let n be Nat; :: thesis: for a being Real st a <> 1 holds
((((a * (1 - (a |^ n))) / ((1 - a) |^ 2)) - ((n * (a |^ (n + 1))) / (1 - a))) + (n * (a |^ (n + 1)))) + (a |^ (n + 1)) = ((a * (1 - (a |^ (n + 1)))) / ((1 - a) |^ 2)) - (((n + 1) * (a |^ (n + 2))) / (1 - a))
let a be Real; :: thesis: ( a <> 1 implies ((((a * (1 - (a |^ n))) / ((1 - a) |^ 2)) - ((n * (a |^ (n + 1))) / (1 - a))) + (n * (a |^ (n + 1)))) + (a |^ (n + 1)) = ((a * (1 - (a |^ (n + 1)))) / ((1 - a) |^ 2)) - (((n + 1) * (a |^ (n + 2))) / (1 - a)) )
assume a <> 1 ; :: thesis: ((((a * (1 - (a |^ n))) / ((1 - a) |^ 2)) - ((n * (a |^ (n + 1))) / (1 - a))) + (n * (a |^ (n + 1)))) + (a |^ (n + 1)) = ((a * (1 - (a |^ (n + 1)))) / ((1 - a) |^ 2)) - (((n + 1) * (a |^ (n + 2))) / (1 - a))
then A1: 1 - a <> 0 ;
then ((((a * (1 - (a |^ n))) / ((1 - a) |^ 2)) - ((n * (a |^ (n + 1))) / (1 - a))) + (n * (a |^ (n + 1)))) + (a |^ (n + 1)) = ((((a * (1 - (a |^ n))) / ((1 - a) |^ 2)) - (((1 - a) * (n * (a |^ (n + 1)))) / ((1 - a) * (1 - a)))) + (n * (a |^ (n + 1)))) + (a |^ (n + 1)) by XCMPLX_1:91
.= ((((a * (1 - (a |^ n))) / ((1 - a) |^ 2)) - (((1 - a) * (n * (a |^ (n + 1)))) / ((1 - a) |^ 2))) + (n * (a |^ (n + 1)))) + (a |^ (n + 1)) by WSIERP_1:1
.= ((((a - (a * (a |^ n))) - ((n * (a |^ (n + 1))) - ((n * (a |^ (n + 1))) * a))) / ((1 - a) |^ 2)) + (n * (a |^ (n + 1)))) + (a |^ (n + 1)) by XCMPLX_1:120
.= ((((a - (a * (a |^ n))) - (n * (a |^ (n + 1)))) + ((a * n) * (a |^ (n + 1)))) / ((1 - a) |^ 2)) + (((n * (a |^ (n + 1))) + (a |^ (n + 1))) * 1)
.= ((((a - (a * (a |^ n))) - (n * (a |^ (n + 1)))) + ((a * n) * (a |^ (n + 1)))) / ((1 - a) |^ 2)) + (((n * (a |^ (n + 1))) + (a |^ (n + 1))) * (((1 - a) / (1 - a)) * 1)) by A1, XCMPLX_1:60
.= ((((a - (a * (a |^ n))) - (n * (a |^ (n + 1)))) + ((a * n) * (a |^ (n + 1)))) / ((1 - a) |^ 2)) + (((n * (a |^ (n + 1))) + (a |^ (n + 1))) * (((1 - a) / (1 - a)) * ((1 - a) / (1 - a)))) by A1, XCMPLX_1:60
.= ((((a - (a * (a |^ n))) - (n * (a |^ (n + 1)))) + ((a * n) * (a |^ (n + 1)))) / ((1 - a) |^ 2)) + (((n * (a |^ (n + 1))) + (a |^ (n + 1))) * (((1 - a) * (1 - a)) / ((1 - a) * (1 - a)))) by XCMPLX_1:76
.= ((((a - (a * (a |^ n))) - (n * (a |^ (n + 1)))) + ((a * n) * (a |^ (n + 1)))) / ((1 - a) |^ 2)) + (((n * (a |^ (n + 1))) + (a |^ (n + 1))) * ((((1 - a) |^ 1) * (1 - a)) / ((1 - a) * (1 - a))))
.= ((((a - (a * (a |^ n))) - (n * (a |^ (n + 1)))) + ((a * n) * (a |^ (n + 1)))) / ((1 - a) |^ 2)) + (((n * (a |^ (n + 1))) + (a |^ (n + 1))) * (((1 - a) |^ (1 + 1)) / ((1 - a) * (1 - a)))) by NEWTON:6
