$true || $ (& Function-like (Element (bool (([:..:] REAL) REAL)))) || 0.243341788737
Coq_Reals_Rdefinitions_R0 || *101 zero3 0[01] (((#hash#)12 NAT) 1) (0. F_Complex) a_Type RetSP Im30 1_NN FALSE0 (0. Z_2) NAT 0c || 0.217618073515
$ (=> $V_$true (=> $V_$true $o)) || $true || 0.216966268709
Coq_Setoids_Setoid_Setoid_Theory || is_strictly_convex_on || 0.269442369002
Coq_Numbers_Integer_BigZ_BigZ_BigZ_eq || ((=3 omega) REAL) || 0.223966075404
$ Coq_Numbers_Integer_BigZ_BigZ_BigZ_t || $ (& Function-like (& ((quasi_total omega) REAL) (Element (bool (([:..:] omega) REAL))))) || 0.300552783504
$ Coq_Reals_Rdefinitions_R || $ real || 0.219311862173
(Coq_Reals_Rdefinitions_Rle Coq_Reals_Rdefinitions_R0) || (<= NAT) || 0.258804993593
Coq_Reals_RIneq_Rsqr || min || 0.257791574372
Coq_Reals_R_sqrt_sqrt || ^20 || 0.274401084704
Coq_Reals_Rdefinitions_Rmult || * || 0.246633378633
Coq_Reals_Rdefinitions_Rminus || - || 0.244356647925
(Coq_Init_Peano_le_0 __constr_Coq_Init_Datatypes_nat_0_1) || (<= 1) || 0.240628872442
Coq_Reals_Rdefinitions_Rplus || + || 0.2387321481
Coq_Reals_Rdefinitions_Rle || <= || 0.245867204003
Coq_Reals_Rtrigo_def_sin || sin || 0.227192057153
Coq_Reals_Rtrigo_def_cos || cos || 0.277968505129
$ Coq_Init_Datatypes_nat_0 || $ natural || 0.223583147086
__constr_Coq_Numbers_BinNums_N_0_1 || op0 k5_ordinal1 {} || 0.233635378762
$ Coq_Numbers_BinNums_N_0 || $ ordinal || 0.246379644903
Coq_Reals_Rdefinitions_Ropp || -0 || 0.219449275544
Coq_Reals_Rbasic_fun_Rabs || *1 || 0.227753596738
Coq_Classes_RelationClasses_Equivalence_0 || is_strongly_quasiconvex_on || 0.210223544227
Coq_Numbers_Natural_BigN_BigN_BigN_eq || ((=4 omega) COMPLEX) || 0.208036874122
$ Coq_Numbers_Natural_BigN_BigN_BigN_t || $ (& Function-like (& ((quasi_total omega) COMPLEX) (Element (bool (([:..:] omega) COMPLEX))))) || 0.300132839372
Coq_QArith_QArith_base_Qeq || c= || 0.199990956908
Coq_Numbers_Rational_BigQ_BigQ_BigQ_to_Q || proj4_4 || 0.2361957385
$ Coq_Numbers_Rational_BigQ_BigQ_BigQ_t || $ (& Relation-like Function-like) || 0.234331412833
$ Coq_Numbers_BinNums_Z_0 || $ boolean || 0.200966011143
Coq_Numbers_Integer_BigZ_BigZ_BigZ_opp || ((-9 omega) REAL) || 0.198469746637
Coq_Reals_Rdefinitions_R1 || 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 {}) || 0.186171168727
Coq_Reals_Rtrigo_calc_sind || sech || 0.204332625829
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sub || (((-15 omega) REAL) REAL) || 0.184942101503
Coq_Numbers_Integer_BigZ_BigZ_BigZ_add || (((+20 omega) REAL) REAL) || 0.220352417522
Coq_Reals_Rtrigo_calc_cosd || cosh || 0.181826588351
Coq_Numbers_Natural_BigN_BigN_BigN_mul || (((#slash##quote# omega) COMPLEX) COMPLEX) || 0.176534396487
