The `4^(th)` term of a geometric progression is `2/3` and the seventh term is `16/81`. Find the geometric series.

If p^(th), q^(th), r^(th) terms of a geometric progression are the positive numbers a,b,c respectively, then the angle between the vectors (log a^(2)) I + (log b^(2)) j + (log c^(2))k and (q - r) I + (r - p) j + (p - q) k is

The first two terms of a geometric progression add up to 12. The sum of the third and the fourth terms is 48. If the terms of the geometric progression are altermately positive and negative then the first term is

n^(th) term of a progression a, ar ar^(2) , ………. is …………

Find the indicated term of each geometric progression. (i) a_(1) = 9, r = 1/3 , find a_(7) .

Find the 31^(th) term of an A.P. whose 11^(th) term is 38 and the 16^(th) term is 73.

Find the indicated term of each geometric progression. (ii) a_(1) = -12, r = 1/3 , find a_(6) .

If seven times of 7th term of an Arithmetic Progression is euqal to the 11 times of 11^(th) term of it, then find the 18^(th) term of that Arithmetic Progression.

Find four numbers forming a geometric progression in which the third term is greater than the first term by 9, and the second term is greater than the 4^("th") by 18.

The 4^(th) term of "log"_(e )(3)/(2) is

If the fourth term of a H.P is 1/3 and 7th term is 1/4, then 16th term is