==Solution==

==Solution==

Let <math>A</math> denote a move of <math>2</math> units north and <math>1</math> unit east, and let <math>B</math> denote a move of <math>1</math> unit north and <math>2</math> units east. To get to the point <math>(15,15)</math> using only these moves, say <math>a</math> moves in direction <math>A</math> and <math>b</math> moves in direction <math>B</math>, we must have <math>2a+1b=1a+2b=15</math> because both the <math>x</math>- and <math>y</math>-coordinates have increased by <math>15</math> since the knight started. Solving this system of equations gives us <math>a=b=5</math>. This means we need the knight to make <math>10</math> moves, <math>5</math> of which are headed in direction <math>A</math>, and the remaining <math>5</math> are headed in direction <math>B</math>. Any combination of these moves work, so the answer is <math>\binom{10}{5}=\boxed{252}.</math>

Let <math>A</math> denote a move of <math>2</math> units north and <math>1</math> unit east, and let <math>B</math> denote a move of <math>1</math> unit north and <math>2</math> units east. To get to the point <math>(15,15)</math> using only these moves, say <math>a</math> moves in direction <math>A</math> and <math>b</math> moves in direction <math>B</math>, we must have <math>2a+1b=1a+2b=15</math> because both the <math>x</math>- and <math>y</math>-coordinates have increased by <math>15</math> since the knight started. Solving this system of equations gives us <math>a=b=5</math>. This means we need the knight to make <math>10</math> moves, <math>5</math> of which are headed in direction <math>A</math>, and the remaining <math>5</math> are headed in direction <math>B</math>. Any combination of these moves work, so the answer is <math>\binom{10}{5}=\boxed{252}.</math>

==See also==

==See also==