402694011421
*51 || exp || 0.040195140508
Catalan || nat2 || 0.0401620997197
$ (& (~ empty) (& right_complementable (& Abelian (& add-associative (& right_zeroed (& discerning0 (& reflexive3 (& vector-distributive1 (& scalar-distributive1 (& scalar-associative1 (& scalar-unital1 (& ComplexNormSpace-like CNORMSTR)))))))))))) || $ (=> nat bool) || 0.0401408644906
(-->0 omega) || B1 || 0.0401235751379
denominator || nth_prime || 0.0400862852386
id7 || pred || 0.0399988550387
|_2 || exp || 0.0399851523086
-SD_Sub_S || nat2 || 0.0399789132717
min || nat2 || 0.0399633173958
#quote##quote# || pred || 0.0399533433681
Y-InitStart || nat2 || 0.0399200516854
card || Z2 || 0.0397759341842
(*32 3) || exp || 0.0397690050095
$ (Element (carrier $V_(& reflexive (& transitive (& antisymmetric (& lower-bounded (& with_suprema RelStr))))))) || $ (finite_enumerable $V_$true) || 0.0397269221668
|^ || mod || 0.039710002205
is_immediate_constituent_of1 || lt || 0.0396867705277
*1 || Qopp0 || 0.039597085086
+ || Fmult || 0.0395650689128
#bslash#+#bslash# || times || 0.0395099989752
Radical || nat2 || 0.0394997980543
$ (& (~ empty0) infinite) || $ (=> nat bool) || 0.0394660860412
-SD0 || nat2 || 0.0394335219879
is_subformula_of0 || le || 0.039415606381
-root || gcd || 0.0393478399745
-\1 || times || 0.0393210212534
Subtrees0 || nat2 || 0.0393189782453
lcm0 || plus || 0.0393143901616
*147 || (times (nat2 (nat2 nat1))) || 0.0392918429922
1*0 || B1 || 0.0392324376975
!8 || fact || 0.0391758019058
gcd0 || minus || 0.0391648453393
disjoin || pred || 0.0391622780248
Radix || smallest_factor || 0.0391595555278
Inv0 || nat2 || 0.0391373657252
!7 || frac || 0.0390709955332
-\ || leb || 0.0390259601374
Fermat || nat2 || 0.0389900632319
$ (& integer (~ even)) || $ (=> R0 R0) || 0.0388683467809
$ (& (~ empty0) (& closed_interval (Element (bool REAL)))) || $ (=> nat bool) || 0.0388569365702
_GraphSelectors || nat1 || 0.0388458851112
*71 || teta || 0.0388444984304
#bslash#0 || divides_b || 0.0388316080994
MidOpGroupObjects || fact || 0.0387932114303
AbGroupObjects || fact || 0.0387932114303
(-0 1) || (nat2 nat1) || 0.0387479500637
k5_moebius2 || nth_prime || 0.0387221926237
Tempty_f_net || nat2 || 0.0386403045578
ProperPrefixes || pred || 0.038636283371
field || nat2 || 0.0386245542983
dl. || Z3 || 0.0386101394947
$ real || $ (list nat) || 0.0385490681381
$ (& (~ empty) (& right_complementable (& Abelian (& add-associative (& right_zeroed (& vector-distributive (& scalar-distributive (& scalar-associative (& scalar-unital (& RealUnitarySpace-like UNITSTR)))))))))) || $ (=> nat bool) || 0.0385001564576
(:->0 NAT) || A\ || 0.0384855040371
escape || pred || 0.0384411675511
$ (& v1_matrix_0 (FinSequence (*0 COMPLEX))) || $ Z || 0.0384402404978
frac || nat2 || 0.0384027519368
0q || minus || 0.0383905407577
are_equipotent0 || reflect || 0.0383795669339
|[..]|2 || nat2 || 0.0383658487799
HFuncs || nat2 || 0.0383606104478
multMagma0 || times || 0.0383554332696
succ1 || fact || 0.0383308091501
the_right_side_of || nat2 || 0.0383092719889
entrance || pred || 0.0383008957038
the_rank_of0 || Z2 || 0.0382711439356
$ (& Relation-like (& (-defined (carrier SCM+FSA)) (& Function-like (-compatible ((the_Values_of (card3 3)) SCM+FSA))))) || $ nat || 0.0382495553617
the_value_of || nat2 || 0.0382339913978
CnPos || fact || 0.0381165789662
free_magma || mod || 0.0380998630336
lower_bound || defactorize || 0.0380849794276
upper_bound2 || defactorize || 0.038072709641
[:..:] || exp || 0.0377898155407
mod || exp || 0.0377752245848
([:..:] omega) || (exp (nat2 (nat2 nat1))) || 0.0377672044359
((|[..]|1 NAT) NAT) || B1 || 0.0377216216487
-root || bc || 0.0377125389494
tree || times || 0.0376125236876
dl. || Z2 || 0.0375273943084
-0 || Z3 || 0.0375136320711
$ (& Relation-like (& Function-like (& constant (& (~ empty0) (& real-valued (& FinSequence-like positive-yielding)))))) || $ nat || 0.0374467810888
max || gcd || 0.0374090622348
sproduct || pred || 0.0374081110869
GroupObjects || fact || 0.0373635926008
++1 || plus || 0.0372635727184
~3 || pred || 0.0372341204099
i_e_s || nat2 || 0.0371904832513
i_w_s || nat2 || 0.0371904832513
i_n_e || nat2 || 0.0371904832513
i_s_e || nat2 || 0.0371904832513
i_n_w || nat2 || 0.0371904832513
i_s_w || nat2 || 0.0371904832513
*1 || teta || 0.037133096276
div || times || 0.0371065427436
^0 || gcd || 0.0370611379597
bool || pred || 0.037058834378
(. cosh1) || nat2 || 0.0369755591422
(. sinh1) || nth_prime || 0.0369518918551
div^ || exp || 0.0369247487339
Seg || Z_of_nat || 0.0369075911187
k5_moebius2 || teta || 0.0369019623162
$ (& (~ empty) (& right_complementable (& Abelian (& add-associative (& right_zeroed (& vector-distributive (& scalar-distributive (& scalar-associative (& scalar-unital (& discerning0 (& reflexive3 (& RealNormSpace-like NORMSTR)))))))))))) || $ (=> nat bool) || 0.0369014250565
field || pred || 0.0368935817523
Pempty_e_net || factorize || 0.036816572547
Tempty_e_net || factorize || 0.036816572547
Tempty_f_net || factorize || 0.036816572547
(<= 4) || prime || 0.0367878745394
-0 || Z2 || 0.0367269437254
$ (Element (carrier Complex_l1_Space)) || $ nat || 0.0367024206141
$ (Element (carrier linfty_Space)) || $ nat || 0.0367024206141
$ (Element (carrier l1_Space)) || $ nat || 0.0367024206141
$ (Element (carrier Complex_linfty_Space)) || $ nat || 0.0367024206141
RingObjects || fact || 0.0367020597496
0.1 || nat1 || 0.0366244225796
[....[0 || ltb || 0.0365403810087
]....]0 || ltb || 0.0365403810087
--1 || plus || 0.0365263342675
(-root 2) || fact || 0.0364065477569
i_e_n || nat2 || 0.0363622193846
i_w_n || nat2 || 0.0363622193846
Union || nat2 || 0.0363089906721
sup4 || Z2 || 0.0362721090022
seq0 || mod || 0.0362076629104
Rank || factorize || 0.0361298700404
Center || teta || 0.0360742979461
^40 || pred || 0.0360553156106
ConwayZero0 || nat1 || 0.0360203277942
k19_msafree5 || plus || 0.0359957650946
RED || gcd || 0.0359489884085
ConwayDay || fact || 0.0359365320453
denominator || teta || 0.0358348958549
block || bc || 0.0358001827799
Radical || smallest_factor || 0.0356943014427
#slash# || minus || 0.0356708006283
#slash##slash##slash# || plus || 0.0356380910464
({..}3 {}) || A\ || 0.0356156800047
(-root 2) || A\ || 0.0356130041397
*51 || gcd || 0.0355843379659
k1_matrix_0 || fact || 0.0355582312659
0_Rmatrix0 || (times (nat2 (nat2 nat1))) || 0.0355260006395
SubstitutionSet || transpose || 0.0354391911421
(.5 dist14) || ltb || 0.0353598347614
k2_numpoly1 || times || 0.035359021869
min || Qopp0 || 0.0353512848086
(0. SCMPDS) (0. SCM+FSA) (0. SCM) omega || (nat2 nat1) || 0.035296210052
$ (& Relation-like (& Function-like Cardinal-yielding)) || $ nat || 0.0352786961032
(. cosh1) || C || 0.0352676253804
(.5 dist14) || minus || 0.0352609542292
{..}18 || factorize || 0.0352149011144
(NonZero SCM) SCM-Data-Loc || nat1 || 0.0351948102271
-67 || Zpred || 0.0351547643223
--0 || nat2 || 0.0351071335791
max+1 || B_split1 || 0.0351021789007
|^19 || index_of || 0.035051593257
Pempty_f_net || factorize || 0.0349598439321
(. sin0) || A\ || 0.0349406250679
$ (& SimpleGraph-like finitely_colorable) || $ nat || 0.0348985985733
-^ || bc || 0.0348587263608
(. sin1) || A\ || 0.0348290954091
the_rank_of0 || fact || 0.0347853681867
FlatCoh || factorize || 0.0347375834364
|^11 || exp || 0.0346042095715
SourceSelector 3 || nat1 || 0.0345673406543
(.5 dist14) || nat_compare || 0.034412702651
quasi_orders || bijn || 0.0343899518164
(|-> omega) || plus || 0.0343502967909
topology || fact || 0.0343495514837
card0 || nth_prime || 0.0343245293289
id0 || Z2 || 0.0342600779938
(. arcsin0) || B1 || 0.0342519682794
(. arcsin) || B1 || 0.0342519682794
Rotate || plus || 0.0342244951975
TrivialOp || factorize || 0.0342230643454
On || smallest_factor || 0.0342180984161
(to_power0 to_power) || defactorize || 0.0341857866411
carrier || (times (nat2 (nat2 nat1))) || 0.0341589323286
$ (& v1_matrix_0 (FinSequence (*0 REAL))) || $ Z || 0.0341480320592
mod1 || bc || 0.0340950377078
$ (& (~ empty0) subset-closed0) || $ nat || 0.0340818216606
seq0 || exp || 0.0340587993065
--2 || plus || 0.0340103666005
((#slash#. COMPLEX) cosh_C) || C1 || 0.0339811294616
|^14 || index_of || 0.0339266608727
underlay || pred || 0.0338911322059
\not\2 || sqrt || 0.0338819159069
k1_nat_6 || bc || 0.0338560964186
.14 || uniq || 0.0336884754598
carr || order || 0.0336356692772
(-root tau_bar) || C2 || 0.0335432431483
downarrow0 || order || 0.0335404540362
. || minus || 0.033530446932
$ (& Relation-like (& T-Sequence-like (& Function-like infinite))) || $ nat || 0.0334964802204
F_Complex || nat1 || 0.0334594527519
UNION0 || times || 0.0334508334856
free_magma_carrier || B_split1 || 0.0334393591836
$ (& SimpleGraph-like with_finite_clique#hash#0) || $ nat || 0.0333935622615
idsym || nat2 || 0.0333572029109
Sum23 || fact || 0.0333332703822
Seg0 || nat2 || 0.0333092024693
+^1 || minus || 0.0333075456939
lcm0 || times || 0.0332982786115
(-root tau_bar) || B_split2 || 0.0332585784018
k4_rvsum_3 || fact || 0.0332566216983
INTERSECTION0 || times || 0.0332269353015
GO || divides || 0.0330335524055
(dom (carrier SCM+FSA)) || teta || 0.033024605421
|_2 || max || 0.0329835404715
last0 || defactorize || 0.0329782453839
limit- || C1 || 0.0329315600777
free_magma0 || C || 0.0329156985446
is_continuous_in || divides || 0.032895294204
QC-symbols || nat2 || 0.0328822804624
Tempty_e_net || nat2 || 0.0328605219372
-36 || Zpred || 0.0327189740676
@44 || frac || 0.0327093181091
Filt || (exp (nat2 (nat2 nat1))) || 0.0326799049923
$ (& (order-sorted1 $V_(& (~ empty) (& (~ void) (& order-sorted (& discernable OverloadedRSSign))))) (MSAlgebra $V_(& (~ empty) (& (~ void) (& order-sorted (& discernable OverloadedRSSign)))))) || $ (finite_enumerable $V_$true) || 0.0326452137269
card0 || teta || 0.0326050608866
GO0 || divides || 0.0326006206515
$ (& (~ empty0) (& infinite (Element (bool omega)))) || $ nat || 0.0325619826869
#bslash#0 || times || 0.0324678106278
free_magma0 || B1 || 0.0324417294262
(]....] -infty0) || Z2 || 0.0324067022508
.order() || nth_prime || 0.0323971554892
$ (& (~ empty) MultiGraphStruct) || $true || 0.0323800956248
SIMPLEGRAPHS || nth_prime || 0.0323658729204
idseq || Z2 || 0.0323584265777
(<= 4) || (lt nat1) || 0.0323265444468
(<*> omega) || (nat2 nat1) || 0.0323220677987
k1_integr20 || nat2 || 0.0323096141863
PFuncs || mod || 0.0322615959012
CnIPC || pred || 0.0322516122563
^omega || nat2 || 0.0322514768931
the_Tree_of || fact || 0.0321880058728
RAT0 || ltb || 0.032114824142
#quote# || compare_invert || 0.0320428786577
- || eqb || 0.0320245253906
Arg || nat2 || 0.0320236710948
-67 || Zsucc || 0.0319900947386
CnCPC || pred || 0.0319887902518
compose || exp || 0.0319566564426
$ natural || $ $V_$true || 0.0319393376121
tree || plus || 0.0319164392861
|^.. || index_of || 0.0318980560119
$ (Element (carrier $V_(& (~ empty) (& infinite0 (& (~ void) (& Circuit-like (& monotonic ManySortedSign))))))) || $ $V_$true || 0.0318795342991
$ (~ empty0) || $ (=> nat bool) || 0.0318782061451
P_t || bool2 || 0.031871982419
Radix || pred || 0.0318399364943
#hash#N || mod || 0.0318253376599
one0 RetIC Rea0 Ser0 unit3 (1. Z_2) TRUE 0_NN non_op VertexSelector 1[01] an_Adj 1 (1_ F_Complex) 1r ({..}2 k5_ordinal1) (((#hash#)11 NAT) 1) (elementary_tree NAT) ({..}2 {}) || compare2 || 0.0317931937995
NEG_MOD || plus || 0.0317250007874
FinSeq-Locations SCM+FSA-Data*-Loc0 || nat1 || 0.0316951915127
1TopSp || (times (nat2 (nat2 nat1))) || 0.0316302915915
RED || max || 0.0315793022718
ConwayDay || Z2 || 0.0315784213544
$ complex || $ Q0 || 0.031561616041
CnPos || pred || 0.0315523346554
<*..*>4 || Z2 || 0.0315359560554
Frege0 || min || 0.0315175611023
Radix || fact || 0.0315139889128
*1 || Z2 || 0.0315042083546
#bslash#+#bslash# || bc || 0.0314993061985
.order() || teta || 0.0314870272846
\not\11 || Z_of_nat || 0.0314733762071
One-Point_Compactification || nat2 || 0.0314546199911
(:->0 NAT) || B1 || 0.0314009596174
in || le || 0.0313587762817
id7 || factorize || 0.0312754037758
$ (FinSequence REAL) || $ nat || 0.0312369512574
([..] 1) || A\ || 0.0312276294953
(((Initialize (card3 3)) SCM+FSA) ((:->0 (intloc NAT)) 1)) || nat1 || 0.0311922793352
(are_equipotent {}) || ((injective nat) nat) || 0.0311873074267
divides || Zlt || 0.0311718775495
1_ || nat2 || 0.0311338903901
$ (& Relation-like (& non-empty (& (-defined omega) (& Function-like (total omega))))) || $ nat || 0.0311316115783
CnS4 || pred || 0.0310988253205
Mersenne || A || 0.0310968117423
(. sin1) || B1 || 0.0310698475459
|....| || nth_prime || 0.0310654764233
(. sin0) || B1 || 0.0310208195395
(-root tau) || B_split1 || 0.0309977401594
*43 || index_of || 0.0309792949425
frac0 || list_n_aux || 0.0309764004727
(0. SCMPDS) (0. SCM+FSA) (0. SCM) omega || Z1 || 0.030921028717
SIMPLEGRAPHS || fact || 0.0308828877855
(]....[1 -infty0) || C1 || 0.0308676054139
-7 || times || 0.0308335721456
Radical || sqrt || 0.0307615903549
SD_Add_Data || min || 0.0306482222812
coth || C || 0.0306041826035
Radical || prim || 0.0305953162594
QC-symbols || (times (nat2 (nat2 nat1))) || 0.0305511263158
Int-Locations || nat1 || 0.0305158449183
|^ || bc || 0.0304982653766
.|. || plus || 0.0304382001772
$ (& strict5 (& (normal0 $V_(& (~ empty) (& Group-like (& associative multMagma)))) (Subgroup $V_(& (~ empty) (& Group-like (& associative multMagma)))))) || $ (finite_enumerable $V_$true) || 0.030429128944
c= || nat_compare || 0.0303985556852
coth || B1 || 0.0303732802786
#hash#N || exp || 0.0303171312479
is_SetOfSimpleGraphs_of || Zlt || 0.0303123141671
SCM-goto || A\ || 0.03025066646
the_subsets_of_card || times || 0.0302457336786
Pitag_dist || C2 || 0.0302282079585
BOOL || factorize || 0.030212817945
-\1 || bc || 0.0301986642595
Pitag_dist || B_split2 || 0.0301521760678
criticals || nat2 || 0.0300364296506
On || sqrt || 0.0300209977698
(|[..]|1 NAT) || plus || 0.029993803704
(#bslash##slash#0 ({..}2 -infty0)) || Z_of_nat || 0.029987907627
lcm0 || ltb || 0.0299807260803
-36 || Zsucc || 0.0299197154746
(.5 dist14) || eqb || 0.0299129467339
1_ || Z_of_nat || 0.0298998076199
{..}2 || (times (nat2 (nat2 nat1))) || 0.029896695434
$ (& Relation-like (& (-defined omega) (& Function-like (& infinite [Graph-like])))) || $ nat || 0.0298919101699
On || prim || 0.029877088587
SDSub_Add_Carry || pi_p0 || 0.0298510794202
Rev0 || (exp (nat2 (nat2 nat1))) || 0.0298497905556
PGraph || factorize || 0.0298271992443
1TopSp || factorize || 0.0298271992443
is_continuous_in || le || 0.0298060693323
$ ordinal-membered || $ nat || 0.0297647794317
!7 || minus || 0.0297581822426
$ (& (~ empty) (& infinite0 (& (~ void) (& Circuit-like (& monotonic ManySortedSign))))) || $true || 0.0297427224422
|^8 || index_of || 0.029698290479
-level || mod || 0.0295399982823
UMP || pred || 0.0295190893951
$ (& Relation-like (& (-defined (carrier SCMPDS)) (& Function-like (& (-compatible ((the_Values_of (card3 2)) SCMPDS)) (total (carrier SCMPDS)))))) || $ nat || 0.0294385528857
sigma1 || times || 0.0294352946054
SmallestPartition || nat2 || 0.0294331933167
-29 || exp || 0.0294251639156
({..}3 {}) || B1 || 0.0293576317205
|->0 || frac || 0.0293431757346
1* || nat2 || 0.0293351624192
Mycielskian1 || nat2 || 0.0293272346715
are_isomorphic2 || divides || 0.0293168404265
cosh1 || (nat2 nat1) || 0.0293089992066
(-root 2) || B1 || 0.0291894956574
the_subsets_of_card || mod || 0.0291745180972
-flat_tree || plus || 0.0291728305062
is_cofinal_with || divides || 0.0291702959451
.76 || A || 0.0291638994811
dom0 || fact || 0.0291575172434
is_convex_on || bijn || 0.0291378108227
MidOpGroupObjects || teta || 0.0290655385581
AbGroupObjects || teta || 0.0290655385581
$ (& (~ empty0) (& primitive-recursively_closed (Element (bool (HFuncs omega))))) || $ nat || 0.0290491886542
Lucas || pred || 0.028997850128
frac0 || times || 0.0289775019623
RN_Base || factorize || 0.028960312876
cpx2euc || nat2 || 0.0289255045266
\not\2 || (times (nat2 (nat2 nat1))) || 0.028909837895
RN_Base || nat2 || 0.0288760202826
dyadic || sieve || 0.0288644823792
|^11 || gcd || 0.0287857926352
criticals || pred || 0.0287774611665
chromatic#hash#0 || fact || 0.0287073437676
(. sinh0) || C1 || 0.0286679965345
-->0 || plus || 0.0286563911368
:->0 || nat_compare || 0.0286418507784
quotient1 || exp || 0.028620465632
Catalan || A || 0.0285783860526
*6 || bc || 0.0285342978663
$ (& (~ empty) (& (~ void) ManySortedSign)) || $true || 0.0285154365983
union0 || smallest_factor || 0.0285141244142
cocf || C || 0.0284941294056
-Root || plus || 0.0284325579084
AbGroupCat || C1 || 0.0284161166103
TOL || fact || 0.0283925422375
bool || nth_prime || 0.0283918252135
Entropy || nat2 || 0.028390948078
idsym || Z3 || 0.0283508018689
divides4 || reflect || 0.0283422918438
cocf || B1 || 0.0283292191902
PTempty_f_net || plus || 0.0283286203333
([....[0 -infty0) || C1 || 0.0283157807652
is_subformula_of1 || lt || 0.0282870991695
((*2 SCM+FSA-OK) SCM*-VAL) || (Z_of_nat nat1) || 0.0282832278063
Tarski-Class0 || plus || 0.0282771795109
idseq || pred || 0.0282414014968
PFuncs || frac || 0.0282009936102
proj1 || nth_prime || 0.0281948352189
Sum0 || defactorize || 0.0281822667544
-level || exp || 0.028143673735
(.5 dist14) || leb || 0.0281426344854
k1_matrix_0 || nth_prime || 0.0281025569901
CircleMap || (Z_of_nat nat1) || 0.0280908447111
R_EAL1 || exp || 0.0280713508744
FinUnion || enum || 0.0280635325314
*42 || index_of || 0.0280058765285
max0 || fact || 0.0280000076819
(]....]0 -infty0) || A\ || 0.0279857533925
POSETS || fact || 0.0279419341512
-CycleSet || nat2 || 0.0278761356049
-root0 || gcd || 0.0278045100625
$ infinite || $ nat || 0.0277852020321
k1_nat_6 || minus || 0.0277710356429
the_transitive-closure_of || nth_prime || 0.0277700464724
-^ || ltb || 0.0277398362504
-60 || nat_compare || 0.0277047443569
are_relative_prime0 || lt || 0.0276821566408
pcs-singleton || Z2 || 0.027679715037
+*1 || times || 0.0276672750241
lower_bound || pred || 0.0276540544115
GroupObjects || teta || 0.0276445102668
root-tree || Zsucc || 0.0276171550502
$ (& Relation-like (& (-defined omega) (& Function-like infinite))) || $ nat || 0.0275964554068
k11_lpspacc1 || nat2 || 0.0275948518677
Radical || pred || 0.0275878815733
fsloc || nat2 || 0.027481474339
COMPLEX0 || nat2 || 0.027448356668
the_transitive-closure_of || fact || 0.0274455369691
root-tree || Zpred || 0.0274423366165
CnPos || nth_prime || 0.0274152426145
root-tree || Z2 || 0.027408846859
succ1 || Z2 || 0.0274022090006
Subtrees0 || pred || 0.0273920415593
upper_bound2 || pred || 0.0273653904655
$ (Element (bool (^omega0 $V_$true))) || $ (finite_enumerable $V_$true) || 0.0273631341219
