MCQ
Let $f(x)$ be continuous and differentiable function for all reals.
$f(x + y)\, = \,f(x) - 3xy + f(y).$ If $\mathop {\lim }\limits_{h \to 0} \frac{{f(h)}}{h} = 7$ then value of $f'(x)$ is-
- A$-3x$
- B$7$
- ✓$-3x+7$
- D$2f(x)+7$
$f(x + y)\, = \,f(x) - 3xy + f(y).$ If $\mathop {\lim }\limits_{h \to 0} \frac{{f(h)}}{h} = 7$ then value of $f'(x)$ is-
$ = \mathop {\lim }\limits_{h \to 0} \frac{{f(x) - 3xh + f(h) - f(x)}}{h}$
$ = \mathop {\lim }\limits_{h \to 0} \left( { - 3x + 7 + \frac{{f(h)}}{h}} \right)$
$=-3 x+7$
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If $I_1 = \int\limits_{\frac{\pi }{6}}^{\frac{\pi }{3}} \, f (\tan\, \theta + \cot\, \theta )\cdot sec^2\, \theta\, d\, \theta$ &
$I_2 = \int\limits_{\frac{\pi }{6}}^{\frac{\pi }{3}} \, f (\tan\, \theta + \cot\, \theta )\cdot cosec^2\, \theta\, d \, \theta$ ,
then the ratio $\frac{{{I_1}}}{{{I_2}}}$ :