:: LIMFUNC3  semantic presentation begin  






















theorem :: LIMFUNC3:1 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "seq")) "being"   ($#m1_subset_1 :::"Real_Sequence":::)  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool  "("  (Bool (Set   ($#k10_xtuple_0 :::"rng"::: )  (Set (Var "seq")))  ($#r1_tarski :::"c="::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")) ")" )  ($#k9_subset_1 :::"/\"::: )  (Set  "("  ($#k10_prob_1 :::"left_open_halfline"::: )  (Set (Var "x0")) ")" ))) "or" (Bool (Set   ($#k10_xtuple_0 :::"rng"::: )  (Set (Var "seq")))  ($#r1_tarski :::"c="::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")) ")" )  ($#k9_subset_1 :::"/\"::: )  (Set  "("  ($#k3_limfunc1 :::"right_open_halfline"::: )  (Set (Var "x0")) ")" )))  ")" )) "holds"  (Bool (Set   ($#k10_xtuple_0 :::"rng"::: )  (Set (Var "seq")))  ($#r1_tarski :::"c="::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")) ")" )  ($#k6_subset_1 :::"\"::: )  (Set  ($#k1_tarski :::"{"::: ) (Set (Var "x0")) ($#k1_tarski :::"}"::: ) )))))) ; 
 
theorem :: LIMFUNC3:2 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "seq")) "being"   ($#m1_subset_1 :::"Real_Sequence":::)  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool  "("   "for" (Set (Var "n")) "being"    ($#m2_subset_1 :::"Element"::: )   "of" (Set   ($#k5_numbers :::"NAT"::: )  ) "holds"   (Bool  "("  (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set   ($#k18_complex1 :::"abs"::: )  (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set  "(" (Set (Var "seq"))  ($#k1_seq_1 :::"."::: )  (Set (Var "n")) ")" ) ")" ))) & (Bool (Set   ($#k18_complex1 :::"abs"::: )  (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set  "(" (Set (Var "seq"))  ($#k1_seq_1 :::"."::: )  (Set (Var "n")) ")" ) ")" ))  ($#r1_xxreal_0 :::"<"::: )  (Set (Num 1)  ($#k10_real_1 :::"/"::: )  (Set  "(" (Set (Var "n"))  ($#k2_nat_1 :::"+"::: )  (Num 1) ")" ))) & (Bool (Set (Set (Var "seq"))  ($#k1_seq_1 :::"."::: )  (Set (Var "n")))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f"))))  ")" )  ")" )) "holds"  (Bool  "("  (Bool (Set (Var "seq")) "is"   ($#v2_comseq_2 :::"convergent"::: )  ) & (Bool (Set   ($#k2_seq_2 :::"lim"::: )  (Set (Var "seq")))  ($#r1_hidden :::"="::: )  (Set (Var "x0"))) & (Bool (Set   ($#k10_xtuple_0 :::"rng"::: )  (Set (Var "seq")))  ($#r1_tarski :::"c="::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")))) & (Bool (Set   ($#k10_xtuple_0 :::"rng"::: )  (Set (Var "seq")))  ($#r1_tarski :::"c="::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")) ")" )  ($#k6_subset_1 :::"\"::: )  (Set  ($#k1_tarski :::"{"::: ) (Set (Var "x0")) ($#k1_tarski :::"}"::: ) )))  ")" )))) ; 
 
theorem :: LIMFUNC3:3 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "seq")) "being"   ($#m1_subset_1 :::"Real_Sequence":::)  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool (Set (Var "seq")) "is"   ($#v2_comseq_2 :::"convergent"::: )  ) & (Bool (Set   ($#k2_seq_2 :::"lim"::: )  (Set (Var "seq")))  ($#r1_hidden :::"="::: )  (Set (Var "x0"))) & (Bool (Set   ($#k10_xtuple_0 :::"rng"::: )  (Set (Var "seq")))  ($#r1_tarski :::"c="::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")) ")" )  ($#k6_subset_1 :::"\"::: )  (Set  ($#k1_tarski :::"{"::: ) (Set (Var "x0")) ($#k1_tarski :::"}"::: ) )))) "holds"  (Bool  "for" (Set (Var "r")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r")))) "holds"  (Bool  "ex" (Set (Var "n")) "being"    ($#m2_subset_1 :::"Element"::: )   "of" (Set   ($#k5_numbers :::"NAT"::: )  ) "st"  (Bool  "for" (Set (Var "k")) "being"    ($#m2_subset_1 :::"Element"::: )   "of" (Set   ($#k5_numbers :::"NAT"::: )  )  "st" (Bool (Bool (Set (Var "n"))  ($#r1_xxreal_0 :::"<="::: )  (Set (Var "k")))) "holds"  (Bool  "("  (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set   ($#k18_complex1 :::"abs"::: )  (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set  "(" (Set (Var "seq"))  ($#k1_seq_1 :::"."::: )  (Set (Var "k")) ")" ) ")" ))) & (Bool (Set   ($#k18_complex1 :::"abs"::: )  (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set  "(" (Set (Var "seq"))  ($#k1_seq_1 :::"."::: )  (Set (Var "k")) ")" ) ")" ))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r"))) & (Bool (Set (Set (Var "seq"))  ($#k1_seq_1 :::"."::: )  (Set (Var "k")))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f"))))  ")" ))))))) ; 
 
theorem :: LIMFUNC3:4 (Bool  "for" (Set (Var "r")) "," (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r")))) "holds"  (Bool (Set (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) )  ($#k7_subset_1 :::"\"::: )  (Set  ($#k1_tarski :::"{"::: ) (Set (Var "x0")) ($#k1_tarski :::"}"::: ) ))  ($#r1_hidden :::"="::: )  (Set (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) )))) ; 
 
theorem :: LIMFUNC3:5 (Bool  "for" (Set (Var "r2")) "," (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool (Set (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r2")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r2")) ")" ) ($#k2_rcomp_1 :::".["::: ) ))  ($#r1_tarski :::"c="::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f"))))) "holds"  (Bool  "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")))) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f"))))  ")" ))))) ; 
 
theorem :: LIMFUNC3:6 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "seq")) "being"   ($#m1_subset_1 :::"Real_Sequence":::)  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool  "("   "for" (Set (Var "n")) "being"    ($#m2_subset_1 :::"Element"::: )   "of" (Set   ($#k5_numbers :::"NAT"::: )  ) "holds"   (Bool  "("  (Bool (Set (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set  "(" (Num 1)  ($#k10_real_1 :::"/"::: )  (Set  "(" (Set (Var "n"))  ($#k2_nat_1 :::"+"::: )  (Num 1) ")" ) ")" ))  ($#r1_xxreal_0 :::"<"::: )  (Set (Set (Var "seq"))  ($#k1_seq_1 :::"."::: )  (Set (Var "n")))) & (Bool (Set (Set (Var "seq"))  ($#k1_seq_1 :::"."::: )  (Set (Var "n")))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Set (Var "seq"))  ($#k1_seq_1 :::"."::: )  (Set (Var "n")))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f"))))  ")" )  ")" )) "holds"  (Bool  "("  (Bool (Set (Var "seq")) "is"   ($#v2_comseq_2 :::"convergent"::: )  ) & (Bool (Set   ($#k2_seq_2 :::"lim"::: )  (Set (Var "seq")))  ($#r1_hidden :::"="::: )  (Set (Var "x0"))) & (Bool (Set   ($#k10_xtuple_0 :::"rng"::: )  (Set (Var "seq")))  ($#r1_tarski :::"c="::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")) ")" )  ($#k6_subset_1 :::"\"::: )  (Set  ($#k1_tarski :::"{"::: ) (Set (Var "x0")) ($#k1_tarski :::"}"::: ) )))  ")" )))) ; 
 
theorem :: LIMFUNC3:7 (Bool  "for" (Set (Var "x0")) "," (Set (Var "g")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "seq")) "being"   ($#m1_subset_1 :::"Real_Sequence":::)  "st" (Bool (Bool (Set (Var "seq")) "is"   ($#v2_comseq_2 :::"convergent"::: )  ) & (Bool (Set   ($#k2_seq_2 :::"lim"::: )  (Set (Var "seq")))  ($#r1_hidden :::"="::: )  (Set (Var "x0"))) & (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g")))) "holds"  (Bool  "ex" (Set (Var "k")) "being"    ($#m2_subset_1 :::"Element"::: )   "of" (Set   ($#k5_numbers :::"NAT"::: )  ) "st"  (Bool  "for" (Set (Var "n")) "being"    ($#m2_subset_1 :::"Element"::: )   "of" (Set   ($#k5_numbers :::"NAT"::: )  )  "st" (Bool (Bool (Set (Var "k"))  ($#r1_xxreal_0 :::"<="::: )  (Set (Var "n")))) "holds"  (Bool  "("  (Bool (Set (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "g")))  ($#r1_xxreal_0 :::"<"::: )  (Set (Set (Var "seq"))  ($#k1_seq_1 :::"."::: )  (Set (Var "n")))) & (Bool (Set (Set (Var "seq"))  ($#k1_seq_1 :::"."::: )  (Set (Var "n")))  ($#r1_xxreal_0 :::"<"::: )  (Set (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "g"))))  ")" ))))) ; 
 
