252 Chapter 3 The Wave Equation
can be obtained fromφ(x−ct)andφ(x− ̄ct).(Herep=√
ω/ 2 kand ̄cis
the complex conjugate ofc. Refer to Exercise 6 in Chapter 2, Section 10.)
28.Some nonlinear equations can also result in “traveling wave solutions,”
u(x,t)=φ(x−ct). Show thatFisher’s equation,∂^2 u
∂x^2 =∂u
∂t−u(^1 −u),
has a solution of this form ifφsatisfies the nonlinear differential equa-
tion
φ′′+cφ′+φ( 1 −φ)= 0.29.Show that the functionuis a solution of the problem
∂^2 u
∂x^2 =1
c^2∂^2 u
∂t^2 ,^0 <x<a,^0 <t,
u( 0 ,t)= 0 , u(a,t)=sin(ωt), 0 <t,provided that the parameters are such that sin(ωa/c)=0.u(x,t)=sin(ωx/c)sin(ωt)
sin(ωa/c).
30.Ifω=πc/a, the denominator of the function in Exercise 29 is 0. Show
that, for this value ofω, a function satisfying the wave equation and the
given boundary condition isu(x,t)=−ct
asin(πx
a)
cos(πct
a)
−
x
acos(πx
a)
sin(πct
a)
.
31.A string in a musical instrument is typically not as flexible as assumed
in Section 1. For such a string, the displacementumay satisfy the partial
differential equation
∂^2 u
∂x^2 −∂^4 u
∂x^4 =1
c^2∂^2 u
∂t^2 ,^0 <x<a,^0 <t,
wherec^2 =T/ρ,asinSection1,and=EI/T, withE=Yo u n g ’s m o d -
ulus for the material,I=second moment of area. (See an elasticity ref-
erence.)
Assuming thatu(x,t)=φ(x)T(t), carry out a separation of variable
and find the eigenvalue problem forφ. Take the boundary conditions to
be