(B) (25%) Complete the table and calculations below to calculate the centroid coordinates (, j) 3...
(D) (25%) Complete the table and calculations below to calculate the moments of inertia of the shape about the centroidal axes. 3 in. 3 in 6 in. in. 4 in. Shape (in) (in) yo (inl (in) (in*) (in*)
(C) (25%) Complete the table and calculations below to calculate the moments of inertia of the shape about the x axis and y-axis 3 in. 3 in. 6 in. n. 4 in. Shape (in4) (in) yo (in) (in) in (in')
For each figure, determine:
The coordinates of the centroid of the area in the figure
below;
b.Determine the moment of inertia about the centroidal x and y
‐axis
3. For each figure, determine: a. b. The coordinates of the centroid of the area in the figure below; Determine the moment of inertia about the centroidal x and y -axis 50" 2* m25 m 3" dia 5 m cutou 90" NA 21 1 m 25" 5*
3. For each figure, determine:...
. For each figure, determine: a. b. The coordinates of the centroid of the area in the figure below; Determine the moment of inertia about the centroidal x and y -axis 50% 2" 25 m 90" 3" dia cutout 41 .5 m NA 2 .1 m 25" 5*
. For each figure, determine: a. b. The coordinates of the centroid of the area in the figure below; Determine the moment of inertia about the centroidal x and y -axis 50%...
2. CENTROID AND MOMENT OF INERTIA For the shape shown below, determine the following: (Make sure to label or describe the different segments.) a. Centroid (Xbar, Ybar) b. Moment of inertia about the x-axis (lx) C. The radius of the circle is 0.75 ft. NOTE: Use only the equations at the end of this test. (Hint: 4 segments) у 1 ft 1 ft X 3 ft 3 3 ft ſõda Ž= S dA Sõda j = S dA ΣΧΑ ž=...
2. CENTROID AND MOMENT OF INERTIA For the shape shown below, determine the following: (Make sure to label or describe the different segments.) a. Centroid (Xbar, Ybar) b. Moment of inertia about the x-axis (lx) C. The radius of the circle is 0.75 ft. NOTE: Use only the equations at the end of this test. (Hint: 4 segments) у 1 ft 1 ft 3 ft 3 ft Sõda S dA SỹdA j= S dA ΣΧΑ x= ΣΑ ΣΥΑ y =...
In all of the problems below sketch the situation first 1. Find the centroid of a region under y-4 42in first quadrant 2. Find the centroid of a region between y = xyx and y = x. 3. Find the centroid of a right triangle with legs length a and b. 4. Apply this result to the shapes below. Report coordinates of the center of gravity for each shape. a. b. C. d. e. 5. Find the centroid of a...
3. (a) Use the table method to calculate the coordinates of the
centre of mass of the shape shown in Figure Q3a. Use the bottom
left corner as the origin. Give your answers to three significant
figures. (10 marks)
.(b) Use the calculus method to calculate the position of the
centre of area, relative to the origin, of the shape enclosed by
the lines x = 0, y = 0 and y = cos x between x = 0 and...
3. (points 10) We have that XAB+A B.D+A B (does not have hi-Z for any input combination). a) Determine appropriate values for In1, In2, In3, In4, In5, In6, In7 and In8 (fill the following table) In6 In7 In8 Inl In2 In3 In4 In5 b) Give an implementation for netl using 6 n-MOS transistors. Only A, B, C, D, and their complements, the ground and the power supply can be u inputs. sed as 4 In 10 In3 ou I Netl
For the shape shown above, b has a value of 4
Calculate the location of the x centroid
Calculate the MOI of the shape about the y axis
Calculate the MOI of the shape about the y axis through the x
centroid
| ------- | Ix=y2/ 67 6/2 | ------- -