solve question #1
m=1 solve for center mass plz
1. Find the center of mass for lamina defined by the interior of the polar curve 1 r sin 30 with ...
a. Find the center of mass for lamina defined by the interior of the polar curve r=sin(3) with a density that varies according to p(r,theta)=1/r b. Find the volume of the cylinder inside the sphere For part a I got a mass of 2 but not sure about the x bar and y bar calculations. For part b Im stuck on the z bounds for the integral when doing the problem with the cylindrical coordinate method. We were unable to...
1 Find the mass and center of mass of the lamina that occupies the region D and has the given density function ρ. ญา D is the triangular region with vertices (0, 0), (2, 1), (0, 3); function 2- Use polar coordinates to combine the sum 3- Find the volume of the solid that lies between the paraboloid zxy2 and the sphere x2 + y2+ z22. 1 Find the mass and center of mass of the lamina that occupies the...
[10 Marks] Find the polar coordinates (ro,ao) of the center of mass of lamina occupying the region and having the density o(r,0)-1. Solution: [10 Marks] Find the polar coordinates (ro,ao) of the center of mass of lamina occupying the region and having the density o(r,0)-1. Solution:
how is this done? urgent. (1 point) Find the center of mass (r, of the lamina which occupies the region if the density at any point is proportional to the distance from the origin x= 0 (1 point) Find the center of mass (r, of the lamina which occupies the region if the density at any point is proportional to the distance from the origin x= 0
lamina with density ρ(x,y) = 3 √{x2+y2} occupies region D, enclosed by the curve r = 1−sin(θ). Which of the following statements is the best description of the center of mass of the lamina? Find the moments of intertia about the x-axis, the y-axis, and the origin for the lamina. Yes, the integrals can be done by hand, but why put yourself through that? You may round your answers to the nearest 0.01.
Find the center of mass of the lamina that occupies the region R with the given density function. R = {y = 0, y = -x = 1,33 = 1,3 = 4}; 0(x, y) = kx
D . Problem 4. A lamina lies in the first quadrant and is enclosed by the circle x2 +y2 = 4 and the lines x = 0 and y = 0. The density function of the lamina is equal to p(x, y) = V x2 + y2. Use the double integral formula in polar coordinates, S/ s(8,y)dx= $." \* fcr cos 6,r sin Øyrar] de, Ja [ Ꭱ . to calculate (1) the mass of the lamina, m = SSP(x,y)...
mass AND center of gravity (G)(3pts) Find the mass and the center of gravity of the lamina with density 6(x, y)r y enclosed by the ellypse: y 4 (G)(3pts) Find the mass and the center of gravity of the lamina with density 6(x, y)r y enclosed by the ellypse: y 4
1. The polar curves r@) = 1 + 2 sin(39), r = 2, are graphed below. 2 (a) Find the area inside the larger loops and outside the smaller loops of the graph of r 12 sin(30). [Hint: Use symmetry, the answer is 3v3.] [Answer: sf-i.] quadrant where r is maximum? (b) Find the area outside the circle r 2 but inside the curve r 1+2 sin(30) (c) What is the tangent line to the curve r-1+2sin(30) at the point...
3) (1.25 point) Find the center of mass of the lamina that occupies the region R with the given density function. R = {y = 0, y = -x = 1,x = 4}: 8(x,y) = kx?