Can you help me in how to approaching the problems ?

Section A - Moss/Density Interpretation [40 points]: Answer each cs instructed. Corsider this scaled graph with 5 defined corner points, AE: ' For Question Al-A3 (10 pts each), define which of the five corner points has the lowest density (so, also, the lg m) based on the density functions, p, listed below. Assume the shape is a solid lamina (not just a boundary). Answer below each question with just the points letter; do not circle. Al- POW) = $3, 1 A2. p(x.y) = E 2 \"'1 POLY) = xy A4. (10 pts) Briefly define below why it is problematic (Le, a mathematical issue) for sun pts]: the above lamina shape to have Pt A be located at the origin. .11 = BLZ [5 pts]: How would we have to modify the equation in A3 in order to move Pt A to the origin (but obviously keeping the same mass distribution)? If not possible, write No Solution. BL3 [4 pts]: Consider this trapezoid, an enclosed 4-sided polygon, Find the value of it_s longat & i_n rds if its perimeter is 77 feet. Circle your fi_nal answer. Watch and report your units! 2x B 3x Section B - waa merit now [110 points]: Complete (5 defined. Bl. (10 pts) Use the graph paper below to define the boundaries of the lamina, and then lightly shade its area, defined by: y=2 y=6 x=1 y+x=11 y-x=-3 Make sure to label your axes, and to provide a simple scale for each (i,e., I will NOT just assume that each tick mark equals one unit; you might see what I used in Section A. . , ). 82. (10 pts ea) There are 2 ways to set this up as a mass problem, one based on a 'dy dx' perspective, and another based on 0 'dx dy' perspective. Set up each of these double integrals below, starting with 'dy dx' with 'dx dy' directly below the first one. Do not circle thae. Use generic density function, p(x, y). BTW, one of these M be set up based on the lamina's symmetry You will now pick JUST ONE of your double integral perspectives above and use it for the B5. (5 pts) Define the coordinates of the Center of Mass. Report as (x, y) =..." remaining problems with this density function, p (x, y) = 36. B3. (15 pts) Find the mass, m, of the lamina. B6. (15 pts each) Find its Ix and Ly. B4. (10 pts each) Now find its Mx and My. B7. (10 pts) Finish by finding its To