WBJEE · Maths · Differentiation
Let \(f_{1}(x)=e^{x}, f_{2}(x)=e^{f_{1}(x)} \ldots \ldots\)
\(f_{n+1}(x)=c^{f n(x)}\) for all \(n \geq 1 .\) Then for any fixed
\(n \cdot \frac{d}{d x} f_{n}(x)\) is
- A \(f_{n}(x)\)
- B \(f_{n}(x)f_{n-1}(x)\)
- C \(f_{n}(x)f_{n-1}(x)...f_{1}(x)\)
- D \(f_{n}(x)...f_{1}(x)e^{x}\)
Answer & Solution
Correct Answer
(C) \(f_{n}(x)f_{n-1}(x)...f_{1}(x)\)
Step-by-step Solution
Detailed explanation
We have, \(f_{1}(x)=e^{x}\) \[ \begin{array}{r} f_{2}(x)=e^{f_{1}(x)} \\ \cdots \cdot \cdots \cdots \\ \cdots f_{n+1}(x)=e^{f_{n}(x)} \end{array} \] \(f_{n}(x)=e^{f_{n-1}(x)}\) On taking log both sides, we get \(\quad \log \left\{f_{n}(x)\right\}=f_{n-1}(x) \log e\)…
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