Solve the exponential equation 2^x = 16.

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Multiple Choice

Solve the exponential equation 2^x = 16.

To solve the equation (2^x = 16), we first express 16 as a power of 2. We know that (16) can be rewritten as (2^4), since (2^4 = 2 \times 2 \times 2 \times 2 = 16).

Now, we have the equation:

[

2^x = 2^4

]

Since the bases are the same (both are base 2), we can equate the exponents:

[

x = 4

]

This indicates that when (x) equals 4, (2^x) equals 16. Therefore, the correct answer is 4.

To clarify the reasoning for why the other choices aren’t correct:

Choosing 2 would suggest that (2^2 = 4), which is not equal to 16.
Choosing 3 would imply (2^3 = 8), which still does not match 16.
Choosing 5 leads to (2^5 = 32), which exceeds 16.

Thus, the only value that satisfies the equation (2^x = 16) is (

Solve the exponential equation 2^x = 16.

Prepare for your College Math Placement Test with our comprehensive practice quizzes. Use multiple choice questions to master concepts and secure your success in academia. Study smart and ace your exam!

Solve the exponential equation 2^x = 16.

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