An isosceles triangle with a horizontal bottom side measuring 12 feet and other two sides measuring 10 feet is submerged such that the top point of the triangle is 2 feet below the water surface 2ft Approximate the hydrostatic force against one side of the plate by a Riemann sum, and choose one of the following for the integral formula for this problem. 10ft 10ft 12ft Write down your Riemann Sum set up and the integral set up with the integration limits on your paper. Do Not Evaluate. Show all work on your paper for full credit and upload later, or receive 1 point maximum for no procedure to support your work and answer! O Integral of (density of water)(gravity)(3/21x-2]x dx Jpg(3/2)(x - 2)zdz O Integral of (density of water)(gravity)(2/3)(x-2]x dx S pg(2/3)(z - 2)zdz Integral of (density of water)(gravity)(3)(x-21x dx Spg(3)(z - 2).zar Integral of (density of water)(gravity)(4/3](x-2]x dx S pg(4/3)(z - 2)zdz Integral of (density of water)(gravity)(3/2](x-10)x dx J pg(3/2)(z - 10)zar Integral of (density of water)(gravity)(2/3](x-12)x dx J pg(2/3)(z - 12)adr O Integral of (density of water)(gravity)(3/4]x-2]x dx S pg(3/4)(z - 2)zdx Z