What is the general solution of the differential equation # e^(dy/dx) = x #?

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Answer 1 · 2017-11-04T20:02:27

#dy/dx=ln x#

If #e^(dy/dx)=x#
then taking the natural log of both sides:
LS#=ln(e^(dy/dx))=dy/dx#
and
RS#=ln(x)#

Answer 2 · 2017-11-04T23:02:07

# y = xlnx-x + C #

We have:

# e^(dy/dx) = x #

Taking Natural logarithms we have:

# dy/dx = ln x #

Which is a separable Differential Equation, so we can separate the variables to get:

# y = int \ ln \ dx + C #

Let # { (u,=lnx, => (du)/dx,=1/x), ((dv)/dx,=1, => v,=x ) :}#

Then plugging into the IBP formula:

# int \ (u)((dv)/dx) \ dx = (u)(v) - int \ (v)((du)/dx) \ dx #

gives us

# int \ (lnx)(1) \ dx = (lnx)(x) - int \ (x)(1/x) \ dx #
# :. int \ lnx \ dx = xlnx - int 1 \ dx #
# :. int \ lnx \ dx = xlnx - x #

Thus we have the GS:

# y = xlnx-x + C #