Difference between revisions of "Sub-Problem 2"

Revision as of 18:00, 22 March 2021

(b) Determine all (a,b) such that:

(Note: If anyone can code the "content" of this page I would be appreciated! I completely don't know how to code the "content" of a page on AoPS)

From equation 2, we can acquire ab = 100

We can then expand both sides by squaring:

$(\sqrt{a} + \sqrt{b})^2 = (8)^2$ $(a + b + 2 \sqrt{ab}) = 64$

since ab = 100: 2root(ab) is 2root(100), which is 20.

We can get the below equation:

$(a + b) = 44$ $(ab) = 100$

Substitue b = 44 - a, we get

$((44-a)a) = 100$ $(44a - a^2 - 100) = 0$

By quadratic equations Formula:

${a=\frac{-44 \pm \sqrt{44^2-4(-1)(-100)}}{2(-1)}}$

${a=\frac{44 \pm \sqrt{1536}}{2(1)}}$

which leads to the answer of 22 +- 8root(6)

Since a = 44 - b, two solutions are:

$(a,b) = (22 + 8root(6), 22 - 8root(6))$ $(a,b) = (22 - 8root(6), 22 + 8root(6))$

~North America Math Contest Go Go Go

@@ Line 4: / Line 4: @@
 [https://artofproblemsolving.com/wiki/index.php/Problem_7#Problem_7 Go back to the previous page]
+(Note: If anyone can code the "content" of this page I would be appreciated! I completely don't know how to code the "content" of a page on AoPS)
 == Solution 1 ==