MCQ
$\int_{0}^{\pi /2}{\frac{dx}{{{a}^{2}}{{\cos }^{2}}x+{{b}^{2}}{{\sin }^{2}}x}}\,=$
- A$\pi ab$
- B${\pi ^2}ab$
- C$\frac{\pi }{{ab}}$
- ✓$\frac{\pi }{{2ab}}$
Dividing the numerator and denominator by ${\cos ^2}x,$ we get
$I = \int_0^{\pi /2} {\frac{{\frac{1}{{{{\cos }^2}x}}dx}}{{{a^2} + {b^2}\frac{{{{\sin }^2}x}}{{{{\cos }^2}x}}}} = \int_0^{\pi /2} {\frac{{{{\sec }^2}x}}{{{a^2} + {b^2}{{\tan }^2}x}}dx} } $.
Substituting $b\,\,\tan x = t$ and $b\,\,{\sec ^2}x\,dx = dt$ and limit when $x = 0$,
then $t = 0$ and when $x = \frac{\pi }{2},$ then $t = \infty ,$
therefore, $I = \int_0^\infty {\frac{{\frac{{dt}}{b}}}{{{a^2} + {t^2}}}} = \frac{1}{b}\left[ {\frac{1}{a}{{\tan }^{ - 1}}\left( {\frac{t}{a}} \right)} \right]_0^\infty $
$ = \frac{1}{{ab}}\left[ {{{\tan }^{ - 1}}\infty - {{\tan }^{ - 1}}0} \right] $
$= \frac{1}{{ab}}\left( {\frac{\pi }{2} - 0} \right) = \frac{\pi }{{2ab}}$.
Generate a complete, print-ready paper with questions like this in minutes — across 16+ boards, with answer keys.
$f(x)=\sin x-e^{x} \,\,\,\, \text { if } x \leq 0$
$\quad\quad\quad a+[-x] \,\,\,\, \text { if } 0\,<\,x\,<\,1$
$\quad\quad\quad 2 x-b \,\,\,\,\,\,\,\, \text { if } \geq 1$
કે જ્યાં $[\mathrm{x}]$ એ $\mathrm{x}$ નું મહતમ પૃણાંક વિધેય છે. જો $\mathrm{f}$ એ $\mathrm{R}$ પર સતત હોય તો $(\mathrm{a}+\mathrm{b})$ ની કિમંત મેળવો.