Question

Use Laplace Transforms to solve the following integrodifferential equation

y'(t)=1-sin(t)- $\int_{0}^{t}$ y(τ) dτ

Answer 1

Now, The given Integro differential equation is » y(E) 1- sint اله (عدام taking Laplace transform both sides we eget => Ş .E اله.( ST.1 | ! - {int م ا - 111 = {الاكا = (ه)3- (E)دمای د الاماره د ادکا = اہلی - | {1}.1 {34} + C. + ک 1+2ی S Let y (0) = 9 G is constant الاما. (اہی | + . ک 1+2ی رامي + ویکی - بج - {ادعا د + G taking Laplace Inverse transform both sides we gels su 1 +1 너 + G 2. ای بهاری - {} - د - اردی ک کا - (Sin ( E (Eالاد + G cost راعي (برای ادبی دبی ما معله .. Now, I wos (1-3) sinx.de j* [cost-cose + sint.sina J. Sinz.dx

- sint. 124–10522) dx Ź cost. Sinez dx + २ 0 L it I los 22 2 + 74 - - { cost.[ sint (Z - Sin22 - { cost [-{ cos(et)+{] + Ź sint. (t - sin 2) ✓ lost +Ğt sint - (1052t-cost +Singl.sint) I lost + / - 해 Lesint 2 Therefore, y(t) = sint -t sin lost 1 tsint lo where Esint + G.Lost. & is constant