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Show that the differential equation (on the left) is a solution of the function (on the right) d^2u/dt^2 = a^2 * (d^2u/dx^2) u(x,t) = f(x-at) + g(x+at)
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Show that the differential equation (on the left) is a solution of the function (on the right)

d^2u/dt^2 = a^2 * (d^2u/dx^2) u(x,t) = f(x-at) + g(x+at)

User Ytw
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1 Answer

3 votes

We have to show that


(\partial ^(2)u)/(\partial t^(2))=a^(2)(\partial ^(2)u)/(\partial x^(2))

for
(\partial ^(2)u)/(\partial t^(2)) we have


(\partial ^(2)u)/(\partial t^(2))=a^(2)(\partial ^(2)u)/(\partial x^(2))


(\partial ^(2)u)/(\partial t^(2))=(\partial ^(2)[f(x-at)+g(x+at)])/(\partial t^(2))


=(\partial )/(\partial t)[(\partial[f(x-at)+g(x+at)] )/(\partial t)]


(\partial )/(\partial t)[-a\cdot f'(x-at)+a\cdot g'(x+at)]


=a^(2)f''(x-at)+a^(2)g''(x+at)


=a^(2)[f''(x-at)+g''(x+at)].............(i)

similarly,


(\partial ^(2)u)/(\partial x^(2))=(\partial ^(2)[f(x-at)+g(x+at)])/(\partial x^(2))


=(\partial )/(\partial x)[(\partial[f(x-at)+g(x+at)] )/(\partial x)]


=(\partial )/(\partial x)[f'(x-at)+g'(x+at)]


=f''(x-at)+g''(x+at).......(ii)

Comparing i and ii we get


a^(2)(\partial ^(2)u)/(\partial x^(2))=(\partial ^(2)u)/(\partial t^(2))

Hence proved

User Tim Hoolihan
by
8.1k points
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