Differentiate log⁡(log⁡x^5) w.r.t x.(a) –\(\frac{5}{x log⁡x^5}\)(b) \(\frac{1}{log⁡x^5}\)(c) \(\frac{5}{x log⁡x^5}\)(d) –\(\frac{1}{x log⁡x^5}\)This question was posed to me during an interview.I want to ask this question from Exponential and Logarithmic Functions in section Continuity and Differentiability of Mathematics – Class 12

Differentiate log⁡(log⁡x^5) w.r.t x.(a) –\(\frac{5}{x log⁡x^5}

1.	Differentiate log⁡(log⁡x^5) w.r.t x.(a) –\(\frac{5}{x log⁡x^5}\)(b) \(\frac{1}{log⁡x^5}\)(c) \(\frac{5}{x log⁡x^5}\)(d) –\(\frac{1}{x log⁡x^5}\)This question was posed to me during an interview.I want to ask this question from Exponential and Logarithmic Functions in section Continuity and Differentiability of Mathematics – Class 12
Answer» CORRECT option is (c) \(\FRAC{5}{x log⁡x^5}\) The best explanation: Consider y=(log⁡(log⁡(x^5))) \(\frac{dy}{DX}=\frac{1}{log⁡x^5} \frac{d}{dx} (log⁡x^5)\) \(\frac{dy}{dx}=\frac{1}{log⁡x^5}.\frac{1}{x^5}.\frac{d}{dx} (x^5)\) \(\frac{dy}{dx}=\frac{1}{log⁡x^5}.\frac{1}{x^5}.5x^4\) ∴\(\frac{dy}{dx}=\frac{5}{x log⁡x^5}\)

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