SubstitutionSet || le || 0.0273564860795
RingObjects || teta || 0.0273447540003
clique#hash#0 || fact || 0.0273028086878
*1 || (exp (nat2 (nat2 nat1))) || 0.0272979643737
InclPoset || (times (nat2 (nat2 nat1))) || 0.027290509883
Inv0 || pred || 0.0272714198696
partially_orders || permut || 0.027243203705
|= || divides || 0.0272257540028
LattPOSet || Z_of_nat || 0.0272215026431
is_right_differentiable_in || permut || 0.02719570146
is_left_differentiable_in || permut || 0.02719570146
block || minus || 0.02718526367
!7 || ltb || 0.0271784930137
Funcs6 || times || 0.0271761886638
arctan0 || A || 0.0271455273225
Frege0 || mod || 0.0271397468072
lcm || gcd || 0.0271074398266
$ (& Function-like (Element (bool (([:..:] COMPLEX) COMPLEX)))) || $ (=> nat nat) || 0.0270937568969
|^5 || Z2 || 0.0270908840291
is_a_normal_form_wrt || divides || 0.0270752493722
Funcs || frac || 0.0270557019649
EqRelLatt || nat2 || 0.0270313622136
SubstitutionSet || lt || 0.0269989193712
lcm0 || minus || 0.0269955850533
|....| || teta || 0.0269908953939
.|. || exp || 0.0269715982732
INTERSECTION0 || minus || 0.0269621185925
bool0 || Z2 || 0.0269556181298
<=>0 || minus || 0.0269170675464
SD_Add_Data || mod || 0.0268971014972
<=>0 || bc || 0.0268841586773
len- || C || 0.0268499795895
$ (& (auxiliary(i) $V_(& reflexive (& transitive (& antisymmetric (& lower-bounded (& with_suprema RelStr)))))) (Element (bool (([:..:] (carrier $V_(& reflexive (& transitive (& antisymmetric (& lower-bounded (& with_suprema RelStr))))))) (carrier $V_(& reflexive (& transitive (& antisymmetric (& lower-bounded (& with_suprema RelStr)))))))))) || $ $V_$true || 0.0268470131833
cf || fact || 0.0267412264406
vol || nat2 || 0.026733819859
is_continuous_on1 || bijn || 0.0267302277798
`2 || (exp (nat2 (nat2 nat1))) || 0.0266612551195
ApproxIndex || nat2 || 0.0266446526359
(|-> COMPLEX) || plus || 0.0266209389137
width || nat2 || 0.0266156025919
(dom (carrier SCM+FSA)) || nth_prime || 0.0265773135338
Frege0 || gcd || 0.0265624116701
-polytopes || plus || 0.0265535751279
(]....]0 -infty0) || C || 0.0265336267018
$ (Element RAT+) || $ nat || 0.0265328210047
Col || fact || 0.0265061883186
is_convex_on || permut || 0.0265058432746
proj1 || teta || 0.0264442626357
INT || nat1 || 0.0264212971305
mod^ || min || 0.0264171280249
arcsin1 || A || 0.0264046481759
(#slash# 1) || compare_invert || 0.0263094557833
len- || B1 || 0.0263081845384
*71 || nat2 || 0.02627041777
-root || plus || 0.0262640939099
UNION0 || min || 0.0262487461684
nabla || (times (nat2 (nat2 nat1))) || 0.026244315108
$ (& Relation-like (& Function-like (& FinSequence-like complex-valued))) || $ nat || 0.0262223653537
.. || min || 0.0262117422797
QC-pred_symbols || teta || 0.026200429633
1q || exp || 0.0261774514805
choose || gcd || 0.0261656067453
cosh || A || 0.0261587208953
is_proper_subformula_of0 || lt || 0.0261193111308
mod1 || plus || 0.0261113046563
$ (& (~ empty0) preBoolean) || $ nat || 0.0261106674779
#slash##bslash#0 || lt || 0.0260808711639
{..}2 || B_split2 || 0.0260717202649
{..}2 || B1 || 0.0260531042457
([..] 1) || B1 || 0.0260486536633
#slash##bslash#0 || le || 0.0260348582683
(0.REAL 3) || nat1 || 0.0260273738094
-roots_of_1 || teta || 0.0260205664968
PFuncs || ltb || 0.0260130360577
(<= NAT) || sorted_lt || 0.0260125114829
([....]5 -infty0) || C1 || 0.0260024050531
union0 || sqrt || 0.0259804739459
{..}2 || C2 || 0.0259734169579
Lucas || C || 0.0259645490922
the_right_side_of || fact || 0.0259556552801
sup4 || Z_of_nat || 0.0259344870714
SIMPLEGRAPHS || Zsucc || 0.0259009353903
is_in_the_area_of || lt || 0.0258963809651
hcf || minus || 0.0258920309238
union0 || prim || 0.0258902549582
!7 || nat_compare || 0.0258687851103
((#slash#. COMPLEX) sinh_C) || C2 || 0.0258556856317
is_cofinal_with || lt || 0.0258274930561
$ (& ordinal natural) || $ bool || 0.0258147575732
Lucas || B1 || 0.0257424878028
<%..%> || Z2 || 0.0257393049652
(<= (-0 1)) || sorted_gt || 0.0257266657936
ind1 || defactorize || 0.0257071138686
halfline || factorize || 0.0257029941273
RealFuncUnit || nat2 || 0.0256970847884
{$} || nat2 || 0.0256586249863
((#slash#. COMPLEX) sinh_C) || B_split2 || 0.0256438582297
MidOpGroupCat || C || 0.0255986360927
$ (MSAlgebra $V_(& (~ empty) (& (~ void) ManySortedSign))) || $ (finite_enumerable $V_$true) || 0.0255837958451
(<*> omega) || nat1 || 0.0255691816535
+ || times_f || 0.0255594440349
-UPS_category || pred || 0.0255501733471
0_Rmatrix || plus || 0.0255241492588
Funcs || times || 0.0255011102689
the_Tree_of || nth_prime || 0.0254325086504
topology || nth_prime || 0.0253981390014
{}0 || Qopp0 || 0.0253591819492
SCM-goto || B1 || 0.025339985898
mod1 || min || 0.0253241894186
((#slash#. COMPLEX) cosh_C) || B_split1 || 0.0253019700587
rngs || defactorize || 0.0252603952366
ZERO1 || nat2 || 0.0252441227314
\not\2 || nat2 || 0.0251904235418
South_Arc || smallest_factor || 0.0251683068709
North_Arc || smallest_factor || 0.0251683068709
pcs-total || Z_of_nat || 0.0251636366438
(]....]0 -infty0) || C1 || 0.0251000054431
LastLoc || fact || 0.0250745566771
$ (& (~ empty) (& unital (SubStr <REAL,+>))) || $ finType || 0.0250671178896
MidOpGroupCat || B1 || 0.0250559847583
is_SetOfSimpleGraphs_of || lt || 0.0250555501864
left_closed_halfline || factorize || 0.0250538326203
card || fact || 0.025050186613
is_differentiable_on6 || permut || 0.0250352472859
is_a_normal_form_wrt || le || 0.0249828883018
Sum^ || defactorize || 0.0249334161101
$ (& (~ empty) (& strict64 MultiGraphStruct)) || $ nat || 0.024906213539
QC-variables || teta || 0.0249016501382
|....|2 || A\ || 0.024876357335
- || times || 0.0248622392629
<*> || costante || 0.024854809035
alef || Z3 || 0.0248357655259
Im3 || fact || 0.0248274042153
SymGroup || Z2 || 0.0248225234478
$ (& (~ empty0) (Element (bool (carrier (TopSpaceMetr $V_(& (~ empty) (& Reflexive (& discerning (& symmetric (& triangle MetrStruct)))))))))) || $ (sort $V_eqType) || 0.0247726081278
$true || $ bool || 0.0247424513944
sinh0 || (nat2 nat1) || 0.0246931569634
- || nat_compare || 0.0246747391056
1q || plus || 0.0246641357263
Re2 || fact || 0.0246593617934
$ (& (~ empty0) (& closed_interval (Element (bool REAL)))) || $ nat || 0.024658347047
$ (& (~ empty0) (& subset-closed0 binary_complete)) || $ nat || 0.0246314559688
cliquecover#hash# || teta || 0.0245843067644
UNION0 || mod || 0.0245737718261
FALSE || nat1 || 0.0245596516285
|23 || div || 0.0245353531381
frac0 || transpose || 0.0245206236567
$ (& ordinal (Element $V_(& (~ empty0) universal0))) || $ $V_$true || 0.0245045865641
(. arctan) || A\ || 0.0244918597577
VERUM2 FALSUM ((<*..*>1 omega) NAT) || (nat2 nat1) || 0.0244876358852
|^ || times || 0.0244622481363
Center || nat2 || 0.0244520702293
sinh1 || (nat2 nat1) || 0.0244453592507
topology || teta || 0.024441709478
k1_matrix_0 || teta || 0.0244013494303
$true || $ $V_$true || 0.0243906043446
SD_Add_Data || gcd || 0.0243844705118
k2_int_8 || smallest_factor || 0.0243705866841
(]....[1 -infty0) || B_split1 || 0.0243587863116
k4_rvsum_3 || teta || 0.0243301258666
hcf || plus || 0.0243251689058
SDSub_Add_Carry || min || 0.0242840926438
([....]5 -infty0) || C || 0.0242816365266
Seg || nat2 || 0.0242808737653
+17 || A || 0.0242714926579
exp7 || minus || 0.0242572486804
k10_lpspacc1 || nat2 || 0.0242441968479
$ (& (~ empty) (& right_complementable (& Abelian (& add-associative (& right_zeroed (& vector-distributive (& scalar-distributive (& scalar-associative (& scalar-unital (& strict82 (& RealUnitarySpace-like UNITSTR))))))))))) || $ nat || 0.0241878356458
mod1 || mod || 0.0241857653737
are_isomorphic3 || Zlt || 0.0241539312976
mod^ || gcd || 0.0241427205933
([....]5 -infty0) || B1 || 0.0241314883006
symplexes || nat2 || 0.0241055647303
cat0 || times || 0.0240922571951
are_relative_prime0 || divides || 0.0240769085715
<:..:>3 || gcd || 0.0240589238954
c= || minus || 0.0240423059216
<*..*>4 || notb || 0.0240160171447
chromatic#hash# || defactorize || 0.024010967479
UNION0 || gcd || 0.0239970526835
cosh || C || 0.0239953148108
right_open_halfline || factorize || 0.0239845591459
max0 || Z2 || 0.0239776398568
mod1 || ltb || 0.0239668783914
P_cos || C || 0.0239622080881
2sComplement || plus || 0.0239587363882
SIMPLEGRAPHS || nat2 || 0.0239328265239
cosh || B1 || 0.0238980773285
(]....[ -infty0) || nat2 || 0.0238861301073
|23 || exp || 0.0238861122277
carrier || nat2 || 0.0238714894085
Necklace || factorize || 0.023864805116
+*2 || plus || 0.0238360555335
<*..*>5 || nat_compare || 0.0238314476321
alef || Z2 || 0.0238149123442
pr12 || plus || 0.0238102905643
max+1 || nat2 || 0.0237909337563
pfexp || nat2 || 0.0237804127202
sinh || C1 || 0.02377689378
k1_nat_6 || ltb || 0.0237745993252
(. arccot) || A\ || 0.0237688336367
(c=0 2) || A\ || 0.0237674358678
#quote##quote#0 || nat2 || 0.0237601316042
$ (& strict5 (Subgroup $V_(& (~ empty) (& Group-like (& associative multMagma))))) || $ (finite_enumerable $V_$true) || 0.023757167461
In_Power || pred || 0.023731059588
R_EAL1 || mod || 0.0237293296079
c_n || C1 || 0.0236813048223
exp7 || times || 0.0236797106774
|[..]|2 || Z3 || 0.0236674997427
Upper_Middle_Point || smallest_factor || 0.0236510865219
Lower_Middle_Point || smallest_factor || 0.0236510865219
SDSub_Add_Carry || mod || 0.0236081412368
mod1 || nat_compare || 0.0235933648141
\or\3 || gcd || 0.0235856702122
goto || nat2 || 0.0235836718946
(L~ 2) || fact || 0.0235409303471
$ (& (~ empty) (& right_complementable (& Abelian (& add-associative (& right_zeroed (& strict30 (& vector-distributive2 (& scalar-distributive2 (& scalar-associative2 (& scalar-unital2 Z_ModuleStruct)))))))))) || $ nat || 0.0235392029104
(]....] -infty0) || C || 0.0235352745575
*109 || gcd || 0.0235311699241
block || ltb || 0.0235220729309
k4_rvsum_3 || nth_prime || 0.0235196261168
#slash##bslash#0 || exp || 0.0235087296542
$ (& Relation-like (& Function-like FinSubsequence-like)) || $ nat || 0.0234614524853
cosh1 || nat1 || 0.0234269711123
#quote# || nat2 || 0.0234262139792
subset-closed_closure_of || Z_of_nat || 0.0234183681645
(]....] -infty0) || B1 || 0.0234126944585
Fib || A || 0.0234095755604
k1_nat_6 || nat_compare || 0.0234093613452
(]....[1 -infty0) || A\ || 0.0234092585761
exp2 || C || 0.0233548253577
#bslash#4 || ltb || 0.023354576268
c[10] ((|[..]| 1) NAT) || QO || 0.0233296856939
[:..:] || nat_compare || 0.0232523095587
(||....||2 Complex_l1_Space) || nth_prime || 0.023248030106
(||....||2 l1_Space) || nth_prime || 0.023248030106
(||....||2 linfty_Space) || nth_prime || 0.023248030106
(||....||2 Complex_linfty_Space) || nth_prime || 0.023248030106
$ (Element (bool (^omega $V_$true))) || $ (finite_enumerable $V_$true) || 0.0232440105574
(to_power0 to_power) || pred || 0.0232020321404
UNIVERSE || Z3 || 0.0232001785727
<%..%>1 || B || 0.0231905896611
GroupCat || C1 || 0.0231655113187
exp2 || B1 || 0.0231629995306
\not\10 || nat2 || 0.0231497820147
RAT0 || leb || 0.02314118586
cobool || B || 0.0231407947681
StoneR || teta || 0.0231368363535
R_EAL1 || gcd || 0.0231336504732
clique#hash# || defactorize || 0.0231327374592
right_closed_halfline || factorize || 0.0231320771347
(. sinh0) || B_split1 || 0.0230989125563
MidOpGroupObjects || nth_prime || 0.0230643703833
AbGroupObjects || nth_prime || 0.0230643703833
cot || C || 0.0230494569134
$ (& (~ empty) (& right_complementable (& strict25 (& Abelian (& add-associative (& right_zeroed (& vector-distributive (& scalar-distributive (& scalar-associative (& scalar-unital RLSStruct)))))))))) || $ nat || 0.0230456983819
0q || times || 0.0230347457771
div^ || min || 0.0230255322652
epsilon_ || fact || 0.0230209544891
(<= (-0 1)) || decidable || 0.0230172290999
<N< || lt || 0.02301262271
(-tuples_on NAT) || Z2 || 0.0230004478046
cot || B1 || 0.0229958794522
#bslash##slash#0 || ltb || 0.022995695723
Tarski-Class || nth_prime || 0.0229898497423
is_continuous_in5 || bijn || 0.0229854483462
-^ || nat_compare || 0.0229609599641
div^ || mod || 0.0229427076192
Lucas || nth_prime || 0.0229406822007
len || Z2 || 0.0229266534231
-^ || eqb || 0.0229174602134
FlatCoh || nat2 || 0.0228944940835
right_open_halfline || nat2 || 0.0228927090585
chromatic#hash#0 || Z2 || 0.0228871927957
Leaves1 || Z_of_nat || 0.0228839322828
base- || C2 || 0.0228537858263
id0 || (exp (nat2 (nat2 nat1))) || 0.0227980189402
-^ || mod || 0.0227866117423
|[..]|2 || Z2 || 0.0227525653271
-^ || min || 0.0227481149709
**3 || mod || 0.0227397992726
Frege0 || exp || 0.0227258805403
quotient1 || min || 0.0226396258842
P_cos || A\ || 0.0226177656446
$ (& Relation-like (& non-empty (& (-defined (carrier $V_(& (~ empty) (& (~ void) ManySortedSign)))) (& Function-like (total (carrier $V_(& (~ empty) (& (~ void) ManySortedSign)))))))) || $ (finite_enumerable $V_$true) || 0.0226104859829
right_closed_halfline || nat2 || 0.0225285684633
- || exp || 0.0225205722519
block || nat_compare || 0.0224801040429
is_continuous_in || bijn || 0.0224330179366
<= || reflect || 0.0224328094818
are_relative_prime0 || le || 0.0224319683705
the_value_of || C1 || 0.0224255004332
R_EAL1 || min || 0.0224101466767
k5_moebius2 || nat2 || 0.0223880063669
div^ || gcd || 0.0223441603604
(to_power1 2) || nth_prime || 0.0223185194401
UNIVERSE || Z2 || 0.0223028748055
(. sinh1) || B_split2 || 0.0222830635925
In_Power || nth_prime || 0.0222801058652
$ (& Relation-like (& Function-like T-Sequence-like)) || $ nat || 0.0222722557477
proj1 || Z_of_nat || 0.022270429328
mod1 || eqb || 0.0222701596073
card0 || nat2 || 0.0222629171174
<%..%>1 || A || 0.022256633523
\xor\ || minus || 0.0222509494477
|23 || times || 0.022228144339
(0.REAL 3) || (nat2 nat1) || 0.0222221580876
|^|^ || min || 0.0222092066674
compose || mod || 0.0222078824547
SymRelStr || Z_of_nat || 0.0221932282176
cobool || A || 0.0221899536425
-^ || gcd || 0.0221889430044
inf5 || defactorize || 0.022185560129
#slash#^0 || gcd || 0.0221648213884
**3 || gcd || 0.0221489652685
-tuples_on || plus || 0.0221479038305
GroupObjects || nth_prime || 0.0221440190348
$ ((OSSubset $V_(& (~ empty) (& (~ void) (& order-sorted (& discernable OverloadedRSSign))))) $V_(& (order-sorted1 $V_(& (~ empty) (& (~ void) (& order-sorted (& discernable OverloadedRSSign))))) (MSAlgebra $V_(& (~ empty) (& (~ void) (& order-sorted (& discernable OverloadedRSSign))))))) || $ $V_$true || 0.0221374963402
k1_nat_6 || eqb || 0.0221315437306
succ0 || defactorize || 0.0221291228441
RealFuncZero || nat2 || 0.0221026561572
chromatic#hash# || teta || 0.0221026518563
{..}18 || C1 || 0.0220852498944
InclPoset || Z2 || 0.0220828267729
intloc || nat2 || 0.0220824477409
$ (Element (bool (carrier $V_(& (~ empty) (& Group-like (& associative multMagma)))))) || $ (finite_enumerable $V_$true) || 0.0220707121914
base- || B_split2 || 0.022069503391
limit- || B_split1 || 0.022069503391
$ (& (~ empty) (& partial (& quasi_total0 (& non-empty1 UAStr)))) || $ nat || 0.0220157356163
is_expressible_by || le || 0.0219610587457
bool0 || (exp (nat2 (nat2 nat1))) || 0.0219598930088
|^|^ || gcd || 0.021946680808
<=>0 || nat_compare || 0.0219184530205
lcm0 || leb || 0.0219045825598
RingObjects || nth_prime || 0.0219025118366
[#hash#] || nth_prime || 0.0218864063562
Toler_on_subsets || sieve || 0.0218788198944
Normal_forms_on || sieve || 0.0218788198944
mod1 || gcd || 0.0218715824998
$ (& (~ empty) (& strict5 (& Group-like (& associative multMagma)))) || $ nat || 0.0218646298191
|` || times || 0.0218511695403
Del || times || 0.0218346795859
-^ || leb || 0.0218318710365
{..}2 || C || 0.0218311623111
compose || min || 0.0218287346557
dom0 || nth_prime || 0.0217940234461
StoneS || teta || 0.0217846336925
-29 || mod || 0.021775436063
$^ || gcd || 0.0217547908573
(. sinh1) || C2 || 0.0217539772735
([....[0 -infty0) || B_split1 || 0.0217493386414
AbGroupCat || C || 0.0217102329837
[....[0 || frac || 0.0217090448419
]....]0 || frac || 0.0217090448419
$ epsilon-transitive || $ (=> nat nat) || 0.021691634834
Sum2 || Z_of_nat || 0.02168757281
Sum0 || pred || 0.0216807263739
IdsMap || teta || 0.0216506360011
compose || gcd || 0.0216327162309
dim0 || defactorize || 0.0216314359261
(<= NAT) || ((injective nat) nat) || 0.0216189438361
gcd0 || plus || 0.0216082217156
(]....] -infty0) || Z3 || 0.0215746562715
+` || minus || 0.021540351352
!7 || eqb || 0.0215357718553
South_Arc || sqrt || 0.02152649964
North_Arc || sqrt || 0.02152649964
clique#hash#0 || Z2 || 0.0215204869314
(<*> REAL) || nat1 || 0.0215119804714
stability#hash# || teta || 0.0214799396108
clique#hash# || teta || 0.0214799396108
tan || C || 0.0214560442094
k5_moebius2 || pred || 0.0214219936905
are_equipotent0 || divides || 0.0214175540719
diameter || Z2 || 0.021414801085
tan || B1 || 0.021406184771
South_Arc || prim || 0.0214045809791
North_Arc || prim || 0.0214045809791
]....[1 || frac || 0.021399525058
[:..:]10 || min || 0.0213669104488
(. P_sin) || A\ || 0.021353853156
AbGroupCat || B1 || 0.0213483521344
(#slash# 1) || nat2 || 0.021345306878
SDSub_Add_Carry || gcd || 0.0213378122574
\or\3 || times || 0.0213032482458
-29 || min || 0.0212659436655
CompleteRelStr || nat2 || 0.0212547142895
Lege || min || 0.0212467901967
(]....[ -infty0) || Z3 || 0.0212431401364
mod1 || leb || 0.0212428237197
free_magma || minus || 0.0212407728471
MetrStruct0 || times || 0.0212339067093
-29 || gcd || 0.0212120288044
Lucas || fact || 0.0212083855003
Rank || fact || 0.021203861207
+*1 || gcd || 0.0211939988153
fsloc || Z3 || 0.021142897288
$ ((ManySortedSubset (carrier $V_(& (~ empty) (& (~ void) ManySortedSign)))) ((Sorts $V_(& (~ empty) (& (~ void) ManySortedSign))) $V_(MSAlgebra $V_(& (~ empty) (& (~ void) ManySortedSign))))) || $ $V_$true || 0.0211349146922
FALSUM0 || Qopp0 || 0.0211233919529
k1_nat_6 || leb || 0.0211165582594
the_ELabel_of || pred || 0.021105658703
#bslash#+#bslash# || nat_compare || 0.0210932467498
the_VLabel_of || pred || 0.0210865722733
mod^ || minus || 0.0210816917702
|....|2 || B1 || 0.0210798004234
order_type_of || defactorize || 0.021048524112
lcm1 || times || 0.0210367697307
1TopSp || nat2 || 0.0210216730687
(0. G_Quaternion) 0q0 || (Z_of_nat nat1) || 0.021020984103
SD_Add_Data || exp || 0.0209998956943
COMPLEX || nat1 || 0.0209612178025
exp1 || gcd || 0.0209184496889
(]....[ -infty0) || C2 || 0.0209038923449
.|. || minus || 0.0208882761611
UNION0 || exp || 0.0208185228841
Sum23 || Z2 || 0.0208053597632
(]....[ -infty0) || B_split2 || 0.0207947255578
.order() || nat2 || 0.0207926127832
(* 2) || (times (nat2 (nat2 nat1))) || 0.020785324897
**3 || min || 0.020770369169
proj1 || Z2 || 0.0207676047758
TOP-REAL || factorize || 0.0207516782047
max || ltb || 0.020748270975
Line2 || defactorize || 0.0207357185559
