17. Use the concept of slicing and the variable shown to answer the following about the...
Use the general slicing method to find the volume of the following solid. The solid with a semicircular base of radius 14 whose cross sections perpendicular to the base and parallel to the diameter are squares The volume of the solid is cubic units. (Type an exact answer.)
Use the general slicing method to find the volume of the following solid. The solid with a semicircular base of radius 3 whose cross sections perpendicular to the base and parallel to the diameter are squares cubic units. The volume of the solid is (Type an exact answer.)
The last one was incorrect
Use the general slicing method to find the volume of the following solid. The solid whose base is the region bounded by the curve y 24cos x and the x-axis on and whose 2'2 cross sections through the solid perpendicular to the x-axis are isosceles right triangles with a horizontal leg in the xy-plane and a vertical leg above the x-axis. y 24Vcos x Set up the integral that gives the volume of the solid....
explain please
finding volume for solids of revolution by slicing,
integrating, and then approximating
v ai = (R: (+)?Ar (using Ve="[R(*)?) Question 3.2: As the number of slices increases, the volume of each slice becomes closer and closer to 0. Is it appropriate to think that If this is not the case, offer an explanation. As you may imagine, this procedure would be quite formidable to complete without technology! Thankfully, the result for the exact volume of the solid can...
Answer the following questions about the greenhouse shown below. It is 10 ft wide and 20 ft long and has a flat roof that is 12 ft high at one corner and 10 ft high at each of the adjacent corners. 10 20 (a) (4 points) Find a function that gives the height, h, of the roof at any point (2,y). h(x,y) = (b) (10 points) Find the volume of the greenhouse. For full credit, upload your work in Question...
Please solve #13 and #17.
In Exercises 13-16, use the shell method to set up and evaluate the integral that gives the volume of the solid generated hy revolving the plane region about the x-axis. 14.,-2-х 13.) у х 12 -2十 In Exercises 17-20, use the shell method to find the volume of the solid generated by revolving the plane region about the indicated line. x2, y 4x x2, about the linex-4 y
In Exercises 13-16, use the shell method...
Blenkinsop Manufacturing produces Chop Slice, a multifunctional slicing and chopping kitchen tool. The following shows a summary of the manufacturing data for ChopNSlice for 2020 Selling price per unit Variable manufacturing costs Annual fixed manufacturing costs Variable selling, distribution and administration costs Annual fixed non-manufacturing costs Annual volume $ 64 38 201 060 10 102 940 28 000 units Required a. Calculate the contribution margin per unit. (1 mark) b. Calculate the contribution margin ratio. (1 mark) c. Calculate the...
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5) Use Desmos to graph the region in the first quadrant that is bounded between the graphs of y=x+2, y = 3, and the y-axis. Then answer the following questions. a) (2 pts) Create a rough sketch of the region on your paper, and show an appropriate representative slice on your diagram that could be used to find the volume of the solid generated by rotating this region about the x-axis. b) (2 pts)...
I need a Python code for this problem.
We can use python's array slicing in many ways, and here is just one example. To take the forward derivative of an array y, we use (y[i+1] - y[i])/dx For example, if dx=1 , we might write a derivative routine as yderiv = zeros (len(y)-1) for i in range(len(y)-1): yderiv[i] = y(i+1] - y[i] Note that here, yderiv is one element shorter than y -- this is because you need 2 points...
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Sample Test 4 1575 Calculus II 1. The region bounded by the parabola y-4x-x and the x -axis is revolved about thex- axis. Find the volume of the solid. Write answer in term of π. Find the area enclosed by the curves: 2. y=2x2-4x-12 y=x2-6x+12 and 3. Find the volume of the solid obtained by rotating the region bounded by the graphs of a. y-x-9, y 0 about the x-axis. -1 about the x-axis. b. y 16-r, y-3x+...