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प्रश्न
If f(x) = `cos^-1[(1 - (logx)^2)/(1 + (logx)^2)]`, then f'(e) = ______.
विकल्प
`1/e`
`2/e^2`
`2/e`
1
MCQ
रिक्त स्थान भरें
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उत्तर
If f(x) = `cos^-1[(1 - (logx)^2)/(1 + (logx)^2)]`, then f'(e) = `underlinebb(1/e)`.
Explanation:
f(x) = `cos^-1[(1 - (logx)^2)/(1 + (logx)^2)]`
Let 1 + (log x)2 = u
`\implies` 1 – (log x)2 = 2 – u
`\implies` f'(u) = `cos^-1((2 - u)/u) = cos^-1(2/u - 1)`
`\implies` f'(u) = `(((2/u^2))/sqrt(1 - (2/u - 1)^2)) = 1/(usqrt(u - 1)`
`\implies` f'(u) = `1/((1 + ((log x)^2)sqrt((logx)^2`
= `1/(logx(1 + (logx)^2)`
`\implies` f'(e) = `1/(loge(1 + (log e)^2)) = 1/2`
shaalaa.com
Derivative of Implicit Functions
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