.= ((((a - (a * (a |^ n))) - (n * (a |^ (n + 1)))) + ((a * n) * (a |^ (n + 1)))) / ((1 - a) |^ 2)) + (((n * (a |^ (n + 1))) + (a |^ (n + 1))) * ((((1 |^ 2) - ((2 * 1) * a)) + (a |^ 2)) / ((1 - a) * (1 - a)))) by Lm5
.= ((((a - (a * (a |^ n))) - (n * (a |^ (n + 1)))) + ((a * n) * (a |^ (n + 1)))) / ((1 - a) |^ 2)) + (((n * (a |^ (n + 1))) + (a |^ (n + 1))) * ((((1 |^ 2) - ((2 * 1) * a)) + (a |^ 2)) / ((1 - a) |^ 2))) by WSIERP_1:1
.= ((((a - (a * (a |^ n))) - (n * (a |^ (n + 1)))) + ((a * n) * (a |^ (n + 1)))) / ((1 - a) |^ 2)) + (((n * (a |^ (n + 1))) + (a |^ (n + 1))) * (((1 - (2 * a)) + (a |^ 2)) / ((1 - a) |^ 2)))
.= ((((a - (a * (a |^ n))) - (n * (a |^ (n + 1)))) + ((a * n) * (a |^ (n + 1)))) / ((1 - a) |^ 2)) + ((((n * (a |^ (n + 1))) + (a |^ (n + 1))) * ((1 - (2 * a)) + (a |^ 2))) / ((1 - a) |^ 2)) by XCMPLX_1:74
.= ((((a - (a * (a |^ n))) - (n * (a |^ (n + 1)))) + ((a * n) * (a |^ (n + 1)))) + (((((n * (a |^ (n + 1))) * 1) - (((n * (a |^ (n + 1))) * 2) * a)) + ((n * (a |^ (n + 1))) * (a |^ 2))) + ((((a |^ (n + 1)) * 1) - (((a |^ (n + 1)) * 2) * a)) + ((a |^ (n + 1)) * (a |^ 2))))) / ((1 - a) |^ 2) by XCMPLX_1:62
.= ((((a - (a |^ (n + 1))) - (n * (a |^ (n + 1)))) + ((a * n) * (a |^ (n + 1)))) + ((((n * (a |^ (n + 1))) - (((n * (a |^ (n + 1))) * 2) * a)) + ((n * (a |^ (n + 1))) * (a |^ 2))) + (((a |^ (n + 1)) - (((a |^ (n + 1)) * 2) * a)) + ((a |^ (n + 1)) * (a |^ 2))))) / ((1 - a) |^ 2) by NEWTON:6
.= ((a - ((a |^ (n + 1)) * a)) - (((n + 1) * (a |^ (n + 1))) * (a - (a |^ 2)))) / ((1 - a) |^ 2)
.= ((a - ((a |^ (n + 1)) * a)) - (((n + 1) * (a |^ (n + 1))) * (a - (a * a)))) / ((1 - a) |^ 2) by WSIERP_1:1
.= ((a - ((a |^ (n + 1)) * a)) / ((1 - a) |^ 2)) - (((((n + 1) * (a |^ (n + 1))) * a) * (1 - a)) / ((1 - a) |^ 2)) by XCMPLX_1:120
.= ((a - ((a |^ (n + 1)) * a)) / ((1 - a) |^ 2)) - (((((n + 1) * (a |^ (n + 1))) * a) * (1 - a)) / ((1 - a) * (1 - a))) by WSIERP_1:1
.= ((a - ((a |^ (n + 1)) * a)) / ((1 - a) |^ 2)) - ((((((n + 1) * (a |^ (n + 1))) * a) / (1 - a)) * (1 - a)) / (1 - a)) by XCMPLX_1:83
.= ((a * (1 - (a |^ (n + 1)))) / ((1 - a) |^ 2)) - (((n + 1) * ((a |^ (n + 1)) * a)) / (1 - a)) by A1, XCMPLX_1:87
.= ((a * (1 - (a |^ (n + 1)))) / ((1 - a) |^ 2)) - (((n + 1) * (a |^ ((n + 1) + 1))) / (1 - a)) by NEWTON:6
.= ((a * (1 - (a |^ (n + 1)))) / ((1 - a) |^ 2)) - (((n + 1) * (a |^ (n + 2))) / (1 - a)) ;
hence ((((a * (1 - (a |^ n))) / ((1 - a) |^ 2)) - ((n * (a |^ (n + 1))) / (1 - a))) + (n * (a |^ (n + 1)))) + (a |^ (n + 1)) = ((a * (1 - (a |^ (n + 1)))) / ((1 - a) |^ 2)) - (((n + 1) * (a |^ (n + 2))) / (1 - a)) ; :: thesis: verum