Solve Using MATLab. Provide code and results.

Problem 2: Solve corrected problem 32 on page 319 of Gilat's book using the function ODESolver1 with the RK2 method and the integration step size At - 0.01. 32. A water tank shaped as an ellipsoid ( a -1.5 m, b -4.0 m, c - 3m) has a circular hole at the bot- tom, as shown. According to Torricelli's law, the speed v of the water that is discharging from the hole is given by Jy where h is the height of the water and g-9.81m/ s2. The rate at which the height, h, of the water in the tank changes as the water flows out through the hole is given by r=0.025m dh 2ghr2 ab 1 2 where r is the radius of the hole. Solve the differential equation for h The initial height of the water is h(0)- 5.9 m. Solve the problem for different times and find an estimate for the time when h(t) 0.1 m. Make a plot ofh as a function of time