Find $a^3 + b^3 +c^3, $ given $a+b+c=12$ and $a^3 cdot b^4 cdot c^5 = 0.1 cdot (600)^3$












1












$begingroup$


$a+b+c=12$ and $a^3 cdot b^4 cdot c^5 = 0.1 cdot (600)^3$.
Find $a^3 + b^3 +c^3 = ?$



My approach is to use AM-GM inequality. Is it correct?










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  • $begingroup$
    Instead of the lengthy title which adds nothing to the post, you should have presented your ideas in detail. Also, are there any conditions on the numbers? Positive? Integer? Rational?
    $endgroup$
    – A. Pongrácz
    Dec 19 '18 at 15:21
















1












$begingroup$


$a+b+c=12$ and $a^3 cdot b^4 cdot c^5 = 0.1 cdot (600)^3$.
Find $a^3 + b^3 +c^3 = ?$



My approach is to use AM-GM inequality. Is it correct?










share|cite|improve this question











$endgroup$












  • $begingroup$
    Instead of the lengthy title which adds nothing to the post, you should have presented your ideas in detail. Also, are there any conditions on the numbers? Positive? Integer? Rational?
    $endgroup$
    – A. Pongrácz
    Dec 19 '18 at 15:21














1












1








1





$begingroup$


$a+b+c=12$ and $a^3 cdot b^4 cdot c^5 = 0.1 cdot (600)^3$.
Find $a^3 + b^3 +c^3 = ?$



My approach is to use AM-GM inequality. Is it correct?










share|cite|improve this question











$endgroup$




$a+b+c=12$ and $a^3 cdot b^4 cdot c^5 = 0.1 cdot (600)^3$.
Find $a^3 + b^3 +c^3 = ?$



My approach is to use AM-GM inequality. Is it correct?







a.m.-g.m.-inequality






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share|cite|improve this question













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edited Dec 19 '18 at 15:58









Namaste

1




1










asked Dec 19 '18 at 14:56









Mark 7Mark 7

95




95












  • $begingroup$
    Instead of the lengthy title which adds nothing to the post, you should have presented your ideas in detail. Also, are there any conditions on the numbers? Positive? Integer? Rational?
    $endgroup$
    – A. Pongrácz
    Dec 19 '18 at 15:21


















  • $begingroup$
    Instead of the lengthy title which adds nothing to the post, you should have presented your ideas in detail. Also, are there any conditions on the numbers? Positive? Integer? Rational?
    $endgroup$
    – A. Pongrácz
    Dec 19 '18 at 15:21
















$begingroup$
Instead of the lengthy title which adds nothing to the post, you should have presented your ideas in detail. Also, are there any conditions on the numbers? Positive? Integer? Rational?
$endgroup$
– A. Pongrácz
Dec 19 '18 at 15:21




$begingroup$
Instead of the lengthy title which adds nothing to the post, you should have presented your ideas in detail. Also, are there any conditions on the numbers? Positive? Integer? Rational?
$endgroup$
– A. Pongrácz
Dec 19 '18 at 15:21










1 Answer
1






active

oldest

votes


















1












$begingroup$

If the numbers have to be positive, then the problem can be solved using AM-GM, indeed.



Namely, consider the following 12 numbers:



$frac{a}{3}, frac{a}{3}, frac{a}{3}, frac{b}{4}, frac{b}{4}, frac{b}{4}, frac{b}{4}, frac{c}{5}, frac{c}{5}, frac{c}{5}, frac{c}{5}, frac{c}{5}$.



The AM is $1$, as $a+b+c=12$.



Thus, the GM is at most $1$, so the product of these $12$ numbers is at most $1$, which yields
$frac{a^3b^4c^5}{3^3cdot 4^4cdot 5^5}leq 1$.
As $a^3b^4c^5 = 0.1cdot 600^3 = 3^3cdot 4^4cdot 5^5$, the above inequality is sharp: it holds with equality.
Thus the AM and the GM of the given $12$ numbers coincide, which means that all $12$ numbers must be equal.
Hence, $frac{a}{3}= frac{b}{4}= frac{c}{5}$.
Using $a+b+c=12$ we obtain $a=3, b=4, c=5$.
Now you just have to sustitute this into $a^3+b^3+c^3$, and you are done.






share|cite|improve this answer









$endgroup$













  • $begingroup$
    Thank you I got it:)
    $endgroup$
    – Mark 7
    Dec 21 '18 at 13:30










  • $begingroup$
    I'm glad I could help. If you are happy with the answer, you should accept it.
    $endgroup$
    – A. Pongrácz
    Dec 24 '18 at 22:08











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1 Answer
1






active

oldest

votes








1 Answer
1






active

oldest

votes









active

oldest

votes






active

oldest

votes









1












$begingroup$

If the numbers have to be positive, then the problem can be solved using AM-GM, indeed.



Namely, consider the following 12 numbers:



$frac{a}{3}, frac{a}{3}, frac{a}{3}, frac{b}{4}, frac{b}{4}, frac{b}{4}, frac{b}{4}, frac{c}{5}, frac{c}{5}, frac{c}{5}, frac{c}{5}, frac{c}{5}$.



The AM is $1$, as $a+b+c=12$.



