10.
To find the volume of a solid with a cross-section of a square, we integrate the area of theisosceles right triangle over the endpoints of the interval. Here, the hypotenusesof the triangles are found by f(x) − g(x) = 4 − x^2 , and the intervals are found by setting y = x^2equal to y = 4. We get x = −2 and x = 2. Thus, we find the volume by evaluating the integral = = . We get = = .
SOLUTIONS TO PRACTICE PROBLEM SET 26
1.
We solve this differential equation by separation of variables. We want to get all of the y
variables on one side of the equals sign and all of the x variables on the other side. We can do
this easily by cross-multiplying. We get y^3 dy = 7x^2 dx. Next, we integrate both sides.∫^ y
(^3) dy =
∫^7 x
(^2) dx
y^4 = + C
Now we solve for C. We plug in x = 3 and y = 2.
16 = 252 + C
C = −236