Solve the boundary value problem y 2y 2y 0 y0 1 ypi2 0S
Solve the boundary value problem y\" + 2y\' + 2y = 0, y(0) = 1, y\'(pi/2) = 0.
Solution
The given equation in symbolic form is( D2 + 2D +2)Y =0
The auxialary equation is m2+2m+2=0
m1= -1+i,m2= -1-i
Therefore,
Roots are imaginary roots,so the solution is
y= e-x[c1cosx+c2sinx]
Given that y(0)=1
then substitute value in y
1=e-0[c1cos0+c2sin0]
1=1[c1+0]
c1=1