Coq_Reals_Rtrigo1_tan || tan || 0.175323102764
Coq_Numbers_Integer_BigZ_BigZ_BigZ_mul || ((((#hash#) omega) REAL) REAL) || 0.175319320889
Coq_Reals_Rpow_def_pow || |^ || 0.172253249895
__constr_Coq_Numbers_BinNums_Z_0_1 || BOOLEAN || 0.171537963867
Coq_Numbers_Natural_BigN_BigN_BigN_shiftl || ((((#hash#)5 omega) COMPLEX) COMPLEX) || 0.170516964677
Coq_Numbers_Natural_BigN_BigN_BigN_mk_t_w || SDSub2INT || 0.164023173575
Coq_Init_Peano_le_0 || divides || 0.16268801788
Coq_Numbers_Natural_BigN_BigN_BigN_div2 || ((-13 omega) COMPLEX) || 0.16084343991
$ Coq_QArith_QArith_base_Q_0 || $ complex-membered || 0.156403752691
Coq_Numbers_Natural_Binary_NBinary_N_pow || exp1 || 0.146037684329
(Coq_Numbers_Natural_Binary_NBinary_N_lt (__constr_Coq_Numbers_BinNums_N_0_2 __constr_Coq_Numbers_BinNums_positive_0_3)) || (are_equipotent 1) || 0.146325588346
Coq_Numbers_Natural_Binary_NBinary_N_le || c=0 || 0.136292850012
Coq_Numbers_Natural_BigN_BigN_BigN_level || InsCode || 0.135548181728
$ (Coq_Numbers_Cyclic_DoubleCyclic_DoubleType_zn2z_0 (Coq_Numbers_Natural_BigN_BigN_BigN_dom_t $V_Coq_Init_Datatypes_nat_0)) || $ (& Int-like (Element (carrier SCM+FSA))) || 0.138336015156
Coq_Numbers_Natural_BigN_BigN_BigN_mk_t_S || =0_goto || 0.149223960844
Coq_Reals_Rdefinitions_Rdiv || #slash# || 0.134593530498
Coq_Reals_Rbasic_fun_Rmax || (#hash#)11 || 0.131917575341
Coq_Numbers_Natural_BigN_BigN_BigN_eval || SDSub2IntOut || 0.130793887735
$ ((Coq_Numbers_Cyclic_DoubleCyclic_DoubleType_word (Coq_Numbers_Natural_BigN_BigN_BigN_dom_t $V_Coq_Init_Datatypes_nat_0)) $V_Coq_Init_Datatypes_nat_0) || $ (& (-element $V_natural) (FinSequence (-SD_Sub0 $V_natural))) || 0.158523457297
(Coq_Init_Peano_lt (__constr_Coq_Init_Datatypes_nat_0_2 __constr_Coq_Init_Datatypes_nat_0_1)) || (<= 2) || 0.130132191135
(Coq_Init_Peano_lt __constr_Coq_Init_Datatypes_nat_0_1) || (<= 4) || 0.179127398233
Coq_Classes_RelationClasses_Symmetric || is_convex_on || 0.128725158698
Coq_Numbers_Natural_BigN_BigN_BigN_to_Z || Sum4 || 0.12861181453
Coq_Reals_Rfunctions_R_dist || max || 0.126065031403
Coq_Reals_Rlimit_dist || ||....|| || 0.124319408243
$ (Coq_Reals_Rlimit_Base $V_Coq_Reals_Rlimit_Metric_Space_0) || $ (Element (carrier $V_(& (~ empty) (& right_complementable (& Abelian (& add-associative (& right_zeroed (& vector-distributive1 (& scalar-distributive1 (& scalar-associative1 (& scalar-unital1 (& ComplexUnitarySpace-like CUNITSTR)))))))))))) || 0.141886298091
$ Coq_Reals_Rlimit_Metric_Space_0 || $ (& (~ empty) (& right_complementable (& Abelian (& add-associative (& right_zeroed (& vector-distributive1 (& scalar-distributive1 (& scalar-associative1 (& scalar-unital1 (& ComplexUnitarySpace-like CUNITSTR)))))))))) || 0.152670821494
