Difference between revisions of "2000 AIME II Problems/Problem 2"

Latest revision as of 01:17, 18 December 2024

Problem

A point whose coordinates are both integers is called a lattice point. How many lattice points lie on the hyperbola $x^2 - y^2 = 2000^2$ ?

Solution

$(x-y)(x+y)=2000^2=2^8 \cdot 5^6$

Note that $(x-y)$ and $(x+y)$ have the same parities, so both must be even. We first give a factor of $2$ to both $(x-y)$ and $(x+y)$ . We have $2^6 \cdot 5^6$ left. Since there are $7 \cdot 7=49$ factors of $2^6 \cdot 5^6$ , and since both $x$ and $y$ can be negative, this gives us $49\cdot2=\boxed{098}$ lattice points.

Solution 2

As with solution 1, note that both $x-y$ and $x+y$ must have the same parities, meaning both have to be even. Additionally, we can express both of them in terms of $2^a\cdot3^b$ and $2^c\cdot3^d$ . Now, $a+c$ must be equal to 6, and both have to be greater than or equal to 1, so there are by stars and bars 7 ways to do this. Similarly, for $b+d$ , we have that both only need to be greater than or equal to 0, so this time there are 7 ways to do so. Since both can be negative, we multiply $7\cdot7\cdot2$ which gives $098$ .

@@ Line 1: / Line 1: @@
 == Problem ==
-Let <math>u</math> and <math>v</math> be integers satisfying <math>0 < v < u</math>. Let <math>A = (u,v)</math>, let <math>B</math> be the reflection of <math>A</math> across the line <math>y = x</math>, let <math>C</math> be the reflection of <math>B</math> across the y-axis, let <math>D</math> be the reflection of <math>C</math> across the x-axis, and let <math>E</math> be the reflection of <math>D</math> across the y-axis. The area of pentagon <math>ABCDE</math> is <math>451</math>. Find <math>u + v</math>.
+A point whose coordinates are both integers is called a lattice point. How many lattice points lie on the hyperbola <math>x^2 - y^2 = 2000^2</math>?
 == Solution ==
-{{solution}}
+<cmath>(x-y)(x+y)=2000^2=2^8 \cdot 5^6</cmath>
+Note that <math>(x-y)</math> and <math>(x+y)</math> have the same [[parity|parities]], so both must be even. We first give a factor of <math>2</math> to both <math>(x-y)</math> and <math>(x+y)</math>. We have <math>2^6 \cdot 5^6</math> left. Since there are <math>7 \cdot 7=49</math> factors of <math>2^6 \cdot 5^6</math>, and since both <math>x</math> and <math>y</math> can be negative, this gives us <math>49\cdot2=\boxed{098}</math> lattice points.
+==Solution 2==
+As with solution 1, note that both <math>x-y</math> and <math>x+y</math> must have the same parities, meaning both have to be even. Additionally, we can express both of them in terms of <math>2^a\cdot3^b</math> and <math>2^c\cdot3^d</math>. Now, <math>a+c</math> must be equal to 6, and both have to be greater than or equal to 1, so there are by stars and bars 7 ways to do this. Similarly, for <math>b+d</math>, we have that both only need to be greater than or equal to 0, so this time there are 7 ways to do so. Since both can be negative, we multiply <math>7\cdot7\cdot2</math> which gives <math>098</math>.
 == See also ==
 {{AIME box|year=2000|n=II|num-b=1|num-a=3}}
+[[Category:Intermediate Number Theory Problems]]
+{{MAA Notice}}

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Difference between revisions of "2000 AIME II Problems/Problem 2"

Latest revision as of 01:17, 18 December 2024

Contents

Problem

Solution

Solution 2

See also