Find the sum of the first six terms of a geometric progression .

Question

asked Feb 1, 2022 40.6k views

1 Answer

Hatboyzero · Answer 1 · 2022-02-06T15:16:28+0000

Question:

Find the sum of the first six terms of a geometric progression.

1,3,9,....

Answer:

S_6 = 364

Explanation:

For a geometric progression, the sum of n terms is:

S_n = (a(r^n - 1))/(r - 1)

In the given sequence:

a = 1

r = 3/1 =3

n = 6

So:

S_n = (a(r^n - 1))/(r - 1)

S_6 = (1 * (3^6 - 1))/(3 - 1)

S_6 = (3^6 - 1)/(2)

S_6 = (728)/(2)

S_6 = 364