Joined: Wed, 30 Mar 2005 04:25:14 UTC Posts: 14746 Location: Austin, TX
I was looking at Exam A from the Putnam from last December and one of the problems looked like a fun thing to spend a couple of minutes trying. It's not hard by any stretch of the imagination, but the method was rather novel, and I think it will be fun for those with even the most rudimentary understanding of DiffEQ.
Functions and are differentiable on some open interval around 0 and satisfy the equations and initial conditions
Find an explicit formula for valid on some open interval around 0.
Start by noting that the identically zero function for any of the three is invalid by the division part of the equations, so multiplying all of the equations by or is a valid operation.
Then we have:
Add these together and note that we are in a situation where we have applied the product rule to the function , so we get:
So integrating, we get that:
Now the initial condition tells us that .
Now returning to the equation
we can see by simple separation of variables that
By a simple u-substitution.
From there it's a simple exponentiation to recover completely, yielding:
Apply the initial condition to see that and that's all she wrote!
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