The sum of three consecutive positive terms of a geometric progression is S and their product is 27.Find the minimum value of S.

The sum of five consecutive positive terms of a G.P.is " S' " and their product is " 243 " .Then the minimum value of 'S' is

What is the product of first 2n+1 terms of a geometric progression ?

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

The sum of three consecutive terms of an A.P. is 30 and their product is 360. Find the terms.

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^(k) .The value of K

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

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 sum of 2008 consecutive positive integers is a perfect square.Find the first two digits of the minimum value of the largest of these integers.