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Chapter 12: Q 68. (page 932)

Let S be a subset of $R^{2} o r R^{3}$ . Prove that $鈭� S$ is a closed set.

Short Answer

Expert verified

It is proved that if S is the subset then $鈭� S$ is the closed set.

Step by step solution

01

Step 1. Given information.

We have givenS is a subset of $R^{2} o r R^{3}$ .

02

Prove the given statement.

Assume an element 'x'such that $x 鈭� 鈭� S$

This means that the element 'x'is on the boundary ofS.

Every open disk D around this element x' will intersect bothS and

S^{c}

.

The complement of

鈭� S

will be union of Sand

S^{c}

, excluding the set

鈭� S

itself.

If S is an open set, then

S^{c}

is a closed set, and vice versa.

This can be possible only if the complement of

鈭� S

is an open set.

This is the definition of closed set.

Thus, it is proved that

鈭� S

is a closed set.

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Most popular questions from this chapter

Describe the meanings of each of the following mathematical expressions :

$\begin{aligned} f_{y} (x_{0}, y_{0}) \end{aligned}$

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

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

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.

Show that the only point given by the method of Lagrange multipliers for the function $f (x, y) = x^{2} y$ subject to the constraint $x + y = 0 is (0, 0) .$

Find the directional derivative of the given function at the specified point P in the direction of the given vector. Note: The given vectors may not be unit vectors.

$f (x, y, z) = \sqrt{\frac{x y}{z}}, P = (2, 3, 1), v = 鉄� 2, 1, 鈭� 2 鉄�$

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

$f (x, y, z) = \frac{x^{2} y}{z}, P = (0, 3, 鈭� 1)$

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