Let `a_n` is a positive term of a GP and `sum_(n=1)^100 a_(2n + 1)= 200, sum_(n=1)^100 a_(2n) = 200`, find `sum_(n=1)^200 a_(2n) =` ?

Let a_n be the n^(th) term, of a G.P of postive terms. If Sigma_(n=1)^(100)a_(2n+1)= 200 and Sigma_(n=1)^(100)a_(2n)=100, " then" Sigma_(n=1)^(200)a_(n)

Let a_(n) be the nth term of the G.P of positive numbers . Let sum_(n=1)^(100) a_(2n) = alpha and sum_(n=1)^(100) a_(2n-1) =beta such that alpha ne beta then the common ratio is

Let a_(n) be the n^(th) term of a G.P of positive integers. Let sum_(n = 1)^(100) a _(2n) = alpha and sum_(n = 1)^(100) a_(2n +1) = beta such that alpha != beta . Then the common ratio is

Let a^(n) be the nth term of the G.P. of positive numbers. Let sum_(n=1)^(100) a_(2n) = alpha and sum_(n=1)^(100) a_(2n-1) = beta , such that alpha cancel(=)beta then the common ration is :

If a_(n)=(n)/((n+1)!) then find sum_(n=1)^(50)a_(n)

Let a_n be the nth term of a G.P. of positive numbers. Let sum_(n=1)^(100)a_(2n)=alpha and sum_(n=1)^(100)a_(2n-1)=beta , such that alpha!=beta , then the common ratio is (a) alpha//beta b. beta//alpha c. sqrt(alpha//beta) d. sqrt(beta//alpha)

Let a_n be the nth term of a G.P. of positive numbers. Let sum_(n=1)^(100)a_(2n)=alpha and sum_(n=1)^(100)a_(2n-1)=beta , such that alpha!=beta , then the common ratio is (a) alpha//beta b. beta//alpha c. sqrt(alpha//beta) d. sqrt(beta//alpha)

Let a_n be the nth term of a G.P. of positive numbers. Let sum_(n=1)^(100)a_(2n)=alphaa n dsum_(n=1)^(100)a_(2n-1)=beta , such that alpha!=beta , then the common ratio is alpha//beta b. beta//alpha c. sqrt(alpha//beta) d. sqrt(beta//alpha)

Let a_n be the nth term of a G.P. of positive numbers. Let sum_(n=1)^(100)a_(2n)=alphaa n dsum_(n=1)^(100)a_(2n-1)=beta , such that alpha!=beta , then the common ratio is alpha//beta b. beta//alpha c. sqrt(alpha//beta) d. sqrt(beta//alpha)