- #1
- 1,902
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This problem has been bugging me and I can't seem to figure it out:
y'' = e^y where y(0)= 0 and y'(0)= -1
I'm supposed to get the first 6 nonzero terms
I know the form is:
y(x) = y(0) + y'(0)x/1! + y''(0)x^2/2! + y'''(0)x^3/3! +...
and I know the first two terms are
y(x) = 0 - x +...
But what's troubling is the e^y. How would I go about getting the y''(0) term. I tried a subsitution of u = y', but the integrals gets very messy. I'm thinking there is either a typo in the book or there is a simpler way to get the answer.
All I need is an example of how to get the next term. I can figure out the rest.
y'' = e^y where y(0)= 0 and y'(0)= -1
I'm supposed to get the first 6 nonzero terms
I know the form is:
y(x) = y(0) + y'(0)x/1! + y''(0)x^2/2! + y'''(0)x^3/3! +...
and I know the first two terms are
y(x) = 0 - x +...
But what's troubling is the e^y. How would I go about getting the y''(0) term. I tried a subsitution of u = y', but the integrals gets very messy. I'm thinking there is either a typo in the book or there is a simpler way to get the answer.
All I need is an example of how to get the next term. I can figure out the rest.
