   Chapter 6.3, Problem 74E

Chapter
Section
Textbook Problem

Determining if a Function Is Homogeneous InExercises 69-76, determine whether the function is homogeneous. and if it is, determine its degree. A function f ( x, y ) is homogeneous of degree n if f ( t x , t y ) = t n f ( x , y ) . f ( x , y ) = tan ( x + y )

To determine
Whether the function f(x,y)=tan(x+y) is homogeneous or not. If the function is homogeneous, then calculate its degree.

Explanation

Given:

The function is f(x,y)=tan(x+y).

Explanation:

If a function is homogeneous of degree n.

Then,

f(tx,ty)=tnf(x,y) t

Consider the function,

f(x,y)=tan(x+y

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