solve for homogeneous
ydx = [ x + (y^2 - x^2)^1/2] dy
pa help naman poh pls
$y \, dx = [ \, x + (y^2 - x^2)^{1/2} \, ] \, dy$
Let $x = vy$
$dx = v \, dy + y \, dv$
$y(v \, dy + y \, dv) = [ \, vy + (y^2 - v^2 y^2)^{1/2} \, ] \, dy$
$vy \, dy + y^2 \, dv = vy \, dy + [ \, y^2(1 - v^2) \, ]^{1/2} \, dy$
$y^2 \, dv = y(1 - v^2)^{1/2} \, dy$
$\dfrac{dv}{(1 - v^2)^{1/2}} = \dfrac{y \, dy}{y^2}$
$\displaystyle \int \dfrac{dv}{\sqrt{1 - v^2}} = \int \dfrac{dy}{y}$
$\arcsin v = \ln y + c$
$\arcsin \left( \dfrac{x}{y} \right) = \ln y + c$
More information about text formats
Follow @iMATHalino
MATHalino
$y \, dx = [ \, x + (y^2 - x^2)^{1/2} \, ] \, dy$
Let
$x = vy$
$dx = v \, dy + y \, dv$
$y(v \, dy + y \, dv) = [ \, vy + (y^2 - v^2 y^2)^{1/2} \, ] \, dy$
$vy \, dy + y^2 \, dv = vy \, dy + [ \, y^2(1 - v^2) \, ]^{1/2} \, dy$
$y^2 \, dv = y(1 - v^2)^{1/2} \, dy$
$\dfrac{dv}{(1 - v^2)^{1/2}} = \dfrac{y \, dy}{y^2}$
$\displaystyle \int \dfrac{dv}{\sqrt{1 - v^2}} = \int \dfrac{dy}{y}$
$\arcsin v = \ln y + c$
$\arcsin \left( \dfrac{x}{y} \right) = \ln y + c$
Add new comment