theorem :: LIMFUNC3:8 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) ) "holds"   (Bool  "("  (Bool  "("   "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")))) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f"))))  ")" ))  ")" ) "iff" (Bool  "("  (Bool  "("   "for" (Set (Var "r")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0")))) "holds"  (Bool  "ex" (Set (Var "g")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g"))) & (Bool (Set (Var "g"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "g"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f"))))  ")" ))  ")" ) & (Bool  "("   "for" (Set (Var "r")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r")))) "holds"  (Bool  "ex" (Set (Var "g")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "g"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g"))) & (Bool (Set (Var "g"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f"))))  ")" ))  ")" )  ")" )  ")" ))) ; 
 definitionlet "f" be   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) ); let "x0" be   ($#m1_subset_1 :::"Real":::); pred "f" :::"is_convergent_in"::: "x0" means :: LIMFUNC3:def 1 (Bool  "("  (Bool  "("   "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  "x0") & (Bool "x0"  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  "x0") & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  "f")) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool "x0"  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  "f"))  ")" ))  ")" ) & (Bool  "ex" (Set (Var "g")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "for" (Set (Var "seq")) "being"   ($#m1_subset_1 :::"Real_Sequence":::)  "st" (Bool (Bool (Set (Var "seq")) "is"   ($#v2_comseq_2 :::"convergent"::: )  ) & (Bool (Set   ($#k2_seq_2 :::"lim"::: )  (Set (Var "seq")))  ($#r1_hidden :::"="::: )  "x0") & (Bool (Set   ($#k10_xtuple_0 :::"rng"::: )  (Set (Var "seq")))  ($#r1_tarski :::"c="::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  "f" ")" )  ($#k6_subset_1 :::"\"::: )  (Set  ($#k1_tarski :::"{"::: ) "x0" ($#k1_tarski :::"}"::: ) )))) "holds"  (Bool  "("  (Bool (Set "f"  ($#k8_funct_2 :::"/*"::: )  (Set (Var "seq"))) "is"   ($#v2_comseq_2 :::"convergent"::: )  ) & (Bool (Set   ($#k2_seq_2 :::"lim"::: )  (Set  "(" "f"  ($#k8_funct_2 :::"/*"::: )  (Set (Var "seq")) ")" ))  ($#r1_hidden :::"="::: )  (Set (Var "g")))  ")" )))  ")" ); pred "f" :::"is_divergent_to+infty_in"::: "x0" means :: LIMFUNC3:def 2 (Bool  "("  (Bool  "("   "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  "x0") & (Bool "x0"  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  "x0") & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  "f")) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool "x0"  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  "f"))  ")" ))  ")" ) & (Bool  "("   "for" (Set (Var "seq")) "being"   ($#m1_subset_1 :::"Real_Sequence":::)  "st" (Bool (Bool (Set (Var "seq")) "is"   ($#v2_comseq_2 :::"convergent"::: )  ) & (Bool (Set   ($#k2_seq_2 :::"lim"::: )  (Set (Var "seq")))  ($#r1_hidden :::"="::: )  "x0") & (Bool (Set   ($#k10_xtuple_0 :::"rng"::: )  (Set (Var "seq")))  ($#r1_tarski :::"c="::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  "f" ")" )  ($#k6_subset_1 :::"\"::: )  (Set  ($#k1_tarski :::"{"::: ) "x0" ($#k1_tarski :::"}"::: ) )))) "holds"  (Bool (Set "f"  ($#k8_funct_2 :::"/*"::: )  (Set (Var "seq"))) "is"   ($#v1_limfunc1 :::"divergent_to+infty"::: )  )  ")" )  ")" ); pred "f" :::"is_divergent_to-infty_in"::: "x0" means :: LIMFUNC3:def 3 (Bool  "("  (Bool  "("   "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  "x0") & (Bool "x0"  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  "x0") & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  "f")) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool "x0"  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  "f"))  ")" ))  ")" ) & (Bool  "("   "for" (Set (Var "seq")) "being"   ($#m1_subset_1 :::"Real_Sequence":::)  "st" (Bool (Bool (Set (Var "seq")) "is"   ($#v2_comseq_2 :::"convergent"::: )  ) & (Bool (Set   ($#k2_seq_2 :::"lim"::: )  (Set (Var "seq")))  ($#r1_hidden :::"="::: )  "x0") & (Bool (Set   ($#k10_xtuple_0 :::"rng"::: )  (Set (Var "seq")))  ($#r1_tarski :::"c="::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  "f" ")" )  ($#k6_subset_1 :::"\"::: )  (Set  ($#k1_tarski :::"{"::: ) "x0" ($#k1_tarski :::"}"::: ) )))) "holds"  (Bool (Set "f"  ($#k8_funct_2 :::"/*"::: )  (Set (Var "seq"))) "is"   ($#v2_limfunc1 :::"divergent_to-infty"::: )  )  ")" )  ")" ); end; 















:: deftheorem    defines :::"is_convergent_in"::: LIMFUNC3:def 1 :  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::) "holds"   (Bool  "("  (Bool (Set (Var "f"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) "iff" (Bool  "("  (Bool  "("   "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")))) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f"))))  ")" ))  ")" ) & (Bool  "ex" (Set (Var "g")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "for" (Set (Var "seq")) "being"   ($#m1_subset_1 :::"Real_Sequence":::)  "st" (Bool (Bool (Set (Var "seq")) "is"   ($#v2_comseq_2 :::"convergent"::: )  ) & (Bool (Set   ($#k2_seq_2 :::"lim"::: )  (Set (Var "seq")))  ($#r1_hidden :::"="::: )  (Set (Var "x0"))) & (Bool (Set   ($#k10_xtuple_0 :::"rng"::: )  (Set (Var "seq")))  ($#r1_tarski :::"c="::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")) ")" )  ($#k6_subset_1 :::"\"::: )  (Set  ($#k1_tarski :::"{"::: ) (Set (Var "x0")) ($#k1_tarski :::"}"::: ) )))) "holds"  (Bool  "("  (Bool (Set (Set (Var "f"))  ($#k8_funct_2 :::"/*"::: )  (Set (Var "seq"))) "is"   ($#v2_comseq_2 :::"convergent"::: )  ) & (Bool (Set   ($#k2_seq_2 :::"lim"::: )  (Set  "(" (Set (Var "f"))  ($#k8_funct_2 :::"/*"::: )  (Set (Var "seq")) ")" ))  ($#r1_hidden :::"="::: )  (Set (Var "g")))  ")" )))  ")" )  ")" ))); 
 
:: deftheorem    defines :::"is_divergent_to+infty_in"::: LIMFUNC3:def 2 :  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::) "holds"   (Bool  "("  (Bool (Set (Var "f"))  ($#r2_limfunc3 :::"is_divergent_to+infty_in"::: )  (Set (Var "x0"))) "iff" (Bool  "("  (Bool  "("   "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")))) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f"))))  ")" ))  ")" ) & (Bool  "("   "for" (Set (Var "seq")) "being"   ($#m1_subset_1 :::"Real_Sequence":::)  "st" (Bool (Bool (Set (Var "seq")) "is"   ($#v2_comseq_2 :::"convergent"::: )  ) & (Bool (Set   ($#k2_seq_2 :::"lim"::: )  (Set (Var "seq")))  ($#r1_hidden :::"="::: )  (Set (Var "x0"))) & (Bool (Set   ($#k10_xtuple_0 :::"rng"::: )  (Set (Var "seq")))  ($#r1_tarski :::"c="::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")) ")" )  ($#k6_subset_1 :::"\"::: )  (Set  ($#k1_tarski :::"{"::: ) (Set (Var "x0")) ($#k1_tarski :::"}"::: ) )))) "holds"  (Bool (Set (Set (Var "f"))  ($#k8_funct_2 :::"/*"::: )  (Set (Var "seq"))) "is"   ($#v1_limfunc1 :::"divergent_to+infty"::: )  )  ")" )  ")" )  ")" ))); 
 
