Solve for c_1
c_{1}=-\frac{c_{2}-ye^{x}}{e^{2x}}
Solve for c_2
c_{2}=-e^{x}\left(c_{1}e^{x}-y\right)
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c_{1}e^{x}+c_{2}e^{-x}=y
Swap sides so that all variable terms are on the left hand side.
c_{1}e^{x}=y-c_{2}e^{-x}
Subtract c_{2}e^{-x} from both sides.
e^{x}c_{1}=-\frac{c_{2}}{e^{x}}+y
The equation is in standard form.
\frac{e^{x}c_{1}}{e^{x}}=\frac{ye^{x}-c_{2}}{e^{x}e^{x}}
Divide both sides by e^{x}.
c_{1}=\frac{ye^{x}-c_{2}}{e^{x}e^{x}}
Dividing by e^{x} undoes the multiplication by e^{x}.
c_{1}=\frac{ye^{x}-c_{2}}{e^{2x}}
Divide \frac{ye^{x}-c_{2}}{e^{x}} by e^{x}.
c_{1}e^{x}+c_{2}e^{-x}=y
Swap sides so that all variable terms are on the left hand side.
c_{2}e^{-x}=y-c_{1}e^{x}
Subtract c_{1}e^{x} from both sides.
\frac{1}{e^{x}}c_{2}=y-c_{1}e^{x}
The equation is in standard form.
\frac{\frac{1}{e^{x}}c_{2}e^{x}}{1}=\frac{\left(y-c_{1}e^{x}\right)e^{x}}{1}
Divide both sides by e^{-x}.
c_{2}=\frac{\left(y-c_{1}e^{x}\right)e^{x}}{1}
Dividing by e^{-x} undoes the multiplication by e^{-x}.
c_{2}=e^{x}\left(y-c_{1}e^{x}\right)
Divide y-e^{x}c_{1} by e^{-x}.
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Limits
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