# How to solve a general recurrence? [closed]

Is there a way to solve a general recurrence relation of the form

a(n)=a(n-1) * a(n-2)....

I mean I can use the matrix method to solve a relation of the form

F(n)=a1*F(n-1) + a2*F(n-2).......+ ak*F(n-k)

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## closed as off topic by Mat, Brett Hale, Ali, GregS, LingerOct 29 '12 at 1:34

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what do you mean by solving? –  elyashiv Oct 28 '12 at 12:12
what have you tried ? –  giorashc Oct 28 '12 at 12:14
Take logarithms. –  huon-dbaupp Oct 28 '12 at 12:21
You should submit this to math.stackexchange.com. This isn't a programming question. –  Brett Hale Oct 28 '12 at 12:54

Use logarithms:

a(n) = a(n-1) * a(n-2) * a(n-3) * ....

Take log of both sides:

log(a(n)) = log(a(n-1) * a(n-2) * a(n-3) * ...)

Use the fact that log(a * b) = log(a) + log(b) to split up the factors:

log(a(n)) = log(a(n-1)) + log(a(n-2)) + log(a(n-3)) + ...

Now, if you just say that F(n) = log(a(n)) then this equation looks just like your second equation. Use the matrix method to solve for log(a(n)):

log(a(n)) = X

Which leaves:

a(n) = e ^ X

(Assuming you take natural logarithms)

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