Simplifying an ODE into explicit form

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cooljosh2k2
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Homework Statement


So i think i found the general solutions to both these separable equations, but I am not sure if I am suppose to simplify any further to get it in explicit form, and how i can even do that.

Homework Equations





The Attempt at a Solution



1. [itex]\frac{dy}{dx}[/itex] - [itex]\frac{x+e^{-x}}{y+e^{y}}[/itex] = 0

2. [itex]\frac{dx}{dt}[/itex] = te[itex]^{x+t}[/itex]

For 1), i get [itex]\frac{y^{2}}{2}[/itex]+e[itex]^{y}[/itex] = [itex]\frac{x^{2}}{2}[/itex]-e[itex]^{-x}[/itex]+C

and for 2) i get:

-e[itex]^{-x}[/itex]+C = te[itex]^{t}[/itex]-e[itex]^{t}[/itex]

Are these right? and is there anyway to simplify them into explicit form? Thanks
 
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