(. arctan) || B1 || 0.0207299492637
exp7 || min || 0.0207244439187
(c= omega) || (lt nat1) || 0.0207210547885
SetVal0 || bc || 0.0207098889162
(to_power1 2) || fact || 0.0206635583375
((*32 3) <e2>) || nat2 || 0.0206478495918
-\1 || ltb || 0.0206344977942
SymGroup || fact || 0.0206327717026
In_Power || fact || 0.0206298680462
FinSETS (Rank omega) || nat1 || 0.0206215704851
k2_int_8 || sqrt || 0.020619136279
(]....[ -infty0) || Z2 || 0.020563761672
$ (Element (bool (carrier (TOP-REAL 2)))) || $ nat || 0.0205564355645
[*] || fact || 0.0205200324409
gcd || minus || 0.0205110142173
exp1 || min || 0.020502526613
hcf || times || 0.0205022733969
k2_int_8 || prim || 0.020494747258
(. arccot) || B1 || 0.0204514118956
!7 || leb || 0.020443564407
dyadic || prime || 0.0204422553141
*6 || mod || 0.0204294006425
Tarski-Class || fact || 0.0204184226101
*^ || mod || 0.0204148631928
-\1 || nat_compare || 0.0203861826113
sinh0 || nat1 || 0.0203657609114
div || mod || 0.0203513303247
epsilon_ || nth_prime || 0.0203476783477
PFuncs || leb || 0.020332100899
div^ || minus || 0.0203275727981
-0 || pred || 0.0203258289762
*` || minus || 0.0203199672305
[*] || nth_prime || 0.0203142346846
-indexing || min || 0.0202969648726
\xor\ || plus || 0.0202374547241
lcm || plus || 0.0202244525318
sinh1 || nat1 || 0.0201959589366
frac0 || le || 0.0201843737781
-0 || compare_invert || 0.0200969494867
LastLoc || Z2 || 0.02007971909
free_magma || plus || 0.0200747662442
gcd || exp || 0.0200632015442
HausDist0 || cmp || 0.0200419627317
*6 || exp || 0.020035116592
the_rank_of0 || defactorize || 0.0200055927946
(are_equipotent 1) || sorted_gt || 0.0199955872488
RAT+ || nat1 || 0.0199940137454
([....]5 -infty0) || B_split1 || 0.0199767273721
frac0 || lt || 0.0199752117863
union0 || nth_prime || 0.0199480726357
|^|^ || plus || 0.0199419463027
#slash##slash##slash# || exp || 0.0199225135445
Upper_Middle_Point || sqrt || 0.0199075464253
Lower_Middle_Point || sqrt || 0.0199075464253
[....[0 || mod || 0.019897741173
]....]0 || mod || 0.019897741173
(((#slash##quote#0 omega) REAL) REAL) || times || 0.0198537488395
SourceSelector 3 || (nat2 nat1) || 0.0198467490525
mod^ || plus || 0.0198395281132
CatSign0 || nat2 || 0.019821730434
(exp7 2) || nth_prime || 0.0198131545941
Upper_Middle_Point || prim || 0.0197839688294
Lower_Middle_Point || prim || 0.0197839688294
-\1 || eqb || 0.0197800651528
$ (& Function-like (& ((quasi_total omega) $V_(~ empty0)) (Element (bool (([:..:] omega) $V_(~ empty0)))))) || $ (finite_enumerable $V_$true) || 0.0197686165987
(]....[1 -infty0) || B1 || 0.0197552246126
On || defactorize || 0.0197395222445
vol || Z2 || 0.0197379503184
([....[0 -infty0) || C2 || 0.0197340818367
-SD_Sub || sieve || 0.0197159511112
-SD_Sub_S || sieve || 0.0197159511112
([....[0 -infty0) || B_split2 || 0.0196961703246
]....[1 || mod || 0.0196799062351
`4_4 || Z_of_nat || 0.0196797666455
InclPoset || factorize || 0.0196398554775
carrier || nth_prime || 0.0196318896259
dom0 || teta || 0.0196300183916
<*..*>35 || Z2 || 0.019561196928
(. sinh1) || Z3 || 0.0195462613689
#hash#Q || mod || 0.0195286225478
SD_Add_Data || max || 0.0195262270751
|....| || nat2 || 0.0194930724196
Frege0 || max || 0.0194908106953
*2 || exp || 0.0194846606862
.. || mod || 0.0194390560494
*50 || sieve || 0.019432291171
HFuncs || sieve || 0.019432291171
(]....]0 -infty0) || B_split1 || 0.0194180928584
#hash#Z0 || min || 0.0194102156897
<:..:>3 || nat_compare || 0.019400184095
TOL || teta || 0.0193892394132
#quote#40 || Qinv0 || 0.0193719619871
card || smallest_factor || 0.0193664566643
**3 || exp || 0.0193211919865
cpx2euc || C || 0.0193205076016
[[0]] || nat2 || 0.0192917250892
\xor\ || bc || 0.0192802625851
HausDist || cmp || 0.0192784401788
block || eqb || 0.0192692306385
$ RelStr || $ nat || 0.0192666221027
cpx2euc || B1 || 0.0192594182012
ovlldiff || cmp || 0.0192518279729
fam_class_metr || fact || 0.0192465399493
sinh || B_split1 || 0.0192211576441
(]....[1 -infty0) || C2 || 0.0192128054556
=>2 || bc || 0.0192125418401
div^ || plus || 0.0192106887802
South_Arc || pred || 0.0192094249254
North_Arc || pred || 0.0192094249254
-SD0 || sieve || 0.0192035493099
^20 || A || 0.0191925475268
|^|^ || minus || 0.0191850295149
(]....[1 -infty0) || B_split2 || 0.019182884284
cosh0 || C2 || 0.0191620669978
union0 || fact || 0.0191431949054
free_magma || div || 0.0191269517847
mod1 || exp || 0.0191070551823
is_differentiable_in0 || permut || 0.0190926548106
$ cardinal || $ (=> nat bool) || 0.0190872196798
cosh0 || B_split2 || 0.0190840325712
#bslash##slash#0 || leb || 0.0190628061633
$ QC-alphabet || $ Q0 || 0.0190624105102
$ ordinal || $ bool || 0.0190520712411
#hash#Q || gcd || 0.0190480563137
$ (& reflexive (& transitive (& antisymmetric (& lower-bounded (& with_suprema RelStr))))) || $true || 0.0190159689945
$ (& (~ empty0) universal0) || $true || 0.0189995184337
(. sinh1) || Z2 || 0.0189959976204
div || min || 0.0189948985578
sin || A || 0.0189546017896
RelIncl0 || factorize || 0.0189416791703
is_coarser_than || divides || 0.0189345958588
-polytopes || bc || 0.0189317627487
Seg0 || Z3 || 0.0189136789394
div0 || bc || 0.0188938927665
$ ordinal || $ Q0 || 0.018884171287
AbGroupCat || B_split1 || 0.0188417124629
*^ || min || 0.0188299721521
(#hash#)20 || Zplus || 0.0188254486528
numbering || nat2 || 0.0188241651698
*75 || times || 0.0188096910964
REAL+ || nat1 || 0.0188071250648
({..}2 NAT) || nat1 || 0.0187858931659
#bslash#4 || mod || 0.0187804448783
mod^ || div || 0.0187604843622
`2110 || Z2 || 0.0187553147556
(dom (carrier SCM+FSA)) || nat2 || 0.0187432509864
(<= (-0 1)) || prime || 0.0187424094161
LConSet || C1 || 0.018702755414
SDSub_Add_Carry || exp || 0.0186981337111
.. || gcd || 0.0186839544724
(. P_sin) || B1 || 0.0186103673032
[....[0 || minus || 0.0185664895293
]....]0 || minus || 0.0185664895293
Top0 || defactorize || 0.0185502240462
is_weight_of || bijn || 0.0185398705303
is_differentiable_in || permut || 0.0185193334785
lcm0 || div || 0.0185128005666
|1 || times || 0.0185091407209
#slash# || eqb || 0.0185010891132
1.REAL || B || 0.0184595789531
ovlcon || cmp || 0.0184563907124
#bslash#4 || leb || 0.0184494984289
$ (Subgroup $V_(& (~ empty) (& Group-like (& associative multMagma)))) || $ $V_$true || 0.0184466262063
c_n || B_split1 || 0.0184138229876
cpx2euc || factorize || 0.0184028579739
block || leb || 0.0183880136518
c< || permut || 0.018383058785
]....[1 || minus || 0.0183666835331
Seg0 || Z2 || 0.0183414080963
div || gcd || 0.0183387459623
(c=0 2) || B1 || 0.0183344465348
1q || bc || 0.0183222613421
exp1 || minus || 0.0183213005942
cf || teta || 0.0183153203953
-root || Fmult || 0.0183026079444
*1 || A || 0.0182994240375
|^5 || Z3 || 0.0182933643135
[....[0 || exp || 0.0182820507741
]....]0 || exp || 0.0182820507741
k2_int_8 || pred || 0.0182692555912
div^ || div || 0.0182688037273
|_2 || times || 0.0182526132527
lcm || nat_compare || 0.0182492665209
Rotate || minus || 0.0182460154534
$ (& (~ empty) (& antisymmetric (& upper-bounded0 RelStr))) || $ nat || 0.0182294694351
$ (& (~ empty) (& antisymmetric (& lower-bounded RelStr))) || $ nat || 0.0182251501842
^8 || gcd || 0.0182183247577
meets || Zlt || 0.0182091416432
$ rational || $ (=> nat bool) || 0.0181942549058
Sum0 || C || 0.0181773753813
<:..:>3 || min || 0.0181633938859
*^ || minus || 0.0181357803102
$ (& (~ empty) (& (~ void) (& order-sorted (& discernable OverloadedRSSign)))) || $true || 0.0181320458838
id7 || Z2 || 0.018117582932
]....[1 || exp || 0.0180990476792
-\ || exp || 0.0180470805368
is_proper_subformula_of || (in_list nat) || 0.0180313584485
k1_matrix_0 || nat2 || 0.0180311875563
Sum0 || B1 || 0.0180276002348
VERUM0 || Qopp0 || 0.0180263048562
lcm0 || exp || 0.017991794605
^40 || teta || 0.0179672930659
proj4_4 || fact || 0.0179612959166
meet || Z_of_nat || 0.0179389787212
1.REAL || A || 0.0179373655801
div || bc || 0.0179347822825
quotient1 || mod || 0.0179198002245
-roots_of_1 || nat2 || 0.0179003420814
Col || factorize || 0.0178962440856
k2_numpoly1 || gcd || 0.0178954016636
firstdom || A || 0.0178817402979
the_Vertices_of || nat2 || 0.0178666213882
$ (& Relation-like (& Function-like (& real-valued FinSequence-like))) || $ (=> R0 R0) || 0.0178460705602
[:..:]10 || times || 0.0178229579534
S-min || (exp (nat2 (nat2 nat1))) || 0.0178101379412
N-max || (exp (nat2 (nat2 nat1))) || 0.0177659705832
card || pred || 0.0177512924684
RelIncl || factorize || 0.0177467008409
E-min || (exp (nat2 (nat2 nat1))) || 0.0177443039824
W-max || (exp (nat2 (nat2 nat1))) || 0.0177017736003
$ (FinSequence $V_(~ empty0)) || $ (sort $V_eqType) || 0.0176857694389
diameter || teta || 0.0176549105079
S-max || (exp (nat2 (nat2 nat1))) || 0.0176398970345
card || sqrt || 0.0176221641096
c_d || C2 || 0.0175927329573
cf || nth_prime || 0.0175861967729
succ0 || fact || 0.0175819284798
Upper_Middle_Point || pred || 0.0175794754189
Lower_Middle_Point || pred || 0.0175794754189
{..}3 || plus || 0.0175773837789
rng || order || 0.0175673709086
card || prim || 0.0175601400171
UAEnd || fact || 0.0175522919435
diameter || nth_prime || 0.0175386492729
MidOpGroupObjects || C2 || 0.0175239418286
k3_rvsum_3 || C || 0.0175145285627
SIMPLEGRAPHS || eq || 0.017511648195
the_Tree_of || nat2 || 0.0175064316816
(are_equipotent 1) || decidable || 0.0175003309821
c_d || B_split2 || 0.0174897789131
TermSymbolsOf || C1 || 0.0174869857927
root-tree || Z3 || 0.0174708020279
InclPoset || nat2 || 0.0174551896254
Euclid || C || 0.0174510336521
$ (& (~ empty) (& Reflexive (& discerning (& symmetric (& triangle MetrStruct))))) || $ eqType || 0.0174432547493
last0 || pred || 0.0174104206122
Euclid || B1 || 0.0174065628658
((#bslash##slash#0 SCM-Data-Loc0) INT) || nat1 || 0.0174047886973
left_closed_halfline || B || 0.0174040656219
-^ || div || 0.0173967289854
{..}18 || B_split1 || 0.017391953309
`120 || Z2 || 0.0173878852307
[:..:]10 || mod || 0.0173696482152
cos || C1 || 0.0173636374269
sin || C1 || 0.0173334121374
div0 || minus || 0.017318712717
|^|^ || div || 0.0173022812485
k3_rvsum_3 || B1 || 0.0172975776222
UNION0 || max || 0.0172383797321
(#bslash##slash# REAL) || times || 0.0172286569001
(. sinh1) || teta || 0.0172211942022
.9 || B || 0.0172158284674
quotient1 || gcd || 0.017192770225
free_magma || times || 0.0171923564922
-composition || Z2 || 0.017185866327
AbGroupObjects || C2 || 0.0171856651884
-polytope-seq || nat2 || 0.017181828345
Moebius || A || 0.0171782015655
|` || min || 0.0171735017665
(elementary_tree 1) || (nat2 nat1) || 0.0171729508244
MidOpGroupObjects || B_split2 || 0.0171494488673
mod1 || max || 0.0171448357672
<=>0 || ltb || 0.0171324624713
BOOLEAN || nat1 || 0.0171320670765
UAAut || fact || 0.0171229663331
N-min || (exp (nat2 (nat2 nat1))) || 0.0171216369782
nextcard || sieve || 0.0170992748037
permutations || Z_of_nat || 0.0170981869885
proj4_4 || A || 0.0170863707227
1q || mod || 0.0170677517713
1. || Z_of_nat || 0.0170646999382
FlatCoh || Z2 || 0.017051297373
ex_inf_of || divides || 0.0170395579844
S-bound || teta || 0.0170251913186
max_dist_min || cmp || 0.0169699835442
(. signum) || A || 0.0169469116249
(to_power1 2) || nat2 || 0.0169432888238
arity || defactorize || 0.0169059821237
*1 || C || 0.0169040004638
lcm1 || gcd || 0.016901969864
AbGroupObjects || B_split2 || 0.0168979001987
Fin || factorize || 0.0168835940106
topology || nat2 || 0.0168745899395
-indexing || mod || 0.0168674692522
goto || Z3 || 0.0168647067878
-Root || minus || 0.0168435488138
k5_rvsum_3 || C1 || 0.0168300874181
ex_sup_of || divides || 0.0168220564166
{}3 || (nat2 nat1) || 0.0168214406126
<X> || times || 0.0168106956831
mod^ || max || 0.0168026305363
((#slash#. COMPLEX) cos_C) || B || 0.0167960812935
((#slash#. COMPLEX) sin_C) || B || 0.0167951518003
.9 || A || 0.0167677043711
`10 || nat2 || 0.0167676455753
(exp7 2) || fact || 0.0167634525649
([..] 1) || nat2 || 0.016757551946
|1 || mod || 0.016750648362
(|^ 2) || fact || 0.0167478942303
mod^ || times || 0.016739121398
#bslash#4 || min || 0.0167390964933
succ0 || pred || 0.0167376186637
carrier || teta || 0.0167166182043
*1 || B1 || 0.0167112432376
$ (& natural prime) || $ (=> nat bool) || 0.0167088072367
union0 || Z2 || 0.0167032087509
{..}3 || ltb || 0.0166982320907
succ1 || Z3 || 0.01669593573
[:..:]10 || gcd || 0.0166530800174
atom. || Z2 || 0.0166523736661
SDSub_Add_Carry || max || 0.0166511851153
is_coarser_than || le || 0.0166398981963
* || nat_compare || 0.0166307581355
ultraset || (times (nat2 (nat2 nat1))) || 0.0166171070752
id0 || nat2 || 0.0166063375416
-3 || Zpred || 0.0165934080483
+48 || Qopp0 || 0.0165930432409
F_primeSet || (times (nat2 (nat2 nat1))) || 0.0165877205391
exp1 || div || 0.0165672015397
apply || A || 0.0165511101741
pr11 || A || 0.0165511101741
E-max || (exp (nat2 (nat2 nat1))) || 0.0165449379165
-Root || min || 0.0165436604014
meet || defactorize || 0.016537919952
r3_tarski || le || 0.0165364265784
+*1 || minus || 0.0164936591849
<:..:>3 || times || 0.0164820168196
rngs || pred || 0.016473665567
#bslash#+#bslash# || div || 0.0164584857885
CnPos || teta || 0.0164453789334
N-bound || fact || 0.0164232506553
div^ || times || 0.0164195211769
*^ || div || 0.0164088115994
is_coarser_than || lt || 0.0164086371571
goto || Z2 || 0.0164075531986
Initialized || fact || 0.0163997002407
*^2 || ltb || 0.0163927471701
|^5 || A || 0.0163823268193
<%..%> || Z3 || 0.0163782287038
RelIncl || nat2 || 0.0163771230342
Subspaces2 || nth_prime || 0.0163723330031
0. || Z_of_nat || 0.0163672512395
MIM || A || 0.0163615302092
.. || max || 0.0163613373505
Submodules || nth_prime || 0.0163586688308
Subspaces0 || nth_prime || 0.0163482723477
left_closed_halfline || A || 0.0163372283947
RED || minus || 0.0163362023892
W-min || (exp (nat2 (nat2 nat1))) || 0.0163085398207
carrier || (exp (nat2 (nat2 nat1))) || 0.0162825744607
ProjectivePoints || C || 0.0162770432326
proj1 || A || 0.016274190703
#hash#Q || min || 0.0162688966907
+61 || minus || 0.0162511275907
|1 || gcd || 0.016244975309
(]....] -infty0) || nat2 || 0.0162404983395
((#slash#. COMPLEX) sin_C) || A || 0.0162372750443
((#slash#. COMPLEX) cos_C) || A || 0.0162352388058
P_cos || factorize || 0.0162186107168
]....[1 || ltb || 0.0162043352256
max || leb || 0.0162025163
-indexing || gcd || 0.0161617307277
(*0 INT) || QO || 0.016159982997
cpx2euc || Z3 || 0.0161563629031
ProjectivePoints || B1 || 0.0161477221109
((#slash#. COMPLEX) sinh_C) || B || 0.0161401325927
SymGroup || Z_of_nat || 0.0161278498918
Union || defactorize || 0.0161278438649
succ1 || factorize || 0.0161095321252
-| || orb || 0.0161087126053
|--0 || orb || 0.0161087126053
$ (Element (carrier $V_(& (~ empty) (& (~ void) ManySortedSign)))) || $ $V_$true || 0.0160883447034
IRRAT || le || 0.016078818154
are_isomorphic3 || divides || 0.0160671338508
k9_moebius2 || smallest_factor || 0.0160559306389
k4_moebius2 || smallest_factor || 0.0160559306389
quotient1 || minus || 0.0160439659016
Col || nat2 || 0.0160422907483
IRRAT || lt || 0.0160347987218
#bslash#+#bslash# || exp || 0.0160345813261
-60 || plus || 0.0160319491725
.. || exp || 0.0160082305253
*\14 || A || 0.0159998224858
(dom omega) || fact || 0.0159993054464
rExpSeq0 || teta || 0.015999052897
((*32 3) <e3>) || B || 0.0159981775819
gcd || div || 0.0159946673047
LMP || (times (nat2 (nat2 nat1))) || 0.0159840981568
the_right_side_of || list_n || 0.0159837896408
gcd0 || min || 0.0159788711308
[*] || nat2 || 0.0159762692073
MidOpGroupObjects || nat2 || 0.015971641988
AbGroupObjects || nat2 || 0.015971641988
((#slash#. COMPLEX) cosh_C) || B || 0.015964958855
proj3_4 || Z2 || 0.0159636212859
(+ ((#slash# P_t) 2)) || nat2 || 0.0159588034284
arccosec20 || B || 0.0159542554917
arccosec10 || B || 0.0159542554917
arcsec20 || B || 0.0159542554917
arcsec10 || B || 0.0159542554917
(. sin1) || Z2 || 0.0159399704625
#quote# || A\ || 0.0159271170737
BOOLEAN || (nat2 nat1) || 0.0159118578845
Catalan || sieve || 0.0159073674526
|^ || gcd || 0.0159041919923
mod || gcd || 0.0158913938061
WFF || plus || 0.0158812658315
tolerates || lt || 0.0158798820287
(^ omega) || Zplus || 0.0158755840218
TOL || nth_prime || 0.0158603762828
$ (& Relation-like (& (-defined Newton_Coeff) (& Function-like (& (total Newton_Coeff) (& natural-valued finite-support))))) || $ nat || 0.0158501333339
r3_tarski || nat_compare || 0.0158182128346
<:..:>3 || mod || 0.015804767523
GroupCat || B_split1 || 0.0157581592976
ADTS || nat2 || 0.0157555673594
#bslash#4 || lt || 0.0157518375795
lcm0 || le || 0.0157468526819
pr22 || A || 0.0157187959691
^20 || Z2 || 0.015716109608
inf5 || pred || 0.0157121913462
RealPFuncUnit || nat2 || 0.0157117057223
|-count0 || defactorize_aux || 0.015711009463
((#slash#. COMPLEX) sinh_C) || A || 0.0157047311861
([..] 1) || Z_of_nat || 0.0156973086473
euc2cpx || defactorize || 0.015684129363
(||....||2 Complex_l1_Space) || teta || 0.0156768608157
(||....||2 l1_Space) || teta || 0.0156768608157
(||....||2 linfty_Space) || teta || 0.0156768608157
(||....||2 Complex_linfty_Space) || teta || 0.0156768608157
exp7 || gcd || 0.0156690325343
#bslash#4 || le || 0.0156625251872
*99 || gcd || 0.0156576694477
(((-9 REAL) REAL) sin1) || (nat2 nat1) || 0.0156526924245
cpx2euc || Z2 || 0.0156207208313
div || div || 0.0156173141437
-\1 || exp || 0.0156165256157
((*32 3) <e3>) || A || 0.0156054235637
arccosec20 || A || 0.0156037797944
arccosec10 || A || 0.0156037797944
arcsec20 || A || 0.0156037797944
arcsec10 || A || 0.0156037797944
|` || mod || 0.0155978472367
lcm0 || lt || 0.0155977350607
* || gcd || 0.0155913502646
proj2_4 || Z2 || 0.015587980779
-VSet || times || 0.0155827199736
-TVSet || times || 0.0155827199736
-SVSet || times || 0.0155827199736
SetVal0 || mod || 0.0155704776974
++3 || minus || 0.0155664912744
=>2 || minus || 0.0155415098837
$ (& (~ empty0) (Element (bool (carrier (TOP-REAL $V_(Element omega)))))) || $ (sort $V_eqType) || 0.0155398691371
((#slash#. COMPLEX) cosh_C) || A || 0.0155288339846
GroupObjects || nat2 || 0.015521136363
-root || minus || 0.0155020011691
(. P_sin) || factorize || 0.0154902051823
$ (& Relation-like (& (-defined omega) (& Function-like (& infinite (& [Graph-like] [ELabeled]))))) || $ nat || 0.0154777280355
$ (& Relation-like (& (-defined omega) (& Function-like (& infinite (& [Graph-like] [VLabeled]))))) || $ nat || 0.0154659643508
.2 || index_of || 0.015453178769
gcd0 || mod || 0.0154469460417
carrier || C1 || 0.0154396161857
Euler || A || 0.0154301991913
*88 || nat2 || 0.0154280423174
[:..:] || ltb || 0.0154108275166
\nand\ || plus || 0.0154033288363
k15_trees_3 || A || 0.0154012909975
the_transitive-closure_of || A || 0.0154012909975
