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#sum_(k=0)^oo(-1)^k ((k+1)/4^(k+1)) =# ?

1 Answer

Mar 3, 2017

See below.

Explanation:

#1/(x+1)^2= -d/(dx)(1/(x+1))# but

#1/(x+1)=1/(2+x-1)=1/2(1/(1+(x-1)/2)) = 1/2sum_(k=0)^oo(-1)^k((x-1)/2)^k# for #abs((x-1)/2)<1#

but

#-d/(dx)(1/2sum_(k=0)^oo(-1)^k((x-1)/2)^k)=-1/2^2sum_(k=1)^oo(-1)^k k/2^(k-1)(x-1)^(k-1) = sum_(k=0)^oo(-1)^k ((k+1)/2^(k+2))(x-1)^k#

Making #x = 1/2# we have

#sum_(k=0)^oo(-1)^k ((k+1)/4^(k+1)) = 1/(1/2+1)^2 = (2/3)^2#

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