Answer Solution: a. = 3 4 x 2 + 100 + 9 x 2 − 60 x 4 π Explanation Given: A 10m long wire is cut into two pieces. One piece is shaped as an equilateral triangle and other piece is shaped as a circle. Calculation: a. To express the total area A enclosed by the pieces of wire as a function of the length x of a side of the equilateral triangle. The side of the equilateral triangle = x . Therefore, Area of the equilateral triangle A 1 = 3 4 x 2 . Total length of the wire which made equilateral triangle is 3 x . The perimeter of the circle = 2 π r = ( 10 − 3 x ) . r = 10 − 3 x 2 π Area of the circle A 2 = π r 2 = ( 10 − 3 x ) 2 4 π . Therefore, the total area enclosed by the wire = A 1 + A 2 . = 3 4 x 2 + ( 10 − 3 x ) 2 4 π = 3 4 x 2 + 100 + 9 x 2 − 60 x 4 π To determine To find: b. To the domain of A . Answer Solution: b. Domain of A = { x | 0 < x < 3.3 } Explanation Given: A 10m long wire is cut into two pieces. One piece is shaped as an equilateral triangle and other piece is shaped as a circle. Calculation: b. To the domain of A : Since, perimeter ( 10 − 3 x ) has to be positive, the domain of A ( x ) = { x | 0 < x < 3.333 } To determine To find: c. To graph A = A ( x ) and to find the value of x is A smallest. Answer Solution: c. x = 2.9 Explanation Given: A 10m long wire is cut into two pieces. One piece is shaped as an equilateral triangle and other piece is shaped as a circle. Calculation: c. To graph A = A ( x ) and to find the value of x is A smallest. From the graph it can be seen that when x = 2.9 , A attains its minimum value 4.18 . Therefore, A is smallest when x = 2.9 .

9th Edition

ISBN: 9780321716835

Author: Michael Sullivan

Publisher: Addison Wesley

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Question

Chapter 2.6, Problem 12AYU

To determine

To find:

a. To express the total area $A$ enclosed by the pieces of wire as a function of the length $x$ of a side of the equilateral triangle.

Expert Solution

Answer to Problem 12AYU

Solution:

a. $= \frac{\sqrt{3}}{4} x^{2} + \frac{100 + 9 x^{2} - 60 x}{4 π}$

Explanation of Solution

Given:

A 10m long wire is cut into two pieces. One piece is shaped as an equilateral triangle and other piece is shaped as a circle.

Calculation:

a. To express the total area $A$ enclosed by the pieces of wire as a function of the length $x$ of a side of the equilateral triangle.

The side of the equilateral triangle $= x$ .

Therefore, Area of the equilateral triangle $A_{1} = \frac{\sqrt{3}}{4} x^{2}$ .

Total length of the wire which made equilateral triangle is $3 x$ .

The perimeter of the circle $= 2 π r = (10 - 3 x)$ .

$r = \frac{10 - 3 x}{2 π}$

Area of the circle $A_{2} = π r^{2} = \frac{{(10 - 3 x)}^{2}}{4 π}$ .

Therefore, the total area enclosed by the wire $= A_{1} + A_{2}$ .

$= \frac{\sqrt{3}}{4} x^{2} + \frac{{(10 - 3 x)}^{2}}{4 π}$

$= \frac{\sqrt{3}}{4} x^{2} + \frac{100 + 9 x^{2} - 60 x}{4 π}$

To determine

To find:

b. To the domain of $A$ .

Expert Solution

Answer to Problem 12AYU

Solution:

b. $Domain of A = {x | 0 < x < 3.3}$

Explanation of Solution

Given:

A 10m long wire is cut into two pieces. One piece is shaped as an equilateral triangle and other piece is shaped as a circle.

Calculation:

b. To the domain of $A$ :

Since, perimeter $(10 - 3 x)$ has to be positive, the domain of

$A (x) = {x | 0 < x < 3.333}$

To determine

To find:

c. To graph $A = A (x)$ and to find the value of $x$ is $A$ smallest.

Expert Solution

Answer to Problem 12AYU

Solution:

c. $x = 2.9$

Explanation of Solution

Given:

A 10m long wire is cut into two pieces. One piece is shaped as an equilateral triangle and other piece is shaped as a circle.

Calculation:

c. To graph $A = A (x)$ and to find the value of $x$ is $A$ smallest.

Precalculus, Chapter 2.6, Problem 12AYU

From the graph it can be seen that when $x = 2.9, A$ attains its minimum value $4.18$ .

Therefore, $A$ is smallest when $x = 2.9$ .

Chapter 2.6, Problem 11AYU

Chapter 2.6, Problem 13AYU

Chapter 2 Solutions

Precalculus

Ch. 2.1 - The inequality 1x3 can be written in interval...Ch. 2.1 - If x=2 , the value of the expression 3 x 2 5x+ 1 x...Ch. 2.1 - The domain of the variable in the expression x3...Ch. 2.1 - Solve the inequality: 32x5 . Graph the solution...Ch. 2.1 - Prob. 5AYU Ch. 2.1 - Prob. 6AYU Ch. 2.1 - Prob. 7AYU Ch. 2.1 - Prob. 8AYU Ch. 2.1 - Prob. 9AYU Ch. 2.1 - Prob. 10AYU

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