Please show the isometric view after rotating following 3-D object 90° clockwise about the x-axis (20...
a solid object is formed by rotating the shaded area 360° about the x axis. A) calculate the total surface area of the object 4. (20 points) A solid object is formed by rotating the shaded area 360° about the x axis a) Calculate the total surface area of the object. 8 in 4 in. 4 in. 4 in.
A 3-D object is created by rotating the area between Ye) and the x-axis about the line y -1.5 from x =-2 to x = 2 as shown. Here x and y are measured in inches. (in) Complete the following worksheet #5 then answer the following questions. 1. What is the volume of the typical slice found on the worksheet? 2. Set up the definite integral to find the volume of this object, then find its volume. (Be accurate to...
Find the area of the surface obtained by rotating the given curve about the x-axis. x = 20 cos (0), y = 20 sinº (0), 0 <O< 2 Preview
• Find the exact surface area obtained by rotating about x-axis. Show all the necessary steps. y= V5 – x, 35x55
Find area of surface obtained by rotating for = 3.x=2 with 25x56 about the x-axis
3- Determine the normal and shear stresses for the following element after rotating 30 degree clockwise and also determine the amount of the principal and maximum shear stresses. SMPa 20MPa a1 10MPa
Find the exact surface area obtained by rotating the curve about x-axis y 1,0 3 Find the exact surface area obtained by rotating the curve about x-axis y 1,0 3
(10 points) 4. Find the volume of the solid obtained by rotating about the x-axis the region between the graph of y = e*, the x-axis, and the lines x 1 x 2 in the first quadrant about the x-axis. Draw a sketch of this solid. 5 3- 2- 1- -4 -1 5 3 0 1 2 5 (10 points) 4. Find the volume of the solid obtained by rotating about the x-axis the region between the graph of y...
1. (20 marks) (a) (4 marks) Derive a formula for the surface area of an object that is created by rotating a function f(x) around: 1. the r-axis with y20 2. the y-axis with 20 You will need to clearly show how you have chosen to break the surface up into tiny pieces and what high school geometry is needed to find the area of these tiny pieces (b) (6 marks) Confirm that your formula provides the expected surface areas...
Given: A shaft is rotating about the fixed X-axis at a constant rate of Ω. A square plate is pinned at its center O to the centerline of the shaft and is rotating relative to the shaft about O at a constant rate of ˙θ. A set of xyz axes are attached to the plate with its origin at O. An insect on the plate is walking along the y-axis with a constant speed of vrel relative to the plate....