If the 4th and 7th term of Geometrics Progressions are 54 and 1458 respectively, find the Geometric Progression.

If the 4^(th) and 7^(th) terms of a GP are 16 and 128 respectively, then the 10^(th) terms is

The first term of an arithmetic progression is 1 and the sum of the first nine terms equal to 369 . The first and the ninth term of a geometric progression coincide with the first and the ninth term of the arithmetic progression. Find the seventh term of the geometric progression.

The 4th term of a geometic progression is 2/3 and the seventh term is 16/81 . Find the geometic series.

In a Geometric Progression, the 4th term is 8, and the 8th term is (128)/(625) . Find the Geometric Progression.

If 10^(th) term and the 18^(th) term of an A.P. are 25 and 41 respectively, then find the 38^(th) term.

Find x so that x+6, x+12 and x+15 are consecutive terms of Geometric Progressions.

If 4^(th) term and sixth term of an HP are 1/9 and 1/13 respectively, find the 10^(th) term of the sequence.

If the product of the 4^(th), 5^(th) and 6^(th) terms of a geometric progression is 4096 and if the product of the 5^(th), 6^(th) and 7^(th) - terms of it is 32768, find the sum of first 8 terms of the geometric progression. For any two positive numbers, the three means AM, GM and HM are in geometric progression.

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