Solve the matrix equations: 1&2&1 1&2&0 2&0&1 1&0&2 0 2 =0

If $a, b$ and $c$ are all non-zero and $\begin{vmatrix}1+\text{a}&1&1\\1&1+\text{b}&1\\1&1&1+\text{c} \end{vmatrix}=0,$ then prove that $\frac{1}{\text{a}}+\frac{1}{\text{b}}+\frac{1}{\text{c}}+1=0.$

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Solve the following system of equations by matrix method:
$6x - 12y + 25z = 4$
$4x + 15y - 20z = 3$
$2x + 18y + 15z = 10$

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Find $\frac{\text{dy}}{\text{dx}}$
$y = x^n + n^x + x^x + n^n$

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Find the equations of the tangent and the normal to the following curves at the indicated points.
$\text{xy}=\text{c}^2\text{ at }\big(\text{ct},\frac{\text{c}}{\text{t}}\big)$

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Prove the following identities:
$\begin{vmatrix}\text{y}+\text{z}&\text{z}&\text{y}\\\text{z}&\text{z}+\text{x}&\text{x}\\\text{y}&\text{x}&\text{x}+\text{y}\end{vmatrix}=4\text{xyz}$

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Of the students in a college, it is known that $60\%$ reside in hostel and $40\%$ are day scholars (not residing in hostel). Previous year results report that $30\%$ of all students who reside in hostel attain 'A' grade and $20\%$ of day scholars attain 'A' grade in their annual examination. At the end of the year, one student is chosen at random from the college and he has an 'A' grade, what is the probability that the student is a hostlier?

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$\int\limits_{0}^{\pi}\text{x}\log\sin\text{x dx}$

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If $\text{y}=\text{x}^3\log\text{x},$ Prove that $\frac{\text{d}^4\text{y}}{\text{dx}^4}=\frac{6}{\text{x}}$

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Find the angle between line $\frac{\text{x}-1}{1}=\frac{\text{y}-2}{-1}=\frac{\text{z}+1}{1}$ and the plane $2x + y - z = 4$.

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Differentiate the following functions with respect to x:
$\sin(2\sin^{-1}\text{x})$

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