Derive the wave equation governing transvene vibrations of tightly stretched elastic string.👉 Also find the natural frequency equation for the string fixed at both ends👈this is the complete questions can i write this video for the same plz plz plz tell!!!
If V(0)=0 the that means V(0)=c1cos(0)+c2sin(0)=0. as sin(0)=0 and cos(0)=1 this reduces to V(0)=c1*1=0 hence c1=0 Then you're left with V(x)=c2sin(Bx) as a function, putting in the other boundary condition V(L)=0 you get V(L)=c2sin(BL)=0
Sir can we write it for..... natural frequency equation for string fixed at both ends......???
Derive the wave equation governing transvene vibrations of tightly stretched elastic string.👉 Also find the natural frequency equation for the string fixed at both ends👈this is the complete questions can i write this video for the same plz plz plz tell!!!
I can't understand the steps, why if v0=0 c1 equal zero then c2sinbl =0
If V(0)=0 the that means V(0)=c1cos(0)+c2sin(0)=0. as sin(0)=0 and cos(0)=1 this reduces to V(0)=c1*1=0 hence c1=0
Then you're left with V(x)=c2sin(Bx) as a function, putting in the other boundary condition
V(L)=0 you get V(L)=c2sin(BL)=0
No enough explanation, only copy paste from textbook