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Page:Elements of the Differential and Integral Calculus - Granville - Revised.djvu/267

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EXAMPLES

1 Given , expand in powers of and .

Solution.

The third and higher partial derivatives are all zero. Substituting in (67),

Ans.

2. Given , expand in powers of , , .

Solution.

The third and higher partial derivatives are all zero. Substituting in (68),

Ans.

3. Given , expand in powers of and .

4. Given , expand in powers of , , .

149. Maxima and minima of functions of two independent variables. The function is said to be a maximum at when is greater than for all values of and in the neighborhood of and . Similarly, is said to be a minimum at when is less than for all values of and in the neighborhood of and .

These definitions may be stated in analytical form as follows:

If, for all values of and numerically less than some small positive quantity,

(A) a negative number, then is a maximum value of .

If

(B) a positive number, then is a minimum value of .

These statements may be interpreted geometrically as follows: a point on the surface