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| + | There is a unique positive real number <math>x</math> such that the three numbers <math>\log_8{2x}</math>, <math>\log_4{x}</math>, and <math>\log_2{x}</math>, in that order, form a geometric progression with positive common ratio. The number <math>x</math> can be written as <math>\frac{m}{n}</math>, where <math>m</math> and <math>n</math> are relatively prime positive integers. Find <math>m + n</math>. |
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| | == Solution == | | == Solution == |
Revision as of 15:49, 14 December 2020
Problem
There is a unique positive real number 
such that the three numbers 
, 
, and 
, in that order, form a geometric progression with positive common ratio. The number can be written as 
, where 
and 
are relatively prime positive integers. Find 
.
Solution
Since these form a geometric series, 
is the common ratio. Rewriting this, we get 
by base change formula. Therefore, the common ratio is 2. Now 
. Therefore, 
.
~ JHawk0224
See here for a video solution:
https://youtu.be/nPL7nUXnRbo
Another video solution:
https://youtu.be/4FvYVfhhTaQ
Video solution (*)
https://youtu.be/FgrIgCyGVUI
Solution 2
If we set 
, we can obtain three terms of a geometric sequence through logarithm properties. The three terms are ![\[\frac{y+1}{3}, \frac{y}{2}, y.\]](//latex.artofproblemsolving.com/8/e/a/8ead8ac857716f8f074ebe20ad11c83299280b6e.png)
In a three-term geometric sequence, the middle term squared is equal to the product of the other two terms, so we obtain the following: ![\[\frac{y^2+y}{3} = \frac{y^2}{4},\]](//latex.artofproblemsolving.com/2/8/3/283eb25c8a6be5001958063c3676264d49d08ceb.png)
which can be solved to reveal 
. Therefore, 
, so our answer is 
.
-molocyxu
Solution 3
Let 
be the common ratio. We have ![\[r = \frac{\log_4{(x)}}{\log_8{(2x)}} = \frac{\log_2{(x)}}{\log_4{(x)}}\]](//latex.artofproblemsolving.com/5/e/4/5e42281b4d205792c2329fb85bc28f1ae2177f6e.png)
Hence we obtain ![\[(\log_4{(x)})(\log_4{(x)}) = (\log_8{(2x)})(\log_2{(x)})\]](//latex.artofproblemsolving.com/2/e/c/2ecc653ff975697ce6eb1005046024982747371c.png)
Ideally we change everything to base 
and we can get: ![\[(\log_{64}{(x^3)})(\log_{64}{(x^3)}) = (\log_{64}{(x^6)})(\log_{64}{(4x^2)})\]](//latex.artofproblemsolving.com/5/1/5/5158df272871b09cb29298858da73415a1594a26.png)
Now divide to get: ![\[\frac{\log_{64}{(x^3)}}{\log_{64}{(4x^2)}} = \frac{\log_{64}{(x^6)}}{\log_{64}{(x^3)}}\]](//latex.artofproblemsolving.com/8/6/5/8651477f2eda8010924eda5d8f7ece6e93f298d2.png)
By change-of-base we obtain: ![\[\log_{(4x^2)}{(x^3)} = \log_{(x^3)}{(x^6)} = 2\]](//latex.artofproblemsolving.com/5/8/e/58ec5c917434946dfd33345bf04e45d4e683593a.png)
Hence 
and we have 
as desired.
