Using integration, it is found that the area of the shaded region is of units squared.
<h3>How is the area of a shaded region found?</h3>
- The area of shaded region, between two curves and , considering , between x = a and x = b, is given by the following integral:
In this problem, the curves are:
The limits of integration are: .
Hence:
Applying the power properties of integration:
Finally, applying the Fundamental Theorem of Calculus:
The area of the shaded region is of units squared.
To learn more about integration, you can take a look at brainly.com/question/20733870
I’m not 100% sure but I believe it’s A
Answer:
A) see attachment
B)a, d
Step-by-step explanation:
A) The attachment shows the stem and leaf diagram
B) The data is strongly on lower side that is from 20% to 60% and is therefore skewed to left.