A. So20 V20 – h² dh | Which is the shape of the region being integrated? A. Triangle B. Part of a circle radius, or base and height = (If you are entering a base and height, enter them separated by a comma, e.g., 4, 3) area = B. S 5x dx Which is the shape of the region being integrated? A. Triangle B. Part of a circle radius, or base and height = (If you are entering a base and height, enter them separated by a comma, e.g., 4, 3) area = 23

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Each of the following integrals represents the area of either a triangle or part of a circle, and the variable of integration measures a distance. In each case, say which shape is represented, and give the radius of the circle or base and height of the triangle. You will find it useful to make a sketch of the region, showing the slice used to find the integral, labeling the variable and differential on your sketch. Then evaluate the integral to find the area. A. So V20 /20 – h² dh Which is the shape of the region being integrated? A. Triangle B. Part of a circle radius, or base and height = (If you are entering a base and height, enter them separated by a comma, e.g., 4, 3) area = B. 5x dx Which is the shape of the region being integrated? A. Triangle B. Part of a circle radius, or base and height = (If you are entering a base and height, enter them separated by a comma, e.g., 4, 3) area = 23