Thus, the GM is at most $1$, so the product of these $12$ numbers is at most $1$, which yields
$frac{a^3b^4c^5}{3^3cdot 4^4cdot 5^5}leq 1$.
As $a^3b^4c^5 = 0.1cdot 600^3 = 3^3cdot 4^4cdot 5^5$, the above inequality is sharp: it holds with equality.
Thus the AM and the GM of the given $12$ numbers coincide, which means that all $12$ numbers must be equal.
Hence, $frac{a}{3}= frac{b}{4}= frac{c}{5}$.
Using $a+b+c=12$ we obtain $a=3, b=4, c=5$.
Now you just have to sustitute this into $a^3+b^3+c^3$, and you are done.






share|cite|improve this answer









$endgroup$













  • $begingroup$
    Thank you I got it:)
    $endgroup$
    – Mark 7
    Dec 21 '18 at 13:30










  • $begingroup$
    I'm glad I could help. If you are happy with the answer, you should accept it.
    $endgroup$
    – A. Pongrácz
    Dec 24 '18 at 22:08
















1












$begingroup$

If the numbers have to be positive, then the problem can be solved using AM-GM, indeed.



Namely, consider the following 12 numbers:



$frac{a}{3}, frac{a}{3}, frac{a}{3}, frac{b}{4}, frac{b}{4}, frac{b}{4}, frac{b}{4}, frac{c}{5}, frac{c}{5}, frac{c}{5}, frac{c}{5}, frac{c}{5}$.



The AM is $1$, as $a+b+c=12$.



Thus, the GM is at most $1$, so the product of these $12$ numbers is at most $1$, which yields
$frac{a^3b^4c^5}{3^3cdot 4^4cdot 5^5}leq 1$.
As $a^3b^4c^5 = 0.1cdot 600^3 = 3^3cdot 4^4cdot 5^5$, the above inequality is sharp: it holds with equality.
Thus the AM and the GM of the given $12$ numbers coincide, which means that all $12$ numbers must be equal.
Hence, $frac{a}{3}= frac{b}{4}= frac{c}{5}$.
Using $a+b+c=12$ we obtain $a=3, b=4, c=5$.
Now you just have to sustitute this into $a^3+b^3+c^3$, and you are done.






share|cite|improve this answer









$endgroup$













  • $begingroup$
    Thank you I got it:)
    $endgroup$
    – Mark 7
    Dec 21 '18 at 13:30










  • $begingroup$
    I'm glad I could help. If you are happy with the answer, you should accept it.
    $endgroup$
    – A. Pongrácz
    Dec 24 '18 at 22:08














1












1








1





$begingroup$

If the numbers have to be positive, then the problem can be solved using AM-GM, indeed.



Namely, consider the following 12 numbers:



$frac{a}{3}, frac{a}{3}, frac{a}{3}, frac{b}{4}, frac{b}{4}, frac{b}{4}, frac{b}{4}, frac{c}{5}, frac{c}{5}, frac{c}{5}, frac{c}{5}, frac{c}{5}$.



The AM is $1$, as $a+b+c=12$.



Thus, the GM is at most $1$, so the product of these $12$ numbers is at most $1$, which yields
$frac{a^3b^4c^5}{3^3cdot 4^4cdot 5^5}leq 1$.
As $a^3b^4c^5 = 0.1cdot 600^3 = 3^3cdot 4^4cdot 5^5$, the above inequality is sharp: it holds with equality.
Thus the AM and the GM of the given $12$ numbers coincide, which means that all $12$ numbers must be equal.
Hence, $frac{a}{3}= frac{b}{4}= frac{c}{5}$.
Using $a+b+c=12$ we obtain $a=3, b=4, c=5$.
Now you just have to sustitute this into $a^3+b^3+c^3$, and you are done.






share|cite|improve this answer









$endgroup$



If the numbers have to be positive, then the problem can be solved using AM-GM, indeed.



Namely, consider the following 12 numbers:



$frac{a}{3}, frac{a}{3}, frac{a}{3}, frac{b}{4}, frac{b}{4}, frac{b}{4}, frac{b}{4}, frac{c}{5}, frac{c}{5}, frac{c}{5}, frac{c}{5}, frac{c}{5}$.



The AM is $1$, as $a+b+c=12$.



Thus, the GM is at most $1$, so the product of these $12$ numbers is at most $1$, which yields
$frac{a^3b^4c^5}{3^3cdot 4^4cdot 5^5}leq 1$.
As $a^3b^4c^5 = 0.1cdot 600^3 = 3^3cdot 4^4cdot 5^5$, the above inequality is sharp: it holds with equality.
Thus the AM and the GM of the given $12$ numbers coincide, which means that all $12$ numbers must be equal.
Hence, $frac{a}{3}= frac{b}{4}= frac{c}{5}$.
Using $a+b+c=12$ we obtain $a=3, b=4, c=5$.
Now you just have to sustitute this into $a^3+b^3+c^3$, and you are done.







share|cite|improve this answer












share|cite|improve this answer



share|cite|improve this answer










answered Dec 19 '18 at 15:29









A. PongráczA. Pongrácz

5,9731929




5,9731929












  • $begingroup$
    Thank you I got it:)
    $endgroup$
    – Mark 7
    Dec 21 '18 at 13:30










  • $begingroup$
    I'm glad I could help. If you are happy with the answer, you should accept it.
    $endgroup$
    – A. Pongrácz
    Dec 24 '18 at 22:08


















  • $begingroup$
    Thank you I got it:)
    $endgroup$
    – Mark 7
    Dec 21 '18 at 13:30










  • $begingroup$
    I'm glad I could help. If you are happy with the answer, you should accept it.
    $endgroup$
    – A. Pongrácz
    Dec 24 '18 at 22:08
















$begingroup$
Thank you I got it:)
$endgroup$
– Mark 7
Dec 21 '18 at 13:30




$begingroup$
Thank you I got it:)
$endgroup$
– Mark 7
Dec 21 '18 at 13:30












$begingroup$
I'm glad I could help. If you are happy with the answer, you should accept it.
$endgroup$
– A. Pongrácz
Dec 24 '18 at 22:08




$begingroup$
I'm glad I could help. If you are happy with the answer, you should accept it.
$endgroup$
– A. Pongrácz
Dec 24 '18 at 22:08


















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