let n be non trivial Nat; :: thesis: Sum (Basel-seq,n) < 5 / 3
Z2: Sum (Basel-seq,n) = ((Partial_Sums Basel-seq) . (0 + 1)) + (((Partial_Sums Basel-seq) . n) - ((Partial_Sums Basel-seq) . 1))
.= (((Partial_Sums Basel-seq) . 0) + (Basel-seq . 1)) + (((Partial_Sums Basel-seq) . n) - ((Partial_Sums Basel-seq) . 1)) by SERIES_1:def 1
.= ((Basel-seq . 0) + (Basel-seq . 1)) + (((Partial_Sums Basel-seq) . n) - ((Partial_Sums Basel-seq) . 1)) by SERIES_1:def 1
.= ((1 / (0 ^2)) + (Basel-seq . 1)) + (Sum (Basel-seq,n,1)) by BASEL_1:31
.= ((1 / 0) + (1 / (1 ^2))) + (Sum (Basel-seq,n,1)) by BASEL_1:31
.= 1 + (Sum (Basel-seq,n,1)) ;
Z5: Sum (Basel-seq,n) < 1 + (Sum (Reci-seq1,n,1)) by Z2, XREAL_1:8, Impor2;
1 + (Sum (Reci-seq1,n,1)) < 1 + (2 / 3) by XREAL_1:8, Seq3;
hence Sum (Basel-seq,n) < 5 / 3 by Z5, XXREAL_0:2; :: thesis: verum