~skyscraper
Solution 4 (Exponents > Logarithms)
Let be the common ratio, and let 
be the starting term (
). We then have: ![\[\log_{8}{(2x)}=a, \log_{4}{(x)}=ar, \log_{2}{(x)}=ar^2\]](//latex.artofproblemsolving.com/9/e/2/9e2d9cb4f3b37f0dde5952b941d6fc744f044424.png)
Rearranging these equations gives: ![\[8^a=2x, 4^{ar}=x, 2^{ar^2}=x\]](//latex.artofproblemsolving.com/9/0/a/90a4cf297b97500ce716fe8d7d4991db720c3fb4.png)
Deal with the last two equations first: Setting them equal gives: ![\[4^{ar}=2^{ar^2} \implies 2^{2ar}=2^{ar^2} \implies 2ar=ar^2 \implies r=2\]](//latex.artofproblemsolving.com/0/6/c/06c7c95f50b77868c23028f03fcda9be3b0106d3.png)
Using this value of , substitute into the first and second equations (or the first and third, it doesn't really matter) to get: ![\[8^a=2x, 4^{2a}=x\]](//latex.artofproblemsolving.com/f/0/a/f0ace305c3e93498a49b6e8c53a26ede66bc71b3.png)
Changing these to a common base gives: ![\[2^{3a}=2x, 2^{4a}=x\]](//latex.artofproblemsolving.com/c/5/f/c5fdd0a487fef9878e80710d0a9e1b641adc3e52.png)
Dividing the first equation by 2 on both sides yields: ![\[2^{3a-1}=x\]](//latex.artofproblemsolving.com/a/a/1/aa15b77225e70af5e4b36a0062b25e757c2ef8e4.png)
Setting these equations equal to each other and removing the exponent again gives: ![\[3a-1=4a \implies a=-1\]](//latex.artofproblemsolving.com/0/b/0/0b0cb679e2937b5ead329a37aef7e6b94d454566.png)
Substituting this back into the first equation gives: ![\[8^{-1}=2x \implies 2x=\frac{1}{8} \implies x=\frac{1}{16}\]](//latex.artofproblemsolving.com/4/3/1/4316c9a38409baa18e92d302a2e5a802aca7571a.png)
Therefore, 
~IAmTheHazard
Solution 5
We can relate the logarithms as follows:
![\[\frac{\log_4{x}}{\log_8{(2x)}}=\frac{\log_2{x}}{\log_4{x}}\]](//latex.artofproblemsolving.com/b/4/c/b4c96bd445244696f33091dcdd08465e85fb90a6.png)
![\[\log_8{(2x)}\log_2{x}=\log_4{x}\log_4{x}\]](//latex.artofproblemsolving.com/d/8/1/d816a700a792939509df5db0e347b461ec56cb2f.png)
Now we can convert all logarithm bases to 
using the identity 
:
![\[\log_2{\sqrt[3]{2x}}\log_2{x}=\log_2{\sqrt{x}}\log_2{\sqrt{x}}\]](//latex.artofproblemsolving.com/9/6/f/96fb06e49096240713e31e20acf1b6f6641b2499.png)
We can solve for as follows:
![\[\frac{1}{3}\log_2{(2x)}\log_2{x}=\frac{1}{4}\log_2{x}\log_2{x}\]](//latex.artofproblemsolving.com/5/4/c/54c192600efeef3f4a1d1de2c9e3d50765b1fa27.png)
![\[\frac{1}{3}\log_2{(2x)}=\frac{1}{4}\log_2{x}\]](//latex.artofproblemsolving.com/1/e/e/1ee7baed2ceabb6241a4accf5fde31d6575d5213.png)
![\[\frac{1}{3}\log_2{2}+\frac{1}{3}\log_2{x}=\frac{1}{4}\log_2{x}\]](//latex.artofproblemsolving.com/1/b/2/1b2948578ed6a989797f8c977a84ef714c8a37a6.png)
We get 
. Verifying that the common ratio is positive, we find the answer of .
~QIDb602
Solution 6
If the numbers are in a geometric sequence, the middle term must be the geometric mean of the surrounding terms. We can rewrite the first two logarithmic expressions as 
and 
, respectively. Therefore:
![\[\frac{1}{2}\log_2{x}=\sqrt{\left(\frac{1+\log_2{x}}{3}\right)\left(\log_2{x}\right)}\]](//latex.artofproblemsolving.com/8/6/3/863ae271c3e4b2a145ad891f77281a6dc81ef154.png)
Let 
. We can rewrite the expression as:
![\[\frac{n}{2}=\sqrt{\frac{n(n+1)}{3}}\]](//latex.artofproblemsolving.com/c/3/2/c32cd2852527f3dc044c1ca575c03bc11647ea1d.png)
![\[\frac{n^2}{4}=\frac{n(n+1)}{3}\]](//latex.artofproblemsolving.com/c/4/0/c408cd472ee251ecafd9b315fc048bfb73f59682.png)
![\[4n(n+1)=3n^2\]](//latex.artofproblemsolving.com/9/a/5/9a5d146c8a968a777b825d888e7f1f2945a2301f.png)
![\[4n^2+4n=3n^2\]](//latex.artofproblemsolving.com/7/3/f/73fc85360037ded47c61e887260a2bc4369e65de.png)
![\[n^2+4n=0\]](//latex.artofproblemsolving.com/6/3/8/638450c02eff44dc43b02b2ee1bf18d5126a55ed.png)
![\[n(n+4)=0\]](//latex.artofproblemsolving.com/7/4/c/74cd28c6b4e54692eed46534ea0daac7e82aacbe.png)
![\[n=0 \text{ and } -4\]](//latex.artofproblemsolving.com/9/6/f/96fa593de1c9656aad0e268504712b83001f88a7.png)
Zero does not work in this case, so we consider 
: 
. Therefore, 
.
