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Homogeneous Equations
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That is, it can be written in the form for some function F. EXAMPLE: 1. Use the substitution y = ux to change the dependent variable from y to u. Note that 2. ... – PowerPoint PPT presentation
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Title: Homogeneous Equations
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Section 2.3
- Homogeneous Equations
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HOMOGENEOUS FUNCTION
Definition A function, f (x, y), is said to be
homogeneous of degree n if f (tx, ty) tn f (x,
y) for some real number n.
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EXAMPLES
Determine whether the function is homogeneous.
If so, state the degree of homogeneity.
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HOMOGENEOUS DIFFERENTIAL EQUATION
Definition A differential equation of the
form M(x, y)dx N(x, y)dy 0 is said to be
homogeneous if both M and N are homogeneous
functions of the same degree.
EXAMPLE (x2 y2)dx 2xydy 0
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ALTERNATE VIEW OF HOMOGENEOUS EQUATION
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SOLVING A HOMOGENEOUS EQUATION
1. Use the substitution y ux to change the
dependent variable from y to u. Note
that 2. Separate the variables and solve the
equation using the techniques of Section 2.2.