:: deftheorem    defines :::"is_divergent_to-infty_in"::: LIMFUNC3:def 3 :  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::) "holds"   (Bool  "("  (Bool (Set (Var "f"))  ($#r3_limfunc3 :::"is_divergent_to-infty_in"::: )  (Set (Var "x0"))) "iff" (Bool  "("  (Bool  "("   "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")))) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f"))))  ")" ))  ")" ) & (Bool  "("   "for" (Set (Var "seq")) "being"   ($#m1_subset_1 :::"Real_Sequence":::)  "st" (Bool (Bool (Set (Var "seq")) "is"   ($#v2_comseq_2 :::"convergent"::: )  ) & (Bool (Set   ($#k2_seq_2 :::"lim"::: )  (Set (Var "seq")))  ($#r1_hidden :::"="::: )  (Set (Var "x0"))) & (Bool (Set   ($#k10_xtuple_0 :::"rng"::: )  (Set (Var "seq")))  ($#r1_tarski :::"c="::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")) ")" )  ($#k6_subset_1 :::"\"::: )  (Set  ($#k1_tarski :::"{"::: ) (Set (Var "x0")) ($#k1_tarski :::"}"::: ) )))) "holds"  (Bool (Set (Set (Var "f"))  ($#k8_funct_2 :::"/*"::: )  (Set (Var "seq"))) "is"   ($#v2_limfunc1 :::"divergent_to-infty"::: )  )  ")" )  ")" )  ")" ))); 
 
theorem :: LIMFUNC3:9 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) ) "holds"   (Bool  "("  (Bool (Set (Var "f"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) "iff" (Bool  "("  (Bool  "("   "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")))) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f"))))  ")" ))  ")" ) & (Bool  "ex" (Set (Var "g")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "for" (Set (Var "g1")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1")))) "holds"  (Bool  "ex" (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool  "("   "for" (Set (Var "r1")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set   ($#k18_complex1 :::"abs"::: )  (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r1")) ")" ))) & (Bool (Set   ($#k18_complex1 :::"abs"::: )  (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r1")) ")" ))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "r1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f"))))) "holds"  (Bool (Set   ($#k18_complex1 :::"abs"::: )  (Set  "(" (Set  "(" (Set (Var "f"))  ($#k1_seq_1 :::"."::: )  (Set (Var "r1")) ")" )  ($#k9_real_1 :::"-"::: )  (Set (Var "g")) ")" ))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1")))  ")" )  ")" ))))  ")" )  ")" ))) ; 
 
theorem :: LIMFUNC3:10 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) ) "holds"   (Bool  "("  (Bool (Set (Var "f"))  ($#r2_limfunc3 :::"is_divergent_to+infty_in"::: )  (Set (Var "x0"))) "iff" (Bool  "("  (Bool  "("   "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")))) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f"))))  ")" ))  ")" ) & (Bool  "("   "for" (Set (Var "g1")) "being"   ($#m1_subset_1 :::"Real":::) (Bool  "ex" (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool  "("   "for" (Set (Var "r1")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set   ($#k18_complex1 :::"abs"::: )  (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r1")) ")" ))) & (Bool (Set   ($#k18_complex1 :::"abs"::: )  (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r1")) ")" ))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "r1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f"))))) "holds"  (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Set (Var "f"))  ($#k1_seq_1 :::"."::: )  (Set (Var "r1"))))  ")" )  ")" ))  ")" )  ")" )  ")" ))) ; 
 
theorem :: LIMFUNC3:11 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) ) "holds"   (Bool  "("  (Bool (Set (Var "f"))  ($#r3_limfunc3 :::"is_divergent_to-infty_in"::: )  (Set (Var "x0"))) "iff" (Bool  "("  (Bool  "("   "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")))) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f"))))  ")" ))  ")" ) & (Bool  "("   "for" (Set (Var "g1")) "being"   ($#m1_subset_1 :::"Real":::) (Bool  "ex" (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool  "("   "for" (Set (Var "r1")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set   ($#k18_complex1 :::"abs"::: )  (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r1")) ")" ))) & (Bool (Set   ($#k18_complex1 :::"abs"::: )  (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r1")) ")" ))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "r1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f"))))) "holds"  (Bool (Set (Set (Var "f"))  ($#k1_seq_1 :::"."::: )  (Set (Var "r1")))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1")))  ")" )  ")" ))  ")" )  ")" )  ")" ))) ; 
 
theorem :: LIMFUNC3:12 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) ) "holds"   (Bool  "("  (Bool (Set (Var "f"))  ($#r2_limfunc3 :::"is_divergent_to+infty_in"::: )  (Set (Var "x0"))) "iff" (Bool  "("  (Bool (Set (Var "f"))  ($#r2_limfunc2 :::"is_left_divergent_to+infty_in"::: )  (Set (Var "x0"))) & (Bool (Set (Var "f"))  ($#r5_limfunc2 :::"is_right_divergent_to+infty_in"::: )  (Set (Var "x0")))  ")" )  ")" ))) ; 
 
theorem :: LIMFUNC3:13 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) ) "holds"   (Bool  "("  (Bool (Set (Var "f"))  ($#r3_limfunc3 :::"is_divergent_to-infty_in"::: )  (Set (Var "x0"))) "iff" (Bool  "("  (Bool (Set (Var "f"))  ($#r3_limfunc2 :::"is_left_divergent_to-infty_in"::: )  (Set (Var "x0"))) & (Bool (Set (Var "f"))  ($#r6_limfunc2 :::"is_right_divergent_to-infty_in"::: )  (Set (Var "x0")))  ")" )  ")" ))) ; 
 
theorem :: LIMFUNC3:14 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f1")) "," (Set (Var "f2")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool (Set (Var "f1"))  ($#r2_limfunc3 :::"is_divergent_to+infty_in"::: )  (Set (Var "x0"))) & (Bool (Set (Var "f2"))  ($#r2_limfunc3 :::"is_divergent_to+infty_in"::: )  (Set (Var "x0"))) & (Bool  "("   "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f1")) ")" )  ($#k3_xboole_0 :::"/\"::: )  (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f2")) ")" ))) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f1")) ")" )  ($#k3_xboole_0 :::"/\"::: )  (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f2")) ")" )))  ")" ))  ")" )) "holds"  (Bool  "("  (Bool (Set (Set (Var "f1"))  ($#k3_valued_1 :::"+"::: )  (Set (Var "f2")))  ($#r2_limfunc3 :::"is_divergent_to+infty_in"::: )  (Set (Var "x0"))) & (Bool (Set (Set (Var "f1"))  ($#k20_valued_1 :::"(#)"::: )  (Set (Var "f2")))  ($#r2_limfunc3 :::"is_divergent_to+infty_in"::: )  (Set (Var "x0")))  ")" ))) ; 
 
theorem :: LIMFUNC3:15 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f1")) "," (Set (Var "f2")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool (Set (Var "f1"))  ($#r3_limfunc3 :::"is_divergent_to-infty_in"::: )  (Set (Var "x0"))) & (Bool (Set (Var "f2"))  ($#r3_limfunc3 :::"is_divergent_to-infty_in"::: )  (Set (Var "x0"))) & (Bool  "("   "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f1")) ")" )  ($#k3_xboole_0 :::"/\"::: )  (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f2")) ")" ))) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f1")) ")" )  ($#k3_xboole_0 :::"/\"::: )  (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f2")) ")" )))  ")" ))  ")" )) "holds"  (Bool  "("  (Bool (Set (Set (Var "f1"))  ($#k3_valued_1 :::"+"::: )  (Set (Var "f2")))  ($#r3_limfunc3 :::"is_divergent_to-infty_in"::: )  (Set (Var "x0"))) & (Bool (Set (Set (Var "f1"))  ($#k20_valued_1 :::"(#)"::: )  (Set (Var "f2")))  ($#r2_limfunc3 :::"is_divergent_to+infty_in"::: )  (Set (Var "x0")))  ")" ))) ; 
 
theorem :: LIMFUNC3:16 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f1")) "," (Set (Var "f2")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool (Set (Var "f1"))  ($#r2_limfunc3 :::"is_divergent_to+infty_in"::: )  (Set (Var "x0"))) & (Bool  "("   "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set  "(" (Set (Var "f1"))  ($#k3_valued_1 :::"+"::: )  (Set (Var "f2")) ")" ))) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set  "(" (Set (Var "f1"))  ($#k3_valued_1 :::"+"::: )  (Set (Var "f2")) ")" )))  ")" ))  ")" ) & (Bool  "ex" (Set (Var "r")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r"))) & (Bool (Set (Set (Var "f2"))  ($#k2_partfun1 :::"|"::: )  (Set  "(" (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ) ")" )) "is"   ($#v2_seq_2 :::"bounded_below"::: )  )  ")" ))) "holds"  (Bool (Set (Set (Var "f1"))  ($#k3_valued_1 :::"+"::: )  (Set (Var "f2")))  ($#r2_limfunc3 :::"is_divergent_to+infty_in"::: )  (Set (Var "x0"))))) ; 
 
