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Chapter 12: Q 5 (page 974)

What is a saddle point of a function of two variables, $f (x, y)$ ?

Short Answer

Expert verified

Saddle points of a two variable function :-

A critical point of a two variable function $f (x, y)$ is saddle point which is neither local maxima nor local minima.

Step by step solution

01

Step 1. Given Information

We have to define that what are the saddle points of a two variable function $f (x, y)$ .

02

Step 2. Define saddle points

We have a two variable function $f (x, y)$ .

We classify the critical points of two variable function in three types :-

Local Maxima
Local Minima
Saddle points

Here we have to define saddle points.

Saddle point is a critical point of a two variable function with one condition.

We know that a critical point is a point which may be local maxima or local minima.

But there exists critical points of a two variable function which is neither local maxima nor local minima. These type of critical points are called saddle points.

In short we can say that :-

A critical point of a two variable function $f (x, y)$ is saddle point which is neither local maxima nor local minima.

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Most popular questions from this chapter

In Exercises, find the maximum and minimum of the function f subject to the given constraint. In each case explain why the maximum and minimum must both exist.

$f (x, y) = x + y when x^{2} + 4 y^{2} = 16$

Partial derivatives: Find all first- and second-order partial derivatives for the following functions:

$f (x, y, z) = x z^{2} e^{y}$

Describe the meanings of each of the following mathematical expressions:

$鈭� f (x, y)$

Use Theorem 12.33 to find the indicated derivatives in Exercises 27鈥�30. Express your answers as functions of two variables.

$\frac{鈭� z}{鈭� s} w h e n z = x^{2} y^{3}, x = t \sin s, a n d y = s \cos t$

Find the gradient of the given function, and find the direction in which the function increases most rapidly at the specified point P.

$f (x, y) = \frac{y}{x}, P = (4, 3)$

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