Consider two infinite geometric series. The first has leading term $a,$ common ratio $b,$ and sum $S.$ The second has a leading term $b,$ common ratio $a,$ and sum $1/S.$ Find the value of $a+b.$

Question

Consider two infinite geometric series. The first has leading term $a,$ common ratio $b,$ and sum $S.$ The second has a leading term $b,$ common ratio  $a,$ and sum $1/S.$ Find the value of $a+b.$

Reiny · Accepted Answer

How about this: From Damons: a/(1-b) = s and b/(1-a) = 1/s OR (1-a)/b = s so a/(1-b) = (1-a)/b ab = 1 - a - b + ab a+b = 1

Damon · Answer

a ab ab^2 ab^3 ..... infinite so sum = a/ (1-b) = s b ba ba^2 ba^3 .... sum = b/(1-a) = 1/s a = s -bs b = 1/s -a/s a+b = s - b s + 1/s -a/s

Chris Phill · Answer

as a number?

Damon · Answer

well, a+b = s + 1/s - (a/s+ bs) I think that only works if s = 1 a+b = 2 - (a+b) 2(a+b) =2 a+b =1

Chris Phill · Answer

Thanks bro