2 Answers

Aslg · Answer 1 · 2020-08-24T14:26:25+0000

Answer:

x=-7

Explanation:

$6^9 \cdot 6^x = 6^2$

Apply exponential property to solve for x

$a^m \cdot a^n = a^(m+n)$

$6^9 \cdot 6^x = 6^(9+x)$

So the given equation becomes

6^(9+x)= 6^2

Both sides of the equation has same base 6

So we equate the exponent and solve for x

9+x= 2

Subtract 9 from both sides

Jfs · Answer 2 · 2020-08-28T01:50:41+0000

Answer:

= -7

Explanation:

6 ⁹ ×6^x = 6²

From the laws of indices;

aⁿ × aⁿ = a^2n

Therefore;

6 ⁹ ×6^x = 6^(9+x)

6^(9+x) = 6²,

Since the bases are the same then the exponents are equal;

9+x = 2

x = -7

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