1.

Find \(\frac{dy}{dx}\), if x=2e^t and y=log⁡t(a) \(\frac{1}{2te^t}\)(b) –\(\frac{1}{2te^t}\)(c) \(\frac{1}{te^t}\)(d) \(\frac{1}{e^t}\)This question was posed to me during an online exam.Query is from Derivatives of Functions in Parametric Forms topic in portion Continuity and Differentiability of Mathematics – Class 12

Answer»

The correct choice is (a) \(\frac{1}{2te^t}\)

EXPLANATION: GIVEN that, x=2e^t and y=log⁡t

\(\frac{DX}{DT}\)=2e^t

\(\frac{dy}{dt}\)=1/t

∴\(\frac{dy}{dx}\)=\(\frac{dy}{dt}.\frac{dt}{dx}=\frac{1}{t}.\frac{1}{2e^t}=\frac{1}{2te^t}\).


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