[" Q 11The sumplinfinite terms of a peomettic progression is "3" and its first term in "2" .The value of "],[" the rediptocal of the conumon ratio of the progrestion is "]

The first term of a geometrical progression is 32 and the fifth is 162. Its sixth term is :

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^(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 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 first 'n' terms of an arithmetic progression is 210 and sum of its first (n-1) terms is 171. If the first term 3, then write the arithmetic progression.

The nth term of a geometric progression is 2(1.5)^(n-1) for all values of n. Write down the value of a (the first term) and the common ratio (r).

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

The sum of the first three terms of the arithmetic progression is 30 and the sum of the squares of the first term and the second term of the same progression is 116. Find the seventh term of the progression if its fith term is known to be exactly divisible by 14.