Difference between revisions of "2011 AMC 12B Problems/Problem 17"

Revision as of 18:36, 27 January 2020

Problem

Let $f(x) = 10^{10x}, g(x) = \log_{10}\left(\frac{x}{10}\right), h_1(x) = g(f(x))$ , and $h_n(x) = h_1(h_{n-1}(x))$ for integers $n \geq 2$ . What is the sum of the digits of $h_{2011}(1)$ ?

$\textbf{(A)}\ 16081 \qquad \textbf{(B)}\ 16089 \qquad \textbf{(C)}\ 18089 \qquad \textbf{(D)}\ 18098 \qquad \textbf{(E)}\ 18099$

Solution

$g(x)=\log_{10}\left(\frac{x}{10}\right)=\log_{10}\left({x}\right) - 1$

$h_{1}(x)=g(f(x))\text{ = }g(10^{10x}=\log_{10}\left({10^{10x}}\right){ - 1 = 10x - 1}$

Proof by induction that $h_{n}(x)\text{ = }10^n x - (1 + 10 + 10^2 + ... + 10^{n-1})$ :

For $n=1$ , $h_{1}(x)=10x - 1$

Assume $h_{n}(x)=10^n x - (1 + 10 + 10^2 + ... + 10^{n-1})$ is true for n:

$\begin{align*} h_{n+1}(x)&= h_{1}(h_{n}(x))\\ &=10 h_{n}(x) - 1\\ &=10 (10^n x - (1 + 10 + 10^2 + ... + 10^{n-1})) - 1\\ &= 10^{n+1} x - (10 + 10^2 + ... + 10^{n}) - 1\\ &= 10^{n+1} x - (1 + 10 + 10^2 + ... + 10^{(n+1)-1}) \end{align*}$

Therefore, if it is true for n, then it is true for n+1; since it is also true for n = 1, it is true for all positive integers n.

$h_{2011}(1) = 10^{2011}\times 1{ - }(1 + 10 + 10^2 + ... + 10^{2010})$ , which is the 2011-digit number 8888...8889

The sum of the digits is 8 times 2010 plus 9, or $\boxed{16089\textbf{(B)}}$

Solution 2 (Non-Rigorous Trends)

As before, combine the functions to see that $h_1(x)=10x-1$ . Compute $h_1$ , $h_2$ , and $h_3$ for $x=1$ to yield 9, 89, and 889. In computing, notice how this trend will evidently continue, because it repeats (multiply by 10 and subtract 1. Multiply by 10 and subtract 1. And so forth). As such, $h_2011$ is 2010 8's followed by a nine. $2010(8)+9=\boxed{\textbf{B)}16089}$ .

~~BJHHar

@@ Line 29: / Line 29: @@
 The sum of the digits is 8 times 2010 plus 9, or <math>\boxed{16089\textbf{(B)}}</math>
+==Solution 2 (Non-Rigorous Trends)==
+As before, combine the functions to see that <math>h_1(x)=10x-1</math>. Compute <math>h_1</math>, <math>h_2</math>, and <math>h_3</math> for <math>x=1</math> to yield 9, 89, and 889. In computing, notice how this trend will evidently continue, because it repeats (multiply by 10 and subtract 1. Multiply by 10 and subtract 1. And so forth). As such, <math>h_2011</math> is 2010 8's followed by a nine. <math>2010(8)+9=\boxed{\textbf{B)}16089}</math>.
+~~BJHHar
 == See also ==
 {{AMC12 box|year=2011|num-b=16|num-a=18|ab=B}}
 {{MAA Notice}}

2011 AMC 12B (Problems • Answer Key • Resources)
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Difference between revisions of "2011 AMC 12B Problems/Problem 17"

Revision as of 18:36, 27 January 2020

Contents

Problem

Solution

Solution 2 (Non-Rigorous Trends)

See also