Asked by Sheenybeany
This was the question before that you answered with more information.
"Two altitudes of a triangle have lengths 12 and 14. What is the longest possible length of the third altitude, if it is a positive integer?"
I don't get it. Could you at least help me for the first couple of steps???
"Two altitudes of a triangle have lengths 12 and 14. What is the longest possible length of the third altitude, if it is a positive integer?"
I don't get it. Could you at least help me for the first couple of steps???
Answers
Answered by
Steve
We know that given sides A,B,C, with A>=B,
A-B < C < A+B
With a little algebra (as seen here):
http://www.algebra.com/algebra/homework/Triangles/Triangles.faq.question.577996.html
we know that if the altitudes are a,b,c then
1/a - 1/b < c < 1/a + 1/b
So, for your triangle, the 3rd altitude must satisfy
1/12 - 1/14 < c < 1/12 + 1/14
A-B < C < A+B
With a little algebra (as seen here):
http://www.algebra.com/algebra/homework/Triangles/Triangles.faq.question.577996.html
we know that if the altitudes are a,b,c then
1/a - 1/b < c < 1/a + 1/b
So, for your triangle, the 3rd altitude must satisfy
1/12 - 1/14 < c < 1/12 + 1/14
Answered by
Steve
oops - make that
1/a + 1/b < 1/c < 1/a - 1/b
1/84 < 1/c < 13/84
84/13 < c < 84
So, 83 is the maximum integer side
1/a + 1/b < 1/c < 1/a - 1/b
1/84 < 1/c < 13/84
84/13 < c < 84
So, 83 is the maximum integer side
Answered by
MathMate
Thank you for the brilliant and elegant proof, Steve!
Answered by
Steve
Google is your friend. It gave several hits, and this one was indeed elegant and simple.
Answered by
Art of Problem Solving
This is a question from the Intermediate Algebra homework. People shouldn't be asking for the answer on different websites. Thanks!
Answered by
AoPS
You're right. We're currently tracking down the IP addresses of the users who post for help here, so that we can contact and deactivate their AoPS accounts.