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Solution by Substitution Homogeneous Differential Equations Bernoulli’s Equation Reduction to Separation of Variables Conclusion
MATH312
Section 2.5: Solutions by Substitution
Prof. Jonathan Duncan
Walla Walla College
Spring Quarter, 2007
Solution by Substitution Homogeneous Differential Equations Bernoulli’s Equation Reduction to Separation of Variables Conclusion
Outline
1 Solution by Substitution
2 Homogeneous Differential Equations
3 Bernoulli’s Equation
4 Reduction to Separation of Variables
5 Conclusion
Solution by Substitution Homogeneous Differential Equations Bernoulli’s Equation Reduction to Separation of Variables Conclusion
A Motivating Example
In this last section of chapter 2, we introduce no new methods of
solving DEs but rather look at ways to reduce a DE to a type we
already know how to solve.
Example
Solve the following differential equation.
(y2 +yx) dx +x2 dy = 0
Your first impulse might be to try exact solution methods.
However:
The equation is not exact.
M −N 2y−x N −M x−2y
y x = and x y = .
N x2 M y2+yx
Finally, dy = −y2+yx is neither separable nor linear.
dx x2
Solution by Substitution Homogeneous Differential Equations Bernoulli’s Equation Reduction to Separation of Variables Conclusion
What is a Homogeneous DE? (this time...)
Unfortunately, the name for differential equations in which our first
substitution works has already been used in this class.
Definition
If f (x, y) is a function such that f (tx,ty) = tαf (x,y) for some
real number α, then f is a homogeneous function of degree α.
Definition
If M(x,y) dx +N(x,y) dy = 0 is a first order differential equation
in differential form, then it is called homogeneous if both M and
N are homogeneous functions of the same degree.
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