Difference between revisions of "2019 AMC 12A Problems/Problem 23"
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<math>\textbf{(A) } 8 \qquad \textbf{(B) } 9 \qquad \textbf{(C) } 10 \qquad \textbf{(D) } 11 \qquad \textbf{(E) } 12</math> | <math>\textbf{(A) } 8 \qquad \textbf{(B) } 9 \qquad \textbf{(C) } 10 \qquad \textbf{(D) } 11 \qquad \textbf{(E) } 12</math> | ||
− | ==Solution 1== | + | == Solution 1 == |
+ | First note that by log properties <math>a\diamondsuit b = 7^{(\log_7a)(\log_7b)}</math> and <math>a \heartsuit b = 7^{\frac{\log_7a}{\log_7b}} = 7^{\log_ba}</math>. | ||
+ | |||
+ | Now, define <math>b_n = \log_7(a_n)</math>. Thus <math>b_3 = \log_7(3\heartsuit 2) = \log_7(7^{\log_23}) = \log_23</math>. | ||
+ | |||
+ | Taking logs of both sides of the recursion and using the definition of <math>\diamondsuit</math> gives <math>\log_7(a_n) = \log_7(7^{\log_7n\heartsuit (n-1)\log_7a_{n-1}})</math>. | ||
+ | |||
+ | The logs and the exponent cancel to <math> \log_7((n\heartsuit (n-1))^{\log_7(a_{n-1})})</math>, and by the definition of <math>\heartsuit</math>, ths is <math>\log_7(7^{(\log_{n-1}n)\log_7(a_{n-1})})</math>, which quickly simplifies to <math>\log_7(a_{n-1})\log_{n-1}n</math> <math> = b_{n-1}\log_{n-1}n</math>. | ||
+ | |||
+ | Thus <math>b_n = b_{n-1}\log_{n-1}n</math>. From this, we have <math>b_4 = b_3\log_34 = \log_23\log_34 = \log_24</math>, <math>b_5 = \log_45\log_24 = \log_25</math>, and in general, <math>b_n = \log_2n</math>. | ||
+ | |||
+ | Finally, <math>\log_7(a_{2019}) = b_{2019}= \log_22019</math>. | ||
+ | Since <math>2^{11} = 2048</math> and <math>2019</math> is slightly less than <math>2048</math>, <math>\log_22019 \approx \boxed{\text{(D) }11}</math>. | ||
+ | |||
+ | - NamelyOrange | ||
+ | |||
+ | |||
+ | ==Solution 2== | ||
By definition, the recursion becomes <math>a_n = \left(n^{\frac1{\log_7(n-1)}}\right)^{\log_7(a_{n-1})}=n^{\frac{\log_7(a_{n-1})}{\log_7(n-1)}}</math>. By the change of base formula, this reduces to <math>a_n = n^{\log_{n-1}(a_{n-1})}</math>. Thus, we have <math>\log_n(a_n) = \log_{n-1}(a_{n-1})</math>. Thus, for each positive integer <math>m \geq 3</math>, the value of <math>\log_m(a_m)</math> must be some constant value <math>k</math>. | By definition, the recursion becomes <math>a_n = \left(n^{\frac1{\log_7(n-1)}}\right)^{\log_7(a_{n-1})}=n^{\frac{\log_7(a_{n-1})}{\log_7(n-1)}}</math>. By the change of base formula, this reduces to <math>a_n = n^{\log_{n-1}(a_{n-1})}</math>. Thus, we have <math>\log_n(a_n) = \log_{n-1}(a_{n-1})</math>. Thus, for each positive integer <math>m \geq 3</math>, the value of <math>\log_m(a_m)</math> must be some constant value <math>k</math>. | ||
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We conclude that <math>\log_7(a_{2019}) = \log_2(2019) \approx \boxed{11}</math>, or choice <math>\boxed{\text{D}}</math>. | We conclude that <math>\log_7(a_{2019}) = \log_2(2019) \approx \boxed{11}</math>, or choice <math>\boxed{\text{D}}</math>. | ||
− | ==Solution | + | ==Solution 3== |
