Question 1
(a) Show that y1(t) = t and y2(t) = et are linearly independent solutions of the homogeneous second order linear DE (1 - t)y'' + ty' -y = 0.
(b) Hence use the method of variation of parameters to determine a particular solution of the inhomogeneous second order DE (1 - t)y'' + ty' - y = (t - 1)2e-t.
Question 2
A uniform bar of mass m1 hangs from two identical springs attached to the bar equidistant from its centre of gravity, and a mass m2 is suspended from a third spring, having the same spring constant as the other two, which is attached to the underside of the bar at its centre of gravity, as shown below:
Then the upward displacement y1 of the bar from its equilibrium position and the upward displacement y2 of the suspended mass from its equilibrium position are governed by the system of linear differential equations
m1y1′′ + 3ky1 - ky2 = 0
m2y2′′ - ky1 + ky2 = 0
where k is the spring constant for all three springs, and we suppose units are chosen so that displacement is measured in metres.
Now assume that m1 = 3, m2 = 1 and k = 2; and that the following initial conditions apply:
y1(0) = 0, y1'(0) = 0, y2(0) = 1, y2'(0) = 0.
(a) Write down the system of first order ODEs corresponding to the above system of 2nd order IVPs. (Do not solve the system).
(b) Use Laplace transforms to solve the system
(c) Determine how high the equilibrium position for m2 needs to be to avoid the mass hitting the bench;
(d) If the motion of the mass and the bar are periodic, find the period; if not, describe the motion.
Hints:
1. A polynomial of the form as4 + bs2 + c can be factorised using the quadratic formula.
2. The period of a sum of two sinosoids of rational frequencies ω1 and ω2 has period given by max(2Π⁄ω1 2Π⁄ω2).
3. A sum of two sinosoids of frequencies ω1 and ω2 is periodic, if and only if the ratio ω1⁄ω2 is rational.
4. For part (d) it is useful to plot the graphs of y1 and y2.