SOLUTION: The measures of two sides are given 9 and 15. Between what two numbers must the third side fall. Write an inequality to represent your answer:___________

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Question 1206202: The measures of two sides are given 9 and 15. Between what two numbers must the third side fall.

Write an inequality to represent your answer:___________
Answer by math_tutor2020(3817) About Me  (Show Source):
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Answer: 6 < c < 24


Explanation

Refer to example 3 and example 4 of this lesson (scroll up a bit to see how I derived the inequality)

a = 9
b = 15
b-a < c < b+a
15-9 < c < 15+9
6 < c < 24

If a triangle has sides 9 units and 15 units, then the third side is somewhere between 6 units and 24 units where we exclude both endpoints.
Meaning that c = 6 isn't possible, and neither is c = 24.

If c is a whole number then here are the possible values: 7, 8, 9, 10, ..., 22, or 23.
If c is some decimal value, then there are infinitely many possibilities (as long as it's between 6 and 24 of course).

A similar question is found here