Difficulty Level 2 Math Competition Problems

Difficulty Level 2 problems are considered 'moderate' problems. For well rounded high school students, these may provide a little challenge, but still accessible by a majority of students. 		 
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Moderate (Difficulty Level 2) Math Competition Problems

The problems on this page are Difficulty Level 2 problems written by Douglas Twitchell. These are the moderate difficulty competition problems. Think of these as filler problems--they're not so easy that everyone will get them, but not so difficult that they'll make the cream of the crop stand out. Brief (not complete) solutions are shown in green, leaving the reader to work through the logic.

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2.1
How many 3 digit numbers have no repeated digits?

    This problem is more time consuming than difficult. Tests the student's ability to keep track of 'details'. Answer is 648
2.2
If x2 + y2 = 100, and xy = 18, find the value of x - y.

    Students can 'grind it out' painfully, but a short cut--if they spot it--will give the answer in seconds. The solution is 8 or -8
2.3
In a triangle, the sum of two of the angles is equal to the third. If the lengths of the two longer sides are 12 and 13, what is the length of the shortest side?

    The biggest challenge here is recognizing that although it is not directly stated, this is a right triangle. Answer is 5