RED || plus || 0.015399362371
-3 || Zsucc || 0.0153931204003
the_value_of || B_split1 || 0.0153769489468
RingObjects || nat2 || 0.0153506932203
mod || minus || 0.0153475404924
-Root || div || 0.0153156246416
div^ || max || 0.0153095093666
REAL0 || C1 || 0.0153024166302
proj1_4 || Z2 || 0.0152929893929
cosh || B || 0.0152675770617
|^|^ || max || 0.0152524200251
*^2 || times || 0.0152516715155
-Root || gcd || 0.0152404397533
the_right_side_of || nth_prime || 0.0152300799247
OddNAT || nat1 || 0.0152232981537
-^ || max || 0.0151826890421
eta || nat2 || 0.0151812973923
\nor\ || plus || 0.0151684496931
Funcs || le || 0.0151433669331
compose || minus || 0.0151396331463
quotient1 || plus || 0.0151392932675
ind1 || pred || 0.0151298969808
are_relative_prime || divides || 0.0151224746195
div0 || min || 0.0151200131716
+` || times || 0.015117769157
MXF2MXR || Z_of_nat || 0.015108818124
hcf || gcd || 0.0151083242784
cf || A || 0.0151004421671
. || times || 0.0150918386476
[....]5 || plus || 0.0150790167855
Funcs || lt || 0.0150718647075
(#slash#. REAL) || plus || 0.0150683161526
succ0 || Z2 || 0.0150510970937
+^1 || div || 0.0150294519641
the_universe_of || Z2 || 0.0150240713558
$ (Element REAL) || $ nat || 0.0149950504802
intloc || Z2 || 0.0149901413269
$ complex || $ (=> nat bool) || 0.0149845848931
the_stable_subgroup_of || repr || 0.0149776231064
idseq || nat2 || 0.014968710572
{}0 || Zopp || 0.0149648723883
EqRelLATT || Z2 || 0.0149471622374
|` || gcd || 0.0149422675556
P_t || (nat2 nat1) || 0.0149287287881
Rotate || div || 0.0149280171753
intpos || B || 0.0149247308098
div0 || mod || 0.0149107992233
field || C || 0.0148967364959
-29 || max || 0.0148922023132
[....[0 || eqb || 0.0148852657989
]....]0 || eqb || 0.0148852657989
field || B1 || 0.0148720376434
arccos || B || 0.0148648718839
arcsin1 || B || 0.0148648718839
quotient1 || max || 0.0148484018406
-59 || Z3 || 0.0148225590563
CnIPC || fact || 0.014819339644
the_Edges_of || fact || 0.014813877881
Toler_on_subsets || prime || 0.0148096005762
Normal_forms_on || prime || 0.0148096005762
$^ || minus || 0.0148000162707
sin || C2 || 0.0147993193431
arctan0 || B || 0.0147972481963
cos || C2 || 0.014782041933
min0 || defactorize || 0.0147718968441
cos || B_split1 || 0.0147685616231
gcd || le || 0.0147672798262
(Product5 Newton_Coeff) || nat2 || 0.0147651384134
sin || B_split2 || 0.0147646291454
*68 || nat2 || 0.0147624153395
cos || B_split2 || 0.0147474577712
sin || B_split1 || 0.0147435308288
the_Tree_of || teta || 0.0147375837466
k19_finseq_1 || Z_of_nat || 0.0147313834019
#slash##bslash#0 || Zplus || 0.014728531091
gcd || lt || 0.0147271985394
|1 || exp || 0.0147216544711
i_e_s || sieve || 0.0147112684986
i_w_s || sieve || 0.0147112684986
i_n_e || sieve || 0.0147112684986
i_s_e || sieve || 0.0147112684986
i_n_w || sieve || 0.0147112684986
i_s_w || sieve || 0.0147112684986
arccot0 || B || 0.0147070794745
CnCPC || fact || 0.0147027010606
]....[1 || eqb || 0.014699473676
R_EAL1 || max || 0.0146966539852
mod || plus || 0.0146816340348
$ (& ordinal epsilon) || $ nat || 0.0146612918246
_GraphSelectors || (nat2 nat1) || 0.0146609857034
+^1 || exp || 0.0146578544357
++3 || plus || 0.0146549057125
#bslash#4 || div || 0.0146319909678
Re0 || (exp (nat2 (nat2 nat1))) || 0.014627758774
\nand\ || times || 0.0146150543036
hcf || andb || 0.0146091473678
Z_3 || (nat2 nat1) || 0.0146085228217
\or\4 || plus || 0.0145994486232
min || (times (nat2 (nat2 nat1))) || 0.0145873645319
frac || sieve || 0.0145806056027
are_relative_prime || le || 0.0145701589105
(are_equipotent 1) || prime || 0.014565199508
halfline || B || 0.0145565255236
#hash#Z0 || mod || 0.0145562739102
intpos || A || 0.0145556475498
$ (& (~ empty) (& Reflexive (& discerning (& symmetric (& triangle (& bounded7 MetrStruct)))))) || $ nat || 0.0145461740793
arccos || A || 0.0145267520945
Rotate || exp || 0.0145126636287
Lower_Arc || smallest_factor || 0.014509358436
Upper_Arc || smallest_factor || 0.0144952778892
[:..:]10 || exp || 0.014491856018
dom0 || nat2 || 0.0144804705198
* || ltb || 0.014460678674
RED || div || 0.0144475673768
\nor\ || times || 0.0144151422384
exp1 || max || 0.0144148633209
^40 || Z2 || 0.0144056923171
-root || min || 0.0144025591058
-59 || Z2 || 0.0143896469881
(#hash#)20 || times || 0.0143708652579
-0 || costante || 0.0143615901398
ord-type || Z2 || 0.0143567462585
succ0 || Z_of_nat || 0.014354811262
compose || plus || 0.0143517904556
cosech || Z2 || 0.0143466580788
^omega || sieve || 0.014330824935
Lege || max || 0.0143203049309
(1. G_Quaternion) 1q0 || (nat2 nat1) || 0.0143164271012
ProperPrefixes || A || 0.0143151297156
CnS4 || fact || 0.014307285524
-30 || A || 0.0142799418906
arccot0 || A || 0.0142692801447
hcf || div || 0.01426092174
Sum^ || pred || 0.0142574195391
[:..:]10 || max || 0.0142538444726
#slash#29 || Zplus || 0.0142524262562
S-min || smallest_factor || 0.0142377141466
CnIPC || nth_prime || 0.0142276621793
tolerates || divides || 0.014218740584
quotient1 || div || 0.0142055172863
N-max || smallest_factor || 0.0141966442741
exp2 || B || 0.0141914177503
E-min || smallest_factor || 0.0141765090164
-root || div || 0.0141540304672
commutes-weakly_with || le || 0.0141377226356
W-max || smallest_factor || 0.0141370072512
*58 || gcd || 0.0141271565283
-indexing || exp || 0.0141180245434
CnCPC || nth_prime || 0.0141079315821
exp7 || max || 0.0140877682014
$ (& (~ constant) (& (~ empty0) (& (circular (carrier (TOP-REAL 2))) (& special (& unfolded (& s.c.c. (& standard0 (FinSequence (carrier (TOP-REAL 2)))))))))) || $ nat || 0.0140829052961
|1 || min || 0.0140815929667
S-max || smallest_factor || 0.0140795905712
i_e_n || sieve || 0.0140658094385
i_w_n || sieve || 0.0140658094385
halfline || A || 0.0140626114415
r3_tarski || lt || 0.014060442069
ComplexFuncUnit || nat2 || 0.0140309966693
bool3 || nth_prime || 0.0140240892012
frac0 || minus || 0.0140103051042
^\ || minus || 0.014007132717
-Root || times || 0.0140068066125
**7 || minus || 0.0140056307038
#quote# || B1 || 0.0140025626439
-Matrices_over || Z2 || 0.0139983476164
^8 || times || 0.013990675565
(. sinh1) || fact || 0.0139603092695
div || max || 0.0139557172041
**3 || max || 0.013951628795
the_Vertices_of || fact || 0.0139423716202
ConsecutiveSet || minus || 0.0139386771887
ConsecutiveSet2 || minus || 0.0139386771887
$^ || plus || 0.0139326645955
commutes_with0 || lt || 0.0139192225948
OpSymbolsOf || C || 0.0139085809013
-60 || div || 0.0139058727133
#hash#Z0 || gcd || 0.0139046034761
card || Z3 || 0.0138963105006
`1 || nat2 || 0.0138873886947
k1_numpoly1 || sieve || 0.0138775225871
RED || andb || 0.013862874332
max0 || defactorize || 0.0138595281547
inf5 || Z2 || 0.0138268147204
**6 || mod || 0.013822886787
k1_numpoly1 || A || 0.0138202963507
hcf || exp || 0.0138164069242
varcl || A || 0.0138005586455
$ (FinSequence omega) || $ Z || 0.0137976337444
chromatic#hash# || pred || 0.0137681125691
bool || factorize || 0.0137668523368
-indexing || max || 0.01375731227
<*..*>4 || Z3 || 0.0137558911047
Lucas || A || 0.0137207510922
tau_bar || nat1 || 0.0137055730928
CnS4 || nth_prime || 0.0137029692669
(([..] {}) {}) || (nat2 nat1) || 0.0136917662056
*50 || prime || 0.0136763573425
HFuncs || prime || 0.0136763573425
(((Initialize (card3 3)) SCM+FSA) ((:->0 (intloc NAT)) 1)) || (nat2 nat1) || 0.0136688201536
Subgroups || nth_prime || 0.0136575255859
|[..]| || times || 0.0136540691866
{..}3 || leb || 0.0136379641016
ExpSeq || (times (nat2 (nat2 nat1))) || 0.0136268131962
dl. || B || 0.0136180012387
dim0 || pred || 0.0136066354844
N-min || smallest_factor || 0.0136011729489
|^ || min || 0.0135864134834
Im31 || frac || 0.0135817370979
(. sinh1) || sieve || 0.0135776155446
1. || nat2 || 0.0135652113033
c< || divides || 0.0135617913886
-60 || exp || 0.0135532348417
disjoin || A || 0.0135429851806
sinh || B || 0.0135427853896
k1_mmlquer2 || le || 0.0135427027124
k4_rvsum_3 || nat2 || 0.0135163140133
Lege || mod || 0.0135056646569
Radix || B || 0.0135019496545
op1 || nat1 || 0.013499726006
$ complex || $ Z || 0.0134958171229
compose || div || 0.0134957052508
OpSymbolsOf || B1 || 0.0134846790853
Rotate || times || 0.0134572399386
clique#hash# || pred || 0.0134534622631
#hash#Z0 || max || 0.013452027233
k5_ltlaxio3 || fact || 0.0134486495911
cosh0 || B || 0.0134480664714
sech || Z2 || 0.0134406110574
+61 || div || 0.0134395785963
[....[0 || nat_compare || 0.0134385932041
]....]0 || nat_compare || 0.0134385932041
curry\ || Z_of_nat || 0.0134329854879
k1_mmlquer2 || lt || 0.0134291570588
exp2 || A || 0.0134264466701
#bslash#+#bslash# || same_atom || 0.0134202105941
$ (~ empty0) || $ eqType || 0.0134185393887
|14 || div || 0.0133856771925
goto || B || 0.0133705898358
k2_orders_1 || Z2 || 0.0133704230767
frac0 || plus || 0.0133484611323
Tarski-Class || Z_of_nat || 0.0133395050985
west_halfline || nth_prime || 0.0133322928592
east_halfline || nth_prime || 0.0133322928592
+49 || A || 0.013331537399
*^ || le || 0.0133214420107
1q || Qtimes0 || 0.0133197554936
<:..:>3 || exp || 0.0133191163564
gcd0 || exp || 0.013315393917
is_immediate_constituent_of1 || le || 0.0133060446531
is_weight>=0of || permut || 0.0133041624991
(Product5 Newton_Coeff) || Z_of_nat || 0.0133028401653
cosec0 || Z2 || 0.0133027127558
*^ || max || 0.0132994488816
MonSet || (times (nat2 (nat2 nat1))) || 0.0132920808292
dl. || A || 0.013287612632
Re2 || C1 || 0.0132843244749
TargetSelector 4 || nat1 || 0.0132730495647
sinh || A || 0.0132698356923
denominator0 || nat2 || 0.013266384526
**7 || plus || 0.0132452333623
]....[1 || nat_compare || 0.0132400400465
Product1 || defactorize || 0.0132384737499
$ Relation-like || $ (=> nat nat) || 0.0132280416932
^\ || plus || 0.0132274505296
|` || exp || 0.0132264594589
*^ || lt || 0.0132168394664
. || mod || 0.0132144594704
FirstNotUsed || Z_of_nat || 0.0132080114143
0.REAL || Z2 || 0.0132039389256
carrier || B_split1 || 0.0132035160913
Radix || A || 0.0131966280413
meet || pred || 0.0131944262471
UsedIntLoc0 || Z_of_nat || 0.0131931467708
* || minus || 0.0131795705934
TWOELEMENTSETS || A || 0.0131793451338
doms || A || 0.0131793451338
exp7 || plus || 0.0131785891522
cosh0 || A || 0.0131707219734
Fin || fsort || 0.013164990606
Subtrees || nth_prime || 0.0131544030314
k9_moebius2 || sqrt || 0.0131493317164
k4_moebius2 || sqrt || 0.0131493317164
SetVal0 || exp || 0.0131263317425
Subspaces2 || fact || 0.0131250434154
RealPFuncZero || nat2 || 0.0131140456513
Submodules || fact || 0.0131124672897
multF || enum || 0.0131112650324
+61 || exp || 0.0131098949994
Subspaces0 || fact || 0.0131028986746
LMP || smallest_factor || 0.0130757565274
UMP || smallest_factor || 0.0130757565274
upper_bound || primeb || 0.0130740810076
E-max || smallest_factor || 0.0130740029783
ConsecutiveSet || plus || 0.0130585849794
ConsecutiveSet2 || plus || 0.0130585849794
#slash# || mod || 0.0130563392044
k9_moebius2 || prim || 0.0130554898069
k4_moebius2 || prim || 0.0130554898069
Lower_Arc || sqrt || 0.0130510794127
goto || A || 0.0130491715524
SD_Add_Carry || A || 0.0130397512715
Upper_Arc || sqrt || 0.0130396781647
$ (& (~ degenerated) (& eligible Language-like)) || $ nat || 0.0130294786349
-root || times || 0.0130288613226
uncurry\ || A || 0.0130257537785
|14 || exp || 0.0130254168042
Sum12 || defactorize || 0.0130202986188
Lower_Arc || prim || 0.0129998326964
(+1 2) || nat2 || 0.0129899812014
Upper_Arc || prim || 0.0129885205775
sin || nat2 || 0.0129740616249
cos || nat2 || 0.0129736659696
Inv0 || Z_of_nat || 0.01295825433
REAL0 || B_split1 || 0.0129404581462
`10 || pred || 0.0129324769846
RED || times || 0.0129281251449
sec0 || Z2 || 0.0129259430519
`2 || pred || 0.0129213810759
$^ || div || 0.012908504651
\in\ || list_n || 0.012903261918
|(..)| || bc || 0.0129028656451
min2 || le || 0.0128878585959
..3 || A || 0.0128866873933
(exp7 2) || nat2 || 0.012877631038
gcd0 || nat_compare || 0.0128659796362
W-min || smallest_factor || 0.0128594772048
^214 || (times (nat2 (nat2 nat1))) || 0.0128572909153
$ (~ with_non-empty_element0) || $ nat || 0.0128516159326
is_proper_subformula_of0 || (in_list nat) || 0.012835807847
Pempty_e_net || nat2 || 0.0128290817008
Seg || smallest_factor || 0.0128233817128
curry\ || A || 0.0128218615242
~3 || A || 0.0128218615242
min2 || lt || 0.0128186692507
~3 || Z_of_nat || 0.0128014160979
Line2 || pred || 0.0127964037259
Lege || gcd || 0.0127939173854
k5_ltlaxio3 || nth_prime || 0.0127757704767
. || gcd || 0.0127756303072
escape || Z_of_nat || 0.0127739579232
[:..:] || leb || 0.0127492329389
-37 || exp || 0.0127488660483
S-min || sqrt || 0.0127419516429
-SD_Sub || prime || 0.0127341147455
-SD_Sub_S || prime || 0.0127341147455
quotient1 || times || 0.0127338742922
<:..:>3 || max || 0.0127254950062
(* <i>) || nat2 || 0.0127168895407
entrance || Z_of_nat || 0.0127157033461
is_proper_subformula_of || lt || 0.012715650937
N-max || sqrt || 0.0127090167868
FinSETS (Rank omega) || (nat2 nat1) || 0.0127003652419
E-min || sqrt || 0.0126928628591
S-min || prim || 0.0126896565384
-49 || times || 0.0126774756724
W-max || sqrt || 0.0126611583307
N-max || prim || 0.0126569903486
Bottom || Z_of_nat || 0.0126522898498
-60 || times || 0.0126491488332
-polytopes || exp || 0.0126481587254
E-min || prim || 0.0126409679503
-29 || minus || 0.0126323085652
RConSet || C2 || 0.0126307353387
P_cos || B || 0.0126303247881
S-max || sqrt || 0.0126150433618
Big_Omega || nth_prime || 0.0126126751116
W-max || prim || 0.0126095210968
Top || Z_of_nat || 0.0126000228858
INT || QO || 0.0125968660084
curry || A || 0.0125886506766
Subtrees0 || fact || 0.0125787850453
frac0 || div || 0.0125777615893
S-max || prim || 0.0125637798064
divides0 || nat_compare || 0.0125508970136
uncurry || A || 0.0125359646096
order_type_of || pred || 0.0125281942376
Inv0 || fact || 0.0125225165455
nextcard || prime || 0.0125188218384
$^ || exp || 0.0125149393399
-SD0 || prime || 0.0125117433327
multF || nat2 || 0.0125088654974
#bslash#4 || max || 0.0125048908917
[....[0 || lt || 0.012487978143
]....]0 || lt || 0.012487978143
Funcs2 || A || 0.0124852239725
intloc || B || 0.0124797161093
k1_rvsum_3 || C2 || 0.0124760973647
op2 || nat1 || 0.0124623335432
\xor\ || times || 0.0124563119598
[....[0 || le || 0.0124552751617
]....]0 || le || 0.0124552751617
k1_rvsum_3 || B_split2 || 0.0124551342883
mlt0 || gcd || 0.0124510057757
|^ || minus || 0.0124423895325
((*2 SCM-OK) SCM-VAL0) || (Z_of_nat nat1) || 0.0124280500519
(<= 3) || (lt nat1) || 0.0124190815001
`3_4 || Z2 || 0.012409432429
south_halfline || nth_prime || 0.0123985320971
north_halfline || nth_prime || 0.0123985320971
(((-9 REAL) REAL) sin1) || nat1 || 0.0123789957101
**7 || div || 0.0123607725102
$ quaternion || $ Q0 || 0.0123588247122
LConSet || B_split1 || 0.0123577176708
RConSet || B_split2 || 0.0123577176708
c= || Zle || 0.0123479971484
BOOL || nat2 || 0.012340868367
exp7 || div || 0.0123122979972
P_cos || A || 0.0123033231791
*2 || mod || 0.012281889826
* || leb || 0.0122668770776
frac0 || exp || 0.0122664517987
^\ || div || 0.0122602288134
SubFuncs || A || 0.0122566681187
({..}18 NAT) || nat1 || 0.012237714797
intloc || A || 0.0122349736039
N-min || sqrt || 0.0122293232524
#hash#Z0 || exp || 0.0122093876115
k2_numpoly1 || minus || 0.0121947128909
compose || times || 0.0121945909424
ConSet || C || 0.0121938511538
<=>0 || eqb || 0.0121921376848
$ (Element (carrier (TOP-REAL 3))) || $ nat || 0.0121814180648
N-min || prim || 0.0121811333619
Necklace || Z2 || 0.0121807885521
SymbolsOf || Z_of_nat || 0.0121763803731
|^11 || minus || 0.0121758215074
$ (& Relation-like (& Function-like (& constant (& (~ empty0) (& real-valued FinSequence-like))))) || $ nat || 0.0121721999251
multF || Z_of_nat || 0.0121701109814
#bslash##slash#0 || div || 0.0121651116429
$ QC-alphabet || $ Z || 0.0121522910978
(rng REAL) || Z_of_nat || 0.0121493178615
*51 || plus || 0.0121448179897
-Root || max || 0.0121409805923
Big_Theta || nth_prime || 0.0121256775984
inf5 || Z_of_nat || 0.0121235937876
|14 || times || 0.0121069679137
carrier\ || defactorize || 0.0121050363781
Rank || A || 0.0120985614437
|^25 || minus || 0.0120969317763
k2_nbvectsp || nat2 || 0.0120920050845
++3 || div || 0.0120907556287
addF || nat2 || 0.0120898092283
INT.Group0 || C || 0.012080159377
$ (& (~ empty0) (FinSequence INT)) || $ nat || 0.0120717243402
*` || div || 0.0120610398906
INT.Group0 || B1 || 0.0120531222545
Lower_Arc || pred || 0.0120470279537
k6_rvsum_3 || C2 || 0.0120432763617
Upper_Arc || pred || 0.0120373102035
AtomicFormulasOf || nat2 || 0.0120362379785
(+22 3) || plus || 0.0120361091861
Top0 || pred || 0.0120287608732
**7 || exp || 0.0120107369526
Pempty_f_net || nat2 || 0.0120024762704
-29 || plus || 0.0119943775106
halt || enum || 0.0119874358415
On || Z2 || 0.0119835855494
is_parametrically_definable_in || le || 0.0119725049915
is_definable_in || le || 0.0119725049915
coefficient || repr || 0.0119723657769
#hash#Q || max || 0.0119697994175
TermSymbolsOf || B_split1 || 0.011942586905
#bslash##slash#0 || exp || 0.0119318922832
ConSet || B1 || 0.0119301627845
#quote# || Z3 || 0.0119253054594
^\ || exp || 0.0119045548118
$ natural || $ bool || 0.0118938533328
k6_rvsum_3 || B_split2 || 0.0118932769467
k5_rvsum_3 || B_split1 || 0.0118932769467
*2 || min || 0.0118833155449
||0 || times || 0.0118710999915
$ (& Relation-like (& (-valued REAL) (& T-Sequence-like (& Function-like infinite)))) || $ nat || 0.0118680462088
Subtrees0 || nth_prime || 0.0118600310751
$ (& ordinal natural) || $ Q0 || 0.011839279106
gcd0 || max || 0.0118324227094
. || exp || 0.0118141538979
are_equipotent || bijn || 0.0118093433331
#quote# || factorize || 0.0118016947795
E-max || sqrt || 0.0118012128429
Inv0 || nth_prime || 0.0117999015501
min0 || pred || 0.0117909058453
((=3 omega) REAL) || le || 0.0117793100736
carr6 || index_of || 0.0117765882798
$ PT_net_Str || $ nat || 0.0117751766995
PGraph || nat2 || 0.0117639231057
Seg || sqrt || 0.0117626340401
E-max || prim || 0.0117563254411
*` || exp || 0.0117327317383
Seg || prim || 0.0117246030315
abs || smallest_factor || 0.0117223706944
++3 || exp || 0.011721819282
S-min || pred || 0.0117206918556
*2 || gcd || 0.0117195108692
*^2 || leb || 0.0117138456119
TrivialOp || nat2 || 0.0117089868238
proj4_4 || defactorize || 0.011695098121
(. exp_R) || A || 0.0116944246945
N-max || pred || 0.0116928087032
\&\2 || exp || 0.0116900830811
(((.1 HP-WFF) (bool0 HP-WFF)) k4_ltlaxio3) || fact || 0.0116849115648
E-min || pred || 0.011679128409
<=>0 || leb || 0.0116646797519
W-max || pred || 0.0116522708476
Catalan || prime || 0.0116361880693
div0 || exp || 0.0116356682559
lcm || minus || 0.0116326639958
#quote# || Z2 || 0.0116297213909
