2017 AMC 10A Problem 23
Below is the professionally curated solution for Problem 23 of the 2017 AMC 10A, from LIVE by Po-Shen Loh. You can also try the full timed exam, view all 2017 AMC 10A solutions, or check the answer key.
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Difficulty rating: 2250
23.
How many triangles with positive area have all their vertices at points in the coordinate plane, where and are integers between and inclusive?
Solution:
We can use complementary counting to find the total number of triangles and subtract out the ones that don't work.
There are a total of points, so there are possible triangles.
Note that the only way a triangle doesn't work is if all the points are in a straight line.
There are rows, columns, and long diagonals. Each of these lines have points, which means they contribute degenerate triangles.
There are also the diagonal lines with points, such as to There are of these lines, so they have degenerate triangles.
Similarly, there are diagonal lines with points. These give us extra triangles that don't work.
Now, we have to look at the lines with slopes of and
There are such lines for each slope, and they all have points on them. Therefore, they contribute more triangles to discount.
The total number of working triangles is then Thus, B is the correct answer.
Problem 23 in Other Years
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