theorem :: LIMFUNC3:17 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f1")) "," (Set (Var "f2")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool (Set (Var "f1"))  ($#r2_limfunc3 :::"is_divergent_to+infty_in"::: )  (Set (Var "x0"))) & (Bool  "("   "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set  "(" (Set (Var "f1"))  ($#k20_valued_1 :::"(#)"::: )  (Set (Var "f2")) ")" ))) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set  "(" (Set (Var "f1"))  ($#k20_valued_1 :::"(#)"::: )  (Set (Var "f2")) ")" )))  ")" ))  ")" ) & (Bool  "ex" (Set (Var "r")) "," (Set (Var "r1")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r"))) & (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r1"))) & (Bool  "("   "for" (Set (Var "g")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "g"))  ($#r2_hidden :::"in"::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f2")) ")" )  ($#k9_subset_1 :::"/\"::: )  (Set  "(" (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ) ")" )))) "holds"  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<="::: )  (Set (Set (Var "f2"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g"))))  ")" )  ")" ))) "holds"  (Bool (Set (Set (Var "f1"))  ($#k20_valued_1 :::"(#)"::: )  (Set (Var "f2")))  ($#r2_limfunc3 :::"is_divergent_to+infty_in"::: )  (Set (Var "x0"))))) ; 
 
theorem :: LIMFUNC3:18 (Bool  "for" (Set (Var "x0")) "," (Set (Var "r")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) ) "holds"   (Bool  "("   "("  (Bool (Bool (Set (Var "f"))  ($#r2_limfunc3 :::"is_divergent_to+infty_in"::: )  (Set (Var "x0"))) & (Bool (Set (Var "r"))  ($#r1_xxreal_0 :::">"::: )  (Set   ($#k6_numbers :::"0"::: )  ))) "implies" (Bool (Set (Set (Var "r"))  ($#k26_valued_1 :::"(#)"::: )  (Set (Var "f")))  ($#r2_limfunc3 :::"is_divergent_to+infty_in"::: )  (Set (Var "x0")))  ")"  &  "("  (Bool (Bool (Set (Var "f"))  ($#r2_limfunc3 :::"is_divergent_to+infty_in"::: )  (Set (Var "x0"))) & (Bool (Set (Var "r"))  ($#r1_xxreal_0 :::"<"::: )  (Set   ($#k6_numbers :::"0"::: )  ))) "implies" (Bool (Set (Set (Var "r"))  ($#k26_valued_1 :::"(#)"::: )  (Set (Var "f")))  ($#r3_limfunc3 :::"is_divergent_to-infty_in"::: )  (Set (Var "x0")))  ")"  &  "("  (Bool (Bool (Set (Var "f"))  ($#r3_limfunc3 :::"is_divergent_to-infty_in"::: )  (Set (Var "x0"))) & (Bool (Set (Var "r"))  ($#r1_xxreal_0 :::">"::: )  (Set   ($#k6_numbers :::"0"::: )  ))) "implies" (Bool (Set (Set (Var "r"))  ($#k26_valued_1 :::"(#)"::: )  (Set (Var "f")))  ($#r3_limfunc3 :::"is_divergent_to-infty_in"::: )  (Set (Var "x0")))  ")"  &  "("  (Bool (Bool (Set (Var "f"))  ($#r3_limfunc3 :::"is_divergent_to-infty_in"::: )  (Set (Var "x0"))) & (Bool (Set (Var "r"))  ($#r1_xxreal_0 :::"<"::: )  (Set   ($#k6_numbers :::"0"::: )  ))) "implies" (Bool (Set (Set (Var "r"))  ($#k26_valued_1 :::"(#)"::: )  (Set (Var "f")))  ($#r2_limfunc3 :::"is_divergent_to+infty_in"::: )  (Set (Var "x0")))  ")"   ")" ))) ; 
 
theorem :: LIMFUNC3:19 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool  "("  (Bool (Set (Var "f"))  ($#r2_limfunc3 :::"is_divergent_to+infty_in"::: )  (Set (Var "x0"))) "or" (Bool (Set (Var "f"))  ($#r3_limfunc3 :::"is_divergent_to-infty_in"::: )  (Set (Var "x0")))  ")" )) "holds"  (Bool (Set   ($#k56_valued_1 :::"abs"::: )  (Set (Var "f")))  ($#r2_limfunc3 :::"is_divergent_to+infty_in"::: )  (Set (Var "x0"))))) ; 
 
theorem :: LIMFUNC3:20 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool  "ex" (Set (Var "r")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Set (Var "f"))  ($#k2_partfun1 :::"|"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )) "is"   ($#v7_valued_0 :::"non-decreasing"::: )  ) & (Bool (Set (Set (Var "f"))  ($#k2_partfun1 :::"|"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) )) "is"   ($#v8_valued_0 :::"non-increasing"::: )  ) & (Bool (Bool  "not" (Set (Set (Var "f"))  ($#k2_partfun1 :::"|"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )) "is"   ($#v1_seq_2 :::"bounded_above"::: )  )) & (Bool (Bool  "not" (Set (Set (Var "f"))  ($#k2_partfun1 :::"|"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) )) "is"   ($#v1_seq_2 :::"bounded_above"::: )  ))  ")" )) & (Bool  "("   "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")))) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f"))))  ")" ))  ")" )) "holds"  (Bool (Set (Var "f"))  ($#r2_limfunc3 :::"is_divergent_to+infty_in"::: )  (Set (Var "x0"))))) ; 
 
theorem :: LIMFUNC3:21 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool  "ex" (Set (Var "r")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r"))) & (Bool (Set (Set (Var "f"))  ($#k2_partfun1 :::"|"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )) "is"   ($#v5_valued_0 :::"increasing"::: )  ) & (Bool (Set (Set (Var "f"))  ($#k2_partfun1 :::"|"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) )) "is"   ($#v6_valued_0 :::"decreasing"::: )  ) & (Bool (Bool  "not" (Set (Set (Var "f"))  ($#k2_partfun1 :::"|"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )) "is"   ($#v1_seq_2 :::"bounded_above"::: )  )) & (Bool (Bool  "not" (Set (Set (Var "f"))  ($#k2_partfun1 :::"|"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) )) "is"   ($#v1_seq_2 :::"bounded_above"::: )  ))  ")" )) & (Bool  "("   "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")))) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f"))))  ")" ))  ")" )) "holds"  (Bool (Set (Var "f"))  ($#r2_limfunc3 :::"is_divergent_to+infty_in"::: )  (Set (Var "x0"))))) ; 
 
theorem :: LIMFUNC3:22 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool  "ex" (Set (Var "r")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Set (Var "f"))  ($#k2_partfun1 :::"|"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )) "is"   ($#v8_valued_0 :::"non-increasing"::: )  ) & (Bool (Set (Set (Var "f"))  ($#k2_partfun1 :::"|"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) )) "is"   ($#v7_valued_0 :::"non-decreasing"::: )  ) & (Bool (Bool  "not" (Set (Set (Var "f"))  ($#k2_partfun1 :::"|"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )) "is"   ($#v2_seq_2 :::"bounded_below"::: )  )) & (Bool (Bool  "not" (Set (Set (Var "f"))  ($#k2_partfun1 :::"|"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) )) "is"   ($#v2_seq_2 :::"bounded_below"::: )  ))  ")" )) & (Bool  "("   "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")))) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f"))))  ")" ))  ")" )) "holds"  (Bool (Set (Var "f"))  ($#r3_limfunc3 :::"is_divergent_to-infty_in"::: )  (Set (Var "x0"))))) ; 
 
theorem :: LIMFUNC3:23 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool  "ex" (Set (Var "r")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r"))) & (Bool (Set (Set (Var "f"))  ($#k2_partfun1 :::"|"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )) "is"   ($#v6_valued_0 :::"decreasing"::: )  ) & (Bool (Set (Set (Var "f"))  ($#k2_partfun1 :::"|"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) )) "is"   ($#v5_valued_0 :::"increasing"::: )  ) & (Bool (Bool  "not" (Set (Set (Var "f"))  ($#k2_partfun1 :::"|"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )) "is"   ($#v2_seq_2 :::"bounded_below"::: )  )) & (Bool (Bool  "not" (Set (Set (Var "f"))  ($#k2_partfun1 :::"|"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) )) "is"   ($#v2_seq_2 :::"bounded_below"::: )  ))  ")" )) & (Bool  "("   "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")))) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f"))))  ")" ))  ")" )) "holds"  (Bool (Set (Var "f"))  ($#r3_limfunc3 :::"is_divergent_to-infty_in"::: )  (Set (Var "x0"))))) ; 
 