W-min || sqrt || 0.0116260593944
Seg || factorize || 0.0116214612366
(1. G_Quaternion) 1q0 || nat1 || 0.0116186160615
+33 || gcd || 0.0116150383038
S-max || pred || 0.0116131871718
1_Rmatrix || Z2 || 0.0115859868273
W-min || prim || 0.0115824899648
LMP || sqrt || 0.0115773718632
UMP || sqrt || 0.0115773718632
Subformulae || fact || 0.0115714812021
Mycielskian1 || fact || 0.0115620473417
exp1 || andb || 0.0115619455272
topology || Z_of_nat || 0.011559134235
(||....||2 Complex_l1_Space) || fact || 0.0115557796987
(||....||2 l1_Space) || fact || 0.0115557796987
(||....||2 linfty_Space) || fact || 0.0115557796987
(||....||2 Complex_linfty_Space) || fact || 0.0115557796987
\not\2 || Qopp0 || 0.0115539610884
ComplexFuncZero || nat2 || 0.0115332774065
-37 || gcd || 0.0115284311037
LMP || prim || 0.0115255434308
UMP || prim || 0.0115255434308
$^ || times || 0.011524377396
0. || nat2 || 0.0115226245013
Tsingle_e_net || nat2 || 0.0115200843151
Psingle_e_net || nat2 || 0.0115200843151
Psingle_f_net || nat2 || 0.0115200843151
k2_numpoly1 || plus || 0.0115147090576
||....|| || cmp || 0.011508351175
#slash# || gcd || 0.0115065760517
|....|2 || sieve || 0.0115046786896
nabla || Z2 || 0.0114834499703
(. sinh0) || A || 0.0114622328442
*\33 || exp || 0.0114587876147
div0 || max || 0.0114433873375
(((#slash#.1 COMPLEX) COMPLEX) cos_C) || Z_of_nat || 0.0114397195569
TOL || nat2 || 0.0114247740699
* || times_f || 0.0114131081644
$ (& (~ empty) (& (~ trivial0) (& Lattice-like (& Boolean LattStr)))) || $ nat || 0.0114101525543
k9_moebius2 || pred || 0.0114061653907
k4_moebius2 || pred || 0.0114061653907
|^11 || plus || 0.0114057133846
field || A || 0.0113830310158
bool3 || fact || 0.0113745997241
(*32 3) || minus || 0.0113696603627
|^ || div || 0.0113668027973
dist5 || cmp || 0.0113538663646
k2_numpoly1 || div || 0.0113512940917
S-T_Arcs || C1 || 0.0113511575803
|^25 || plus || 0.0113459523286
R_EAL1 || minus || 0.0113390229632
(<= +infty0) || prime || 0.0113290760113
(#slash# 1) || Qinv0 || 0.0113250829993
^30 || nat2 || 0.0113223679338
P_sin || (nat2 nat1) || 0.0113219403128
div0 || eqb || 0.0113203755791
max0 || pred || 0.0112978888647
+` || div || 0.0112860080892
N-min || pred || 0.0112854056295
*\33 || nat_compare || 0.0112778880189
#quote# || defactorize || 0.0112740451438
FinSeq-Locations SCM+FSA-Data*-Loc0 || (nat2 nat1) || 0.011241652145
\or\3 || plus || 0.0112282119596
Sgm || A || 0.0112102761663
$ (& (~ empty) (& (~ trivial0) (& Lattice-like (& Heyting LattStr)))) || $ nat || 0.0112054635869
one0 RetIC Rea0 Ser0 unit3 (1. Z_2) TRUE 0_NN non_op VertexSelector 1[01] an_Adj 1 (1_ F_Complex) 1r ({..}2 k5_ordinal1) (((#hash#)11 NAT) 1) (elementary_tree NAT) ({..}2 {}) || Z1 || 0.0111982688332
$ (& natural (~ v8_ordinal1)) || $ nat_fact || 0.0111895239533
-TruthEval2 || plus || 0.0111785183678
Im3 || C2 || 0.0111613143966
meet || A || 0.0111580910521
order_type_of || (exp (nat2 (nat2 nat1))) || 0.0111567802981
Lege || exp || 0.0111551584762
*51 || mod || 0.0111400907922
RN_Base || Z3 || 0.0111368879356
Im3 || B_split2 || 0.0111257308196
-29 || div || 0.0111254437543
**7 || times || 0.0111228735567
Tsingle_f_net || nat2 || 0.0111118372897
0.1 || (nat2 nat1) || 0.0111104530141
Dir_of_Lines || C2 || 0.0111091783763
Subgroups || fact || 0.011088226077
Product1 || Z_of_nat || 0.0110765586379
west_halfline || fact || 0.0110723834377
east_halfline || fact || 0.0110723834377
the_axiom_of_power_sets || nat1 || 0.011062842252
the_axiom_of_unions || nat1 || 0.011062842252
the_axiom_of_pairs || nat1 || 0.011062842252
Sgm || Z_of_nat || 0.0110551318112
IncAddr || uniq || 0.0110519210602
the_LeftOptions_of || C1 || 0.0110434401566
^omega || prime || 0.0110272956822
(. arctan) || A || 0.0110241477079
cf || nat2 || 0.0110233655885
k2_numpoly1 || exp || 0.0110216876193
Dir_of_Lines || B_split2 || 0.0110204559726
arity || pred || 0.0110155281966
RelIncl || Z_of_nat || 0.0110128859298
Re2 || B_split1 || 0.0110125993709
Seg || pred || 0.0110078193101
^\ || times || 0.0110046272004
+` || exp || 0.0109693265373
sup4 || nth_prime || 0.0109579001097
diameter || nat2 || 0.0109525233385
[....[0 || plus || 0.0109506635528
mlt0 || exp || 0.0109383708333
(#hash#)0 || plus || 0.0109370546542
-root || max || 0.0109241986884
div0 || leb || 0.010922102954
E-max || pred || 0.0109197594562
(NonZero SCM) SCM-Data-Loc || (nat2 nat1) || 0.0109078288601
is_subformula_of1 || divides || 0.0108940350738
#slash##quote#2 || Zplus || 0.0108654380226
frac || prime || 0.0108442130378
]....[1 || plus || 0.0108411996226
(-2 3) || compare_invert || 0.0108398586258
(((#slash#.1 COMPLEX) COMPLEX) cosh_C) || Z_of_nat || 0.0108383218921
Mycielskian1 || nth_prime || 0.0108128165299
Subtrees || fact || 0.0107984863695
++3 || times || 0.0107933311792
Rev1 || nat2 || 0.010777723622
GPerms || nat2 || 0.010770569631
W-min || pred || 0.0107695984638
(*32 3) || plus || 0.0107632234241
([....[0 -infty0) || Z2 || 0.010753957026
Int-Locations || (nat2 nat1) || 0.0107317291548
|^ || max || 0.0107270193396
QSub || C1 || 0.0107208752747
~4 || A || 0.010717023636
tan || A || 0.0107080363392
RN_Base || Z2 || 0.0107002246595
R_EAL1 || plus || 0.0106966931424
`11 || nat2 || 0.0106922411334
k5_ltlaxio3 || nat2 || 0.010679282959
FALSUM0 || Zopp || 0.0106723528407
#slash##bslash#0 || Ztimes || 0.0106602223295
proj4_4 || Z2 || 0.010625469237
cosh || Z2 || 0.0106177963912
addint || C2 || 0.0106108191662
addint || B_split2 || 0.0105870353949
\or\ || andb || 0.0105819217573
LMP || pred || 0.0105720378829
k1_numpoly1 || prime || 0.0105528456519
FALSE || (nat2 nat1) || 0.0105472403252
id0 || Z_of_nat || 0.0105457534619
c= || cmp_cases || 0.0105391770794
Rev0 || nat2 || 0.0105343470042
proj1 || defactorize || 0.0105337264374
*\33 || plus || 0.0105221067171
Necklace || nat2 || 0.0105177079979
0q || gcd || 0.010516216659
(#slash# 1) || Z3 || 0.0105019172175
Big_Oh || nth_prime || 0.0105010520622
Sum0 || Z_of_nat || 0.0104879961101
abs || sqrt || 0.0104829884702
r3_tarski || minus || 0.0104747684298
-49 || gcd || 0.0104587209851
abs || prim || 0.0104396902373
Big_Omega || fact || 0.0104129905475
Col || Z2 || 0.0104069433692
$ cardinal || $ Q0 || 0.0104041102291
$ (& v1_matrix_0 (FinSequence (*0 COMPLEX))) || $ nat || 0.0103944029791
cot || Z2 || 0.0103942553867
|^11 || div || 0.0103918593709
GPFuncs || nat2 || 0.0103849254576
cos || B || 0.0103570840893
sin || B || 0.010354399349
|^25 || div || 0.0103514468197
south_halfline || fact || 0.0103419046478
north_halfline || fact || 0.0103419046478
LowerCompoundersOf || C2 || 0.0103363960354
`1 || Z_of_nat || 0.0103201112225
COMPLEX || (nat2 nat1) || 0.0103098166169
ConsecutiveSet || div || 0.0103045449908
ConsecutiveSet2 || div || 0.0103045449908
+33 || exp || 0.0102876304708
(#slash# 1) || Z2 || 0.0102719102971
halfline || nat2 || 0.010257857739
*51 || minus || 0.0102518655636
MFuncs || nat2 || 0.01022904455
dist4 || cmp || 0.0102175684198
sin0 || (nat2 nat1) || 0.0102159715734
div0 || nat_compare || 0.0102105480037
sin1 || (nat2 nat1) || 0.0102063236876
k1_numpoly1 || Z2 || 0.0102008020839
div0 || ltb || 0.0101848434954
Product1 || pred || 0.0101844234044
-SuccRelStr || nat2 || 0.0101669281727
\in\ || nat2 || 0.0101633008484
ConwayZero0 || (nat2 nat1) || 0.0101614883629
cos || A || 0.0101563945367
id7 || Zopp || 0.0101486147422
left_closed_halfline || nat2 || 0.0101448757112
LowerCompoundersOf || B_split2 || 0.0101397285582
$ (& v1_matrix_0 (FinSequence (*0 REAL))) || $ nat || 0.0101366382227
#slash# || div || 0.0101334674197
$ COM-Struct || $ finType || 0.010132835604
$ (& Function-like (& ((quasi_total omega) REAL) (Element (bool (([:..:] omega) REAL))))) || $ nat || 0.010131676989
#slash#^5 || minus || 0.0101304606565
cosh0 || Z2 || 0.0101241089583
Arg || sieve || 0.0101042721048
. || min || 0.0101022624467
the_Options_of || C || 0.0100996465909
- || leb || 0.0100914101827
.126 || nat2 || 0.0100909308077
#slash# || min || 0.010089089276
-29 || times || 0.0100813837349
-49 || exp || 0.010066149461
$ ordinal || $ Z || 0.0100642435609
$ Relation-like || $ Z || 0.0100600523228
\xor\ || gcd || 0.010054790208
id7 || A || 0.0100454643185
$ complex || $ Formula || 0.0100432214265
Sum || Z_of_nat || 0.0100365598758
Big_Theta || fact || 0.0100348230568
(#slash# 1) || factorize || 0.0100295976959
((#slash#. COMPLEX) cos_C) || Z2 || 0.0100228920169
the_Options_of || B1 || 0.0100134890709
#slash##slash##slash# || minus || 0.00999007285254
$ (& Relation-like (& Function-like FinSequence-like)) || $ Q0 || 0.00997395947335
ConsecutiveSet || exp || 0.00996639768433
ConsecutiveSet2 || exp || 0.00996639768433
card || (exp (nat2 (nat2 nat1))) || 0.00996261545835
*1 || B || 0.00994267735534
(. sinh1) || prime || 0.009938443869
(*32 3) || div || 0.00991317611116
#slash# || Qtimes0 || 0.00988285118181
-0 || Qinv0 || 0.00986495490487
In_Power || Z2 || 0.00985976973621
^0 || minus || 0.00985963166924
#quote# || A || 0.00983635180587
proj1 || C1 || 0.00983516772785
\X\ || list_n || 0.00982786383585
(|^ 2) || Z2 || 0.00981911458322
*109 || plus || 0.00981118267273
(AffineMap0 NAT) || nat2 || 0.00980601850207
(#hash#)0 || minus || 0.00978856158925
InternalRel || Z_of_nat || 0.00975875816651
REAL0 || nat2 || 0.00974279643238
(.2 REAL) || times || 0.00973016159104
\xor\ || eqb || 0.00972857467808
Subspaces2 || nat2 || 0.0097240368141
Submodules || nat2 || 0.00971468629192
Subspaces0 || nat2 || 0.00970757193795
$ (& (~ empty0) (Element (bool omega))) || $ nat || 0.00970222102175
$ (Element the_arity_of) || $ bool || 0.0096865205109
(+ 6) || nat2 || 0.00968617313971
limit- || Z2 || 0.00966326888828
k1_rvsum_3 || C || 0.00966161780095
euc2cpx || pred || 0.00965771628004
seq0 || gcd || 0.00965284364471
(#slash# 1) || defactorize || 0.00965222905646
(-0 ((#slash# P_t) 2)) || (nat2 nat1) || 0.0096512576756
NonTerminals || B_split2 || 0.0096447936891
CFQ || C || 0.00964048308734
abs || pred || 0.00963783539636
NonTerminals || C2 || 0.00963480939108
#slash#^5 || plus || 0.00963224274024
sinh || Z2 || 0.0096309394474
choose3 || nat2 || 0.00962971126066
k1_rvsum_3 || B1 || 0.0096160751412
On || factorize || 0.00959861122032
VERUM0 || Zopp || 0.00959738981232
lcm1 || le || 0.00958668626153
cos || teta || 0.00957752563507
sin || teta || 0.00957541548387
+` || gcd || 0.00956790003305
Segm00 || C1 || 0.00956770590882
Im3 || A || 0.00956584100698
\not\8 || list_n || 0.00955799812366
Fixed || Qplus || 0.00955199551171
Free1 || Qplus || 0.00955199551171
lcm1 || lt || 0.00954285018613
1*0 || nat2 || 0.00954241849059
1q || minus || 0.00952772726906
SymGroup || nat2 || 0.00950519548737
Re2 || A || 0.00949474425997
P_sin || nat1 || 0.00948775214917
carrier\ || Z_of_nat || 0.00948218142545
pi4 || Ztimes || 0.00948043168712
{..}2 || (exp (nat2 (nat2 nat1))) || 0.00945853582159
union0 || Zpred || 0.00945487383659
#slash##slash##slash#0 || minus || 0.00945254522387
base- || Z2 || 0.00943248604673
0* || Z2 || 0.00942614269399
CFQ || B1 || 0.00942320967355
- || ltb || 0.00941408745957
$ boolean || $ Q0 || 0.00940781505097
|(..)| || exp || 0.00939102901216
sup4 || nat2 || 0.00937810379106
((#slash#. COMPLEX) cosh_C) || Z2 || 0.00937522752614
$ (~ empty0) || $true || 0.00935788545231
cos || sieve || 0.00935272242788
sin || sieve || 0.0093505194899
Initialized || teta || 0.00931697261605
union0 || A || 0.00931635351561
i_e_s || prime || 0.00930570839055
i_w_s || prime || 0.00930570839055
i_n_e || prime || 0.00930570839055
i_s_e || prime || 0.00930570839055
i_n_w || prime || 0.00930570839055
i_s_w || prime || 0.00930570839055
*2 || max || 0.00930343845906
\xor\ || leb || 0.00930295500275
inf || plus || 0.00928290395819
k1_mmlquer2 || plus || 0.00926446368918
([....]5 -infty0) || Z2 || 0.00925767454277
-Matrices_over || nat2 || 0.00924495662507
len || C2 || 0.00923197787177
|16 || index_of || 0.00921912365821
RelIncl0 || nat2 || 0.00921869630222
cosech || nat2 || 0.0092009655512
|^11 || times || 0.00919968357071
INT.Group0 || factorize || 0.00919893083885
k10_moebius2 || factorize || 0.00919297101115
|^25 || times || 0.00918335152057
(((.1 HP-WFF) (bool0 HP-WFF)) k4_ltlaxio3) || nat2 || 0.0091779347544
+ || div || 0.00917745324
RelIncl0 || (times (nat2 (nat2 nat1))) || 0.00917339805875
proj4_4 || C2 || 0.00914359396042
proj4_4 || B_split2 || 0.00912834545316
ConsecutiveSet || times || 0.00912229142043
ConsecutiveSet2 || times || 0.00912229142043
$ complex-membered || $ Z || 0.00910906437422
D-Meet || C1 || 0.00910497607318
D-Union || C1 || 0.00910497607318
sproduct || sieve || 0.00910088533434
(. sin0) || A || 0.00909902604481
(dom omega) || teta || 0.00909009414011
InstructionsF || fsort || 0.00908899231194
1.REAL || nat2 || 0.00908515122348
succ1 || eq || 0.00907725955745
+*1 || div || 0.00907679052671
BOOLEAN || QO || 0.00907493483655
len || B_split2 || 0.00906303287773
--2 || exp || 0.00905625326919
(*6 F_Real) || nat2 || 0.00904131387581
i_e_n || prime || 0.00903726978502
i_w_n || prime || 0.00903726978502
INT || (nat2 nat1) || 0.00902550654322
sin0 || nat1 || 0.00902200870887
sin1 || nat1 || 0.00901447971207
divides0 || minus || 0.00900833275063
*51 || div || 0.00897357636658
Terminals || C1 || 0.00897209253048
Top0 || nat2 || 0.00896279066911
$ (Element (carrier $V_(& (~ empty) (& right_complementable (& Abelian (& add-associative (& right_zeroed (& vector-distributive1 (& scalar-distributive1 (& scalar-associative1 (& scalar-unital1 (& ComplexUnitarySpace-like CUNITSTR)))))))))))) || $ (sort $V_eqType) || 0.0089598062207
multint0 || C2 || 0.00895881963884
--2 || minus || 0.00895534419598
union0 || Zsucc || 0.00895291093615
(*32 3) || times || 0.00893605848974
#slash##slash##slash#0 || exp || 0.00891377126122
(#hash#)20 || Ztimes || 0.00889763695017
+*1 || exp || 0.00889426717026
multint0 || C || 0.00889283804313
\nand\ || frac || 0.00886063222885
op1 || (nat2 nat1) || 0.00884560205559
|....|2 || prime || 0.00882692627743
Sum12 || pred || 0.00881562553433
multint0 || B_split2 || 0.00880485886445
$ natural || $ Q0 || 0.00879627196091
^0 || div || 0.00879392421328
carrier\ || pred || 0.00876611717721
west_halfline || nat2 || 0.0087613612049
east_halfline || nat2 || 0.0087613612049
Big_Oh || fact || 0.00876046850597
ChangeVal_2 || andb || 0.00876037059185
(||....||2 Complex_l1_Space) || nat2 || 0.0087565877479
(||....||2 l1_Space) || nat2 || 0.0087565877479
(||....||2 linfty_Space) || nat2 || 0.0087565877479
(||....||2 Complex_linfty_Space) || nat2 || 0.0087565877479
VERUM || Qopp0 || 0.00875061930931
WeightSelector 5 || nat1 || 0.00874832695856
Big_Theta || C || 0.00874097249157
the_right_side_of || Z2 || 0.00873952383134
multint0 || B1 || 0.00873745179836
bool3 || nat2 || 0.0087265150241
$ (& Relation-like (& T-Sequence-like (& Function-like infinite))) || $ bool || 0.00870312092126
(. sin0) || Z_of_nat || 0.00870225289344
Big_Theta || B1 || 0.00870006400179
\nor\ || frac || 0.00869295095603
proj4_4 || Zopp || 0.00868476450406
sup2 || plus || 0.00868084674526
BooleLatt || nat2 || 0.00864182480957
the_transitive-closure_of || Zopp || 0.0086392714214
1q || nat_compare || 0.00863682039355
+^1 || andb || 0.00863039422136
^0 || exp || 0.0086093145061
#bslash##slash#0 || andb || 0.00860707787957
REAL0 || Z2 || 0.00860410959549
proj1 || B_split1 || 0.00858218426622
+56 || Zopp || 0.00855988502044
Subgroups || nat2 || 0.00854763710338
(|[..]| NAT) || nat2 || 0.00854477332668
FALSE || bool1 || 0.00852599412752
(#hash#)0 || div || 0.00851604627211
<:..:>3 || minus || 0.00851192673321
$true || $ Q0 || 0.00849803314218
<*..*>4 || Z_of_nat || 0.00849004458306
WeightSelector 5 || (nat2 nat1) || 0.00848701094896
Big_Omega || C2 || 0.00847253181822
Subtrees || nat2 || 0.00846042534859
Big_Omega || B_split2 || 0.00843286896563
abs || nth_prime || 0.00840802693454
Bottom0 || nat2 || 0.00839889228009
bool || Z2 || 0.00839770921061
. || max || 0.00838538206608
cos0 || nat2 || 0.00837537186479
the_RightOptions_of || C2 || 0.0083750988084
underlay || Zpred || 0.0083748489116
Rank || defactorize || 0.00836905851194
^20 || Z_of_nat || 0.00836220645164
abs || fact || 0.00835468035876
(#slash# 1) || B || 0.00834784481223
len || sieve || 0.00833858277231
CQC-Sub-WFF || C2 || 0.00831785611979
(Rev (carrier (TOP-REAL 2))) || Qopp0 || 0.00831440192303
are_isomorphic2 || le || 0.00831017787313
the_RightOptions_of || B_split2 || 0.00830352956236
south_halfline || nat2 || 0.00829716287223
north_halfline || nat2 || 0.00829716287223
(#hash#)0 || exp || 0.00829394331502
$ (& reflexive (& transitive (& antisymmetric (& lower-bounded (& with_suprema RelStr))))) || $ nat || 0.00829064967186
#quote##quote#0 || Z3 || 0.00828201762487
ind || pi_p0 || 0.00827769544067
Det0 || frac || 0.0082765807043
cos1 || nat2 || 0.00827517766573
card || teta || 0.00826524129987
Big_Omega || nat2 || 0.00825128864502
R_EAL1 || div || 0.00824238615243
#slash# || max || 0.00823482315028
coth || nat2 || 0.00821171643456
(Load SCMPDS) || Z_of_nat || 0.00820897515547
are_isomorphic2 || lt || 0.00820181803724
the_LeftOptions_of || B_split1 || 0.00819812930841
multint || C1 || 0.00819413969857
--0 || Z3 || 0.00818967320025
Initialized || nat2 || 0.00818602925579
(#slash# 1) || A || 0.00817080154585
one0 RetIC Rea0 Ser0 unit3 (1. Z_2) TRUE 0_NN non_op VertexSelector 1[01] an_Adj 1 (1_ F_Complex) 1r ({..}2 k5_ordinal1) (((#hash#)11 NAT) 1) (elementary_tree NAT) ({..}2 {}) || Zone || 0.00816994337414
T-S_Arcs || C2 || 0.0081649243682
Initialized || nth_prime || 0.008161379791
*51 || times || 0.00815301524183
$ real || $ Z || 0.00813578419593
CQC-Sub-WFF || B_split2 || 0.00813014684266
is_SetOfSimpleGraphs_of || symmetric0 || 0.00812717520853
*^2 || exp || 0.00811691572087
([..] NAT) || nat2 || 0.00811639607954
sin || Z_of_nat || 0.00810432708028
in || divides || 0.00809863701056
FALSE || QO || 0.0080985738826
Sum0 || C1 || 0.00809836760492
([..] {}) || nat2 || 0.00808314560055
<:..:>3 || plus || 0.00808033075861
-0 || smallest_factor || 0.00807989316642
carrier || Zpred || 0.00807985678599
T-S_Arcs || B_split2 || 0.0080696948645
S-T_Arcs || B_split1 || 0.0080696948645
k1_mmlquer2 || times || 0.00806356338036
* || Qtimes0 || 0.00804474680203
(c= INT) || (lt nat1) || 0.00803952669397
Big_Theta || nat2 || 0.0080117863268
op2 || (nat2 nat1) || 0.00801073692801
$true || $ finType || 0.00800729920227
#quote##quote#0 || Z2 || 0.00799364970471
max || div || 0.00799110404214
(dom omega) || nth_prime || 0.00798580484647
(. sin0) || Z2 || 0.00797810312952