~Bowser498
Solution 7 (Official MAA)
By the Change of Base Formula the common ratio of the progression is![\[\frac{\log_2 x}{\log_4 x} = \frac{\hphantom{m}\log_2x\hphantom{m}}{\frac{\log_2x}{\log_24}} = 2.\]](//latex.artofproblemsolving.com/3/c/c/3ccd59bb41a8562a6d71439697a18523b9f3531d.png)
Hence must satisfy![\[2=\frac{\log_4 x}{\log_8 (2x)}= \frac{\log_2 x}{\log_2 4} \div \frac{\log_2(2x)}{\log_28} = \frac 32\cdot \frac{\log_2x}{1+\log_2x}.\]](//latex.artofproblemsolving.com/5/2/2/522a531b45cda0320f9afb22c98bfa8172d012a0.png)
This is equivalent to 
. Hence 
and 
. The requested sum is 
.
See here for a video solution:
https://youtu.be/nPL7nUXnRbo
Video Solution
https://youtu.be/mgRNqSDCvgM?t=281s
See Also
The problems on this page are copyrighted by the Mathematical Association of America's American Mathematics Competitions. 
such that the three numbers 
, 
, and 
, in that order, form a geometric progression with positive common ratio. The number 
, where 
and 
are relatively prime positive integers. Find 
.
is the common ratio. Rewriting this, we get 
by base change formula. Therefore, the common ratio is 2. Now 
. Therefore, 
.
, we can obtain three terms of a geometric sequence through logarithm properties. The three terms are ![\[\frac{y+1}{3}, \frac{y}{2}, y.\]](http://latex.artofproblemsolving.com/8/e/a/8ead8ac857716f8f074ebe20ad11c83299280b6e.png)
In a three-term geometric sequence, the middle term squared is equal to the product of the other two terms, so we obtain the following: ![\[\frac{y^2+y}{3} = \frac{y^2}{4},\]](http://latex.artofproblemsolving.com/2/8/3/283eb25c8a6be5001958063c3676264d49d08ceb.png)
which can be solved to reveal 
. Therefore, 
, so our answer is 
.
be the common ratio. We have ![\[r = \frac{\log_4{(x)}}{\log_8{(2x)}} = \frac{\log_2{(x)}}{\log_4{(x)}}\]](http://latex.artofproblemsolving.com/5/e/4/5e42281b4d205792c2329fb85bc28f1ae2177f6e.png)
Hence we obtain ![\[(\log_4{(x)})(\log_4{(x)}) = (\log_8{(2x)})(\log_2{(x)})\]](http://latex.artofproblemsolving.com/2/e/c/2ecc653ff975697ce6eb1005046024982747371c.png)
Ideally we change everything to base 
and we can get: ![\[(\log_{64}{(x^3)})(\log_{64}{(x^3)}) = (\log_{64}{(x^6)})(\log_{64}{(4x^2)})\]](http://latex.artofproblemsolving.com/5/1/5/5158df272871b09cb29298858da73415a1594a26.png)
Now divide to get: ![\[\frac{\log_{64}{(x^3)}}{\log_{64}{(4x^2)}} = \frac{\log_{64}{(x^6)}}{\log_{64}{(x^3)}}\]](http://latex.artofproblemsolving.com/8/6/5/8651477f2eda8010924eda5d8f7ece6e93f298d2.png)
By change-of-base we obtain: ![\[\log_{(4x^2)}{(x^3)} = \log_{(x^3)}{(x^6)} = 2\]](http://latex.artofproblemsolving.com/5/8/e/58ec5c917434946dfd33345bf04e45d4e683593a.png)
Hence 
and we have 
as desired.
be the starting term (
). We then have: ![\[\log_{8}{(2x)}=a, \log_{4}{(x)}=ar, \log_{2}{(x)}=ar^2\]](http://latex.artofproblemsolving.com/9/e/2/9e2d9cb4f3b37f0dde5952b941d6fc744f044424.png)
Rearranging these equations gives: ![\[8^a=2x, 4^{ar}=x, 2^{ar^2}=x\]](http://latex.artofproblemsolving.com/9/0/a/90a4cf297b97500ce716fe8d7d4991db720c3fb4.png)
Deal with the last two equations first: Setting them equal gives: ![\[4^{ar}=2^{ar^2} \implies 2^{2ar}=2^{ar^2} \implies 2ar=ar^2 \implies r=2\]](http://latex.artofproblemsolving.com/0/6/c/06c7c95f50b77868c23028f03fcda9be3b0106d3.png)
Using this value of ![\[8^a=2x, 4^{2a}=x\]](http://latex.artofproblemsolving.com/f/0/a/f0ace305c3e93498a49b6e8c53a26ede66bc71b3.png)