theorem :: LIMFUNC3:24 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f1")) "," (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool (Set (Var "f1"))  ($#r2_limfunc3 :::"is_divergent_to+infty_in"::: )  (Set (Var "x0"))) & (Bool  "("   "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")))) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f"))))  ")" ))  ")" ) & (Bool  "ex" (Set (Var "r")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r"))) & (Bool (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")) ")" )  ($#k9_subset_1 :::"/\"::: )  (Set  "(" (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ) ")" ))  ($#r1_tarski :::"c="::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f1")) ")" )  ($#k9_subset_1 :::"/\"::: )  (Set  "(" (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ) ")" ))) & (Bool  "("   "for" (Set (Var "g")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "g"))  ($#r2_hidden :::"in"::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")) ")" )  ($#k9_subset_1 :::"/\"::: )  (Set  "(" (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ) ")" )))) "holds"  (Bool (Set (Set (Var "f1"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g")))  ($#r1_xxreal_0 :::"<="::: )  (Set (Set (Var "f"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g"))))  ")" )  ")" ))) "holds"  (Bool (Set (Var "f"))  ($#r2_limfunc3 :::"is_divergent_to+infty_in"::: )  (Set (Var "x0"))))) ; 
 
theorem :: LIMFUNC3:25 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f1")) "," (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool (Set (Var "f1"))  ($#r3_limfunc3 :::"is_divergent_to-infty_in"::: )  (Set (Var "x0"))) & (Bool  "("   "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")))) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f"))))  ")" ))  ")" ) & (Bool  "ex" (Set (Var "r")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r"))) & (Bool (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")) ")" )  ($#k9_subset_1 :::"/\"::: )  (Set  "(" (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ) ")" ))  ($#r1_tarski :::"c="::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f1")) ")" )  ($#k9_subset_1 :::"/\"::: )  (Set  "(" (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ) ")" ))) & (Bool  "("   "for" (Set (Var "g")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "g"))  ($#r2_hidden :::"in"::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")) ")" )  ($#k9_subset_1 :::"/\"::: )  (Set  "(" (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ) ")" )))) "holds"  (Bool (Set (Set (Var "f"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g")))  ($#r1_xxreal_0 :::"<="::: )  (Set (Set (Var "f1"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g"))))  ")" )  ")" ))) "holds"  (Bool (Set (Var "f"))  ($#r3_limfunc3 :::"is_divergent_to-infty_in"::: )  (Set (Var "x0"))))) ; 
 
theorem :: LIMFUNC3:26 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f1")) "," (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool (Set (Var "f1"))  ($#r2_limfunc3 :::"is_divergent_to+infty_in"::: )  (Set (Var "x0"))) & (Bool  "ex" (Set (Var "r")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r"))) & (Bool (Set (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ))  ($#r1_tarski :::"c="::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")) ")" )  ($#k3_xboole_0 :::"/\"::: )  (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f1")) ")" ))) & (Bool  "("   "for" (Set (Var "g")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "g"))  ($#r2_hidden :::"in"::: )  (Set (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) )))) "holds"  (Bool (Set (Set (Var "f1"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g")))  ($#r1_xxreal_0 :::"<="::: )  (Set (Set (Var "f"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g"))))  ")" )  ")" ))) "holds"  (Bool (Set (Var "f"))  ($#r2_limfunc3 :::"is_divergent_to+infty_in"::: )  (Set (Var "x0"))))) ; 
 
theorem :: LIMFUNC3:27 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f1")) "," (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool (Set (Var "f1"))  ($#r3_limfunc3 :::"is_divergent_to-infty_in"::: )  (Set (Var "x0"))) & (Bool  "ex" (Set (Var "r")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r"))) & (Bool (Set (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ))  ($#r1_tarski :::"c="::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")) ")" )  ($#k3_xboole_0 :::"/\"::: )  (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f1")) ")" ))) & (Bool  "("   "for" (Set (Var "g")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "g"))  ($#r2_hidden :::"in"::: )  (Set (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) )))) "holds"  (Bool (Set (Set (Var "f"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g")))  ($#r1_xxreal_0 :::"<="::: )  (Set (Set (Var "f1"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g"))))  ")" )  ")" ))) "holds"  (Bool (Set (Var "f"))  ($#r3_limfunc3 :::"is_divergent_to-infty_in"::: )  (Set (Var "x0"))))) ; 
 definitionlet "f" be   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) ); let "x0" be   ($#m1_subset_1 :::"Real":::); assume 
(Bool (Set (Const "f"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Const "x0")))
 ; func  :::"lim":::  "(" "f" "," "x0" ")"  ->   ($#m1_subset_1 :::"Real":::) means :: LIMFUNC3:def 4 (Bool  "for" (Set (Var "seq")) "being"   ($#m1_subset_1 :::"Real_Sequence":::)  "st" (Bool (Bool (Set (Var "seq")) "is"   ($#v2_comseq_2 :::"convergent"::: )  ) & (Bool (Set   ($#k2_seq_2 :::"lim"::: )  (Set (Var "seq")))  ($#r1_hidden :::"="::: )  "x0") & (Bool (Set   ($#k10_xtuple_0 :::"rng"::: )  (Set (Var "seq")))  ($#r1_tarski :::"c="::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  "f" ")" )  ($#k6_subset_1 :::"\"::: )  (Set  ($#k1_tarski :::"{"::: ) "x0" ($#k1_tarski :::"}"::: ) )))) "holds"  (Bool  "("  (Bool (Set "f"  ($#k8_funct_2 :::"/*"::: )  (Set (Var "seq"))) "is"   ($#v2_comseq_2 :::"convergent"::: )  ) & (Bool (Set   ($#k2_seq_2 :::"lim"::: )  (Set  "(" "f"  ($#k8_funct_2 :::"/*"::: )  (Set (Var "seq")) ")" ))  ($#r1_hidden :::"="::: )  it)  ")" )); end; 







:: deftheorem    defines :::"lim"::: LIMFUNC3:def 4 :  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "f"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0")))) "holds"  (Bool  "for" (Set (Var "b3")) "being"   ($#m1_subset_1 :::"Real":::) "holds"   (Bool  "("  (Bool (Set (Var "b3"))  ($#r1_hidden :::"="::: )  (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f")) "," (Set (Var "x0")) ")" )) "iff" (Bool  "for" (Set (Var "seq")) "being"   ($#m1_subset_1 :::"Real_Sequence":::)  "st" (Bool (Bool (Set (Var "seq")) "is"   ($#v2_comseq_2 :::"convergent"::: )  ) & (Bool (Set   ($#k2_seq_2 :::"lim"::: )  (Set (Var "seq")))  ($#r1_hidden :::"="::: )  (Set (Var "x0"))) & (Bool (Set   ($#k10_xtuple_0 :::"rng"::: )  (Set (Var "seq")))  ($#r1_tarski :::"c="::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")) ")" )  ($#k6_subset_1 :::"\"::: )  (Set  ($#k1_tarski :::"{"::: ) (Set (Var "x0")) ($#k1_tarski :::"}"::: ) )))) "holds"  (Bool  "("  (Bool (Set (Set (Var "f"))  ($#k8_funct_2 :::"/*"::: )  (Set (Var "seq"))) "is"   ($#v2_comseq_2 :::"convergent"::: )  ) & (Bool (Set   ($#k2_seq_2 :::"lim"::: )  (Set  "(" (Set (Var "f"))  ($#k8_funct_2 :::"/*"::: )  (Set (Var "seq")) ")" ))  ($#r1_hidden :::"="::: )  (Set (Var "b3")))  ")" ))  ")" )))); 
 
theorem :: LIMFUNC3:28 (Bool  "for" (Set (Var "x0")) "," (Set (Var "g")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool (Set (Var "f"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0")))) "holds"  (Bool  "("  (Bool (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f")) "," (Set (Var "x0")) ")" )  ($#r1_hidden :::"="::: )  (Set (Var "g"))) "iff" (Bool  "for" (Set (Var "g1")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1")))) "holds"  (Bool  "ex" (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool  "("   "for" (Set (Var "r1")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set   ($#k18_complex1 :::"abs"::: )  (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r1")) ")" ))) & (Bool (Set   ($#k18_complex1 :::"abs"::: )  (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r1")) ")" ))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "r1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f"))))) "holds"  (Bool (Set   ($#k18_complex1 :::"abs"::: )  (Set  "(" (Set  "(" (Set (Var "f"))  ($#k1_seq_1 :::"."::: )  (Set (Var "r1")) ")" )  ($#k9_real_1 :::"-"::: )  (Set (Var "g")) ")" ))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1")))  ")" )  ")" )))  ")" ))) ; 
 
