Question:
If \( f(x) = x^6 + 6^x \), then \( f'(x) \) is equal to
If \( f(x) = x^6 + 6^x \), then \( f'(x) \) is equal to
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Remember derivative of \( a^x \) includes \( \ln a \).
Updated On: May 1, 2026
- \( 12x \)
- \( x+4 \)
- \( 6x^5 + 6^x \log 6 \)
- \( 6x^5 + x6^{x-1} \)
- \( x^6 \)
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The Correct Option is C
Solution and Explanation
Concept:
Derivative rules:
\[
\frac{d}{dx}(x^n) = nx^{n-1}, \quad \frac{d}{dx}(a^x) = a^x \ln a
\]
Step 1: Differentiate \( x^6 \).
\[ = 6x^5 \]
Step 2: Differentiate \( 6^x \).
\[ = 6^x \ln 6 \]
Step 3: Combine derivatives.
\[ f'(x) = 6x^5 + 6^x \ln 6 \]
Step 4: Verify no simplification needed.
Expression is already simplest form.
Step 5: Final answer.
\[ 6x^5 + 6^x \log 6 \]
Step 1: Differentiate \( x^6 \).
\[ = 6x^5 \]
Step 2: Differentiate \( 6^x \).
\[ = 6^x \ln 6 \]
Step 3: Combine derivatives.
\[ f'(x) = 6x^5 + 6^x \ln 6 \]
Step 4: Verify no simplification needed.
Expression is already simplest form.
Step 5: Final answer.
\[ 6x^5 + 6^x \log 6 \]
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