(a)
To find: The points of discontinuity of the integrand on the interval of
(a)
Answer to Problem 52E
There is a discontinuity at
Explanation of Solution
Given information:
The integration is:
Graph:
The graph of the function
While the graph doesn't appear to be discontinuous, the function is discontinuous
Hence substituting in into
The required function is discontinuous at
(b)
To find: The integral.
(b)
Answer to Problem 52E
The integral
Explanation of Solution
Given information:
The integration is:
Calculation:
The graph of the function
From the graph, the area is composed of a triangle above the
and the triangle below the
Therefore the required integral of the given integration
Chapter 5 Solutions
CALCULUS-W/XL ACCESS
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