Find ’C’ using Lagrange’s mean value theorem, if f(x) = e^x, a = 0, b = 1.(a) e^e-1(b) e-1(c) log\(_e^{e+1}\)(d) log\(_e^{e-1}\)The question was asked in an internship interview.I would like to ask this question from Mean Value Theorem in chapter Continuity and Differentiability of Mathematics – Class 12

Find ’C’ using Lagrange’s mean value theorem, if f(x) = e^x, a =

1.	Find ’C’ using Lagrange’s mean value theorem, if f(x) = e^x, a = 0, b = 1.(a) e^e-1(b) e-1(c) log\(_e^{e+1}\)(d) log\(_e^{e-1}\)The question was asked in an internship interview.I would like to ask this question from Mean Value Theorem in chapter Continuity and Differentiability of Mathematics – Class 12
Answer» Right choice is (d) log\(_e^{e-1}\) EASY EXPLANATION: Given f(x) = e^x, a = 0, B = 1 f’(c) = \(\frac {f(b)-f(a)}{b-a}\) e^c = \(\frac {e-1}{1-0}\) e^c = e – 1 C = log\(_e^{e-1}\)

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