theorem :: LIMFUNC3:29 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool (Set (Var "f"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0")))) "holds"  (Bool  "("  (Bool (Set (Var "f"))  ($#r1_limfunc2 :::"is_left_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set (Var "f"))  ($#r4_limfunc2 :::"is_right_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set   ($#k1_limfunc2 :::"lim_left"::: )   "(" (Set (Var "f")) "," (Set (Var "x0")) ")" )  ($#r1_hidden :::"="::: )  (Set   ($#k2_limfunc2 :::"lim_right"::: )   "(" (Set (Var "f")) "," (Set (Var "x0")) ")" )) & (Bool (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f")) "," (Set (Var "x0")) ")" )  ($#r1_hidden :::"="::: )  (Set   ($#k1_limfunc2 :::"lim_left"::: )   "(" (Set (Var "f")) "," (Set (Var "x0")) ")" )) & (Bool (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f")) "," (Set (Var "x0")) ")" )  ($#r1_hidden :::"="::: )  (Set   ($#k2_limfunc2 :::"lim_right"::: )   "(" (Set (Var "f")) "," (Set (Var "x0")) ")" ))  ")" ))) ; 
 
theorem :: LIMFUNC3:30 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool (Set (Var "f"))  ($#r1_limfunc2 :::"is_left_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set (Var "f"))  ($#r4_limfunc2 :::"is_right_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set   ($#k1_limfunc2 :::"lim_left"::: )   "(" (Set (Var "f")) "," (Set (Var "x0")) ")" )  ($#r1_hidden :::"="::: )  (Set   ($#k2_limfunc2 :::"lim_right"::: )   "(" (Set (Var "f")) "," (Set (Var "x0")) ")" ))) "holds"  (Bool  "("  (Bool (Set (Var "f"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f")) "," (Set (Var "x0")) ")" )  ($#r1_hidden :::"="::: )  (Set   ($#k1_limfunc2 :::"lim_left"::: )   "(" (Set (Var "f")) "," (Set (Var "x0")) ")" )) & (Bool (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f")) "," (Set (Var "x0")) ")" )  ($#r1_hidden :::"="::: )  (Set   ($#k2_limfunc2 :::"lim_right"::: )   "(" (Set (Var "f")) "," (Set (Var "x0")) ")" ))  ")" ))) ; 
 
theorem :: LIMFUNC3:31 (Bool  "for" (Set (Var "x0")) "," (Set (Var "r")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool (Set (Var "f"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0")))) "holds"  (Bool  "("  (Bool (Set (Set (Var "r"))  ($#k26_valued_1 :::"(#)"::: )  (Set (Var "f")))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set  "(" (Set (Var "r"))  ($#k26_valued_1 :::"(#)"::: )  (Set (Var "f")) ")" ) "," (Set (Var "x0")) ")" )  ($#r1_hidden :::"="::: )  (Set (Set (Var "r"))  ($#k8_real_1 :::"*"::: )  (Set  "("  ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f")) "," (Set (Var "x0")) ")"  ")" )))  ")" ))) ; 
 
theorem :: LIMFUNC3:32 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool (Set (Var "f"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0")))) "holds"  (Bool  "("  (Bool (Set   ($#k32_valued_1 :::"-"::: )  (Set (Var "f")))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set  "("  ($#k32_valued_1 :::"-"::: )  (Set (Var "f")) ")" ) "," (Set (Var "x0")) ")" )  ($#r1_hidden :::"="::: )  (Set   ($#k1_real_1 :::"-"::: )  (Set  "("  ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f")) "," (Set (Var "x0")) ")"  ")" )))  ")" ))) ; 
 
theorem :: LIMFUNC3:33 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f1")) "," (Set (Var "f2")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool (Set (Var "f1"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set (Var "f2"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool  "("   "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set  "(" (Set (Var "f1"))  ($#k3_valued_1 :::"+"::: )  (Set (Var "f2")) ")" ))) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set  "(" (Set (Var "f1"))  ($#k3_valued_1 :::"+"::: )  (Set (Var "f2")) ")" )))  ")" ))  ")" )) "holds"  (Bool  "("  (Bool (Set (Set (Var "f1"))  ($#k3_valued_1 :::"+"::: )  (Set (Var "f2")))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set  "(" (Set (Var "f1"))  ($#k3_valued_1 :::"+"::: )  (Set (Var "f2")) ")" ) "," (Set (Var "x0")) ")" )  ($#r1_hidden :::"="::: )  (Set (Set  "("  ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f1")) "," (Set (Var "x0")) ")"  ")" )  ($#k7_real_1 :::"+"::: )  (Set  "("  ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f2")) "," (Set (Var "x0")) ")"  ")" )))  ")" ))) ; 
 
theorem :: LIMFUNC3:34 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f1")) "," (Set (Var "f2")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool (Set (Var "f1"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set (Var "f2"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool  "("   "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set  "(" (Set (Var "f1"))  ($#k47_valued_1 :::"-"::: )  (Set (Var "f2")) ")" ))) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set  "(" (Set (Var "f1"))  ($#k47_valued_1 :::"-"::: )  (Set (Var "f2")) ")" )))  ")" ))  ")" )) "holds"  (Bool  "("  (Bool (Set (Set (Var "f1"))  ($#k47_valued_1 :::"-"::: )  (Set (Var "f2")))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set  "(" (Set (Var "f1"))  ($#k47_valued_1 :::"-"::: )  (Set (Var "f2")) ")" ) "," (Set (Var "x0")) ")" )  ($#r1_hidden :::"="::: )  (Set (Set  "("  ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f1")) "," (Set (Var "x0")) ")"  ")" )  ($#k9_real_1 :::"-"::: )  (Set  "("  ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f2")) "," (Set (Var "x0")) ")"  ")" )))  ")" ))) ; 
 
theorem :: LIMFUNC3:35 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool (Set (Var "f"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set (Set (Var "f"))  ($#k8_relat_1 :::"""::: )  (Set  ($#k1_tarski :::"{"::: ) (Set  ($#k6_numbers :::"0"::: ) ) ($#k1_tarski :::"}"::: ) ))  ($#r1_hidden :::"="::: )  (Set   ($#k1_xboole_0 :::"{}"::: )  )) & (Bool (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f")) "," (Set (Var "x0")) ")" )  ($#r1_hidden :::"<>"::: )  (Set   ($#k6_numbers :::"0"::: )  ))) "holds"  (Bool  "("  (Bool (Set (Set (Var "f"))  ($#k6_rfunct_1 :::"^"::: )  )  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set  "(" (Set (Var "f"))  ($#k6_rfunct_1 :::"^"::: )  ")" ) "," (Set (Var "x0")) ")" )  ($#r1_hidden :::"="::: )  (Set (Set  "("  ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f")) "," (Set (Var "x0")) ")"  ")" )  ($#k2_real_1 :::"""::: )  ))  ")" ))) ; 
 
theorem :: LIMFUNC3:36 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool (Set (Var "f"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0")))) "holds"  (Bool  "("  (Bool (Set   ($#k56_valued_1 :::"abs"::: )  (Set (Var "f")))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set  "("  ($#k56_valued_1 :::"abs"::: )  (Set (Var "f")) ")" ) "," (Set (Var "x0")) ")" )  ($#r1_hidden :::"="::: )  (Set   ($#k18_complex1 :::"abs"::: )  (Set  "("  ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f")) "," (Set (Var "x0")) ")"  ")" )))  ")" ))) ; 
 
theorem :: LIMFUNC3:37 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool (Set (Var "f"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f")) "," (Set (Var "x0")) ")" )  ($#r1_hidden :::"<>"::: )  (Set   ($#k6_numbers :::"0"::: )  )) & (Bool  "("   "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")))) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")))) & (Bool (Set (Set (Var "f"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g1")))  ($#r1_hidden :::"<>"::: )  (Set   ($#k6_numbers :::"0"::: )  )) & (Bool (Set (Set (Var "f"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g2")))  ($#r1_hidden :::"<>"::: )  (Set   ($#k6_numbers :::"0"::: )  ))  ")" ))  ")" )) "holds"  (Bool  "("  (Bool (Set (Set (Var "f"))  ($#k6_rfunct_1 :::"^"::: )  )  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set  "(" (Set (Var "f"))  ($#k6_rfunct_1 :::"^"::: )  ")" ) "," (Set (Var "x0")) ")" )  ($#r1_hidden :::"="::: )  (Set (Set  "("  ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f")) "," (Set (Var "x0")) ")"  ")" )  ($#k2_real_1 :::"""::: )  ))  ")" ))) ; 
 