Coq_NArith_BinNat_N_add || +^1 || 0.123540370067
Coq_Reals_Rbasic_fun_Rmin || (#hash#)12 || 0.119875427157
Coq_NArith_BinNat_N_mul || *^ || 0.117983154879
Coq_Numbers_Natural_Binary_NBinary_N_lt || are_equipotent || 0.117997458282
__constr_Coq_Init_Datatypes_bool_0_2 || FALSE || 0.115797598187
(Coq_Reals_Rdefinitions_Rmult ((Coq_Reals_Rdefinitions_Rplus Coq_Reals_Rdefinitions_R1) Coq_Reals_Rdefinitions_R1)) || (* 2) || 0.114393685563
Coq_Numbers_Natural_BigN_BigN_BigN_lxor || (((+18 omega) COMPLEX) COMPLEX) || 0.11336664657
Coq_ZArith_BinInt_Z_opp || \not\2 || 0.107727119067
Coq_Numbers_Rational_BigQ_BigQ_BigQ_inv_norm || .:30 || 0.105847654417
((Coq_Reals_Rdefinitions_Rdiv Coq_Reals_Rtrigo1_PI) ((Coq_Reals_Rdefinitions_Rplus Coq_Reals_Rdefinitions_R1) Coq_Reals_Rdefinitions_R1)) || ((#slash# P_t) 2) || 0.103229559541
Coq_Structures_OrdersEx_Nat_as_DT_max || lcm0 || 0.102750235403
Coq_Numbers_Natural_BigN_BigN_BigN_succ || (*\0 omega) || 0.0992393181908
Coq_Numbers_Natural_BigN_BigN_BigN_le || ((=3 omega) COMPLEX) || 0.142520710557
Coq_Numbers_Natural_BigN_BigN_BigN_shiftr || (((#hash#)4 omega) COMPLEX) || 0.0991435578872
Coq_Numbers_Natural_BigN_BigN_BigN_one || (-0 1r) || 0.10925709909
__constr_Coq_Init_Datatypes_nat_0_2 || RealVectSpace || 0.0963156675903
Coq_Arith_PeanoNat_Nat_div2 || dim0 || 0.137339956401
(Coq_Init_Nat_mul (__constr_Coq_Init_Datatypes_nat_0_2 (__constr_Coq_Init_Datatypes_nat_0_2 __constr_Coq_Init_Datatypes_nat_0_1))) || Seg || 0.097232674741
Coq_Structures_OrdersEx_Nat_as_DT_min || gcd || 0.0920351273457
Coq_Classes_RelationClasses_Reflexive || is_quasiconvex_on || 0.0889981277059
Coq_Numbers_Rational_BigQ_BigQ_BigQ_red || ~3 || 0.0875658270636
Coq_QArith_QArith_base_Qminus || [:..:] || 0.0860427422101
Coq_Numbers_Rational_BigQ_BigQ_BigQ_sub_norm || |:..:|3 || 0.0902669013157
Coq_Classes_RelationClasses_Transitive || is_strictly_quasiconvex_on || 0.0855146809946
Coq_QArith_Qminmax_Qmax || **5 || 0.0848695757586
Coq_Numbers_Natural_BigN_BigN_BigN_pred_t || ProjFinSeq || 0.0841530018202
Coq_Reals_AltSeries_Alt_PI Coq_Reals_Rtrigo1_PI || P_t || 0.0837693867337
Coq_QArith_QArith_base_Qmult || #slash##slash##slash#0 || 0.0824463078772
Coq_Reals_RList_mid_Rlist || *51 || 0.0820259681336
Coq_NArith_BinNat_N_succ || succ1 || 0.0799180695795
Coq_Numbers_Natural_Binary_NBinary_N_ge || is_cofinal_with || 0.075826165488
Coq_Numbers_Natural_BigN_BigN_BigN_succ_t || Sum11 || 0.0738017611014
$ (Coq_Numbers_Natural_BigN_BigN_BigN_dom_t (__constr_Coq_Init_Datatypes_nat_0_2 $V_Coq_Init_Datatypes_nat_0)) || $ ((Element2 REAL) (REAL0 $V_natural)) || 0.072141044778
