2 Answers

Nathan Campos · Answer 1 · 2021-07-08T15:55:28+0000

Answer:

a = 0

Explanation:

Given

((1)/(7))^(3a+3) = (343)^(a-1)

Required

Find a

We start by writing 343 as a factor of 7

((1)/(7))^(3a+3) = (343)^(a-1)

((1)/(7))^(3a+3) = (7^3)^(a-1)

From laws of indices;

(1)/(a) = a^(-1)

So;

((1)/(7))^(3a+3) = (7^3)^(a-1) becomes

(7^(-1))^(3a+3) = (7^3)^(a-1)

$(7)^{(-1){(3a+3)}} = (7)^(3(a-1))$

Cancel 7 on both sides

(-1){(3a+3) = {3(a-1)}

Open brackets

-3a - 3 = 3a - 3

Collect like terms

3 - 3 = 3a + 3a

0 = 6a

Divide both sides by 6

0 = a

a = 0

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