Textbook ExpertVerified Tutor
31 Oct 2021
Given information
Given function: 
if 
and 
for all other values of 
.
Step-by-step explanation
Step 1.
To prove that 
is a probability density function, it should satisfy the following two properties:
1. 
for all values of .
2. 
Since for the given function, for all values of . First condition is satisfied.
Single Variable Calculus: Early Transcendentals
4th Edition, 2018
Stewart
ISBN: 9781337687805
Solutions
Chapter
Section
- Problem 1a
- Problem 1b
- Problem 2a
- Problem 2b
- Problem 3a
- Problem 3b
- Problem 4a
- Problem 4b
- Problem 5a
- Problem 5b
- Problem 6a
- Problem 6b
- Problem 6c
- Problem 7a
- Problem 7b
- Problem 8a
- Problem 8b
- Problem 8c
- Problem 9
- Problem 10a
- Problem 10b
- Problem 11a
- Problem 11b
- Problem 11c
- Problem 12a
- Problem 12b
- Problem 13
- Problem 14a
- Problem 14b
- Problem 15a
- Problem 15b
- Problem 16
- Problem 17
- Problem 18