The first term of a geometric sequence is 64, and the common ratio is `(1)/(4)`.
For what value of n is `t_(n)=(1)/(4)`?

Find the seventh term of the geometric sequence 1,2,4,…, and

The first three terms of a geometric sequence are root4(3), root8(3),1. The fourth term is

Which term of the geometric sequence: 1/4, -1/2, 1,….. Is 64?

The first term of a sequence is (1)/(2) and the second term is (1)/(4) . Each term thereafter is the sum of the all the terms before it , If the n^(th) term is the first term of the sequence that is an integer , what is the value of n ?

The first three terms of a geometric progression are 48,24,12 . What are the common ratio and fourth term of this sequence ?

Write the first four terms of the sequence whose nth term is given (2n+1)/(2n-1)

Write the first four terms of the sequence whose nth term is given (n^(2)+1)/(n)

Let a_n= 16,4,1,… be a geometric sequence .Define P_n as the product of the first n terms. The value of Sigma_(n=1)^(oo) nsqrtP_n is _________.

Let lta_(n)gt be an arithmetic sequence whose first term is 1 and ltb_(n)gt be a geometric sequence whose first term is 2 . If the common ratio of geometric sequence is half the common difference of arithmetic sequence, the minimum value of (a_(4)b_(1) + a_(3)b_(2) + 2a_(1)b_(3)) is equal to

The first and last term of a geometrical Pregression (G.P.) are 3 and 96 respectively. If the common ratio is 2, find : (i) 'n' the number of terms of the G.P. (ii) Sum of the n terms.