2004 AMC 12A Problem 17

Below is the professionally curated solution for Problem 17 of the 2004 AMC 12A, from LIVE by Po-Shen Loh. You can also try the full timed exam, view all 2004 AMC 12A solutions, or check the answer key.

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Concepts:functional equationrecursionsummation

Difficulty rating: 1720

17.

Let ff be a function with the following properties:

(i) f(1)=1,f(1) = 1, and

(ii) f(2n)=nf(n)f(2n) = n \cdot f(n) for any positive integer n.n.

What is the value of f(2100)?f(2^{100})?

11

2992^{99}

21002^{100}

249502^{4950}

299992^{9999}

Solution:

Applying f(2n)=nf(n)f(2n) = n \cdot f(n) with n=2k,n = 2^{k}, we get f(2k+1)=2kf(2k).f(2^{k+1}) = 2^{k} \cdot f(2^{k}).

Unwinding from f(21)=f(2)=1f(1)=20,f(2^1) = f(2) = 1 \cdot f(1) = 2^0, the exponents accumulate: f(2n)=20+1+2++(n1)=2n(n1)/2. f(2^n) = 2^{0 + 1 + 2 + \cdots + (n-1)} = 2^{n(n-1)/2}.

Therefore f(2100)=210099/2=24950.f(2^{100}) = 2^{100 \cdot 99 / 2} = 2^{4950}.

Thus, the correct answer is D.

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