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SECOND ORDER DIFFERENTIAL EQUATION EXAM QUESTIONS FROM ‘OLD’ PAPERS 1. (a) Show that y = 1 2 x2ex is a solution of the differential equation d2 y dy 2 + y = ex. 2 dx dx (4) (b) Solve the differential equation d2 y dy 2 + y = ex. 2 dx dx given that at x = 0, y = 1 and dy = 2. dx (9) [P4 January 2002 Qn 7] 2. (a) Find the general solution of the differential equation 2 d2 y dy 7 3 y = 3t2 + 11t. 2 dt dt (8) dy (b) Find the particular solution of this differential equation for which y = 1 and =1 dt when t = 0. (5) (c) For this particular solution, calculate the value of y when t = 1. (1) [P4 June 2002 Qn 7] 3. (a) Find the value of for which x cos 3x is a particular integral of the differential equation d2 y + 9y = 12 sin 3x. dx 2 (4) (b) Hence find the general solution of this differential equation. (4) dy The particular solution of the differential equation for which y = 1 and = 2 at x = 0, is dx y = g(x). (c) Find g(x). (d) Sketch the graph of y = g(x), 0 x . (4) (2) [P4 January 2003 Qn 7] FP2 exam questions from past papers – Second Order Differential Equations 4. d2 y dy 6 + 9y = 4e3t, t 0. 2 dt dt 2 3t (a) Show that Kt e is a particular integral of the differential equation, where K is a constant to be found. (4) (b) Find the general solution of the differential equation. (3) dy Given that a particular solution satisfies y = 3 and = 1 when t = 0, dt (c) find this solution. (4) dy Another particular solution which satisfies y = 1 and = 0 when t = 0, has equation dt y = (1 – 3t + 2t2)e3t. (d) For this particular solution draw a sketch graph of y against t, showing where the graph crosses the t-axis. Determine also the coordinates of the minimum of the point on the sketch graph. (5) [P4 June 2003 Qn 8] 5. d2 y dy +4 + 5y = 65 sin 2x, x > 0. 2 dx dx (a) Find the general solution of the differential equation. (9) (b) Show that for large values of x this general solution may be approximated by a sine function and find this sine function. (2) [P4 January 2004 Qn 6] 6. (a) Find the general solution of the differential equation d2 y dy +2 + 2y = 2et. 2 dt dt (6) (b) Find the particular solution that satisfies y = 1 and dy = 1 at t = 0. dt (6) [P4 June 2004 Qn 7] FP2 exam questions from past papers – Second Order Differential Equations 7. (a) Show that the transformation y = xv transforms the equation x2 d2 y dy – 2x + (2 + 9x2)y = x5, 2 d x dx I into the equation d 2v + 9v = x2. 2 dx II (5) (b) Solve the differential equation II to find v as a function of x. (6) (c) Hence state the general solution of the differential equation I. (1) [FP1/P4 January 2005 Qn 6] 8. (a) Find the general solution of the differential equation 2 d2x dx +5 + 2x = 2t + 9. 2 dt dt (6) (b) Find the particular solution of this differential equation for which x = 3 and dx = –1 dt when t = 0. (4) The particular solution in part (b) is used to model the motion of a particle P on the x-axis. At time t seconds (t 0), P is x metres from the origin O. (c) Show that the minimum distance between O and P is distance is a minimum. 1 2 (5 + ln 2) m and justify that the (4) [FP1/P4 June 2005 Qn 7] 9. (a) Find the general solution of the differential equation d2x dx +2 + 5x = 0. 2 dt dt (4) dx = 1 at t = 0, find the particular solution of the differential dt equation, giving your answer in the form x = f(t). (5) (b) Given that x = 1 and (c) Sketch the curve with equation x = f(t), 0 t , showing the coordinates, as multiples of , of the points where the curve cuts the t-axis. (4) [FP1/P4 January 2006 Qn 4] FP2 exam questions from past papers – Second Order Differential Equations 10. Given that 3x sin 2x is a particular integral of the differential equation d2 y + 4y = k cos 2x, dx 2 where k is a constant, (a) calculate the value of k, (4) (b) find the particular solution of the differential equation for which at x = 0, y = 2, and for which at x = , y = . 4 2 (4) [FP1 June 2006 Qn 3] 11. A scientist is modelling the amount of a chemical in the human bloodstream. The amount x of the chemical, measured in mg l–1, at time t hours satisfies the differential equation 2 d2x dx – 6 = x2 – 3x4, x > 0. 2 dt dt 1 (a) Show that the substitution y = 2 transforms this differential equation into x 2x d2 y + y = 3. dt 2 [I] (5) (b) Find the general solution of differential equation [ I ]. (4) Given that at time t = 0, x 1 dx and = 0, 2 dt (c) find an expression for x in term of t, (4) (d) write down the maximum value of x as t varies. (1) [FP1 January 2007 Qn 7] 12. For the differential equation find the solution for which at x = 0, d2 y dy +3 + 2y = 2x(x + 3), 2 dx dx dy = 1 and y = 1. dx (12) [FP1 June 2007 Qn 5] FP2 exam questions from past papers – Second Order Differential Equations 13. (a) Find the general solution of the differential equation 3 d 2 y dy – – 2y = x2. 2 d x dx (8) dy (b) Find the particular solution for which, at x = 0, y = 2 and = 3. dx (6) [FP1 January 2008 Qn 7] 14. (a) Find, in terms of k, the general solution of the differential equation d2x dx +4 + 3x = kt + 5, 2 dt dt where k is a constant and t > 0. (7) For large values of t, this general solution may be approximated by a linear function. (b) Given that k = 6, find the equation of this linear function. (2) [FP1 June 2008 Qn 4] 15. (x2 + 1) d2 y dy = 2y2 + (1 – 2x) . 2 dx dx (I) (a) By differentiating equation (I) with respect to x, show that (x2 + 1) d3 y d2 y dy = (1 – 4x) + (4y – 2) . 3 2 dx dx dx (3) dy Given that y = 1 and = 1 at x = 0, dx (b) find the series solution for y, in ascending powers of x, up to and including the term in x3. (4) (c) Use your series to estimate the value of y at x = –0.5, giving your answer to two decimal places. (1) [FP3 June 2008 Qn 3] FP2 exam questions from past papers – Second Order Differential Equations