Changing these to a common base gives: ![\[2^{3a}=2x, 2^{4a}=x\]](http://latex.artofproblemsolving.com/c/5/f/c5fdd0a487fef9878e80710d0a9e1b641adc3e52.png)
Dividing the first equation by 2 on both sides yields: ![\[2^{3a-1}=x\]](http://latex.artofproblemsolving.com/a/a/1/aa15b77225e70af5e4b36a0062b25e757c2ef8e4.png)
Setting these equations equal to each other and removing the exponent again gives: ![\[3a-1=4a \implies a=-1\]](http://latex.artofproblemsolving.com/0/b/0/0b0cb679e2937b5ead329a37aef7e6b94d454566.png)
Substituting this back into the first equation gives: ![\[8^{-1}=2x \implies 2x=\frac{1}{8} \implies x=\frac{1}{16}\]](http://latex.artofproblemsolving.com/4/3/1/4316c9a38409baa18e92d302a2e5a802aca7571a.png)
Therefore, 
![\[\frac{\log_4{x}}{\log_8{(2x)}}=\frac{\log_2{x}}{\log_4{x}}\]](http://latex.artofproblemsolving.com/b/4/c/b4c96bd445244696f33091dcdd08465e85fb90a6.png)
![\[\log_8{(2x)}\log_2{x}=\log_4{x}\log_4{x}\]](http://latex.artofproblemsolving.com/d/8/1/d816a700a792939509df5db0e347b461ec56cb2f.png)
using the identity 
:
![\[\log_2{\sqrt[3]{2x}}\log_2{x}=\log_2{\sqrt{x}}\log_2{\sqrt{x}}\]](http://latex.artofproblemsolving.com/9/6/f/96fb06e49096240713e31e20acf1b6f6641b2499.png)
![\[\frac{1}{3}\log_2{(2x)}\log_2{x}=\frac{1}{4}\log_2{x}\log_2{x}\]](http://latex.artofproblemsolving.com/5/4/c/54c192600efeef3f4a1d1de2c9e3d50765b1fa27.png)
![\[\frac{1}{3}\log_2{(2x)}=\frac{1}{4}\log_2{x}\]](http://latex.artofproblemsolving.com/1/e/e/1ee7baed2ceabb6241a4accf5fde31d6575d5213.png)
![\[\frac{1}{3}\log_2{2}+\frac{1}{3}\log_2{x}=\frac{1}{4}\log_2{x}\]](http://latex.artofproblemsolving.com/1/b/2/1b2948578ed6a989797f8c977a84ef714c8a37a6.png)
We get 
. Verifying that the common ratio is positive, we find the answer of 
and 
, respectively. Therefore:
![\[\frac{1}{2}\log_2{x}=\sqrt{\left(\frac{1+\log_2{x}}{3}\right)\left(\log_2{x}\right)}\]](http://latex.artofproblemsolving.com/8/6/3/863ae271c3e4b2a145ad891f77281a6dc81ef154.png)
Let 
. We can rewrite the expression as:
![\[\frac{n}{2}=\sqrt{\frac{n(n+1)}{3}}\]](http://latex.artofproblemsolving.com/c/3/2/c32cd2852527f3dc044c1ca575c03bc11647ea1d.png)
![\[\frac{n^2}{4}=\frac{n(n+1)}{3}\]](http://latex.artofproblemsolving.com/c/4/0/c408cd472ee251ecafd9b315fc048bfb73f59682.png)
![\[4n(n+1)=3n^2\]](http://latex.artofproblemsolving.com/9/a/5/9a5d146c8a968a777b825d888e7f1f2945a2301f.png)
![\[4n^2+4n=3n^2\]](http://latex.artofproblemsolving.com/7/3/f/73fc85360037ded47c61e887260a2bc4369e65de.png)
![\[n^2+4n=0\]](http://latex.artofproblemsolving.com/6/3/8/638450c02eff44dc43b02b2ee1bf18d5126a55ed.png)
![\[n(n+4)=0\]](http://latex.artofproblemsolving.com/7/4/c/74cd28c6b4e54692eed46534ea0daac7e82aacbe.png)
![\[n=0 \text{ and } -4\]](http://latex.artofproblemsolving.com/9/6/f/96fa593de1c9656aad0e268504712b83001f88a7.png)
Zero does not work in this case, so we consider 
: 
. Therefore, 
.
![\[\frac{\log_2 x}{\log_4 x} = \frac{\hphantom{m}\log_2x\hphantom{m}}{\frac{\log_2x}{\log_24}} = 2.\]](http://latex.artofproblemsolving.com/3/c/c/3ccd59bb41a8562a6d71439697a18523b9f3531d.png)
Hence ![\[2=\frac{\log_4 x}{\log_8 (2x)}= \frac{\log_2 x}{\log_2 4} \div \frac{\log_2(2x)}{\log_28} = \frac 32\cdot \frac{\log_2x}{1+\log_2x}.\]](http://latex.artofproblemsolving.com/5/2/2/522a531b45cda0320f9afb22c98bfa8172d012a0.png)
This is equivalent to 
. Hence 
and 
. The requested sum is 
.
See here for a video solution:
