Question:
If $f(x+y) = f(x) \cdot f(y)$, $f(3) = 3$, $f'(0) = 11$, then $f'(3)$ is equal to
If $f(x+y) = f(x) \cdot f(y)$, $f(3) = 3$, $f'(0) = 11$, then $f'(3)$ is equal to
Show Hint
The functional equation $f(x+y) = f(x)f(y)$ implies $f(x) = e^{kx}$.
Updated On: May 2, 2026
- $11 \cdot e^{33}$
- $33$
- $11$
- $\log 33$
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The Correct Option is B
Solution and Explanation
Step 1: Understanding the Concept:
The functional equation $f(x+y) = f(x)f(y)$ with $f$ differentiable implies $f(x) = e^{kx}$.
Step 2: Detailed Explanation:
From $f(x+y) = f(x)f(y)$, differentiate with respect to $x$: $f'(x+y) = f'(x)f(y)$. Put $x=0$: $f'(y) = f'(0)f(y) = 11 f(y)$. So $f'(y) = 11 f(y)$.
Solving: $f(y) = Ce^{11y}$. Given $f(3) = 3$, so $3 = Ce^{33} \Rightarrow C = 3e^{-33}$. Thus $f(y) = 3e^{11(y-3)}$.
Then $f'(y) = 33e^{11(y-3)}$, so $f'(3) = 33$.
Step 3: Final Answer:
$f'(3) = 33$.
The functional equation $f(x+y) = f(x)f(y)$ with $f$ differentiable implies $f(x) = e^{kx}$.
Step 2: Detailed Explanation:
From $f(x+y) = f(x)f(y)$, differentiate with respect to $x$: $f'(x+y) = f'(x)f(y)$. Put $x=0$: $f'(y) = f'(0)f(y) = 11 f(y)$. So $f'(y) = 11 f(y)$.
Solving: $f(y) = Ce^{11y}$. Given $f(3) = 3$, so $3 = Ce^{33} \Rightarrow C = 3e^{-33}$. Thus $f(y) = 3e^{11(y-3)}$.
Then $f'(y) = 33e^{11(y-3)}$, so $f'(3) = 33$.
Step 3: Final Answer:
$f'(3) = 33$.
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