The solution of x(dx/dy)=y+xey/x with y(1) = 0 is

Question

The solution of x(dx/dy)=y+xey/x with y(1) = 0 is (A) ey/x+ log x=1 (B) e-y/x= log x (C) e-y/x+2 log x=1 (D) e-y/x+ log x=1

Tardigrade Admin · Accepted Answer

x (dy/dx) = y + xeyx ⇒ (dy/dx)- (y/x) = eyx Put y = vx ⇒ (dy/dx) = upsilon+x (d upsilon/dx) ∴ v + x (dv/dx)- upsilon = e upsilon ⇒ x (dv/dx) = e upsilon ⇒ ∫ e- upsilon = ∫ (dx/x)+c ⇒ -e- upsilon = log x+c ⇒ e-yx = log x + c When x = 1, y = 0 ∴ -e-0 = log 1 + c ⇒ -1 = 0+c ⇒ c = -1 ∴ x = 1, y = 0 ∴ -e-yx = log x-1 ⇒ log x + e-yx = 1

Q. The solution of $x \frac{d x}{d y} = y + x e^{y / x}$ with $y (1) = 0$ is

$e^{y / x} + lo g x = 1$

$e^{- y / x} = lo g x$

$e^{- y / x} + 2 lo g x = 1$

$e^{- y / x} + lo g x = 1$

Q. The solution of xdydx​=y+xey/x with y(1)=0 is

ey/x+logx=1

e−y/x=logx

e−y/x+2logx=1

e−y/x+logx=1

xdxdy​=y+xeyx ⇒dxdy​−xy​=eyx Put y=vx ⇒dxdy​=υ+xdxdυ​ ∴v+xdxdv​−υ=eυ ⇒xdxdv​=eυ ⇒∫e−υ=∫xdx​+c ⇒−e−υ=logx+c ⇒e−yx=logx+c When x=1, y=0 ∴−e−0=log1+c⇒−1=0+c⇒c=−1 ∴x=1, y=0 ∴−e−yx=logx−1 ⇒logx+e−yx=1

Q. The solution of $x \frac{d x}{d y} = y + x e^{y / x}$ with $y (1) = 0$ is

$e^{y / x} + lo g x = 1$

$e^{- y / x} = lo g x$

$e^{- y / x} + 2 lo g x = 1$

$e^{- y / x} + lo g x = 1$