− | Using the recursive definition, <math>a_4 = (4 \, \heartsuit \, 3) \, \diamondsuit\, (3 \, \heartsuit\, 2)</math> or <math>a_4 = (4^{m})^{ | + | Using the recursive definition, <math>a_4 = (4 \, \heartsuit \, 3) \, \diamondsuit\, (3 \, \heartsuit\, 2)</math> or <math>a_4 = (4^{m})^{k}</math> where <math>m = \frac{1}{\log_{7}(3)}</math> and <math>k = \log_{7}(3^{\frac{1}{\log_{7}(2)}})</math>. Using logarithm rules, we can remove the exponent of the 3 so that <math>k = \frac{\log_{7}(3)}{\log_{7}(2)}</math>. Therefore, <math>a_4 = 4^{\frac{1}{\log_{7}(2)}}</math>, which is <math>4 \, \heartsuit \, 2</math>. |
We claim that <math>a_n = n \, \heartsuit \, 2</math> for all <math>n \geq 3</math>. We can prove this through induction. | We claim that <math>a_n = n \, \heartsuit \, 2</math> for all <math>n \geq 3</math>. We can prove this through induction. | ||
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<math>a_n = (n\, \heartsuit\, (n-1)) \,\diamondsuit\, ((n-1) \, \heartsuit \, 2)</math> | <math>a_n = (n\, \heartsuit\, (n-1)) \,\diamondsuit\, ((n-1) \, \heartsuit \, 2)</math> | ||
− | This can be simplified as <math>a_n = | + | This can be simplified as <math>a_n = (n^{\log_{n-1}(7)}) \, \diamondsuit \, ((n-1)^{\log_{2}(7)})</math>. |
Applying the diamond operation, we can simplify <math>a_n = n^h</math> where <math>h = \log_{n-1}(7) \cdot \log_{7}(n-1)^{\log_{2}(7)}</math>. By using logarithm rules to remove the exponent of <math>\log_{7}(n-1)</math> and after cancelling, <math>h = \frac{1}{\log_{7}(2)}</math>. | Applying the diamond operation, we can simplify <math>a_n = n^h</math> where <math>h = \log_{n-1}(7) \cdot \log_{7}(n-1)^{\log_{2}(7)}</math>. By using logarithm rules to remove the exponent of <math>\log_{7}(n-1)</math> and after cancelling, <math>h = \frac{1}{\log_{7}(2)}</math>. | ||
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We have <math>a_{2019} = 2019^{\log_{2}(7)}</math>. Taking <math>\log_{2019}</math> of both sides gives us <math>{\log_{2019}(a_{2019})} = {\log_{2}(7)}</math>. Then, by changing to base <math>7</math> and after cancellation, we arrive at <math>{\log_{7}(a_{2019})} = {\log_{2}(2019)}</math>. Because <math>2^{11} = 2048</math> and <math>2^{10} = 1024</math>, our answer is <math>\boxed{\textbf{(D) } 11}</math>. | We have <math>a_{2019} = 2019^{\log_{2}(7)}</math>. Taking <math>\log_{2019}</math> of both sides gives us <math>{\log_{2019}(a_{2019})} = {\log_{2}(7)}</math>. Then, by changing to base <math>7</math> and after cancellation, we arrive at <math>{\log_{7}(a_{2019})} = {\log_{2}(2019)}</math>. Because <math>2^{11} = 2048</math> and <math>2^{10} = 1024</math>, our answer is <math>\boxed{\textbf{(D) } 11}</math>. | ||
− | + | == Solution 4 == | |
− | == Solution | ||
We are given that | We are given that | ||
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<cmath>\log_7(a_n)=(\log_7n)(\log_{n-1}7)(\log_7a_{n-1})</cmath> | <cmath>\log_7(a_n)=(\log_7n)(\log_{n-1}7)(\log_7a_{n-1})</cmath> | ||
− | Now expressing <math>\log_7a_ | + | Now expressing <math>\log_7a_{n-1}</math> in a similar expression as <math>\log_7a_n</math>, |
<cmath>\log_7(a_n)=(\log_7n)(\log_{n-1}7)(\log_7n-1)(\log_{n-2}7)(\log_7a_{n-2})</cmath> | <cmath>\log_7(a_n)=(\log_7n)(\log_{n-1}7)(\log_7n-1)(\log_{n-2}7)(\log_7a_{n-2})</cmath> | ||
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<cmath>\log_7(a_n)=(\log_7n)(\log_37)(\log_7a_3)</cmath> | <cmath>\log_7(a_n)=(\log_7n)(\log_37)(\log_7a_3)</cmath> | ||
− | <cmath>\log_7(a_n)=(\log_7n)(\log_37)(\log_7(3^{\frac{1}{\log_72}})</cmath> | + | <cmath>\log_7(a_n)=(\log_7n)(\log_37)(\log_7(3^{\frac{1}{\log_72}}))</cmath> |
+ | <cmath>\log_7(a_n)=(\log_7n)(\log_37)(\log_27)(\log_73)</cmath> | ||
+ | <cmath>\log_7(a_n)=(\log_27)(\log_7n)</cmath> | ||
+ | |||
+ | Using the Chain Rule for Logarithm, <math>(\log_ab)(\log_bc)=\log_ac</math>, yields | ||
+ | |||
+ | <cmath>\log_7(a_n)=(\log_2n)</cmath> | ||
+ | Finally, substituting in <math>n=2019</math>, we have | ||
+ | <cmath>\log_7(a_{2019})=(\log_22019)</cmath> | ||
+ | <cmath>\log_7(a_{2019})\approx11\boxed{\mathrm{(D)}}</cmath> | ||
+ | |||
+ | ~ Nafer | ||
+ | |||
+ | === Video Solution by Richard Rusczyk === | ||
+ | |||
+ | https://artofproblemsolving.com/videos/amc/2019amc12a/495 | ||
+ | |||
+ | ~ dolphin7 | ||
==See Also== | ==See Also== |
Latest revision as of 08:10, 29 September 2024
Contents
Problem
Define binary operations and by for all real numbers and for which these expressions are defined. The sequence is defined recursively by and for all integers . To the nearest integer, what is ?
Solution 1
First note that by log properties and .
Now, define . Thus .
Taking logs of both sides of the recursion and using the definition of gives .
The logs and the exponent cancel to , and by the definition of , ths is , which quickly simplifies to .
Thus . From this, we have , , and in general, .
Finally, . Since and is slightly less than , .
- NamelyOrange
Solution 2
By definition, the recursion becomes . By the change of base formula, this reduces to . Thus, we have . Thus, for each positive integer , the value of must be some constant value .
We now compute from . It is given that , so .
Now, we must have . At this point, we simply switch some bases around. For those who are unfamiliar with logarithms, we can turn the logarithms into fractions which are less intimidating to work with.
We conclude that , or choice .
Solution 3
Using the recursive definition, or where and . Using logarithm rules, we can remove the exponent of the 3 so that . Therefore, , which is .
We claim that for all . We can prove this through induction.
Clearly, the base case where holds.
This can be simplified as .
Applying the diamond operation, we can simplify where . By using logarithm rules to remove the exponent of and after cancelling, .
Therefore, for all , completing the induction.
We have . Taking of both sides gives us . Then, by changing to base and after cancellation, we arrive at . Because and , our answer is .
Solution 4
We are given that Since we are asked to find , we directly apply Using the property that Now using the property that Once again applying the first property yields Rearranging the expression,
Now expressing in a similar expression as ,
Because of the fact that , we can cancel out the terms to get
Using the Chain Rule for Logarithm, , yields
Finally, substituting in , we have
~ Nafer
Video Solution by Richard Rusczyk
https://artofproblemsolving.com/videos/amc/2019amc12a/495
~ dolphin7
See Also
2019 AMC 12A (Problems • Answer Key • Resources) | |
Preceded by Problem 22 |
Followed by Problem 24 |
1 • 2 • 3 • 4 • 5 • 6 • 7 • 8 • 9 • 10 • 11 • 12 • 13 • 14 • 15 • 16 • 17 • 18 • 19 • 20 • 21 • 22 • 23 • 24 • 25 | |
All AMC 12 Problems and Solutions |
The problems on this page are copyrighted by the Mathematical Association of America's American Mathematics Competitions.