$ (Element (carrier $V_(& (~ empty) (& right_complementable (& Abelian (& add-associative (& right_zeroed (& vector-distributive (& scalar-distributive (& scalar-associative (& scalar-unital (& RealUnitarySpace-like UNITSTR)))))))))))) || $ (sort $V_eqType) || 0.00795935021291
Big_Oh || C1 || 0.00795731249135
Arg || prime || 0.00795163221705
--0 || Z2 || 0.00791593134053
$ (& Relation-like (& Function-like FinSequence-like)) || $ Z || 0.00790934376689
^40 || Z3 || 0.00788999170334
\xor\ || nat_compare || 0.00785963687107
rngs || Z2 || 0.00785500470843
1. || numerator || 0.0078422979017
+*1 || le || 0.00784083389979
uncurry || nat2 || 0.00784058089688
$true || $ Formula || 0.0078374155987
+*1 || lt || 0.00782018315744
*1 || sieve || 0.00780351612756
max || exp || 0.00780008479476
#quote# || pred || 0.00779487398326
MidOpGroupObjects || Z2 || 0.00779149508623
min2 || div || 0.00779027184725
AbGroupObjects || Z2 || 0.00778636626908
carrier || Zsucc || 0.00777874185754
BOOLEAN || (Z_of_nat nat1) || 0.00777870073278
-roots_of_1 || Z2 || 0.00777834540935
(-0 ((#slash# P_t) 2)) || nat1 || 0.00775835307471
\xor\ || ltb || 0.00775560206394
(#hash#)0 || times || 0.00772601439083
Rev0 || Z3 || 0.00771091484823
(((.: (carrier (TOP-REAL 2))) REAL) proj11) || nat2 || 0.0077005426665
\or\3 || minus || 0.00768439337273
Components || C || 0.00767059199874
-0 || Zopp || 0.00763385507776
-- || Z3 || 0.00761555042228
FALSE || (Z_of_nat nat1) || 0.00759811059778
min2 || exp || 0.00759569083569
^8 || andb || 0.00758296686402
(k22_pre_poly Newton_Coeff) || Z_of_nat || 0.00758286986819
*+^ || C || 0.00756281704196
f_pre || C || 0.00755859921743
*+^ || B1 || 0.00754010062688
is_subformula_of0 || divides || 0.00752529673903
f_pre || B1 || 0.00752469145902
-30 || compare_invert || 0.00750724383276
#slash#^5 || div || 0.00750708466218
Components || B1 || 0.00749835410719
Subformulae || Z2 || 0.00749568827022
cos || Z2 || 0.00748850046571
underlay || Zsucc || 0.00748482623332
Rev0 || Z2 || 0.00748077686503
the_transitive-closure_of || eq || 0.00747098347086
-0 || sqrt || 0.00747041180437
^215 || Z_of_nat || 0.00747007200521
$ (Element (carrier (TOP-REAL $V_natural))) || $ (sort $V_eqType) || 0.00746502460415
$ (& (~ empty) (& right_complementable (& Abelian (& add-associative (& right_zeroed (& vector-distributive1 (& scalar-distributive1 (& scalar-associative1 (& scalar-unital1 (& ComplexUnitarySpace-like CUNITSTR)))))))))) || $ eqType || 0.00745032692722
-0 || prim || 0.00744838096362
$ (& (~ empty0) (& compact (Element (bool REAL)))) || $ nat || 0.00744529077082
Var2 || defactorize || 0.00741557406087
Goto0 || Z2 || 0.00739884943342
(]....[1 -infty0) || nat2 || 0.00739836591327
R_EAL1 || times || 0.00738377130898
-- || Z2 || 0.00737049187653
varcl || Zopp || 0.00735921065502
|^11 || Fmult || 0.00735621989346
are_not_conjugated1 || incl || 0.00735433997051
(((.: (carrier (TOP-REAL 2))) REAL) proj2) || nat2 || 0.00734445426363
\&\2 || plus || 0.00733276181052
#slash#^5 || exp || 0.00731362837646
cos || prime || 0.00729745667514
sin || prime || 0.00729611068142
Funcs6 || Ztimes || 0.00727725797251
$ (& (~ empty) MultiGraphStruct) || $ (=> nat nat) || 0.00721828886697
.78 || frac || 0.00720967628154
*\33 || minus || 0.00720000210017
Big_Oh || nat2 || 0.00717769049245
#bslash#4 || Zplus || 0.00716713385748
tan || nat2 || 0.00715301307317
carrier || fsort || 0.00714862584407
(c= omega) || sorted_gt || 0.00714740488317
(dom omega) || nat2 || 0.0070928028467
$ (& (~ empty) (& right_complementable (& Abelian (& add-associative (& right_zeroed (& vector-distributive (& scalar-distributive (& scalar-associative (& scalar-unital (& RealUnitarySpace-like UNITSTR)))))))))) || $ eqType || 0.0070837142354
QSub || B_split1 || 0.00705803922034
$ (Element (bool omega)) || $ nat || 0.00705314155405
sinh || nat2 || 0.00702454092252
mlt3 || gcd || 0.00701836101607
are_not_conjugated0 || incl || 0.00700331689971
tree0 || Z_of_nat || 0.00699711387416
cosh0 || nat2 || 0.00699070503507
sproduct || prime || 0.00698995499151
(<*..*>1 omega) || Z3 || 0.00697824412133
(#slash# 1) || pred || 0.00697796682092
Trivial-addLoopStr || (Z_of_nat nat1) || 0.00696480592646
op0 k5_ordinal1 {} || (nat2 (nat2 nat1)) || 0.00696162087314
len || prime || 0.00695670527517
(Product5 Newton_Coeff) || defactorize || 0.00694488070614
$ (& (~ empty) (& with_tolerance RelStr)) || $ Q0 || 0.00692379204813
#slash#^5 || times || 0.00681839324168
curry || Z_of_nat || 0.00681170362943
=>2 || ltb || 0.00681119013656
$ (& Relation-like (& Function-like FinSequence-like)) || $ bool || 0.0067969865361
still_not-bound_in || Qplus || 0.00679490059079
(Funcs0 omega) || A\ || 0.00675178742109
(<*..*>1 omega) || Z2 || 0.00672757797183
Terminals || B_split1 || 0.00672131715772
#bslash#+#bslash# || Zplus || 0.00668761938311
`4_4 || nat2 || 0.00666470292624
^0 || andb || 0.00665886834059
-65 || gcd || 0.00662810265807
+65 || gcd || 0.00662810265807
are_equipotent || (in_list nat) || 0.00662523443215
- || same_atom || 0.00661450719216
op0 k5_ordinal1 {} || Zone || 0.00660140700722
-3 || nat2 || 0.00659132663629
<*>0 || costante || 0.00658791775271
-CycleSet || sieve || 0.00658256896215
is_subformula_of0 || lt || 0.00656171847153
(<= 1) || sorted_lt || 0.00652654482526
*1 || prime || 0.00652369295906
Sum0 || B_split1 || 0.00651166679706
Segm00 || B_split1 || 0.00647751417942
euc2cpx || nat2 || 0.00644615308684
-30 || nat2 || 0.00644064354608
=>2 || eqb || 0.00643406346284
is_SetOfSimpleGraphs_of || reflexive || 0.00642812539109
$ (& (~ empty) (& Group-like (& associative (& (distributive3 $V_$true) (HGrWOpStr $V_$true))))) || $ (finite_enumerable $V_$true) || 0.00642799768026
k13_lattad_1 || andb || 0.00642554702103
len || C1 || 0.00641689501953
||....||2 || Qplus || 0.00635708476659
Big_Oh || B_split1 || 0.00635167330293
^214 || Z2 || 0.00634652781781
(]....]0 -infty0) || nat2 || 0.00634121397816
D-Meet || B_split1 || 0.00634086668082
D-Union || B_split1 || 0.00634086668082
=>2 || nat_compare || 0.00633944465592
Open_Domains_of || C2 || 0.00631733085852
Closed_Domains_of || C2 || 0.00631733085852
LeftComp || Z_of_nat || 0.00630289465107
bool0 || nat2 || 0.00628410695582
RightComp || Z_of_nat || 0.0062429378531
(.59 ECIW-signature) || A || 0.0062420103598
SW-corner || nat2 || 0.00621442621622
curry\ || Z2 || 0.0062027940825
SE-corner || nat2 || 0.00619664251075
+26 || plus || 0.00618907010933
NE-corner || nat2 || 0.00617946412842
=>2 || leb || 0.00617646419307
curry || Z2 || 0.0061647239927
Open_Domains_of || B_split2 || 0.00616187174777
Closed_Domains_of || B_split2 || 0.00616187174777
First*NotUsed || Z2 || 0.00614850373429
NW-corner || nat2 || 0.00614677831742
-0 || fact || 0.00614455986702
\or\3 || exp || 0.00613160462285
$ (& (~ empty) MultiGraphStruct) || $ Z || 0.00612607691283
chi0 || times || 0.006124641578
-0 || nth_prime || 0.00609392192341
$ ext-real || $ Z || 0.00608833612393
-29 || Qplus || 0.00607880858591
mlt0 || Fmult || 0.00607398949315
(c= omega) || decidable || 0.00607216154567
Center || sieve || 0.00607091751107
[#hash#] || Qopp0 || 0.00606714542914
gcd0 || times || 0.00605072308333
[:..:] || Ztimes || 0.00602342591011
$ (Element (bool (carrier $V_(& (~ empty) (& Group-like (& associative multMagma)))))) || $ (list $V_$true) || 0.00602072716167
<X> || nat_compare || 0.00601998636203
$ (Element omega) || $ eqType || 0.00599977071394
(<= 0.1) || (lt nat1) || 0.00599449960531
div || ltb || 0.00596290398253
mlt3 || exp || 0.00594379598099
(^ omega) || plus || 0.00594329249302
(- 1) || A\ || 0.00591877181336
Elements || C || 0.00590714829609
(are_equipotent 1) || B || 0.00590374868295
Rank || pred || 0.0058884255842
(-->1 omega) || exp || 0.00587827258883
(-tuples_on 1) || smallest_factor || 0.00587813716514
$ (& (~ empty) (& reflexive (& transitive (& antisymmetric RelStr)))) || $ Q0 || 0.00586954699587
uncurry\ || Z2 || 0.0058626230223
Elements || B1 || 0.0058608948129
subset-closed_closure_of || Zopp || 0.00584114241628
FuncUnit0 || nat_fact_all3 || 0.00581070277736
k3_poset_2 || C2 || 0.00580800138207
min0 || num || 0.00580304665974
(are_equipotent 1) || A || 0.00580120418073
LeftComp || Z2 || 0.00579207714895
k3_poset_2 || B_split2 || 0.00578208172751
div || eqb || 0.00576252064943
$ (Element ((({..}0 1) 2) 3)) || $ bool || 0.00576139920404
$ boolean || $ bool || 0.00575535381036
ApproxIndex || sieve || 0.00575371200447
proj1 || Zopp || 0.00574325049468
RightComp || Z2 || 0.00574151546653
EX || Zpred || 0.00572891139756
Rev1 || Zopp || 0.00568325909456
len || B_split1 || 0.00566782162084
$ complex-membered || $ Q0 || 0.00566591928019
-65 || exp || 0.00566089393998
+65 || exp || 0.00566089393998
TotalGrammar || factorize || 0.00565825330107
Segm00 || C2 || 0.00564238611093
Funcs2 || Z2 || 0.00561495459075
Z#slash#Z* || C || 0.00560958958095
carrier\ || C2 || 0.00560853520878
uncurry || Z2 || 0.00558495840569
CatSign0 || Zpred || 0.00557305779639
carrier\ || B_split2 || 0.00557063384105
$ natural || $ Z || 0.00557000986896
+33 || Fmult || 0.00555183648772
UsedInt*Loc || Z2 || 0.00554628004325
*88 || C1 || 0.00554431648951
are_not_conjugated || incl || 0.00554352304233
multint || B_split1 || 0.00554347795784
Segm00 || B_split2 || 0.00554347795784
div || leb || 0.0055402459776
div || nat_compare || 0.0055325865894
$ (& (~ empty) ZeroStr) || $ (finite_enumerable $V_$true) || 0.00552993054702
*101 zero3 0[01] (((#hash#)12 NAT) 1) (0. F_Complex) a_Type RetSP Im30 1_NN FALSE0 (0. Z_2) NAT 0c || (nat2 (nat2 nat1)) || 0.00552827373442
(<= 1) || ((injective nat) nat) || 0.00552788077348
Union || Z2 || 0.0055250116865
+26 || Zplus || 0.00551863319253
Z#slash#Z* || B1 || 0.00551286644127
ppf || factorize || 0.00549890705271
-37 || Fmult || 0.00549890348571
$ (& v1_matrix_0 (& (((v2_matrix_0 REAL) NAT) NAT) (FinSequence (*0 REAL)))) || $ nat || 0.00549832646369
$ natural || $ eqType || 0.00549504204993
FALSE || compare2 || 0.0054917497096
*51 || Fmult || 0.00547085375469
is_proper_subformula_of || le || 0.00544969567868
Cl_Seq || Qplus || 0.00544790242405
$ ext-real || $ Q0 || 0.00544182645784
#slash#29 || times || 0.00541735824888
$ ((Element3 SCM+FSA-Memory) SCM+FSA-Data*-Loc0) || $ nat || 0.00540525606676
Fixed || Zplus || 0.00539426443029
Free1 || Zplus || 0.00539426443029
$ (& Relation-like Function-like) || $ Z || 0.00537973015347
$ ext-real-membered || $ Z || 0.00537620375711
max0 || denom || 0.00534524318533
* || list_n_aux || 0.00534085761368
carrier || B1 || 0.00533540445339
(Funcs0 omega) || B1 || 0.00533235042556
union0 || Z_of_nat || 0.00532614352213
Flow || C || 0.00530735524049
$ (& (strict92 $V_$true) ((StableSubgroup $V_$true) $V_(& (~ empty) (& Group-like (& associative (& (distributive3 $V_$true) (HGrWOpStr $V_$true))))))) || $ $V_$true || 0.00529673263214
sqrreal || (nat2 nat1) || 0.00529093443605
MidOpGroupCat || nat2 || 0.00527654983673
$ (& (~ empty) DTConstrStr) || $ nat || 0.00527629619689
$ ((Element3 SCM+FSA-Memory) SCM+FSA-Data-Loc) || $ nat || 0.00526845641141
*71 || sieve || 0.00525692024249
(- 1) || B1 || 0.0052498277215
FuncUnit || nat_fact_all3 || 0.00524918295281
Flow || B1 || 0.00524527800576
-7 || minus || 0.00524484797679
(c= omega) || (lt (nat2 nat1)) || 0.00522859219184
len0 || Qplus || 0.0052239188726
(c= omega) || prime || 0.00522045939045
$ (& (~ trivial0) (& AffinSpace-like AffinStruct0)) || $ nat || 0.00521968590024
Cir || Qplus || 0.00520491641067
|` || Ztimes || 0.00519148517736
e_Transitions || C || 0.00518966573808
QC-symbols || sieve || 0.00518364447994
<1 || le || 0.00517998109935
CatSign0 || Zsucc || 0.00517776592608
is_parametrically_definable_in || bijn || 0.00516289078409
(((#slash##quote#0 omega) REAL) REAL) || times_f || 0.00516042551286
Tarski-Class || eq || 0.00515479541741
the_proper_Tree_of || C || 0.00512776876147
EX || Zsucc || 0.00512772969069
e_Transitions || B1 || 0.00511762845938
\X\ || nat2 || 0.0051099763269
#bslash##slash#0 || Ztimes || 0.00508952382972
the_proper_Tree_of || B1 || 0.00508096789823
k1_integr20 || sieve || 0.00505689223974
denominator || sieve || 0.00504923415984
(-tuples_on 1) || sqrt || 0.00504920648039
$ (& (~ empty) (& (~ degenerated) multLoopStr_0)) || $ Q0 || 0.00503373456203
\not\8 || nat2 || 0.00503281480583
Bound_Vars || Qplus || 0.00503269796839
(-tuples_on 1) || prim || 0.00502135854602
1q || gcd || 0.00501300913683
* || le || 0.00499439557637
Trivial-COM || nat1 || 0.00499388912679
index || Qplus || 0.00498484058482
AbGroupCat || nat2 || 0.00498460091158
proj2_4 || Zopp || 0.00497797344868
proj1_4 || Zopp || 0.00497797344868
proj3_4 || Zopp || 0.00497797344868
* || lt || 0.00495658470395
k4_moebius2 || Z2 || 0.00494985910186
k9_moebius2 || Z2 || 0.00494932546778
IncAddr || frac || 0.00494629940905
$ (& (~ empty) (& being_B (& being_C (& being_I (& being_BCI-4 BCIStr_0))))) || $ nat || 0.00494154244548
(+22 3) || minus || 0.00493868205496
UpperCone || Qplus || 0.00493109206123
<=>0 || gcd || 0.0049209735825
(Omega). || Qopp0 || 0.00491586788839
card0 || defactorize || 0.0048781785066
InstructionsF || Z_of_nat || 0.00487579442577
$ (& ordinal natural) || $ Z || 0.00485019107423
k2_fuznum_1 || Qplus || 0.00484548167993
1_Rmatrix || Qopp0 || 0.00484403356895
is_SetOfSimpleGraphs_of || transitive || 0.00483888954747
k4_poset_2 || C || 0.00482317707872
ppf || nat2 || 0.00481791405746
\&\2 || andb || 0.00480620824082
k4_poset_2 || B1 || 0.00480163122165
-concatenation || C2 || 0.00480057306447
-concatenation || B_split2 || 0.00478611358214
..0 || orb || 0.00478561501789
EMF || Qopp0 || 0.00477842796147
LowerCone || Qplus || 0.00473531247599
union0 || Zopp || 0.00472954589963
$ (FinSequence COMPLEX) || $ Z || 0.00472221181699
#bslash#+#bslash# || Ztimes || 0.00471817662262
Top || defactorize || 0.00471418380831
+61 || Qplus || 0.00468867910555
VERUM || Zopp || 0.00467904882299
(-2 3) || nat2 || 0.00465968043531
proj1_3 || Zopp || 0.00465820855157
$ (& Relation-like (& Function-like (& FinSequence-like complex-valued))) || $ (=> R0 R0) || 0.00465334525174
-CycleSet || prime || 0.00463321162499
(Rotate1 (carrier (TOP-REAL 2))) || frac || 0.00460861446899
$ (Element (InstructionsF Trivial-COM)) || $ nat || 0.00460384162497
$ (& infinite (Element (bool (Rank omega)))) || $ nat || 0.0046029071352
|=8 || bijn || 0.00460039212326
the_Tree_of || C1 || 0.00459816115097
$ real || $ Q0 || 0.00459741381119
* || transpose || 0.00459232849315
^2 || nat2 || 0.00458293440106
Center || prime || 0.00457220225952
card3 || C1 || 0.00456522555853
ComplexFuncUnit || Z2 || 0.00455008810827
$ (Element (carrier $V_(& (~ empty) ZeroStr))) || $ $V_$true || 0.00454879259399
RealFuncUnit || Z2 || 0.00454377941912
OPD-Meet || B1 || 0.00453720138444
OPD-Union || B1 || 0.00453720138444
CLD-Meet || B1 || 0.00453720138444
CLD-Union || B1 || 0.00453720138444
e_Places || C2 || 0.00453703537496
symplexes || sieve || 0.00453413220276
prop || nat2 || 0.00451961808683
(-tuples_on 1) || pred || 0.00451873545874
$ (FinSequence omega) || $ nat || 0.00449936841386
-37 || nat_compare || 0.00449175376633
+ || andb || 0.00449012411302
e_Places || B_split2 || 0.00447401645703
1_. || Qopp0 || 0.00444203252734
{}4 || Qopp0 || 0.0044228061692
OPD-Meet || C || 0.00441387605748
OPD-Union || C || 0.00441387605748
CLD-Meet || C || 0.00441387605748
CLD-Union || C || 0.00441387605748
Det0 || Qplus || 0.00439728860253
$ (& (~ empty) (& Group-like (& associative multMagma))) || $ Q0 || 0.00439324730285
Seed || B || 0.00439196828802
$ (~ empty0) || $ Q0 || 0.00439120739749
is_definable_in || permut || 0.00437471826596
goto0 || nat2 || 0.00435332468882
*71 || prime || 0.00434043522496
-22 || (nat2 nat1) || 0.00434007170019
firstdom || Zopp || 0.00431725633023
Ball2 || C2 || 0.00429655229234
the_Complex_Space || C || 0.00429655229234
\nand\ || Qplus || 0.00427260669489
`2 || nat2 || 0.00426533529071
-VSet || Ztimes || 0.00426440227905
-TVSet || Ztimes || 0.00426440227905
-SVSet || Ztimes || 0.00426440227905
$ boolean || $ Z || 0.00425245738476
pfexp || notb || 0.00424934690779
denominator0 || Z3 || 0.00424901995836
UMF || (times (nat2 (nat2 nat1))) || 0.00424507410645
\in\ || factorize || 0.00423160970628
ZeroLC || Qopp0 || 0.00421225865136
the_Complex_Space || B1 || 0.00419906143698
Ball2 || B_split2 || 0.00419906143698
topology || A\ || 0.00419852627362
Product5 || Qplus || 0.00419750722731
still_not-bound_in || Zplus || 0.00419720158085
{..}2 || A\ || 0.00417092909174
is_in_the_area_of || divides || 0.00416671010257
Pempty_e_net || Zpred || 0.00416030359801
Tempty_e_net || Zpred || 0.00416030359801
Tempty_f_net || Zpred || 0.00416030359801
~4 || Zopp || 0.00414970110892
+26 || times || 0.00413914855292
$ ((Element3 SCM-Memory) SCM-Data-Loc) || $ nat || 0.00413684871929
Bin1 || Qopp0 || 0.00412565446413
(-tuples_on 1) || Z2 || 0.00411529246938
[#hash#]0 || Qopp0 || 0.00409507231215
denominator0 || Z2 || 0.00409411139964
num-polytopes || nat2 || 0.00408821910894
+33 || plus || 0.0040798280572
width || sieve || 0.00407502087172
<*..*>4 || Zpred || 0.00407026639425
|23 || minus || 0.00403872527876
$ (& (~ empty) (& with_tolerance RelStr)) || $ Z || 0.0040313126778
absreal || (nat2 nat1) || 0.00402153566424
lcm1 || Ztimes || 0.00401909287383
(Product5 Newton_Coeff) || pred || 0.00401076590056
uncurry\ || nat2 || 0.00400920776854
last0 || Zpred || 0.00400668615545
(-8 (TOP-REAL 2)) || nat2 || 0.00400352147412
-29 || Zplus || 0.00399902369157
(#hash#)20 || plus || 0.00399157259091
|-6 || le || 0.00398479193922
Pempty_f_net || Zpred || 0.00398421653749
ApproxIndex || prime || 0.0039789276196
^b || Qplus || 0.00396848667728
|^11 || Qplus || 0.00396801445922
Var2 || pred || 0.00396402886086
id7 || Zpred || 0.00395892128876
FlatCoh || Zpred || 0.00395697970797
<=>0 || plus || 0.00395645738997
<*..*>33 || Qopp0 || 0.00395266146578
|=8 || permut || 0.0039482302543
Subtrees0 || Z_of_nat || 0.00394216317964
apply || Zopp || 0.00391967563522
pr11 || Zopp || 0.00391967563522
card3 || B_split1 || 0.00391049210145
[#hash#] || Zopp || 0.00390500262601
are_isomorphic8 || incl || 0.00390178623103
\not\2 || B || 0.0038995026613
0. || Qopp0 || 0.0038920420868
SmallestPartition || Zopp || 0.00389156196041
INT.Group0 || S_mod || 0.00389127875432
$ cardinal || $ Z || 0.00388798336144
+33 || times || 0.00386476338169
the_Edges_of || nat2 || 0.00386269570096
<*..*>4 || Zsucc || 0.0038603655857
|^25 || Qplus || 0.00385276904291
RelStr0 || times || 0.00384824874371
^42 || Zopp || 0.00384750232284
(r3_tarski omega) || (transitive Z) || 0.00384388270875
EmptyBag || Qopp0 || 0.0038433757515
|23 || plus || 0.00383571826278
*40 || list2 || 0.00383566205688
Subtrees || Z2 || 0.00383548827651
({..}4 omega) || factorize || 0.00383416636775
