TS EAMCET 2020 (Online) 11th September Evening Shift | Differential Equations Question 64 | Mathematics

If the solution $y(x)$ of the differential equation $\sin x \frac{d y}{d x}+y \cos x=e^{2 x}, x \in(0, \pi)$ satisfies $y\left(\frac{\pi}{2}\right)=0$, then $y\left(\frac{\pi}{6}\right)=$

$e^{\pi / 3}+e^\pi$

$e^{\pi / 3}-e^\pi$

$e^\pi-e^{\pi / 3}$

$\frac{1}{2}\left(e^{\pi / 3}-e^\pi\right)$

TS EAMCET 2020 (Online) 11th September Morning Shift

MCQ (Single Correct Answer)

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The differential equation for which $l x^2+m y^2=x+y$ is the general solution is

$\left|\begin{array}{ccc}x^2 & y^2 & x+y \\ 2 x & 2 y^{\prime} y & y^{\prime}+1 \\ 2 & 2 y y^{\prime \prime} & y^{\prime \prime}\end{array}\right|=0$

$\left|\begin{array}{ccc}x^2 & y^2 & x+y \\ 2 x & 2 y y^{\prime} & 1+y^{\prime} \\ 2 & 2\left(y^{\prime 2}+y y^{\prime \prime}\right) & y^{\prime \prime}\end{array}\right|=0$

$\left|\begin{array}{ccc}x^2 & y^2 & x+y \\ 2 x & 2 y y^{\prime} & y+1 \\ 2 & 2\left(y^{\prime 2}+y^{\prime} y^{\prime \prime}\right) & y^{\prime \prime}\end{array}\right|=0$

$\left|\begin{array}{ccc}x^2 & y^2 & x+y \\ 2 x & 2 y & 1+y^{\prime} \\ 2 & 2 y y^{\prime} y^{\prime \prime} & y^{\prime \prime}\end{array}\right|=0$

TS EAMCET 2020 (Online) 11th September Morning Shift

MCQ (Single Correct Answer)

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The general solution of the differential equation $(x-2 y+1) d y-(3 x-6 y+2) d x=0$ is

$\left|x+2 y+\frac{3}{5}\right|^{2 / 25} \cdot e^{115(x+2 y)}=C$

$\left|x-2 y+\frac{3}{5}\right|^{2 / 25} \cdot e^{1 / 5(x-2 y)}=C$

$\left|x-2 y+\frac{3}{5}\right|^{\frac{2}{25}} \cdot e^{1 / 5(6 x-2 y)}=C$

$\left|x-2 y+\frac{1}{5}\right|^{\frac{2}{25}} \cdot e^{1 / 5(x-2 y)}=C$

TS EAMCET 2020 (Online) 11th September Morning Shift

MCQ (Single Correct Answer)

-0

The general solution of the differential equation $\left(1+y^2\right) d x=\left(\tan ^{-1} y-x\right) d y$ is

$x=\left(\tan ^{-1} y\right)-1+C e^{-\tan ^{-1} y}$

$x=\left(\tan ^{-1} y\right)-1+C e^{\tan ^{-1} y}$

$x=\left(\tan ^{-1} y\right)-1+C$

$x=\left(\tan ^{-1} y\right)+C e^{-\tan ^{-1} y}$

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