Thursday, June 10, 2010

The Triangle Inequality Theorem


Let us learn Triangle Inequality Theorem :

In Δ TAB (Figure 1 ), if T, A, and B represent three points on a map and you want to go from T to B, going from T to A to B would obviously be longer than going directly from T to B. The following theorem expresses this idea.


Figure 1
Two paths from T to B.


Theorem (Triangle Inequality Theorem): The sum of the lengths of any two sides of a triangle is greater than the length of the third side.

Example 1: In Figure 2 , the measures of two sides of a triangle are 7 and 12. Find the range of possibilities for the third side.


Figure 2

What values of x will make a triangle possible?

Using the Triangle Inequality Theorem, you can write the following:

7 + x > 12, so x > 5

7 + 12 > x, so 19 > x (or x < 19)

Therefore, the third side must be more than 5 and less than 19.

Hope the above explanation helped you.

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