*\21 || times || 0.00383402965406
(<= 3) || sorted_gt || 0.00382973225295
\&\2 || minus || 0.00381650732395
mod^ || Qplus || 0.00381488176358
has_a_representation_of_type<= || divides || 0.00380575035536
*^ || Ztimes || 0.00380492729616
\not\2 || A || 0.0038004013045
Entropy || sieve || 0.00379545063846
(<*> COMPLEX) || (nat2 nat1) || 0.00379511882982
\not\2 || Zopp || 0.00379350342107
k1_integr20 || prime || 0.00378571865531
-3 || compare_invert || 0.00378569211088
Aut || C1 || 0.00378510517113
prop || Z3 || 0.00377884841031
*^ || andb || 0.00376326734632
\or\3 || mod || 0.00375063685835
denominator || prime || 0.00375050778807
+26 || minus || 0.00374533956764
hcf || Qplus || 0.0037365002952
+1 || times || 0.00373472601569
id7 || Zsucc || 0.0037325694804
Pempty_e_net || Zsucc || 0.0037253352515
Tempty_e_net || Zsucc || 0.0037253352515
Tempty_f_net || Zsucc || 0.0037253352515
$ (Element 0) || $ Q0 || 0.00370603188497
+90 || plus || 0.00370116075314
LAp || Qplus || 0.00368842247556
vol || sieve || 0.00368746746612
$ (& (~ empty) (& right_complementable (& Abelian (& add-associative (& right_zeroed (& discerning0 (& reflexive3 (& vector-distributive1 (& scalar-distributive1 (& scalar-associative1 (& scalar-unital1 (& ComplexNormSpace-like (& right-distributive (& right_unital (& vector-associative0 (& associative (& Banach_Algebra-like Normed_Complex_AlgebraStr))))))))))))))))) || $ Q0 || 0.00368667442019
0q || div || 0.00368303090251
pr22 || Zopp || 0.00367721107707
$ (& Relation-like (& Function-like (& real-valued FinSequence-like))) || $ Q0 || 0.00367558172268
Radical || Z2 || 0.00366826787728
<=>0 || Qplus || 0.00366576649405
-49 || div || 0.00366492108832
inf7 || Z2 || 0.0036641600939
topology || B1 || 0.003653820195
UAp || Qplus || 0.00365367912889
prop || Z2 || 0.00365297407846
$ (& Relation-like (& T-Sequence-like Function-like)) || $ nat || 0.00364654302972
*88 || B_split1 || 0.00364343468741
VERUM2 FALSUM ((<*..*>1 omega) NAT) || Z1 || 0.00362673633916
QC-symbols || prime || 0.0036088851404
ComplRelStr || nat2 || 0.00360527936876
field || Zopp || 0.0036037439975
InternalRel || nth_prime || 0.00359523041742
symplexes || prime || 0.0035911990467
0q || exp || 0.00358964922858
$ (& (~ empty) (& reflexive (& transitive (& antisymmetric RelStr)))) || $ Z || 0.00358783433576
Seed || A || 0.00358621833219
k15_trees_3 || Zopp || 0.00358602119831
last0 || Zsucc || 0.00358421858087
FlatCoh || Zsucc || 0.00356638061932
sum2 || Qplus || 0.00356231939561
Pempty_f_net || Zsucc || 0.00356222904294
Fr || Qplus || 0.0035620094237
<=>0 || times || 0.00355737029553
RED || Qplus || 0.00355189414799
$^ || Qplus || 0.00353802291072
BOOL || Zpred || 0.00353115475479
-59 || Qopp0 || 0.00353030057118
PGraph || Zpred || 0.00350293018778
1TopSp || Zpred || 0.00350293018778
\&\2 || mod || 0.00349463013597
\in\ || Zpred || 0.00346836588612
div^ || Qplus || 0.0034678190922
$ (& ext-real-membered (& left_end (& (~ right_end) interval))) || $ Q0 || 0.00346557491218
$ (& ext-real-membered (& (~ left_end) (& right_end interval))) || $ Q0 || 0.00346557491218
Vertices || C || 0.0034645809182
-8 || frac || 0.00345291398139
ConsecutiveSet || Qplus || 0.00345076987511
ConsecutiveSet2 || Qplus || 0.00345076987511
quotient1 || Qplus || 0.00344892607633
chi || plus || 0.00344407604982
(c= INT) || sorted_gt || 0.00343669632225
$ (& ext-real-membered (& (~ empty0) (& (~ left_end) (& (~ right_end) interval)))) || $ Q0 || 0.00343305322418
is_proper_subformula_of0 || divides || 0.00342916832615
QuantNbr || Qplus || 0.00341496805929
bound_QC-variables || A\ || 0.00341420989415
+17 || Zopp || 0.00340699478445
Path_Rel || C2 || 0.0034059695055
-polytopes || Qplus || 0.00340260322283
sqr || (times (nat2 (nat2 nat1))) || 0.00340081673076
{..}2 || Zpred || 0.00339952310318
R_Quaternion || A || 0.00339919079681
(SUCC (card3 2)) || frac || 0.00339535374226
len3 || Qplus || 0.00339337573297
ord || Qplus || 0.00339146674491
$ denumerable || $ nat || 0.00339111790981
Vertices || B1 || 0.00338572515179
(<*> REAL) || Z1 || 0.00337048403887
$ (& TopSpace-like TopStruct) || $ (=> nat bool) || 0.0033687701938
First*NotUsed || Z_of_nat || 0.00336383897807
$ (& Relation-like (& Function-like complex-valued)) || $ Q0 || 0.0033609993587
Absval || Qplus || 0.00335197976794
|-3 || bijn || 0.0033453994642
(<= 3) || decidable || 0.00334395689558
-^ || Qplus || 0.00334296404189
the_Tree_of || B_split1 || 0.00334227312637
Path_Rel || B_split2 || 0.00332916952939
cf || Zopp || 0.00332731246289
([:..:] omega) || defactorize || 0.00331697628772
*38 || append || 0.00330750539761
TotalGrammar || nat2 || 0.00330044100709
(<= 3) || (lt (nat2 nat1)) || 0.00329524968839
$ (& (~ empty) TopStruct) || $ Q0 || 0.00329187652872
$ real || $ (=> R0 R0) || 0.00329166987491
(<= 3) || prime || 0.00329074509394
dist || le || 0.00328818225053
sup5 || Z2 || 0.00328307707057
ProperPrefixes || Zopp || 0.0032796260315
1q || div || 0.00327064082938
(dist4 2) || nat_compare || 0.00326119542682
free_magma || Qplus || 0.00325652571457
$ (Element (carrier Trivial-addLoopStr)) || $ nat || 0.00325192019424
{..}2 || Zsucc || 0.00325147272426
LettersOf || C2 || 0.00324984992862
UAAutComp || C2 || 0.00324555093707
dist || lt || 0.00324337235008
$ (Element REAL+) || $ nat || 0.00323876171952
^\ || Qplus || 0.00323448869151
INT.Group0 || nat2 || 0.00323151798244
*2 || Ztimes || 0.00323135706674
k10_moebius2 || nat2 || 0.00323066393027
\in\ || Zsucc || 0.00322645686008
BOOL || Zsucc || 0.00321394681793
EG || Zpred || 0.00320343548607
c=8 || le || 0.00319841760801
UAAutComp || B_split2 || 0.00319714659646
PGraph || Zsucc || 0.00318395752124
1TopSp || Zsucc || 0.00318395752124
is_elementary_subsystem_of || lt || 0.00317914112929
|_2 || Ztimes || 0.00317665219902
$ (& Int-like (Element (carrier SCM))) || $ nat || 0.00317578275794
rngs || Zpred || 0.00317462873074
lcm0 || Qplus || 0.00316491945513
(. signum) || Zopp || 0.00316438665303
|^|^ || Qplus || 0.00316307156303
card0 || pred || 0.00315496469074
the_Source_of0 || nat2 || 0.00315184020933
{}3 || nat1 || 0.00314892594765
SubXFinS || minus || 0.00314690670921
k1_matrix_0 || sieve || 0.00312241227292
Terminals || defactorize || 0.00312219708517
#quote##quote#0 || Zopp || 0.00311926676919
card0 || sieve || 0.00311678198392
Entropy || prime || 0.00311489033862
<==>0 || le || 0.00311131965533
Rotate || Qplus || 0.00310811025384
**7 || Qplus || 0.00310312017919
vol || prime || 0.00309820776097
is_immediate_constituent_of0 || lt || 0.00309769410364
[:..:]10 || Ztimes || 0.00309375093857
exp7 || Qplus || 0.00309096973541
*0 || C1 || 0.00309083019823
Top || pred || 0.00308894423099
HCar || B || 0.00308708038277
UAAut || C1 || 0.00307210646127
(Product5 Newton_Coeff) || Z3 || 0.00306869488775
disjoin || Zopp || 0.00306711441561
succ1 || C1 || 0.00305968733953
++3 || Qplus || 0.00305458457437
$ (& (~ constant) (& (~ empty0) (& (circular (carrier (TOP-REAL 2))) (& special (& unfolded (& s.c.c. (& standard0 (FinSequence (carrier (TOP-REAL 2)))))))))) || $ Z || 0.00304607565746
(halt SCM) (halt SCMPDS) ((([..]0 NAT) {}) {}) (halt SCM+FSA) || nat1 || 0.00304328177924
0_. || Qopp0 || 0.00304158468302
$ (& infinite (Element (bool HP-WFF))) || $ (=> nat nat) || 0.00303775526124
+26 || Ztimes || 0.00303269539403
arity0 || Z_of_nat || 0.00303157291977
+33 || Zplus || 0.00302962223726
denominator || denom || 0.00302855392953
numerator || num || 0.00302855392953
mlt0 || plus || 0.00302186089853
%O || B || 0.00302020334283
$ (FinSequence REAL) || $ Q0 || 0.00301567752149
the_value_of || A\ || 0.0030155587843
sqr || nat2 || 0.0030058867636
C_Normed_Algebra_of_BoundedLinearOperators || nat_fact_to_fraction || 0.00299964032706
C_Algebra_of_BoundedLinearOperators || nat_fact_to_fraction || 0.00299964032706
Ring_of_BoundedLinearOperators0 || nat_fact_to_fraction || 0.00299964032706
LettersOf || B_split2 || 0.00299838996721
prob || Qplus || 0.00299490733039
product || Z_of_nat || 0.00299313360203
*` || Qplus || 0.00298677059352
#slash# || same_atom || 0.00297999941176
$ ((Element2 REAL) (REAL0 3)) || $ Q0 || 0.00297614312571
abs6 || nat2 || 0.00297505705329
bound_QC-variables || B1 || 0.00297217900505
TWOELEMENTSETS || Zopp || 0.00296857121512
doms || Zopp || 0.00296857121512
SubXFinS || plus || 0.00296410238579
Cl_Seq || Zplus || 0.00296110930576
HCar || A || 0.00296087481974
|-3 || permut || 0.00295713162536
(Product5 Newton_Coeff) || Z2 || 0.00295484614094
$ natural || $ (=> R0 R0) || 0.002951528091
(*32 3) || Qplus || 0.00294915697265
AutGroup || C || 0.002947859701
exp1 || Qplus || 0.00294501876274
\or\3 || div || 0.0029388237866
|(..)| || nat_compare || 0.00293158128809
uncurry\ || Zopp || 0.00292724582541
Flow || C1 || 0.00291770144549
$ Relation-like || $ Q0 || 0.00291705180743
-63 || compare_invert || 0.0029165643613
k5_moebius2 || sieve || 0.00290266076675
rngs || Zsucc || 0.00290084325477
*^ || Qplus || 0.00289951817932
$ (~ empty0) || $ Z || 0.00289341398508
..3 || Zopp || 0.0028899804317
AutGroup || B1 || 0.0028898847257
$ (& natural prime) || $ bool || 0.00288526078429
1_ || list1 || 0.00287927832174
*0 || Z2 || 0.00287779913406
curry\ || Zopp || 0.00287265846826
~3 || Zopp || 0.00287265846826
Cir || Zplus || 0.00287120423878
QC-symbols || factorize || 0.00286545638111
field || defactorize || 0.00286516833061
EG || Zsucc || 0.00286198571401
Class0 || times || 0.00285100632926
compose || Qplus || 0.00284863388927
1_ || Qopp0 || 0.00284480569357
1. || Qopp0 || 0.00283765106577
AutComp || C2 || 0.00283102155775
(c= INT) || decidable || 0.00282067885868
f_places || B || 0.00282043704431
$ (& (~ empty) 1-sorted) || $ nat || 0.00281947827459
curry || Zopp || 0.00281060198074
Bound_Vars || Zplus || 0.00281039818997
$ (& polyhedron_1 (& polyhedron_2 (& polyhedron_3 PolyhedronStr))) || $ Q0 || 0.00280231755688
carrier || C || 0.00279897094795
+61 || Zplus || 0.00279809402666
id14 || Z2 || 0.00279755007614
uncurry || Zopp || 0.00279663857022
roots0 || Z3 || 0.0027942076944
R_EAL1 || Qplus || 0.00278723709981
Funcs2 || Zopp || 0.00278321030572
AutComp || B_split2 || 0.00277533801905
UpperCone || Zplus || 0.00276776617179
Mersenne || Zopp || 0.00276219740604
#slash#29 || exp || 0.0027591405445
(([..]0 1) {}) || Z_of_nat || 0.00275637334338
cpx2euc || defactorize || 0.00274866707445
<:..:>3 || Ztimes || 0.00274809400183
k3_rvsum_3 || nat_fact_to_fraction || 0.00273771453858
f_transitions || B || 0.00273097531813
k2_fuznum_1 || Zplus || 0.00272878922884
+` || Qplus || 0.00272309565462
SubFuncs || Zopp || 0.00272296168474
Product5 || Zplus || 0.00271852693066
UAAutGroup || C || 0.00271740970264
EMF || Zopp || 0.00271472464991
roots0 || Z2 || 0.00271365184299
center || prim || 0.00271099119717
* || andb || 0.00270370010607
width || prime || 0.00269235263944
LowerCone || Zplus || 0.00269143030632
SubFuncs || nat2 || 0.00268769493143
Rank || Zopp || 0.00268151110859
UAAutGroup || B1 || 0.0026768609384
Del || Ztimes || 0.00266584512498
euc2cpx || factorize || 0.0026561779816
(#hash#)0 || Qplus || 0.00264519486731
.Lifespan() || Z_of_nat || 0.00264264429396
(|2 (TOP-REAL 2)) || C1 || 0.00264074616067
InnAutGroup || A || 0.00263889316374
#bslash#+#bslash# || Qplus || 0.00263877666883
+^1 || Qplus || 0.00262918267344
$ (& (~ empty) RelStr) || $ Q0 || 0.00262338491907
\&\2 || Qplus || 0.00261756210423
*` || Ztimes || 0.00261687563409
f_places || A || 0.00261296397284
Fin || Zopp || 0.00261146026255
f_transitions || A || 0.00260374490445
$ (& (~ empty) (& TopSpace-like TopStruct)) || $ nat || 0.00260224476602
-7 || Zplus || 0.00259493228994
Seg || nat_fact_to_fraction || 0.00259311246675
(are_equipotent {}) || not_nf || 0.00258951251579
$ (& Relation-like (& Function-like (& T-Sequence-like infinite))) || $ Q0 || 0.00258666099885
-52 || (nat2 nat1) || 0.00258652823592
*51 || Qplus || 0.00258651054753
*0 || B_split1 || 0.00258363666702
(Load SCMPDS) || numerator || 0.00257879564207
REAL-US || factorize || 0.00257700510653
EmptyBag || Zopp || 0.00256043666584
k3_moebius2 || nat2 || 0.00255945024479
-7 || nat_compare || 0.00255931434448
.76 || Zopp || 0.0025555009285
k1_matrix_0 || prime || 0.0025531807911
(||....||2 Complex_l1_Space) || sieve || 0.00254594600321
(||....||2 l1_Space) || sieve || 0.00254594600321
(||....||2 linfty_Space) || sieve || 0.00254594600321
(||....||2 Complex_linfty_Space) || sieve || 0.00254594600321
<%..%> || Zpred || 0.00254387477842
k8_moebius2 || nat2 || 0.00253109472551
$ integer || $ Q0 || 0.00253001733092
(#hash#)20 || exp || 0.00252893987976
-- || Zopp || 0.002527461759
is_proper_subformula_of || divides || 0.00252395549718
Aut || B_split1 || 0.00252236208522
\X\ || Zpred || 0.00252036124452
-37 || minus || 0.00251968135876
the_Target_of0 || nat2 || 0.00251486883051
(Zero_1 +97) || nat_compare || 0.00251231375785
(<= 0.1) || sorted_gt || 0.00249708376807
are_os_isomorphic || incl || 0.00249599670284
Catalan || Zopp || 0.00249390790812
PFactors || nat2 || 0.00249363023605
.order() || sieve || 0.00248976691985
%O || A || 0.00248715194949
$ (Element (carrier $V_(& (~ empty) (& Group-like (& associative multMagma))))) || $ (list $V_$true) || 0.00248559687786
Top0 || Zpred || 0.00248254940514
InclPoset || Zpred || 0.00248254940514
#bslash#0 || Zplus || 0.00248110384261
$ (& Relation-like (& Function-like Function-yielding)) || $ nat || 0.00247996705105
Goto0 || nat_fact_all3 || 0.00247164786091
succ1 || B_split1 || 0.00246259190927
([:..:] omega) || pred || 0.00245333478518
Sgm || Zopp || 0.00245206817055
(#quote#**#quote# REAL) || plus || 0.00245088964435
the_Complex_Space || nat2 || 0.00244968128984
Lang1 || Z_of_nat || 0.00244326375202
-roots_of_1 || factorize || 0.00244093131437
meet || Zopp || 0.00243876930869
||....||2 || Zplus || 0.00243643262581
$ (& (~ empty0) infinite) || $ Q0 || 0.00243541268911
. || orb || 0.0024347597185
frac0 || Qplus || 0.00243373836135
TopStruct0 || times || 0.0024333544107
Inf_seq || B || 0.00242926142666
id9 || Z_of_nat || 0.00242197534471
$ (& (~ empty) (& TopSpace-like TopStruct)) || $ Q0 || 0.00241814173374
topology || sieve || 0.0024137837294
div || Qplus || 0.00240142123205
-\1 || Qplus || 0.00239837102168
carrier || A\ || 0.00239779577877
<%..%> || Zsucc || 0.0023912408946
$ (& (~ empty) (& right_complementable (& Abelian (& add-associative (& right_zeroed (& vector-distributive (& scalar-distributive (& scalar-associative (& scalar-unital RLSStruct))))))))) || $ Q0 || 0.00238899787178
gcd || Qplus || 0.0023886865277
*88 || Z2 || 0.00238351405043
free_magma || Ztimes || 0.00238180871551
euc2cpx || Z3 || 0.00238125261409
^b || Zplus || 0.00236787327566
Inf_seq || A || 0.00236696264222
Flow || B_split1 || 0.00235722891389
$ (& LTL-formula-like (FinSequence omega)) || $ Q0 || 0.00235668358883
the_family_of || B || 0.00235561006329
proj4_4 || Qopp0 || 0.00235262144797
$ (& (~ empty) ZeroStr) || $ Q0 || 0.0023511035648
card0 || prime || 0.00234226934039
-Root || Qplus || 0.00234206155664
the_value_of || B1 || 0.00233644105982
ComplexFuncUnit || nat_fact_all3 || 0.00233487891069
(+22 3) || gcd || 0.00232641609224
$ (& (~ empty) addLoopStr) || $ Q0 || 0.00231570303147
topology || prime || 0.00231402840253
*0 || Zopp || 0.00231398493812
RealFuncUnit || nat_fact_all3 || 0.00231182511325
goto0 || nat_fact_to_fraction || 0.00230930403867
Top0 || Zsucc || 0.00230840762082
InclPoset || Zsucc || 0.00230840762082
euc2cpx || Z2 || 0.0023064989988
\X\ || Zsucc || 0.00229813424704
CRing || nat_fact_to_fraction || 0.00229652938204
valH || Z2 || 0.00229597660139
SD_Add_Carry || Zopp || 0.00229138557357
k4_rvsum_3 || Z2 || 0.00228387035898
--0 || Zopp || 0.0022817800633
RelIncl || Zpred || 0.00227889728143
(#hash#)0 || Ztimes || 0.00226642938901
x.1 || nat2 || 0.00226620963892
$ (& reflexive (& transitive (& antisymmetric (& lower-bounded (& with_suprema (& with_infima (& modular0 RelStr))))))) || $ nat || 0.00226532516241
(||....||2 Complex_l1_Space) || prime || 0.00226313458293
(||....||2 l1_Space) || prime || 0.00226313458293
(||....||2 linfty_Space) || prime || 0.00226313458293
(||....||2 Complex_linfty_Space) || prime || 0.00226313458293
max0 || Z_of_nat || 0.00226292905756
sqrt0 || Z_of_nat || 0.00225801816461
the_family_of || A || 0.00224670142006
LAp || Zplus || 0.00224039882345
proj4_4 || A\ || 0.00223591508017
-60 || Qplus || 0.00222913010882
^21 || (times (nat2 (nat2 nat1))) || 0.00222900918876
-stRWNotIn || defactorize_aux || 0.00222594294248
UAp || Zplus || 0.00222464358564
$ (& natural (~ v8_ordinal1)) || $ Q0 || 0.002222005041
idseq || nat_fact_all3 || 0.00221865847395
* || Ztimes || 0.00221783238313
#slash#^5 || Qplus || 0.00221645459903
0. || Zopp || 0.00221456798288
are_equipotent || symmetric0 || 0.00221444392241
#slash##quote#2 || plus || 0.0022113151528
(.2 REAL) || defactorize_aux || 0.00221105281634
bool || Zopp || 0.00220541990785
meet || Zpred || 0.00219545686975
#bslash#4 || Qplus || 0.00219507672843
.14 || times || 0.00219487798862
mod^ || Zplus || 0.00219145082604
Fr || Zplus || 0.00218678590491
the_VLabel_of || nat2 || 0.0021855723763
the_ELabel_of || nat2 || 0.00218482022088
<X> || exp || 0.00218404915332
return || Z2 || 0.00218031458644
Fin || Zpred || 0.00217735264626
free_magma || Zplus || 0.00217529061438
*\14 || Zopp || 0.00216011280588
arctan0 || Zopp || 0.00215963353334
QC-symbols || B || 0.00215952917996
hcf || Zplus || 0.00214188107791
(dist4 2) || minus || 0.00214030870538
Union || Zpred || 0.00213994727133
RelIncl || Zsucc || 0.00213821625358
|(..)| || minus || 0.00212875919377
$^ || Zplus || 0.00212631959283
$ (Element (bool HP-WFF)) || $ (=> nat nat) || 0.00212445917326
$ (& (~ empty) (& right_complementable (& Abelian (& add-associative (& right_zeroed (& discerning0 (& reflexive3 (& vector-distributive1 (& scalar-distributive1 (& scalar-associative1 (& scalar-unital1 (& ComplexNormSpace-like CNORMSTR)))))))))))) || $ Q0 || 0.00212306579689
UAAut || B_split1 || 0.00212261471093
c= || symmetric0 || 0.00211949436295
=>8 || plus || 0.00210288244506
id0 || numerator || 0.00210275143458
(#hash#)0 || Zplus || 0.00209519966426
QC-symbols || A || 0.00209424101408
-63 || nat2 || 0.00209286828243
card || Z_of_nat || 0.00208619763435
|^11 || Qtimes0 || 0.00208421623128
-root || Qplus || 0.00207762027852
|1 || Ztimes || 0.00207626061672
|^ || Qplus || 0.00207047874452
dim3 || defactorize || 0.00206653180978
(<= 0.1) || decidable || 0.00206234730293
.order() || Z2 || 0.002060388643
meet || Zsucc || 0.00205856026151
{}4 || Zopp || 0.00205304985678
Fin || Zsucc || 0.00205243679593
(c= INT) || (lt (nat2 nat1)) || 0.00204941476945
