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differential equation using separable method
- Thread starter sozener1
- Start date
HallsofIvy
Elite Member
- Joined
- Jan 27, 2012
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It would help if you told us how you got that answer!
(Perhaps you mis-interpreted the equation? Obviously if y= 5x+ c then xy'= 5x, not 5y.)
(Perhaps you mis-interpreted the equation? Obviously if y= 5x+ c then xy'= 5x, not 5y.)
xy'=5y
I tried to solve for general solution for the above equation
I get somthing like y=5x+c
but the answer says its y=Ax^5
why is it??
Without seeing your work, you most likely either separated the variables incorrectly, took the integral incorrectly or possibly did both.
\(\displaystyle xy'=5y\)
\(\displaystyle x\dfrac{dy}{dx}=5y\)
Divide both sides by x and both sides by y
\(\displaystyle \dfrac{1}{y}dy=\dfrac{5}{x}dx\)
Now proceed with the integration.
Without seeing your work, you most likely either separated the variables incorrectly, took the integral incorrectly or possibly did both.
\(\displaystyle xy'=5y\)
\(\displaystyle x\dfrac{dy}{dx}=5y\)
Divide both sides by x and both sides by y
\(\displaystyle \dfrac{1}{y}dy=\dfrac{5}{x}dx\)
Now proceed with the integration.
I got up to where you've shown to me myself
from there I took integrals of both sides
which gave me lny=5lnx +c
from here I took exponentials of boths sides to elliminate ln
that gave me y=5x*e^c
which is different from answer
how do you get x^5 like the answer
Last edited:
Remember this exponent rule: \(\displaystyle log_{b}a^m=(m)log_{b}a\)I got up to where you've shown to me myself
from there I took integrals of both sides
which gave me lny=5lnx +c
from here I took exponentials of boths sides to elliminate ln
that gave me y=5x*e^c
which is different from answer
Apply this to 5lnx before you take the e of both sides and see what transpires.