MCQ
${d \over {dx}}[\cos {(1 - {x^2})^2}]$=
- A$ - 2x(1 - {x^2})\sin {(1 - {x^2})^2}$
- B$ - 4x(1 - {x^2})\sin {(1 - {x^2})^2}$
- ✓$4x(1 - {x^2})\sin {(1 - {x^2})^2}$
- D$ - 2(1 - {x^2})\sin {(1 - {x^2})^2}$
$ = 4x(1 - {x^2})\sin {(1 - {x^2})^2}$.
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$f(\mathrm{x})=\frac{\mathrm{x}[\mathrm{x}]}{1+\mathrm{x}^{2}},$ where $[\mathrm{x}]$ denotes the greatest
integer $\leq \mathrm{x} .$ Then the range of $f$ is
$-x+y+2 z=0$
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$2 x-2 y-a z=7$
Let $S_{1}$ be the set of all $\mathrm{a} \in {R}$ for which the system is inconsistent and $S_{2}$ be the set of all $a \in {R}$ for which the system has infinitely many solutions. If $n\left(S_{1}\right)$ and $n\left(S_{2}\right)$ denote the number of elements in $S_{1}$ and $\mathrm{S}_{2}$ respectively, then