Question
Determine which of the following is a reasonable solution to the logarithmic equation log2(x4)=3
log
2
β‘
(
π₯
4
)
=
3
.(1 point)
Responses
x=32
π₯
=
32
x equals 32
x=β32
π₯
=
β
32
x equals negative 32
x=24
π₯
=
24
x equals 24
x=β24
log
2
β‘
(
π₯
4
)
=
3
.(1 point)
Responses
x=32
π₯
=
32
x equals 32
x=β32
π₯
=
β
32
x equals negative 32
x=24
π₯
=
24
x equals 24
x=β24
Answers
GPT-4o mini
To solve the logarithmic equation \( \log_2(x^4) = 3 \), we can first rewrite the equation in its exponential form.
Recall that if \( \log_b(a) = c \), then \( a = b^c \). Here, we have:
\[
x^4 = 2^3
\]
Calculating \( 2^3 \):
\[
x^4 = 8
\]
Next, we find \( x \) by taking the fourth root of both sides:
\[
x = \sqrt[4]{8}
\]
We can express 8 as \( 2^3 \):
\[
x = \sqrt[4]{2^3} = 2^{3/4}
\]
Calculating \( 2^{3/4} \) yields a positive value. The approximate value for \( 2^{3/4} \) is about 1.68 (since \( 2^3 = 8 \), and thus \( \sqrt[4]{8} \) is positive).
Now, letβs check each of the given responses:
1. **\( x = 32 \)**:
\( \log_2(32^4) = \log_2(2^{30}) = 30 \) (not equal to 3).
2. **\( x = -32 \)**:
Logarithm of a negative number is undefined.
3. **\( x = 24 \)**:
\( \log_2(24^4) \) is unlikely to simplify to 3 upon further checks.
4. **\( x = -24 \)**:
Logarithm of a negative number is undefined.
None of the options provided gives the appropriate logarithmic equation equal to 3. However, the solution \( x = 2^{3/4} \) is the only valid and reasonable solution, which does not appear among your options.
Thus, it seems the question might be formulated incorrectly, but based on logarithmic rules, only non-negative x is valid here.
From the given choices, **none** are valid solutions to the equation \( \log_2(x^4) = 3\).
Recall that if \( \log_b(a) = c \), then \( a = b^c \). Here, we have:
\[
x^4 = 2^3
\]
Calculating \( 2^3 \):
\[
x^4 = 8
\]
Next, we find \( x \) by taking the fourth root of both sides:
\[
x = \sqrt[4]{8}
\]
We can express 8 as \( 2^3 \):
\[
x = \sqrt[4]{2^3} = 2^{3/4}
\]
Calculating \( 2^{3/4} \) yields a positive value. The approximate value for \( 2^{3/4} \) is about 1.68 (since \( 2^3 = 8 \), and thus \( \sqrt[4]{8} \) is positive).
Now, letβs check each of the given responses:
1. **\( x = 32 \)**:
\( \log_2(32^4) = \log_2(2^{30}) = 30 \) (not equal to 3).
2. **\( x = -32 \)**:
Logarithm of a negative number is undefined.
3. **\( x = 24 \)**:
\( \log_2(24^4) \) is unlikely to simplify to 3 upon further checks.
4. **\( x = -24 \)**:
Logarithm of a negative number is undefined.
None of the options provided gives the appropriate logarithmic equation equal to 3. However, the solution \( x = 2^{3/4} \) is the only valid and reasonable solution, which does not appear among your options.
Thus, it seems the question might be formulated incorrectly, but based on logarithmic rules, only non-negative x is valid here.
From the given choices, **none** are valid solutions to the equation \( \log_2(x^4) = 3\).