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Describe the possible lengths of the third side of a triangle if the two given sides are 6 inches and 9 inches long.

User Jinet
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1 Answer

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13 votes

Recall that for a, b, and c to be the lengths of a triangle they must satisfy the following inequalities:


\begin{gathered} a+b>c, \\ a+c>b, \\ b+c>a\text{.} \end{gathered}

Therefore, if we call the other side x, it must satisfy that:


\begin{gathered} 6+x>9, \\ 9+x>6, \\ 9+6>x\text{.} \end{gathered}

Solving each inequality for x, we get:


\begin{gathered} x>9-6=3, \\ x>6-9=-3, \\ 15>x\text{.} \end{gathered}

Therefore, x must be greater than 3 inches but less than 15 inches.

Answer: The possible lengths of the third side must be greater than 3 inches but less than 15 inches

User Ricardo Gasca
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