theorem :: LIMFUNC3:38 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f1")) "," (Set (Var "f2")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool (Set (Var "f1"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set (Var "f2"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool  "("   "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set  "(" (Set (Var "f1"))  ($#k20_valued_1 :::"(#)"::: )  (Set (Var "f2")) ")" ))) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set  "(" (Set (Var "f1"))  ($#k20_valued_1 :::"(#)"::: )  (Set (Var "f2")) ")" )))  ")" ))  ")" )) "holds"  (Bool  "("  (Bool (Set (Set (Var "f1"))  ($#k20_valued_1 :::"(#)"::: )  (Set (Var "f2")))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set  "(" (Set (Var "f1"))  ($#k20_valued_1 :::"(#)"::: )  (Set (Var "f2")) ")" ) "," (Set (Var "x0")) ")" )  ($#r1_hidden :::"="::: )  (Set (Set  "("  ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f1")) "," (Set (Var "x0")) ")"  ")" )  ($#k8_real_1 :::"*"::: )  (Set  "("  ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f2")) "," (Set (Var "x0")) ")"  ")" )))  ")" ))) ; 
 
theorem :: LIMFUNC3:39 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f1")) "," (Set (Var "f2")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool (Set (Var "f1"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set (Var "f2"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f2")) "," (Set (Var "x0")) ")" )  ($#r1_hidden :::"<>"::: )  (Set   ($#k6_numbers :::"0"::: )  )) & (Bool  "("   "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set  "(" (Set (Var "f1"))  ($#k3_rfunct_1 :::"/"::: )  (Set (Var "f2")) ")" ))) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set  "(" (Set (Var "f1"))  ($#k3_rfunct_1 :::"/"::: )  (Set (Var "f2")) ")" )))  ")" ))  ")" )) "holds"  (Bool  "("  (Bool (Set (Set (Var "f1"))  ($#k3_rfunct_1 :::"/"::: )  (Set (Var "f2")))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set  "(" (Set (Var "f1"))  ($#k3_rfunct_1 :::"/"::: )  (Set (Var "f2")) ")" ) "," (Set (Var "x0")) ")" )  ($#r1_hidden :::"="::: )  (Set (Set  "("  ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f1")) "," (Set (Var "x0")) ")"  ")" )  ($#k10_real_1 :::"/"::: )  (Set  "("  ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f2")) "," (Set (Var "x0")) ")"  ")" )))  ")" ))) ; 
 
theorem :: LIMFUNC3:40 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f1")) "," (Set (Var "f2")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool (Set (Var "f1"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f1")) "," (Set (Var "x0")) ")" )  ($#r1_hidden :::"="::: )  (Set   ($#k6_numbers :::"0"::: )  )) & (Bool  "("   "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set  "(" (Set (Var "f1"))  ($#k20_valued_1 :::"(#)"::: )  (Set (Var "f2")) ")" ))) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set  "(" (Set (Var "f1"))  ($#k20_valued_1 :::"(#)"::: )  (Set (Var "f2")) ")" )))  ")" ))  ")" ) & (Bool  "ex" (Set (Var "r")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r"))) & (Bool (Set (Set (Var "f2"))  ($#k2_partfun1 :::"|"::: )  (Set  "(" (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ) ")" )) "is"   ($#v1_comseq_2 :::"bounded"::: )  )  ")" ))) "holds"  (Bool  "("  (Bool (Set (Set (Var "f1"))  ($#k20_valued_1 :::"(#)"::: )  (Set (Var "f2")))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set  "(" (Set (Var "f1"))  ($#k20_valued_1 :::"(#)"::: )  (Set (Var "f2")) ")" ) "," (Set (Var "x0")) ")" )  ($#r1_hidden :::"="::: )  (Set   ($#k6_numbers :::"0"::: )  ))  ")" ))) ; 
 
theorem :: LIMFUNC3:41 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f1")) "," (Set (Var "f2")) "," (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool (Set (Var "f1"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set (Var "f2"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f1")) "," (Set (Var "x0")) ")" )  ($#r1_hidden :::"="::: )  (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f2")) "," (Set (Var "x0")) ")" )) & (Bool  "("   "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")))) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f"))))  ")" ))  ")" ) & (Bool  "ex" (Set (Var "r")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r"))) & (Bool  "("   "for" (Set (Var "g")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "g"))  ($#r2_hidden :::"in"::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")) ")" )  ($#k9_subset_1 :::"/\"::: )  (Set  "(" (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ) ")" )))) "holds"  (Bool  "("  (Bool (Set (Set (Var "f1"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g")))  ($#r1_xxreal_0 :::"<="::: )  (Set (Set (Var "f"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g")))) & (Bool (Set (Set (Var "f"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g")))  ($#r1_xxreal_0 :::"<="::: )  (Set (Set (Var "f2"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g"))))  ")" )  ")" ) & (Bool  "("  (Bool  "("  (Bool (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f1")) ")" )  ($#k9_subset_1 :::"/\"::: )  (Set  "(" (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ) ")" ))  ($#r1_tarski :::"c="::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f2")) ")" )  ($#k9_subset_1 :::"/\"::: )  (Set  "(" (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ) ")" ))) & (Bool (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")) ")" )  ($#k9_subset_1 :::"/\"::: )  (Set  "(" (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ) ")" ))  ($#r1_tarski :::"c="::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f1")) ")" )  ($#k9_subset_1 :::"/\"::: )  (Set  "(" (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ) ")" )))  ")" ) "or" (Bool  "("  (Bool (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f2")) ")" )  ($#k9_subset_1 :::"/\"::: )  (Set  "(" (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ) ")" ))  ($#r1_tarski :::"c="::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f1")) ")" )  ($#k9_subset_1 :::"/\"::: )  (Set  "(" (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ) ")" ))) & (Bool (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")) ")" )  ($#k9_subset_1 :::"/\"::: )  (Set  "(" (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ) ")" ))  ($#r1_tarski :::"c="::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f2")) ")" )  ($#k9_subset_1 :::"/\"::: )  (Set  "(" (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ) ")" )))  ")" )  ")" )  ")" ))) "holds"  (Bool  "("  (Bool (Set (Var "f"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f")) "," (Set (Var "x0")) ")" )  ($#r1_hidden :::"="::: )  (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f1")) "," (Set (Var "x0")) ")" ))  ")" ))) ; 
 
theorem :: LIMFUNC3:42 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f1")) "," (Set (Var "f2")) "," (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool (Set (Var "f1"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set (Var "f2"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f1")) "," (Set (Var "x0")) ")" )  ($#r1_hidden :::"="::: )  (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f2")) "," (Set (Var "x0")) ")" )) & (Bool  "ex" (Set (Var "r")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r"))) & (Bool (Set (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ))  ($#r1_tarski :::"c="::: )  (Set (Set  "(" (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f1")) ")" )  ($#k3_xboole_0 :::"/\"::: )  (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f2")) ")" ) ")" )  ($#k3_xboole_0 :::"/\"::: )  (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")) ")" ))) & (Bool  "("   "for" (Set (Var "g")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "g"))  ($#r2_hidden :::"in"::: )  (Set (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) )))) "holds"  (Bool  "("  (Bool (Set (Set (Var "f1"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g")))  ($#r1_xxreal_0 :::"<="::: )  (Set (Set (Var "f"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g")))) & (Bool (Set (Set (Var "f"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g")))  ($#r1_xxreal_0 :::"<="::: )  (Set (Set (Var "f2"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g"))))  ")" )  ")" )  ")" ))) "holds"  (Bool  "("  (Bool (Set (Var "f"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f")) "," (Set (Var "x0")) ")" )  ($#r1_hidden :::"="::: )  (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f1")) "," (Set (Var "x0")) ")" ))  ")" ))) ; 
 
theorem :: LIMFUNC3:43 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f1")) "," (Set (Var "f2")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool (Set (Var "f1"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set (Var "f2"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool  "ex" (Set (Var "r")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r"))) & (Bool  "("  (Bool  "("  (Bool (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f1")) ")" )  ($#k9_subset_1 :::"/\"::: )  (Set  "(" (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ) ")" ))  ($#r1_tarski :::"c="::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f2")) ")" )  ($#k9_subset_1 :::"/\"::: )  (Set  "(" (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ) ")" ))) & (Bool  "("   "for" (Set (Var "g")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "g"))  ($#r2_hidden :::"in"::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f1")) ")" )  ($#k9_subset_1 :::"/\"::: )  (Set  "(" (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ) ")" )))) "holds"  (Bool (Set (Set (Var "f1"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g")))  ($#r1_xxreal_0 :::"<="::: )  (Set (Set (Var "f2"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g"))))  ")" )  ")" ) "or" (Bool  "("  (Bool (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f2")) ")" )  ($#k9_subset_1 :::"/\"::: )  (Set  "(" (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ) ")" ))  ($#r1_tarski :::"c="::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f1")) ")" )  ($#k9_subset_1 :::"/\"::: )  (Set  "(" (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ) ")" ))) & (Bool  "("   "for" (Set (Var "g")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "g"))  ($#r2_hidden :::"in"::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f2")) ")" )  ($#k9_subset_1 :::"/\"::: )  (Set  "(" (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ) ")" )))) "holds"  (Bool (Set (Set (Var "f1"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g")))  ($#r1_xxreal_0 :::"<="::: )  (Set (Set (Var "f2"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g"))))  ")" )  ")" )  ")" )  ")" ))) "holds"  (Bool (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f1")) "," (Set (Var "x0")) ")" )  ($#r1_xxreal_0 :::"<="::: )  (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f2")) "," (Set (Var "x0")) ")" )))) ; 
 
