_ 2 ^ 2 = - Vidyadip

MCQ

$\int\limits_{2}^{2} \mid\text{x}\mid\text{dx}=$

A
$0$
B
$2$
C
$1$
✓
$4$

✓

Answer

Correct option: D.

$4$

Need a full question paper?

Generate a complete, print-ready paper with questions like this in minutes — across 16+ boards, with answer keys.

Start Generating Free

Explore more

More "M.C.Q (1 Marks)" from Integrals→Integrals — all question types→Maths STD 12 Science question papers→Gujarat Board STD 12 Science question papers→Gujarat Board question paper generator→

Similar questions

Let $f$ be a function satisfying $f(xy) = \frac{f(x)}{y}$ for all positive real numbers $x$ and $y.$ If $ f(30) = 20,$ then the value of $f(40)$ is-

The domain of ${\sin ^{ - 1}}({\log _3}x)$ is

Let $N$ denotes the sum of the numbers obtained when two dice are rolled. If the probability that $2^{ N } < N !$ is $\frac{m}{n}$, where $m$ and $n$ are coprime, then $4 m -3 n$ is equal to $......$.

A die is tossed thrice. A success is getting $1$ or $6$ on a toss. The mean and the variance of number of successes

The slope of the tangent to the curve $x = t^2 + 3 t - 8, y = 2t^2 - 2t - 5$ at point $(2, -1)$ is:

Let $P = \left[ {{a_{ij}}} \right]$ be $4 \times 4$ matrix. If $\left| P \right| = - 2$ , then value of $\left| {\,\,adj\,\left( {3P} \right)} \right|$ ,is (where $|A|$ denotes determinant value of matrix $A$ )

If $y = 1 + x + {{{x^2}} \over {2!}} + {{{x^3}} \over {3!}} + .....\infty ,$ then ${{dy} \over {dx}} = $

The probability distribution of a discrete random variable X is given below:

$\text{X}:$	$2$	$3$	$4$	$5$
$\text{P}(\text{X}):$	$\frac{5}{\text{k}}$	$\frac{7}{\text{k}}$	$\frac{9}{\text{k}}$	$\frac{11}{\text{k}}$

The value of k is:

$\int_{}^{} {{{\sin }^{ - 1}}} (\cos x)dx = $

If $f(\theta ) =\left| {\begin{array}{*{20}{c}}
1&{\cos {\mkern 1mu} \theta }&1\\
{ - \sin {\mkern 1mu} \theta }&1&{ - \cos {\mkern 1mu} \theta }\\
{ - 1}&{\sin {\mkern 1mu} \theta }&1
\end{array}} \right|$ and $A$ and $B$ are respectively the maximum and the minimum values of $f(\theta )$, then $(A , B)$ is equal to