Coq_QArith_QArith_base_Qinv || bool || 0.0712185970857
Coq_ZArith_BinInt_Z_compare || =>2 || 0.0677601393243
Coq_NArith_BinNat_N_pred || union0 || 0.0671754870203
Coq_Numbers_Integer_Binary_ZBinary_Z_testbit || \nand\ || 0.0668837905351
Coq_Numbers_Natural_BigN_BigN_BigN_lcm || (((-14 omega) COMPLEX) COMPLEX) || 0.0665764710448
Coq_Arith_PeanoNat_Nat_square || 0_Rmatrix0 || 0.0665663468924
Coq_Numbers_Natural_BigN_BigN_BigN_sqrt || ((#quote#3 omega) COMPLEX) || 0.0635539964669
Coq_Numbers_Natural_Binary_NBinary_N_add || -Veblen0 || 0.0624871199304
Coq_NArith_BinNat_N_div || div^ || 0.0568565923924
$ Coq_Reals_RList_Rlist_0 || $ (FinSequence REAL) || 0.055833577636
Coq_Arith_PeanoNat_Nat_log2_up || Radix || 0.0557246606871
Coq_Reals_Ratan_ps_atan || (. signum) || 0.0556031182595
__constr_Coq_Vectors_Fin_t_0_2 || 0c0 || 0.0546879752612
Coq_Numbers_Natural_Binary_NBinary_N_sub || -^ || 0.0539101538226
Coq_Numbers_Integer_Binary_ZBinary_Z_min || \or\3 || 0.0538604765156
Coq_Numbers_Integer_Binary_ZBinary_Z_max || \&\2 || 0.0713383297696
Coq_Numbers_Integer_BigZ_BigZ_BigZ_min || (((#slash##quote#0 omega) REAL) REAL) || 0.0536304266911
Coq_Arith_PeanoNat_Nat_min || mod1 || 0.0533766166993
(Coq_Numbers_Natural_Binary_NBinary_N_lt __constr_Coq_Numbers_BinNums_N_0_1) || (are_equipotent {}) || 0.0507751373938
Coq_Numbers_Rational_BigQ_BigQ_BigQ_sub || <:..:>3 || 0.0495193599788
Coq_ZArith_BinInt_Z_rem || \xor\ || 0.0490207650282
Coq_Numbers_Natural_BigN_BigN_BigN_log2_up || Partial_Sums1 || 0.0489092379765
Coq_QArith_QArith_base_Qdiv || #bslash##slash#0 || 0.0483056081811
$ Coq_Init_Datatypes_bool_0 || $ (Element HP-WFF) || 0.0477884756376
Coq_Numbers_Natural_Binary_NBinary_N_b2n || Subformulae0 || 0.0488233157648
Coq_QArith_QArith_base_Qplus || --2 || 0.0474619855577
$ (Coq_Vectors_Fin_t_0 $V_Coq_Init_Datatypes_nat_0) || $ ((Element2 COMPLEX) (*88 $V_natural)) || 0.0472972946251
Coq_QArith_Qminmax_Qmin || ++0 || 0.0464228738438
(Coq_Reals_Rdefinitions_Rdiv Coq_Reals_Rdefinitions_R1) || (#slash# (^20 3)) || 0.0455856173374
Coq_Init_Peano_lt || are_relative_prime || 0.0436644920596
Coq_Numbers_Integer_BigZ_BigZ_BigZ_sgn || ((abs0 omega) REAL) || 0.0433784125043
Coq_Numbers_Rational_BigQ_BigQ_BigQ_div_norm || +*1 || 0.0429500318172
Coq_Reals_Ratan_atan || (. cosh1) || 0.0426477524961
Coq_Reals_Rdefinitions_Rinv || sgn || 0.042432915547
(Coq_Reals_Rdefinitions_Rplus Coq_Reals_Rdefinitions_R1) || sinh || 0.041995096687
Coq_Reals_RList_Rlength || dom0 || 0.041325191917
Coq_ZArith_BinInt_Z_modulo || \#bslash#\ || 0.040900887594
Coq_Reals_Rsqrt_def_pow_2_n || |^5 || 0.0405656703789