(c= INT) || prime || 0.00204564500949
(choose 2) || nat_fact_all3 || 0.00204448661034
#slash#29 || plus || 0.00204364224926
-59 || Zopp || 0.00203618220159
proj4_4 || B1 || 0.00203367746502
are_equipotent || reflexive || 0.00203233190982
|^25 || Qtimes0 || 0.00203174316196
$ (Element (bool REAL)) || $ Q0 || 0.00203147228362
(+22 3) || times || 0.00202257795428
SCMPDS || (Z_of_nat nat1) || 0.002017624121
$ (& Relation-like (& (-valued REAL) (& T-Sequence-like (& Function-like infinite)))) || $ Z || 0.00201761403784
carrier\ || A\ || 0.00201683038633
-concatenation || Z2 || 0.00201528526442
|^19 || append || 0.00201503360752
$ (& Function-like (& ((quasi_total omega) REAL) (Element (bool (([:..:] omega) REAL))))) || $ nat_fact || 0.00201323327615
(|2 (TOP-REAL 2)) || B_split1 || 0.00201202295017
(. exp_R) || Zopp || 0.00201185677108
Union || Zsucc || 0.00201108387041
Fib || Zopp || 0.00200749925178
FixedSubtrees || nat2 || 0.00200675990514
k4_rvsum_3 || nat_fact_all3 || 0.00200234771173
are_isomorphic || Zlt || 0.00199460621336
^\ || Zplus || 0.00199411795928
-^ || Zplus || 0.00199375765199
TopUnitSpace || nat_fact_to_fraction || 0.00199103057487
mlt3 || Fmult || 0.00198584534645
ZeroLC || Zopp || 0.0019848462806
*\21 || plus || 0.0019845014063
arcsin1 || Zopp || 0.00197944315527
div^ || Qtimes0 || 0.00197507370722
Omega || Z2 || 0.00197349407653
^0 || Zplus || 0.00196631472456
(. sinh0) || Zopp || 0.00196472583708
$ (& infinite natural-membered) || $ nat || 0.00196123059666
frac0 || Ztimes || 0.00196071934361
cosh || Zopp || 0.00195769346933
RED || Qtimes0 || 0.00195679086664
c= || reflexive || 0.00195125988012
MultGroup || Z_of_nat || 0.00194657865578
#slash#4 || times || 0.00194119071403
|-6 || lt || 0.00194044312548
$ (& (~ empty) TopStruct) || $ Z || 0.00193930898458
distance_by_norm_of || C2 || 0.00193226446859
dist || list_n_aux || 0.00193110376746
#quote# || Zopp || 0.00192495167939
^0 || Qplus || 0.00192013406372
c=8 || divides || 0.00191757252547
*` || gcd || 0.00191583824986
k5_moebius2 || prime || 0.00191144603073
carrier || sieve || 0.00190878704788
$ rational || $ Q0 || 0.00190211775526
quotient1 || Qtimes0 || 0.00189997226269
`20 || nat2 || 0.00189962535203
*58 || defactorize_aux || 0.00189463481138
Z#slash#Z* || Z2 || 0.00189380158243
.order() || prime || 0.00188839562681
|....| || sieve || 0.00188831081814
$ (& (~ empty) (& right_complementable (& Abelian (& add-associative (& right_zeroed (& vector-distributive (& scalar-distributive (& scalar-associative (& scalar-unital (& discerning0 (& reflexive3 (& RealNormSpace-like NORMSTR)))))))))))) || $ Q0 || 0.00188565088346
Terminals || pred || 0.0018828220679
((* ((#slash# 3) 2)) P_t) || (nat2 nat1) || 0.00188235191042
mlt0 || mod || 0.00187982454363
(. arctan) || Zopp || 0.00187668996261
arity || Z2 || 0.00187418360396
k2_rvsum_3 || A\ || 0.00187340270914
Topology_of || B || 0.00186873937012
*+^+<0> || nat2 || 0.00186669547274
Ball2 || Z2 || 0.00186577776399
+^1 || Zplus || 0.00186297463857
|....| || prime || 0.00186240932578
-37 || times || 0.00184268651648
vol || C || 0.00183989651589
*48 || defactorize || 0.00183868410019
union || times || 0.00183458080125
vol || B1 || 0.00183432995953
-65 || Fmult || 0.00183389449479
+65 || Fmult || 0.00183389449479
*1 || Zopp || 0.00182560456569
bool || Zpred || 0.00182441323125
#slash##quote#2 || exp || 0.00182053448083
distance_by_norm_of || B_split2 || 0.00181822035609
carrier\ || B1 || 0.00181656254355
are_equipotent || transitive || 0.00181451978766
tan || Zopp || 0.00181388289244
$ (& Relation-like (& Function-like segmental0)) || $ nat || 0.00180424587515
upper_bound || defactorize || 0.00180193612574
|^|^ || Qtimes0 || 0.00180126033991
Topology_of || A || 0.00180052876061
ModelSP || nat2 || 0.00179873457662
(UBD 2) || smallest_factor || 0.00179863696511
(<*> COMPLEX) || nat1 || 0.00179777365295
|(..)|0 || nat_compare || 0.00177641142507
chromatic#hash#0 || Z_of_nat || 0.00176845442149
CRing || nat2 || 0.0017671152419
Eq_classMetricSpace || C || 0.0017669672884
#slash# || Qplus || 0.00176621106791
<=>0 || Zplus || 0.00176531596929
free_magma || Qtimes0 || 0.00176313384763
+ || Zplus || 0.00175975259456
lcm1 || orb0 || 0.00175835561224
+33 || mod || 0.00175686322923
sum2 || Zplus || 0.00175581953154
QuantNbr || Zplus || 0.00175130541846
k2_rvsum_3 || B1 || 0.00175097224903
Eq_classMetricSpace || B1 || 0.00174965552308
c= || transitive || 0.0017486652617
$ (& Relation-like Function-like) || $ (=> nat nat) || 0.00174840123155
#slash##quote#2 || minus || 0.00174571771619
-37 || mod || 0.00174409881444
<0 || le || 0.001740889438
#bslash#4 || Ztimes || 0.00173922657574
bool || Zsucc || 0.00173669900635
-SuccRelStr || nat_fact_to_fraction || 0.00171632385858
lcm0 || Qtimes0 || 0.00171617462835
+*1 || Qplus || 0.00170948011022
are_isomorphic || divides || 0.0017062861406
op0 k5_ordinal1 {} || Q10 || 0.00170439253503
TotalGrammar || nat_fact_to_fraction || 0.00169830214455
len3 || Zplus || 0.00169533316002
exp7 || Qtimes0 || 0.00169013035676
c=8 || lt || 0.00168969547562
TWOELEMENTSETS || finv || 0.00168801385295
size0 || Z2 || 0.00168607305829
divides || nat_compare || 0.00168557411032
carrier\ || Zpred || 0.0016825778056
$ (& Relation-like Function-like) || $ Q0 || 0.00168176629128
({..}4 omega) || nat2 || 0.00168086213318
.#slash#.1 || exp || 0.00168041867836
#bslash##slash#0 || Qplus || 0.00167797212695
exp1 || Qtimes0 || 0.00167692314801
Omega || fact || 0.00167671688737
(BDD 2) || smallest_factor || 0.00167369021473
$ FinSeq-Location || $ nat || 0.00167320472886
x.1 || Z3 || 0.0016713719696
idseq || nat_fact_to_fraction || 0.00167065918955
proj1 || sieve || 0.00166846808544
TAUT || nth_prime || 0.00166758931687
FixedSubtrees || Z3 || 0.00166461578101
multF || C2 || 0.00166341600596
*101 zero3 0[01] (((#hash#)12 NAT) 1) (0. F_Complex) a_Type RetSP Im30 1_NN FALSE0 (0. Z_2) NAT 0c || Q10 || 0.00166332128229
TargetSelector 4 || (nat2 nat1) || 0.00166081918593
ConsecutiveSet || Zplus || 0.00165773075812
ConsecutiveSet2 || Zplus || 0.00165773075812
SymRelStr || numerator || 0.00165632468425
$ (& Relation-like (& Function-like (& T-Sequence-like infinite))) || $ Z || 0.00165528259983
**7 || Qtimes0 || 0.00165419202534
clique#hash#0 || Z_of_nat || 0.00165236643868
*^ || Qtimes0 || 0.00165098109775
cpx2euc || pred || 0.00164707332841
topology || C2 || 0.00164453957945
$ (& (~ empty) RelStr) || $ Z || 0.00164302677018
*` || Qtimes0 || 0.00163307438233
carrier || Z2 || 0.00163006434271
* || Zplus || 0.00162880153894
(0. SCMPDS) (0. SCM+FSA) (0. SCM) omega || QO || 0.0016245004192
(are_equipotent omega) || prime || 0.00162372561045
x.1 || Z2 || 0.00161965977125
+` || Zplus || 0.00161965682005
Operations || Z2 || 0.00161339174983
++3 || Zplus || 0.00160990389673
topology || B_split2 || 0.00160704215112
TAUT || fact || 0.0016057413194
carrier\ || Zsucc || 0.00160447709814
FixedSubtrees || Z2 || 0.00159454263536
Im3 || Zopp || 0.00159189359785
proj4_4 || Zpred || 0.00159138048076
$ (& Relation-like (& Function-like (& real-valued FinSequence-like))) || $ (=> nat bool) || 0.00158887985726
Ring_of_BoundedLinearOperators || nat_fact_to_fraction || 0.0015841534625
diameter || sieve || 0.00158291939745
(UBD 2) || sqrt || 0.00158226635043
$ (& strict5 (Subgroup $V_(& (~ empty) (& Group-like (& associative multMagma))))) || $ (list $V_$true) || 0.00157929665837
VLabelSelector 7 || (nat2 nat1) || 0.00157903270052
Re2 || Zopp || 0.00157832882614
*51 || min || 0.00157760222332
(UBD 2) || prim || 0.00157483042672
MetricSpaceNorm || nat_fact_to_fraction || 0.00157471540996
-65 || nat_compare || 0.00157241427391
^20 || Zopp || 0.00156979972667
carrier || prime || 0.00156720920569
(<= 0.1) || (lt (nat2 nat1)) || 0.00156477412186
(<= 0.1) || prime || 0.00156199700555
sqr || Zopp || 0.00155907190985
0_. || Zopp || 0.00155570886166
min0 || Z_of_nat || 0.00155312129397
(*32 3) || Qtimes0 || 0.00154791110217
- || Qplus || 0.00154686236324
$ (& (~ empty) (& TopSpace-like TopStruct)) || $ Z || 0.00154440200161
\&\2 || Zplus || 0.00154265355972
multF || B_split2 || 0.00154164414847
|^6 || append || 0.00154040377801
(Omega). || C || 0.00154009328766
ELabelSelector 6 || (nat2 nat1) || 0.00153851797941
are_isomorphic3 || le || 0.00153562367328
#quote##quote# || Zopp || 0.00153329963059
(+ 6) || nat_fact_to_fraction || 0.00153202040683
#slash# || Ztimes || 0.00152745875244
$ (& (~ empty) (& right_complementable (& Abelian (& add-associative (& right_zeroed (& vector-distributive (& scalar-distributive (& scalar-associative (& scalar-unital RLSStruct))))))))) || $ Z || 0.0015261932494
*+^ || nat2 || 0.00152509728811
((* ((#slash# 3) 2)) P_t) || nat1 || 0.00152370674557
MetricSpaceNorm || C || 0.00152314918693
proj4_4 || Zsucc || 0.00151960967121
^2 || Z3 || 0.00151890456206
$ (& (~ empty) (& meet-associative (& meet-absorbing (& join-absorbing (& distributive0 (& v3_lattad_1 (& v4_lattad_1 LattStr))))))) || $ nat || 0.00151826021483
*+^ || nat_fact_to_fraction || 0.00151763882636
G_Quaternion || nat1 || 0.0015152420988
choose3 || nat_fact_to_fraction || 0.00151438688311
k4_rvsum_3 || sieve || 0.00150725536189
+ || Qplus || 0.00150527272622
(. sin0) || Zopp || 0.00150336214609
Rotate || Zplus || 0.0014982331089
SCM-Instr0 || fact || 0.00149798536487
compose || Qtimes0 || 0.00149455534064
Funcs0 || plus || 0.00149101650934
(.2 REAL) || Ztimes || 0.00148865615139
proj1 || Zpred || 0.00148769536182
are_isomorphic11 || divides || 0.00148504765461
(BDD 2) || sqrt || 0.00148458913262
the_arity_of (({..}3 NAT) 1) || (nat2 nat1) || 0.00148171831391
(BDD 2) || prim || 0.00147803690537
(Omega). || B1 || 0.00147624262711
^2 || Z2 || 0.00147602326718
CAlgebra || nat2 || 0.00147131879604
len0 || Zplus || 0.00147064268747
k3_rvsum_3 || nat2 || 0.00146991088136
hcf || orb0 || 0.00146108417167
(Rev (carrier (TOP-REAL 2))) || nat2 || 0.00145705147518
card || defactorize || 0.00145662258408
$ (Element (carrier I[01])) || $ nat || 0.00145644413709
+*1 || Zplus || 0.00145643603299
StoneS || Z2 || 0.00145408191781
CAlgebra || nat_fact_to_fraction || 0.00144548277002
FuncUnit || Z2 || 0.00144369044979
(UBD 2) || pred || 0.00143860805486
R_Algebra_of_BoundedLinearOperators || nat_fact_to_fraction || 0.00143683252653
$ integer || $ Z || 0.00143520281768
MetricSpaceNorm || B1 || 0.00143321677893
RAlgebra || nat2 || 0.00143263222672
abs6 || Z2 || 0.00143197374311
proj1 || Zsucc || 0.00142487132554
*+^+<0> || nat_fact_to_fraction || 0.00142410443868
gcd || Zplus || 0.00142329369469
R_EAL1 || Zplus || 0.00141661236715
R_Normed_Algebra_of_BoundedLinearOperators || nat_fact_to_fraction || 0.00141532993695
sin || Zopp || 0.00141253433671
(c< omega) || (transitive Z) || 0.0014122334031
FuncUnit0 || Z2 || 0.00141147383794
.126 || nat_fact_to_fraction || 0.00140717321674
Arg0 || Z2 || 0.00140599716517
e_Places || Z2 || 0.00140473840385
RRing || nat2 || 0.00140254570971
cf || sieve || 0.00140218090177
the_Weight_of || nat2 || 0.00140186534309
-37 || Ztimes || 0.00139707481839
ex_inf_of || le || 0.00139532274301
(#hash#)0 || Qtimes0 || 0.00139130119942
- || Zplus || 0.00138540175144
SubXFinS || div || 0.00138400850515
ex_sup_of || le || 0.00138246462886
succ0 || numerator || 0.00137843043902
E-bound || C1 || 0.00137622084466
W-bound || C1 || 0.00137615201171
TOP-REAL || nat_fact_to_fraction || 0.0013745574054
**5 || Ztimes || 0.00137397807614
$ (& Relation-like (& (-defined (*0 omega)) (& Function-like (& natural-valued homogeneous0)))) || $ nat || 0.00137153635876
Product1 || C || 0.00136938016318
are_homeomorphic0 || le || 0.00136340445241
*51 || Qtimes0 || 0.00136289217219
(BDD 2) || pred || 0.00135735305701
RAlgebra || nat_fact_to_fraction || 0.00135633730474
are_homeomorphic0 || lt || 0.0013559509961
$ (& Relation-like (& (-defined omega) (& Function-like (& infinite (& [Graph-like] [Weighted]))))) || $ nat || 0.0013534535835
1*0 || nat_fact_to_fraction || 0.00135234207471
((#slash# P_t) 2) || (nat2 nat1) || 0.00134611883526
len || Z_of_nat || 0.0013451992572
SubXFinS || exp || 0.0013421439411
Arg || Z_of_nat || 0.00133341149264
SymbolsOf || Zopp || 0.00132905467323
$ (& (~ empty) (& Group-like (& associative multMagma))) || $ nat || 0.0013273805492
TAUT || nat2 || 0.00132530694847
max || Ztimes || 0.00132511965132
SetMajorant || nat2 || 0.00132317677468
-7 || exp || 0.00132158795746
SCM-Instr0 || teta || 0.00131971865835
one || (nat2 nat1) || 0.00131665291211
$ 1-sorted || $ nat || 0.00131498988581
++0 || Ztimes || 0.00130615346474
div || Qtimes0 || 0.00130169606703
#quote#40 || A || 0.00129523108531
((|41 (TOP-REAL 2)) proj2) || C2 || 0.00129463265246
((|41 (TOP-REAL 2)) proj11) || C2 || 0.00129331802929
proj1 || prime || 0.00129291351813
RRing || nat_fact_to_fraction || 0.00129086290845
are_isomorphic3 || permut || 0.00129040180008
atom. || nat_fact_all3 || 0.00128977135428
(*6 F_Real) || nat_fact_to_fraction || 0.00128341751239
-\1 || Zplus || 0.00128137632049
HomeoGroup || nat2 || 0.00128129077518
-3 || Z3 || 0.00127851632769
frac0 || Qtimes0 || 0.00127369616693
+33 || Ztimes || 0.00126782931134
upper_bound2 || C1 || 0.00126492585438
((|41 (TOP-REAL 2)) proj2) || B_split2 || 0.00126111185785
**4 || Ztimes || 0.00126055393989
-Matrices_over || nat_fact_to_fraction || 0.00126020003361
((|41 (TOP-REAL 2)) proj11) || B_split2 || 0.00125983119682
k7_lattad_1 || C || 0.00125882543896
$ (& Function-like (& ((quasi_total omega) REAL) (Element (bool (([:..:] omega) REAL))))) || $ Z || 0.00125656696153
cliquecover#hash#0 || Z_of_nat || 0.00124388073482
-3 || Z2 || 0.00124147322091
-60 || Zplus || 0.0012413622665
-Root || Qtimes0 || 0.00124051055072
|^ || Qtimes0 || 0.00124048275907
Complement1 || nat2 || 0.00124022374672
. || Ztimes || 0.00123939223515
SubXFinS || times || 0.0012366891131
((#quote#13 omega) REAL) || (times (nat2 (nat2 nat1))) || 0.00123477179855
bubble-sort || nat2 || 0.00123221270912
divides || minus || 0.00122788655901
Product1 || B1 || 0.00122483681658
$ (& LTL-formula-like (FinSequence omega)) || $ Z || 0.00122306105644
insert-sort0 || nat2 || 0.0012209533312
$ (Element omega) || $ nat_fact || 0.00121625375034
Family_open_set0 || nat_fact_all3 || 0.00121521008958
mlt0 || Zplus || 0.00121401685167
$ (& ext-real-membered (& left_end (& right_end interval))) || $ Q0 || 0.00121038761191
$ (& (~ empty) ZeroStr) || $ Z || 0.00120900406132
$ (& (~ empty) addLoopStr) || $ Z || 0.00120755763126
((abs0 omega) REAL) || pred || 0.00120728873158
S-bound || C2 || 0.00120438465343
N-bound || C2 || 0.00120403541826
dom0 || sieve || 0.00120391077847
#slash#^5 || Zplus || 0.00120029637114
1.REAL || nat_fact_to_fraction || 0.00119956687576
S-bound || B_split2 || 0.00119620077648
N-bound || B_split2 || 0.00119585390778
permutations || numerator || 0.00119423538448
e_shore || B || 0.00119370760182
dim3 || pred || 0.00119096672515
numbering || factorize || 0.00118496040682
gcd || gcd || 0.00118410325333
stability#hash#0 || Z_of_nat || 0.0011834363954
dist || transpose || 0.00117863588949
+26 || gcd || 0.00117207157046
P_t || nat1 || 0.00117016302888
++1 || Ztimes || 0.00116762285153
IC2 || nat2 || 0.00116446606323
#slash# || Zplus || 0.00115850741531
the_Field_of_Quotients || nat2 || 0.00115519439741
are_fiberwise_equipotent || le || 0.00114684567263
#slash##slash##slash#0 || Ztimes || 0.00114335081927
$ real || $ nat_fact || 0.00114042056235
$ (& (~ empty) (& right_complementable (& Abelian (& add-associative (& right_zeroed (& vector-distributive (& scalar-distributive (& scalar-associative (& scalar-unital (& discerning0 (& reflexive3 (& RealNormSpace-like NORMSTR)))))))))))) || $ nat || 0.00113867408372
--1 || Ztimes || 0.0011353106897
E-bound || B_split1 || 0.00113409825177
W-bound || B_split1 || 0.00113404188649
-7 || gcd || 0.0011303612183
Lang1 || numerator || 0.00112843200588
$ (& (~ empty) (& right_complementable (& Abelian (& add-associative (& right_zeroed (& discerning0 (& reflexive3 (& vector-distributive1 (& scalar-distributive1 (& scalar-associative1 (& scalar-unital1 (& ComplexNormSpace-like CNORMSTR)))))))))))) || $ Z || 0.00112723846789
carrier || nat_fact_to_fraction || 0.00112682318586
$ (FinSequence (carrier (TOP-REAL 2))) || $ nat || 0.00112605225915
*33 || (nat2 nat1) || 0.00112518260948
k7_lattad_1 || B1 || 0.00112370291235
((#slash# P_t) 2) || nat1 || 0.0011192168359
*99 || Ztimes || 0.00111757651335
--2 || Ztimes || 0.00111693747171
*51 || max || 0.00111583000228
COMPLEX1 || Z2 || 0.00111288114823
|....| || numerator || 0.00111277826305
SymGroup || numerator || 0.00111275643572
SCM-Instr0 || nth_prime || 0.00111010201307
LattPOSet || C || 0.00110981984856
*48 || pred || 0.00110700442121
TopSpaceNorm || nat_fact_all3 || 0.00110358201602
is_continuous_on1 || divides || 0.00110335216271
-root || Qtimes0 || 0.00110030388136
#slash##slash##slash# || Ztimes || 0.00109702668621
*51 || Ztimes || 0.00109569202781
upper_bound || pred || 0.00109291756355
e_shore || A || 0.00109151002902
card || denominator || 0.00108962001125
k2_lattad_1 || C2 || 0.00108486111698
diameter || prime || 0.00108332990284
proj1 || C || 0.00107812244013
<*..*>33 || Z2 || 0.00107750460565
proj1 || B1 || 0.0010761763402
$ (Element (bool REAL)) || $ Z || 0.00107583191854
<1 || divides || 0.00106957143047
*0 || nat_fact_all3 || 0.00106734167694
^21 || nat2 || 0.00106582106524
lower_bound || C2 || 0.00105946049581
SetMinorant || nat2 || 0.0010572619578
lower_bound || B_split2 || 0.00105625262858
+19 || (nat2 nat1) || 0.00105540912763
upper_bound2 || B_split1 || 0.0010544273072
upper_bound3 || times || 0.00105295071929
lower_bound4 || times || 0.00105295071929
-61 || nat2 || 0.00105079379771
Subtrees0 || Zopp || 0.00105074231228
min2 || Zplus || 0.00104560889114
.order()0 || Z2 || 0.00104092706493
$ (& (~ empty) (& Lattice-like LattStr)) || $ nat || 0.00103744069071
bound_QC-variables || nat2 || 0.00103690842415
*1 || Z_of_nat || 0.00103653176932
*51 || Zplus || 0.00103416775628
min0 || Z2 || 0.0010324158929
$ (& (~ empty) (& right_complementable (& Abelian (& add-associative (& right_zeroed (& vector-distributive (& scalar-distributive (& scalar-associative (& scalar-unital (& discerning0 (& reflexive3 (& RealNormSpace-like NORMSTR)))))))))))) || $ Z || 0.00102932001285
-Matrices_over || nat_fact_all3 || 0.00102439163421
-\0 || minus || 0.0010232912897
MXF2MXR || numerator || 0.0010187209447
$ (& Int-like (Element (carrier SCMPDS))) || $ nat || 0.00101260016002
`3 || nat2 || 0.00100817415834
*101 zero3 0[01] (((#hash#)12 NAT) 1) (0. F_Complex) a_Type RetSP Im30 1_NN FALSE0 (0. Z_2) NAT 0c || Zone || 0.00100252619509
