Difference between revisions of "1994 AIME Problems/Problem 7"

Revision as of 18:44, 16 October 2008

Problem

For certain ordered pairs $(a,b)\,$ of real numbers, the system of equations

$ax+by=1\,$ $x^2+y^2=50\,$

has at least one solution, and each solution is an ordered pair $(x,y)\,$ of integers. How many such ordered pairs $(a,b)\,$ are there?

Solution

$x^2+y^2=50$ is the equation of a circle of radius $\sqrt{50}$ , centered at the origin. The lattice points on this circle are $(\pm1,\pm7)$ , $(\pm5,\pm5)$ , and $(\pm7,\pm1)$ .

$ax+by=1$ is the equation of a line that does not pass through the origin. (Since $(x,y)=(0,0)$ yields $a(0)+b(0)=0 \neq 1$ ).

So, we are looking for the number of lines which pass through either one or two of the $12$ lattice points on the circle, but do not pass through the origin.

It is clear that if a line passes through two opposite points, then it passes through the origin, and if a line passes through two non-opposite points, the it does not pass through the origin.

There are $\binom{12}{2}=66$ ways to pick two distinct lattice points, and thus $66$ distinct lines which pass through two lattice points on the circle. However, $\frac{12}{2}=6$ of these lines pass through the origin.

Since there is a unique tangent line to the circle at each of these lattice points, there are $12$ distinct lines which pass through exactly one lattice point on the circle.

Thus, there are a total of $66-6+12=\boxed{072}$ distinct lines which pass through either one or two of the $12$ lattice points on the circle, but do not pass through the origin.

@@ Line 1: / Line 1: @@
 == Problem ==
-For certain ordered pairs <math>(a,b)\,</math> of real numbers, the system of equations
+For certain ordered pairs <math>(a,b)\,</math> of [[real number]]s, the system of equations
 <center><math>ax+by=1\,</math></center>
 <center><math>x^2+y^2=50\,</math></center>
@@ Line 6: / Line 6: @@
 == Solution ==
-<math>x^2+y^2=50</math> is the equation of a circle of radius <math>\sqrt{50}</math>, centered at the origin. The [[lattice points]] on this circle are <math>(\pm7,\pm1)</math>, <math>(\pm5,\pm5)</math>, and <math>(\pm7,\pm1)</math>.
+<math>x^2+y^2=50</math> is the equation of a circle of radius <math>\sqrt{50}</math>, centered at the origin. The [[lattice points]] on this circle are <math>(\pm1,\pm7)</math>, <math>(\pm5,\pm5)</math>, and <math>(\pm7,\pm1)</math>.
 <math>ax+by=1</math> is the equation of a line that does not pass through the origin. (Since <math>(x,y)=(0,0)</math> yields <math>a(0)+b(0)=0 \neq 1</math>).
@@ Line 18: / Line 18: @@
 Since there is a unique tangent line to the circle at each of these lattice points, there are <math>12</math> distinct lines which pass through exactly one lattice point on the circle.
-Thus, there are a total of <math>66-6+12=\boxed{72}</math> distinct lines which pass through either one or two of the <math>12</math> lattice points on the circle, but do not pass through the origin.
+Thus, there are a total of <math>66-6+12=\boxed{072}</math> distinct lines which pass through either one or two of the <math>12</math> lattice points on the circle, but do not pass through the origin.
 == See also ==
 {{AIME box|year=1994|num-b=6|num-a=8}}
+[[Category:Intermediate Combinatorics Problems]]

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Difference between revisions of "1994 AIME Problems/Problem 7"

Revision as of 18:44, 16 October 2008

Problem

Solution

See also