If `6^( th )` term of a Geometric Progression is 5 then the product of first 11 term is `5^(K)` .The value of K

If 6^( th ) term of a Geometric Progression is 5 then the product of first 11 term is 5^(X) .The value of K is

The third term of a geometric progression is 4. Then find the product of the first five terms.

The third term of a geometric progression is 4. The production of the first five terms is 4^(3) b.4^(5) c.4^(4) d.none of these

The eighth term of a geometric progression is 128 and common ratio is 2. The product of the first five terms is

The third term of a geometric progression is 4 The product of the first five terms is (a) 4^(3)(b)4^(5)(c)4^(4)(d) None of these

If the 5th term of a GP is 2, find the product of its first nine terms.

The sum of an infinite geometric progression is 243 and the sum of its first five terms is 275 The first term of the progression

The sum of the first 2012 terms of a geometric progression is 200. The sum of the first 4024 terms of the same series is 380. Find the sum of the first 6036 terms of the series.

The sum of the first four terms of a geometric series is 520. The sum of the first five terms is 844. The sum of the first six terms is 1330. (a) Find the common ratio of the geometric progression.(b) Find the sum of the first two terms.