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Calculus: An Applied Approach (Min...
Solutions
Calculus: An Applied Approach (Min...
Finding Area In Exercises 35-40, use a graphing utility to graph the region bounded by the graphs of the functions. Find the area of the region by hand.
To calculate: The region bounded by the graphs of functions
Given Information:
The region bounded by the graphs of
Formula used:
Area of a region bounded by two graphs is calculated using the following formula,
If f and g are continuous on
Calculation:
Consider the following functions,
Use Ti-83 calculator to graph the provided region as follows:
Step 1: Press
Step 2: Press “Window” key. Set the viewing window as,
Step 3: Press “2nd”, “Trace” and then “5” key to compute intersection point. Press “Enter” key three times. The intersection point of two graphs is found as
Press “2nd”, “Trace” and then “5” key to compute intersection point. Press “Enter” key two times. Scroll near to second intersection point. The second intersection point of two graphs is found as
Press “2nd”, “Trace” and then “5” key to compute intersection point. Press “Enter” key two times. Scroll near to third intersection point. The third intersection point of two graphs is found as
Step 4: Press “2nd”, “Mode”, “2nd” and then “PRGM” key to open “Draw” menu. Scroll to “7: Shade” and press “Enter.”
Step 5: Press “Vars” key, scroll to right and press “Enter” key to open “Functions.” Scroll to “
Chapter 5 Solutions
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