theorem :: LIMFUNC3:44 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool  "("  (Bool (Set (Var "f"))  ($#r2_limfunc3 :::"is_divergent_to+infty_in"::: )  (Set (Var "x0"))) "or" (Bool (Set (Var "f"))  ($#r3_limfunc3 :::"is_divergent_to-infty_in"::: )  (Set (Var "x0")))  ")" ) & (Bool  "("   "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")))) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")))) & (Bool (Set (Set (Var "f"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g1")))  ($#r1_hidden :::"<>"::: )  (Set   ($#k6_numbers :::"0"::: )  )) & (Bool (Set (Set (Var "f"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g2")))  ($#r1_hidden :::"<>"::: )  (Set   ($#k6_numbers :::"0"::: )  ))  ")" ))  ")" )) "holds"  (Bool  "("  (Bool (Set (Set (Var "f"))  ($#k6_rfunct_1 :::"^"::: )  )  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set  "(" (Set (Var "f"))  ($#k6_rfunct_1 :::"^"::: )  ")" ) "," (Set (Var "x0")) ")" )  ($#r1_hidden :::"="::: )  (Set   ($#k6_numbers :::"0"::: )  ))  ")" ))) ; 
 
theorem :: LIMFUNC3:45 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool (Set (Var "f"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f")) "," (Set (Var "x0")) ")" )  ($#r1_hidden :::"="::: )  (Set   ($#k6_numbers :::"0"::: )  )) & (Bool  "("   "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")))) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")))) & (Bool (Set (Set (Var "f"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g1")))  ($#r1_hidden :::"<>"::: )  (Set   ($#k6_numbers :::"0"::: )  )) & (Bool (Set (Set (Var "f"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g2")))  ($#r1_hidden :::"<>"::: )  (Set   ($#k6_numbers :::"0"::: )  ))  ")" ))  ")" ) & (Bool  "ex" (Set (Var "r")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r"))) & (Bool  "("   "for" (Set (Var "g")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "g"))  ($#r2_hidden :::"in"::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")) ")" )  ($#k9_subset_1 :::"/\"::: )  (Set  "(" (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ) ")" )))) "holds"  (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<="::: )  (Set (Set (Var "f"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g"))))  ")" )  ")" ))) "holds"  (Bool (Set (Set (Var "f"))  ($#k6_rfunct_1 :::"^"::: )  )  ($#r2_limfunc3 :::"is_divergent_to+infty_in"::: )  (Set (Var "x0"))))) ; 
 
theorem :: LIMFUNC3:46 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool (Set (Var "f"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f")) "," (Set (Var "x0")) ")" )  ($#r1_hidden :::"="::: )  (Set   ($#k6_numbers :::"0"::: )  )) & (Bool  "("   "for" (Set (Var "r1")) "," (Set (Var "r2")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2")))) "holds"  (Bool  "ex" (Set (Var "g1")) "," (Set (Var "g2")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set (Var "r1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g1"))) & (Bool (Set (Var "g1"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "x0"))) & (Bool (Set (Var "g1"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")))) & (Bool (Set (Var "g2"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r2"))) & (Bool (Set (Var "x0"))  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "g2"))) & (Bool (Set (Var "g2"))  ($#r2_hidden :::"in"::: )  (Set   ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")))) & (Bool (Set (Set (Var "f"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g1")))  ($#r1_hidden :::"<>"::: )  (Set   ($#k6_numbers :::"0"::: )  )) & (Bool (Set (Set (Var "f"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g2")))  ($#r1_hidden :::"<>"::: )  (Set   ($#k6_numbers :::"0"::: )  ))  ")" ))  ")" ) & (Bool  "ex" (Set (Var "r")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r"))) & (Bool  "("   "for" (Set (Var "g")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "g"))  ($#r2_hidden :::"in"::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")) ")" )  ($#k9_subset_1 :::"/\"::: )  (Set  "(" (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ) ")" )))) "holds"  (Bool (Set (Set (Var "f"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g")))  ($#r1_xxreal_0 :::"<="::: )  (Set   ($#k6_numbers :::"0"::: )  ))  ")" )  ")" ))) "holds"  (Bool (Set (Set (Var "f"))  ($#k6_rfunct_1 :::"^"::: )  )  ($#r3_limfunc3 :::"is_divergent_to-infty_in"::: )  (Set (Var "x0"))))) ; 
 
theorem :: LIMFUNC3:47 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool (Set (Var "f"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f")) "," (Set (Var "x0")) ")" )  ($#r1_hidden :::"="::: )  (Set   ($#k6_numbers :::"0"::: )  )) & (Bool  "ex" (Set (Var "r")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r"))) & (Bool  "("   "for" (Set (Var "g")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "g"))  ($#r2_hidden :::"in"::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")) ")" )  ($#k9_subset_1 :::"/\"::: )  (Set  "(" (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ) ")" )))) "holds"  (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set (Set (Var "f"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g"))))  ")" )  ")" ))) "holds"  (Bool (Set (Set (Var "f"))  ($#k6_rfunct_1 :::"^"::: )  )  ($#r2_limfunc3 :::"is_divergent_to+infty_in"::: )  (Set (Var "x0"))))) ; 
 
theorem :: LIMFUNC3:48 (Bool  "for" (Set (Var "x0")) "being"   ($#m1_subset_1 :::"Real":::)  (Bool  "for" (Set (Var "f")) "being"   ($#m1_subset_1 :::"PartFunc":::) "of" (Set  ($#k1_numbers :::"REAL"::: ) ) "," (Set  ($#k1_numbers :::"REAL"::: ) )  "st" (Bool (Bool (Set (Var "f"))  ($#r1_limfunc3 :::"is_convergent_in"::: )  (Set (Var "x0"))) & (Bool (Set   ($#k1_limfunc3 :::"lim"::: )   "(" (Set (Var "f")) "," (Set (Var "x0")) ")" )  ($#r1_hidden :::"="::: )  (Set   ($#k6_numbers :::"0"::: )  )) & (Bool  "ex" (Set (Var "r")) "being"   ($#m1_subset_1 :::"Real":::) "st"  (Bool  "("  (Bool (Set   ($#k6_numbers :::"0"::: )  )  ($#r1_xxreal_0 :::"<"::: )  (Set (Var "r"))) & (Bool  "("   "for" (Set (Var "g")) "being"   ($#m1_subset_1 :::"Real":::)  "st" (Bool (Bool (Set (Var "g"))  ($#r2_hidden :::"in"::: )  (Set (Set  "("  ($#k9_xtuple_0 :::"dom"::: )  (Set (Var "f")) ")" )  ($#k9_subset_1 :::"/\"::: )  (Set  "(" (Set  ($#k2_rcomp_1 :::"]."::: ) (Set  "(" (Set (Var "x0"))  ($#k9_real_1 :::"-"::: )  (Set (Var "r")) ")" ) "," (Set (Var "x0")) ($#k2_rcomp_1 :::".["::: ) )  ($#k4_subset_1 :::"\/"::: )  (Set  ($#k2_rcomp_1 :::"]."::: ) (Set (Var "x0")) "," (Set  "(" (Set (Var "x0"))  ($#k7_real_1 :::"+"::: )  (Set (Var "r")) ")" ) ($#k2_rcomp_1 :::".["::: ) ) ")" )))) "holds"  (Bool (Set (Set (Var "f"))  ($#k1_seq_1 :::"."::: )  (Set (Var "g")))  ($#r1_xxreal_0 :::"<"::: )  (Set   ($#k6_numbers :::"0"::: )  ))  ")" )  ")" ))) "holds"  (Bool (Set (Set (Var "f"))  ($#k6_rfunct_1 :::"^"::: )  )  ($#r3_limfunc3 :::"is_divergent_to-infty_in"::: )  (Set (Var "x0"))))) ;