How to solve for the particular solution of the separable Differential equation
- Thread starter tops
- Start date
Hello, tops!
You've never done one of these? . . . Ever?
I'll do the first one.
Separate variables: .[\(\displaystyle \frac{y+1}{y}\,dy \;=\;2x \,dx\)
Integrate: .\(\displaystyle \displaystyle\int\left(1 + \tfrac{1}{y}\right)\,dy \;=\;\int 2x\,dx\)
. . . . . . . . . . . . .\(\displaystyle y + \ln y \;=\;x^2 + C\)
\(\displaystyle y(2) = 1\!:\;\; 1 + \ln 1 \:=\:2^2+C \quad\Rightarrow\quad C \,=\,-3\)
\(\displaystyle \text{Therefore: }\;y + \ln y \;=\;x^2 - 3\)
You've never done one of these? . . . Ever?
I'll do the first one.
Separate variables: .[\(\displaystyle \frac{y+1}{y}\,dy \;=\;2x \,dx\)
Integrate: .\(\displaystyle \displaystyle\int\left(1 + \tfrac{1}{y}\right)\,dy \;=\;\int 2x\,dx\)
. . . . . . . . . . . . .\(\displaystyle y + \ln y \;=\;x^2 + C\)
\(\displaystyle y(2) = 1\!:\;\; 1 + \ln 1 \:=\:2^2+C \quad\Rightarrow\quad C \,=\,-3\)
\(\displaystyle \text{Therefore: }\;y + \ln y \;=\;x^2 - 3\)