Precalculus: Mathematics for Calculus - 6th Edition

6th Edition

ISBN: 9780840068071

Author: Stewart, James, Redlin, Lothar, Watson, Saleem

Publisher: Cengage Learning

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Question

Chapter 2.3, Problem 51E

(a)

To determine

To sketch: The graph of the function E(T)=(5.67×10−8)T4 for temperature T between 100 K and 300 K.

(a)

Expert Solution

Explanation of Solution

The given function is E(T)=(5.67×10−8)T4 ,

Where,

E is the energy radiated per unit of surface area measured in Watts.
T is the absolute temperature in Kelvin.

Use graphing calculator to draw the graph of the Function E with values of T between 100 K and 300 K as shown below in Figure 1.

Precalculus: Mathematics for Calculus - 6th Edition, Chapter 2.3, Problem 51E

Figure (1)

From Figure (1), it is noticed that the value of E(T) increases as T increases.

(b)

To determine

To explain: The change in Energy E as the temperature increases.

(b)

Expert Solution

Explanation of Solution

From Figure (1), it is clearly visible that the graph rises for all the values of T between 100 K and 300 K. It means that the function E is increasing on the interval (100,300) . Therefore, the energy radiated per unit of surface area increases as the temperature increases.

Chapter 2.3, Problem 50E

Chapter 2.3, Problem 52E

Chapter 2 Solutions

Precalculus: Mathematics for Calculus - 6th Edition

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The graph of the function E ( T ) = ( 5.67 × 10 − 8 ) T 4 for temperature T between 100 K and 300 K.

Solution Summary: The author illustrates the graph of the function E with values of T between 100 K and 300 K, where E is the energy radiated per unit of surface area measured in Watts.

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To sketch: The graph of the function E(T)=(5.67×10−8)T4 for temperature T between 100 K and 300 K.

Explanation of Solution

To explain: The change in Energy E as the temperature increases.

Explanation of Solution

Chapter 2 Solutions