Question:
If $u = f(x^2) , v = g(x^3) , f'(x) = \sin x $ and $g'(x) = \cos x,$ then $ \frac{du}{dv} = $
If $u = f(x^2) , v = g(x^3) , f'(x) = \sin x $ and $g'(x) = \cos x,$ then $ \frac{du}{dv} = $
Updated On: Jun 21, 2022
- $\frac{3x \cos x^{3}}{2 \sin x^{2}}$
- $\frac{2 \sin x^{2}}{3x \cos x^{3}}$
- $\frac{2 \sin x^{2}}{3 \cos x^{3}}$
- $\frac{3x \sin x^{2}}{{2} cosx^{3}}$
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The Correct Option is B
Solution and Explanation
$u =f\left(x^2\right) , v =g\left(x^{3}\right) $
$f'\left(x\right) = \sin x, g'\left(x\right) =\cos x$
$ \frac{du}{dx} = f'\left(x^{2}\right).2x$ and $\frac{dv}{dx} =g'\left(x^{3}\right) .3x^{2}$
$ \frac{du}{dv} =\frac{du}{dx}. \frac{dx}{dv} = \frac{f'\left(x^{2}\right).2x}{g'\left(x^{3}\right).3x^{2}} = \frac{2}{3x} \frac{ \sin x^{2}}{\cos x^{3}} $
$f'\left(x\right) = \sin x, g'\left(x\right) =\cos x$
$ \frac{du}{dx} = f'\left(x^{2}\right).2x$ and $\frac{dv}{dx} =g'\left(x^{3}\right) .3x^{2}$
$ \frac{du}{dv} =\frac{du}{dx}. \frac{dx}{dv} = \frac{f'\left(x^{2}\right).2x}{g'\left(x^{3}\right).3x^{2}} = \frac{2}{3x} \frac{ \sin x^{2}}{\cos x^{3}} $
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Concepts Used:
Continuity & Differentiability
Definition of Differentiability
f(x) is said to be differentiable at the point x = a, if the derivative f ‘(a) be at every point in its domain. It is given by
Definition of Continuity
Mathematically, a function is said to be continuous at a point x = a, if
It is implicit that if the left-hand limit (L.H.L), right-hand limit (R.H.L), and the value of the function at x=a exist and these parameters are equal to each other, then the function f is said to be continuous at x=a.
If the function is unspecified or does not exist, then we say that the function is discontinuous.