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Chapter 10: Q. 6 (page 777)

The sides of a 2 脳 3 脳 4 rectangular solid are parallel to the coordinate planes. The coordinates of four of its vertices are (1, 鈭�2, 3), (鈭�1, 鈭�2, 鈭�1), (鈭�1, 1, 3), and (1, 鈭�2, 3). What are the coordinates of the other four vertices?

Short Answer

Expert verified

The remaining coordinates of the cuboid are ( -1, -2, 3 ); ( 1, 1, 3 ); ( 1, 1, -1 ); ( 1, -2, -1 ) and ( -1, 1, -1 ).

Step by step solution

01

Step 1. Analyzing the problem

According to the coordinates given we can assume that the given vertices should be at the below mentioned locations.

From the figure, the line along x - axis will have a length of 2 units.

The line along the y - axis will have a length of 3 units.

The line along the z - axis will have a length of 4 units.

02

Step 2. Finding coordinates.

Coordinates of D: ( -1, -2, 3 )

Coordinates of E: ( 1, 1, 3 )

Coordinates of F: ( 1, 1, -1 )

Coordinates of G: ( 1, -2, -1 )

Coordinates of H: ( -1, 1, -1 )

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Most popular questions from this chapter

In Exercises 24-27, find ${comp}_{u} v, {proj}_{u} v$ and the component of v orthogonal tou.

$u = <3, - 1, 2>, v = <- 4, - 6, 3>$

In Exercises 30鈥�35 compute the indicated quantities when $u = (鈭� 3, 1, 鈭� 4), v = (2, 0, 5), and w = (1, 3, 13)$

role="math" localid="1649434688557" $v 脳 w and w 脳 v$

Use the Intermediate Value Theorem to prove that every cubic function $f (x) = A x^{3} + B x^{2} + C x + D$ has at least one real root. You will have to first argue that you can find real numbers a and b so that f(a) is negative and f(b) is positive.

Prove the first part of Theorem $1.31$ (a): If $k > 0$ , then $\lim_{x 鈫� 鈭�} x^{k} = 鈭�$ . (Hint: Given $M > 0$ , choose $N = M^{1 / k}$ . Then show that for $x > N$ it must follow that $x^{k} > M$ .)

Determine whether each of the statements that follow is true or false. If a statement is true, explain why. If a statement is false, provide a counterexample.

(a) True or False: The sum formulas in Theorem 4.4 can be applied only to sums whose starting index value is $k = 1$ .

(b) True or False: ${鈭�}_{k = 0}^{n} 鈥� \frac{1}{k + 1} + {鈭�}_{k = 1}^{n} 鈥� k^{2}$ is equal to ${鈭�}_{k = 0}^{n} 鈥� \frac{k^{3} + k^{2} + 1}{k + 1}$ .

(c) True or False: ${鈭�}_{k = 1}^{n} 鈥� \frac{1}{k + 1} + {鈭�}_{k = 0}^{n} 鈥� k^{2}$ is equal to ${鈭�}_{k = 1}^{n} 鈥� \frac{k^{3} + k^{2} + 1}{k + 1}$ .

(d) True or False: $({鈭�}_{k = 1}^{n} 鈥� \frac{1}{k + 1}) ({鈭�}_{k = 1}^{n} 鈥� k^{2})$ is equal to ${鈭�}_{k = 1}^{n} 鈥� \frac{k^{2}}{k + 1}$ .

(e) True or False: ${鈭�}_{k = 0}^{m} 鈥� \sqrt{k} + {鈭�}_{k = m}^{n} 鈥� \sqrt{k}$ is equal to ${鈭�}_{k = 0}^{n} 鈥� \sqrt{k}$ .

(f) True or False: ${鈭�}_{k = 0}^{n} 鈥� a_{k} = 鈭� a_{0} 鈭� a_{n} + {鈭�}_{k = 1}^{n 鈭� 1} 鈥� a_{k}$ .

(g) True or False: ${({鈭�}_{k = 1}^{10} 鈥� a_{k})}^{2} = {鈭�}_{k = 1}^{10} 鈥� a_{k}^{2}$ .

(h) True or False: ${鈭�}_{k = 1}^{n} 鈥� {(e^{x})}^{2} = \frac{e^{x} (e^{x} + 1) (2 e^{x} + 1)}{6}$ .

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