Question

: When a 3 kg mass is attached to a spring whose constant is 12 N/m, it comes to rest in the equilibrium position. Starting at i=0, a force equal to f(t) = 15e-54 cos 4t is applied to the system. In the absence of damping, (a) find the position of the mass when t=n. (b) what is the amplitude of vibrations after a very long time?

Answer 1

Date Page - attached mass cm) = 3 kg spering constant (k) - 12 Nm external force 15e-5t costt then the egn of spring-mass system is - Kx + f(t) ma2x dtz d²x + dt? k m х 15 e-It Cost d?x 12. 3 12 * 15 est 15 e-5t Coset 3 5 e 5t Cosat at? d²x + 4 x 0 dt now we will solve this egn from left side 02 + 4 = 0 Auxiliary eqni's m² + 4 zo m-t2i m=0 + 2 i so complementry funn will be Xi(t) = @-Ott? ( A CO2+ + 0 Sim2 t) xi(t) = A Cosatt i sinat 2 now for the perticuler solm we will use method undermined coefficients. so let us consider perticuler son is X2C+ 7 = Best [C, Cosat + Casinata SO CS

Date Page xa"ct) : a [C, est coset Cz e-st Sinet] a t² 9 Cie 5t Cost + 40 C, est sinat 40 C2 e 5t Cosat +9 Cze-5t Sint so put the value of " (t) ineqnces d²X₂ ( t) + 4 X2Ctl5e-5+ Cos 4t at² ac, e-5t cosat +40 C1 e 5th sin4t - 40 C2 e 5+ Cosat + 9 C2 2-5t sin4 t + 4 (G2-5t coset +Cz e-st sin 4+] - 56-5t Coset (1301 - 40 C2 ) e 5t Coset + (40 Git 13 C2) e 5t sinut - 5 e 5+ Costt comparing this eqn we sue got G = 136 - 40 C2 = 5 40G + 1362 = 6 by solving these can we got 65 C2 = -200 1769 1769 put the value of Cif Ca in egn X2lt i = 65 e 5t coset 200 2-5+ Cos 4t. @ 1769 1769 CS

Dato Page total soin will be X(t)= Xicti + ₂ ct) Acos 2t + 8 sinat & 65 e 5t Cosat 1769 200 eest sinut (769 the initial condition is col=0 X'CO2=0 d XC) at dtl d (ACOS 2t + 8 sim2t + 65 e 5+ Costt [269 - 200 e 5t sin 4t (769 . -11254-5Coset 1769 740 2-5t sin4t. 2A Sinet 1769 + 28o Cosat at xcolo the egn (5) Az A to +65 1766 .65 1769 and x'(02:0 in egon (6) -1125 1769 20 + =) 8: 1125 3538 CS

Date Page put the value of A & B in egn 6 so X(t) = -65 bosat + 1125 sinat 1 769 3538 + 65 2-5+ 6054 t 200 e-5t Sin 4t 1769 1269 17 When tut the position of mars so X(t = 1) = -65 (1 + 0 65 (C-5172 1769 1769 Xltz (1) -0.036 m b) after a Long time Chie. tao] then complitude term e-5t at to SO X( to] - -65 1769 Cos 2t + 1125 sinat 3538 2 1 X(t = ) a 9-65 1769 3538 0.13m Act 20