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Exercise 6.1.15 Calculate the area A of the shaded region in shown below. Also locate the...
Exercise 6.1.20 Calculate the area A and locate the centroid (X, Yc) of the shaded region shown below. Assume a = 44 cm, b = 28 cm, and r = 19 cm. Ka-b- X A= cm2 Xc = cm Yc = cm
Calculate the area A and locate the centroid (X, Yc) of the shaded region shown below. Assume a = 41 cm, b = 32 cm, and r = 20 cm. cm cm XC = Yc = cm
Statics
3. For the following composite area shown below. Shaded regions have material while white regions are empty. Include proper units. a. Find the location of the centroid measured from the shown X and Y axes. b. Calculate the moment of inertia and radius of gyration about the indicated axes Yc centroidal Ixe = bh?/12 and lyc = hb?/12 h Xc b Yc centroidal Ixe = r4/4 and Iye = 1r4/4 Xc ka nga X- Y- 8" (5 points) (5...
3. For the following composite area shown below. Shaded regions have material while white regions are empty. Include proper units. a. Find the location of the centroid measured from the shown X and Y axes. b. Calculate the moment of inertia and radius of gyration about the indicated axes Yc centroidal Ixe = bh?/12 and Iye = hb/12 h Xc b Yc centroidal Ixe = 1 r*/4 and lye - r*/4 Xc KX - Ky = Lt 2" 6" X=...
Question 3 26 pt Locate the centroid (i,y) of the shaded area (26 Marks). 0.6 m 3 m у 1.5 m 3 m 1 m Important Table: Geometric Properties of Line and Area Elements Centroid Location Centroid Location Area Moment of Inertia L-20 sin 20) 1,- 20 453/take ometric Properties of Line and Area Elements Centroid Location Centroid Location Area Moment of Inertia у -L-201 - 1.- (0-sin 20) 1,=+c0+ sin 20) rsine "'" Circular arc segment Circular sector area...
For the plane area shown below, a) Locate the centroid b) Calculate the Moment of Inertia, Ix and ly, and the radius of Gyration (Kx and Ky) 2- l O 1 2 ie 2- a 2-b
Locate the centroid of the composite cross-sectional area shown in the figure below. Also, determine the moments of inertia for the area about its x’and y' centroidal axes. y=y' Note: all dimensions in (mm).
3. For the following composite area shown below. Shaded regions have material while white regions are empty. Include proper units. a. Find the location of the centroid measured from the shown X and Y axes. b. Calculate the moment of inertia and radius of gyration about the indicated axes fYc centroidal Ixc=bh3/12 and lyc = hb3/12 h Xc b 4Yc centroidal Ixe = 1 r*/4 and Iyo = r4/4 Xc Kx = = TEM Ky = { 6" X- (5...
1. A steady, uniform magnetic field of magnitude B, exists in the horizontal, shaded region. This field is directed downward, as indicated. A rectangular loop of rigid, conductive wire, of length L, width W mass m, and resistance R, is initially at rest on a horizontal, frictionless surface, with its east end located at the edge of the field, as shown couninate natn north L easr side 1 X X X X W X X side 2 X X d...
i need help in problem 3.6 which is the first picture.
the other 2 pictures are the equations that i need.
opened read only to prevent modification incompressibly, which because of the large strains cannot be accoun for via v = ). If the original length is L and the current length is /, volu conservation requires LA,=IA - A=A.(L/I) assuming uniform str and strain. Hence, 0x = A 4 = AS where A=1/L is a stretch ratio and is...