Difference between revisions of "Differential Equations"
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Method for solving linear differential equations: | Method for solving linear differential equations: | ||
# Put equation into standard form: dy/dx + f(x)y = g(x) | # Put equation into standard form: dy/dx + f(x)y = g(x) | ||
| − | # Find the integrating factor: u(x) which is equal to e<sup>∫f(x)dx</sup>, so du/dx = f(x) | + | # Find the integrating factor: u(x) which is equal to e<sup>∫f(x)dx</sup>, so du/dx = f(x)u(x) |
| − | # multiply the standard form by u(x) | + | # multiply the standard form by u(x): u(x)dy/dx + u(x)f(x)y = u(x)g(x) |
# use the product rule on the left side: u(x)dy/dx +y(x)du/dx = d/dx(u(x),y(x)) | # use the product rule on the left side: u(x)dy/dx +y(x)du/dx = d/dx(u(x),y(x)) | ||
# integrate both sides | # integrate both sides | ||
# solve for y | # solve for y | ||
Revision as of 05:30, 5 May 2020
The integral character ∫
Method for solving linear differential equations:
- Put equation into standard form: dy/dx + f(x)y = g(x)
- Find the integrating factor: u(x) which is equal to e∫f(x)dx, so du/dx = f(x)u(x)
- multiply the standard form by u(x): u(x)dy/dx + u(x)f(x)y = u(x)g(x)
- use the product rule on the left side: u(x)dy/dx +y(x)du/dx = d/dx(u(x),y(x))
- integrate both sides
- solve for y
