SOLUTION: Kate has found six two-digit numbers, such that no three of them can constitute the lengths of a triangle's sides.Can you find such a number?
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Question 833572: Kate has found six two-digit numbers, such that no three of them can constitute the lengths of a triangle's sides.Can you find such a number?
Answer by KMST(5328) (Show Source): You can put this solution on YOUR website!
My numbers are , , , , , and .
If were the length of the longest side, to form a triangle, the lengths of the other two sides must add up to more than , but I chose the numbers so that is equal to or greater than the sum of any two of the other numbers.
Each of the numbers , , and , cannot be the measure of the longest side for a similar reason:
, , and .
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