Calculate the moments My and My and the center of mass of a lamina with the...
please answer both questions Calculate the moments, and M, and the center of mass of lamina with the given density and shape 0 Need Help? 2014 Points DETAILS SCALCETS 8.5.016 ASK YOUR TEACHER PRACTICE ANOTHER Hoxes are labeled as containing cong of cereal. The machine iting the bones produces weights that are normally distributed with standard deviation 14 (a) If the target weight is 600, what is the probability that the machine produces a box with less than 50 g...
Find the moments of the lamina S of constant density p = 2 g/cm occupying the region between y = x and y = 19x over [0,3). (Give your answers for the moments to one decimal place, if necessary.) M= M = Determine the center of mass of the lamina, (Give your answer as point's coordinates in the form (*.*). Give the coordinates precise to two decimal places.) center of mass:
17. LarCalc11 7.6.035. My Notes Ask Your Teacher Find the center of mass of the lamina in the following figure if the circular portion of the lamina has twice the density of the square portion of the lamina. (Round your answers to two decimal places.) (X.) = WebAssign Plot Show My Work (Optional e inc 18. LarCalc11 7.7.010. My Notes Ask Your Teacher Sind themden onthnical adnotato warn the dimensionale in feat. Acum that the tana w ater the OD...
Find the mass and center of mass of the lamina bounded by the graphs of the equations for the given densityy=x³, y=0, x=2, ρ=kx
For the lamina that occupies the region D bounded by the curves x = y2 – 2 and x = 2y + 6, and has a density function: p(x, y) = y + 4, find: a) the mass of the lamina; b) the moments of the lamina about x-axis and y-axis; c) the coordinates of the center of mass of the lamina.
4. + -/2 points SCalcET8 15.4.503.XP. My Notes Find the mass and center of mass of the lamina that occupies the region D and has the given density function p. Dis bounded by the parabolas y = x2 and x = y2; p(x, y) = 23x m = (x, y) = ( Submit Answer
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...
3) (1.25 point) Find the center of mass of the lamina that occupies the region with the given density function. R = {y = 0, y = x = 1,= 4}; 8(x,y) = kx?
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