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The sum of the lengths of any two sides of a triangle must be greater than the third side. If a triangle has one side that is 18 inches and a second side that is 3 inches less than twice the third side, what are the possible lengths for the second and third sides?

User Christopher Perry
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1 Answer

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12 votes

Answer: One side could be 18 and the other side will be 33.

Explanation:

  • Side #1 = 18
  • Side #2 = 2x - 3
  • Side #3 = x

One way of setting up the inequality is: Side #2 + Side #3 > Side #1


2x-3+x>18\\3x-3>18\\3x>18+3\\3x>21\\x>7

Another way of setting up the inequality is: Side #1 + Side #3 > Side #2


18+x>2x-3\\18+3>2x-x\\x<21

Final way of setting up the inequality is: Side #1 + Side #2 > Side #3


18+2x-3>x\\15>x-2x\\15>-x\\x>-15

Therefore, we have the range for our value of x, which is between 7 and 21. Any possible value between works. Negative measurements are rejected. One of the sides would equal the x-value, while the other side would equal the value of 2x-3.

User Khaino
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