There are two value of a which makes the determinant = 1&-2&5 2&a&-1 0&4&2a equal to 86. The sum of these two values is:

There are two value of a which makes the determinant = 1&-2&5 2&a…

Given that $A$ is a square matrix of order 3 and $|A|=-2$, then $|\operatorname{adj}(2 A)|$ is equal to

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If $ 3\cos ^{ -1 }{ \text{x} } +\sin ^{ -1 }{\text{ x} } =π$ then x:

$\frac { 4 }{ \sqrt { 2 } }$
$ -\frac { 1 }{ \sqrt { 2 } }$
$\frac { 1 }{ \sqrt { 2 } }$
$\frac { 1 }{ \sqrt { 4 } }$

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Let $f : R \rightarrow R$ be a function defined by $\text{f(x)}=\frac{\text{x}^2-8}{\text{x}^2+2}.$ Then, $f$ is:

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Find the value of $\int_{-\pi / 2}^{\pi / 2}|\sin x| d x$.

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The solution of the equation $\frac{d y}{d x}=e^{x+y}+e^y x^2$ is :

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If $A$ is a square matrix such that $A^2 = I,$ then $(A - I)^3 + (A + I)^3 - 7A$ is equal to$:$

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The positive integral solution of the equation$\tan^{-1}\text{x}+\cos^{-1}\frac{\text{y}}{\sqrt{1+\text{y}^2}}=\sin^{-1}\frac{3}{\sqrt{10}}$ is:

x = 1, y = 2
x = 2, y = 1
x = 3, y = 2
x = -2, y = -1

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The objective function of an LPP is

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If $\vec{\text{a}}\text{ and }\vec{\text{b}}$ are two collinear vectors, then which of the follwoing are incorrect?

$\vec{\text{b}}=\lambda\vec{\text{a}}$ for some scalar $\lambda$
$\vec{\text{a}}=\pm\vec{\text{b}}$
The respective components of $\vec{\text{a}}\text{ and }\vec{\text{b}}$ are proportional.
Both the vectors $\vec{\text{a}}\text{ and }\vec{\text{b}}$ have the same direction but different magnitudes.

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A die is thrown and a card is selected ar random from a deck pf $52$ playing cards. The probability of getting an even number of the die and a spade card is

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Determinants — MATHS STD 12 Science — Question

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