248 Chapter 3 The Wave Equation
6.Find an analytic (integral) solution of this wave problem
∂^2 u
∂x^2=^1
c^2∂^2 u
∂t^2, −∞<x<∞, 0 <t,u(x, 0 )=f(x), ∂∂ut(x, 0 )=g(x), −∞<x<∞,withg(x)=0andf(x)={h, |x|<,
0 , |x|>.
7.Sketch the solution of the problem in Exercise 6 at timest=0,/c,2/c,
3 /c.
8.Same as Exercise 7, butf(x)=0andg(x)={c, |x|<,
0 , |x|>.9.Letu(x,t)be the solution of the problem
∂^2 u
∂x^2 =1
c^2∂^2 u
∂t^2 ,^0 <x,^0 <t,
u( 0 ,t)= 0 , 0 <t,u(x, 0 )=f(x),∂u
∂t(x,^0 )=g(x),^0 <x.
Sketch the solutionu(x,t)as a function ofxat timest=0,a/ 6 c,a/ 2 c,
5 a/ 6 c,7a/ 6 c.Useg(x)≡0andf(x)=
3 hx
2 a, 0 <x<^2 a
3,
3 h(a−x)
a ,2 a
3 <x<a,
0 , a<x.10.Same task as in Exercise 9 butf(x)={
sin(x), 0 <x<π,
0 ,π<x
andg(x)=0. Sketch at timest=0,π/ 4 c,π/ 2 c,3π/ 4 c,π/c,2π/c.
11.Letu(x,t)be the solution of the wave equation on the semi-infinite in-
terval 0<x<∞, with both initial conditions equal to zero but with the