What exponent would make the two expressions equivalent: (16x)6=(1618)?(1 point)

The exponent that would make the two expressions equivalent is 3. When (16x)^6 is expanded, it becomes (16^6)(x^6). The number 16 raised to the power of 6 is equal to 16777216. So, we can rewrite the first expression as 16777216(x^6). 16^18 is equal to 1073741824. In order for the two expressions to be equivalent, 1073741824 must be multiplied by x^3.

explain it in a easier way

In order to make the two expressions equivalent, we need to find an exponent that, when applied to 16x, gives us (16x) raised to that exponent.

Let's break it down step by step:

(16x)^6 means we are multiplying (16x) by itself six times: (16x)(16x)(16x)(16x)(16x)(16x).

(16^6)(x^6) means we are raising 16 to the power of 6 and multiplying it by x raised to the power of 6: 16^6 * x^6.

To make the two expressions equivalent, we need to find the exponent that gives us the same result as (16^6 * x^6).

For this, we need to find an exponent that, when applied to 16x, will give us the same result as raising 16 to the power of 6 and multiplying it by x raised to the power of 6.

The answer is 3 because when you multiply 16x by itself three times, you get (16x)(16x)(16x) = 16^6 * x^6.

So, the exponent that would make the two expressions equivalent is 3.

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