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Chapter 12: Q 3. (page 915)

Let f : R 鈫� R be a function of a single variable. Explain why the graph of f is a subset of $R^{2}$ .

Short Answer

Expert verified

The graph of f is a subset of as the graph is plotted using two axes: x-axis and y-axis

Step by step solution

01

Step 1. Given information

Function is $f : R 鈫� R$

02

Step 2. Explanation

A graph is a graphical portrayal represents the relationship between the dependent and independent variables.

The input and output values are used to display the curve of a function.

For the function y=f(x), graph is to be mapped between two variables, 'x' and 'y'.

As a result, the graph will be plotted with two axes.

The concept of $R^{2}$ is as follows.

As a result, f graph must be a subset of $R^{2}$

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Most popular questions from this chapter

Explain the steps you would take to find the extrema of a function of two variables, $f (x, y), if (x, y)$ is a point in the rectangle $R$ defined by role="math" localid="1649881836115" $a 鈮� x 鈮� b and c 鈮� y 鈮� d .$

In Exercises, by considering the function $f (x, y) = x^{2} y$ subject to the constraint $x + y = 0,$ you will explore a situation in which the method of Lagrange multipliers does not provide an extremum of a function.

Optimize $f (x, y) = x^{2} y$ subject to the constraint $a x + b y = 0$ for nonzero constants a and b. Are there any nonzero values of a and b for which the method of Lagrange multipliers succeeds?

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

$f (x, y) = x \sin 鈦� y, P = (3, \frac{蟺}{2})$

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

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

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

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

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