Difference between revisions of "Solve Differential Equation by means of Separating Variables"

Latest revision as of 14:09, 28 September 2021

Ex1 ${dy \over dx}={x^{2} \over y^{2}}$

$y^{2}*dy=x^{2}*dx$

${\int y^{2}*dy}={\int x^{2}*dx}$

${\int y^{2}*dy}={y^{3} \over 3}$

${\int x^{2}*dx}={x^{3} \over 3}$

But one side of the equation needs to add a constant c.

${y^{3} \over 3}={x^{3} \over 3}+c$

$y^{3}=x^{3}+3c$

constant times 3 will still be constant so 3c-> c.

${\sqrt[{3}]{y^{3}}}.={\sqrt[{3}]{x^{3}+c}}$

Ex2 y' = xy ${dy \over dx}=xy$

$dy=xy*dx$

${dy \over y}=x*dx$

$\int {1 \over y}dy=\int x*dx$

$\int {1 \over y}dy=ln|y|$

$\int x*dx={x^{2} \over 2}+c$

@@ Line 1: / Line 1: @@
 ==Examples==
-Ex1 <math> {dx \over dy} = {x^2 \over y^2}</math>
+Ex1 <math> {dy \over dx} = {x^2 \over y^2}</math>
 <math> y^2 * dy = x^2 * dx</math>
@@ Line 19: / Line 19: @@
 <math> \sqrt[3] {y^3}.  = \sqrt[3] {x^3  + c}</math>
+Ex2 y' = xy
+<math> {dy \over dx} = xy</math>
+<math> dy = xy * dx</math>
+<math> {dy \over y} = x * dx</math>
+<math>\int {1 \over y} dy = \int x * dx</math>
+<math>\int {1 \over y} dy = ln|y|</math>
+<math> \int x * dx = {x^2 \over 2} + c</math>
+==reference==
+https://www.youtube.com/watch?v=C7nuJcJriWM&list=PLEjLk3Wl8akWPgisw-u9jrmdN67dgPibe&index=33