d dx ^ - 1 [ 3 a^2 x - x^3 a( a^2 - 3 x^2 ) ] at x = 0 is - Vidyadip

MCQ

${d \over {dx}}{\tan ^{ - 1}}\left[ {{{3{a^2}x - {x^3}} \over {a({a^2} - 3{x^2})}}} \right]$ at $x = 0$ is

A
${1 \over a}$
✓
${3 \over a}$
C
$3a$
D
$3$

✓

Answer

Correct option: B.

${3 \over a}$

b
(b) $\frac{d}{{dx}}{\tan ^{ - 1}}\left[ {\frac{{3{a^2}x - {x^3}}}{{a({a^2} - 3{x^2})}}} \right]$

Put $x = a\tan \theta $

$ \Rightarrow \frac{d}{{dx}}{\tan ^{ - 1}}\left[ {\frac{{3{a^3}\tan \theta - {a^3}{{\tan }^3}\theta }}{{{a^3} - 3{a^3}{{\tan }^2}\theta }}} \right]$

$ = \frac{d}{{dx}}{\tan ^{ - 1}}(\tan 3\theta ) = \frac{d}{{dx}}(3\theta ) = \frac{{3a}}{{{x^2} + {a^2}}}$

If $x = 0,$ then $\frac{d}{{dx}}{\tan ^{ - 1}}\left[ {\frac{{3{a^2}x - {x^3}}}{{a({a^2} - 3{x^2})}}} \right] = \frac{3}{a}$.

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