Coq_NArith_Ndigits_eqf || are_isomorphic2 || 0.0396211418039
Coq_NArith_BinNat_N_testbit_nat || RelIncl0 || 0.0448728971125
((Coq_Reals_Rdefinitions_Rdiv Coq_Reals_Rtrigo1_PI) ((Coq_Reals_Rdefinitions_Rmult ((Coq_Reals_Rdefinitions_Rplus Coq_Reals_Rdefinitions_R1) Coq_Reals_Rdefinitions_R1)) ((Coq_Reals_Rdefinitions_Rplus Coq_Reals_Rdefinitions_R1) Coq_Reals_Rdefinitions_R1))) || ((#slash# P_t) 6) || 0.039385666343
Coq_Arith_Factorial_fact || Goto || 0.037694886383
(Coq_Reals_Rdefinitions_Rlt Coq_Reals_Rdefinitions_R0) || (are_equipotent NAT) || 0.0506544848455
Coq_Reals_Raxioms_INR || dom2 || 0.0866223341561
Coq_PArith_BinPos_Pos_to_nat || Stop || 0.0523801186278
$ Coq_Numbers_BinNums_positive_0 || $ COM-Struct || 0.0518696965194
Coq_Numbers_Integer_BigZ_BigZ_BigZ_lor || (+10 REAL) || 0.0375639133358
Coq_Numbers_Integer_BigZ_BigZ_BigZ_land || (#hash##hash#) || 0.0530361722755
Coq_Structures_OrdersEx_N_as_OT_lt || c< || 0.0352733224039
Coq_Arith_PeanoNat_Nat_max || lcm || 0.0329624830082
Coq_romega_ReflOmegaCore_ZOmega_do_normalize_list || SDSub_Add_Carry || 0.0320784381789
Coq_romega_ReflOmegaCore_ZOmega_valid_hyps || (<= (-0 1)) || 0.0390039215787
$ (Coq_Init_Datatypes_list_0 Coq_romega_ReflOmegaCore_ZOmega_step_0) || $ integer || 0.0470455779023
Coq_Reals_RIneq_nonzero || (Product5 Newton_Coeff) || 0.0318867831172
$ Coq_Reals_RIneq_nonzeroreal_0 || $ (& Relation-like (& (-defined Newton_Coeff) (& Function-like (& (total Newton_Coeff) (& natural-valued finite-support))))) || 0.0524391327862
__constr_Coq_Numbers_BinNums_positive_0_3 || Example || 0.0310786961284
__constr_Coq_Numbers_BinNums_N_0_2 || carrier || 0.0381810781015
Coq_Numbers_Natural_Binary_NBinary_N_testbit || . || 0.03030637659
Coq_Arith_PeanoNat_Nat_divide || is_expressible_by || 0.0294870191057
Coq_Arith_PeanoNat_Nat_lcm || NEG_MOD || 0.0440622220987
Coq_Arith_PeanoNat_Nat_mul || 0_Rmatrix || 0.0282508049107
(Coq_Reals_R_sqrt_sqrt ((Coq_Reals_Rdefinitions_Rplus Coq_Reals_Rdefinitions_R1) Coq_Reals_Rdefinitions_R1)) || a_Term EdgeSelector 2 (({..}3 k5_ordinal1) 1) || 0.0278316582729
Coq_ZArith_BinInt_Z_add || \nor\ || 0.0274220591081
Coq_Arith_Compare_dec_nat_compare_alt || div || 0.0272581755908
Coq_Arith_PeanoNat_Nat_compare || frac0 || 0.0316759091121
Coq_Arith_Mult_tail_mult || mod || 0.0248095027762
Coq_Init_Nat_mul || div0 || 0.025023612876
Coq_Numbers_Natural_Binary_NBinary_N_sqrt || card || 0.0240552904463
Coq_Numbers_Natural_Binary_NBinary_N_succ || {..}2 || 0.0239989437153
Coq_QArith_Qreduction_Qred || -- || 0.0217377981827
Coq_QArith_QArith_base_Qopp || #quote##quote#0 || 0.0384994730883
Coq_Structures_OrdersEx_Nat_as_DT_lcm || gcd0 || 0.0156657351072
