MCQ
The function $\frac{{\sin \,\,(x\, + \,a)}}{{\sin \,\,(x\, + \,b)}}$ has no maxima or minima if
- A$b - a = n \pi , n \in I$
- B$b - a = (2n + 1) \pi , n \in I$
- C$b - a = 2n \pi , n \in I$
- ✓All of these .
$ f '(x) =\,\frac{{\sin (x + b)\, \times \,\cos (x + a)\, - \,\sin (x + a)\,\cos (x + b)}}{{{{\sin }^2}(x + b)}}\, =\,\frac{{\sin (b - a)}}{{{{\sin }^2}(x + b)}}\,$
If $sin(b - a) = 0$ then $f' (x) = 0$ ==> $f (x)$ will be constant
i.e. $b - a = n\pi$ or $n\pi$
or $b - a = (2n + 1)\pi$ or $b - a = 2n\pi$
then $f (x)$ has no minima
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($A$) The area of the quadrilateral $A_1 A _2 A _3 A _4$ is $35$ square units
($B$) The area of the quadrilateral $A_1 A_2 A_3 A_4$ is $36$ square units
($C$) The tangents $T_1$ and $T_2$ meet the $x$-axis at the point $(-3,0)$
($D$) The tangents $T_1$ and $T_2$ meet the $x$-axis at the point $(-6,0)$