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Find the sum of a 10-term geometric sequence when the first term is 3 and the last term is 59,049 and select the correct answer below.

177,147
88,572
88,575
177,144

Respuesta :

MissPhiladelphia

First, we need to solve for the common ratio from the data given by using the equation.

a(n) = a(1) r^(n-1)
59049 = 3 r^(10-1)
19683 = r^9
r = 3

Then, we can find the sum by the expression:

S(n) = a(1) ( r^n -1) / 1-r
S(10) = 3 (3^10  -1  ) / 3-1
S(10) =88572

zame

Answer:

B) 88572

Step-by-step explanation:

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