Obj. 22 Triangle Inequalities
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Transcript of Obj. 22 Triangle Inequalities
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Obj. 22 Triangle Inequalities
The student is able to (I can):
• Analyze the relationship between the angles of a triangle and the lengths of the sides
• Determine allowable lengths for sides of triangles
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Thm 5-5-1
Thm 5-5-2
If two sides of a triangle are not congruent, then the larger angle is opposite the longer side.
If two angles of a triangle are not congruent, then the longer side is opposite the larger angle.
A
C
T
AT > AC → m∠C > m∠T
m∠C > m∠T → AT > AC
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Triangle Inequality Theorem
The sum of any two side lengths of a triangle is greater than the third side length.
Example:
1. Which set of lengths forms a triangle?
4, 5, 10 7, 9, 12
4 + 5 < 10 � 7 + 9 > 12 �
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Note: To find a range of possible third sides given two sides, subtract for the lower bound and add for the upper bound.
Examples:
2. What is a possible third side for a triangle with sides 8 and 14?
14 — 8 = 6 lower bound
14 + 8 = 22 upper bound
The third side can be between 6 and 22.
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3. What is the range of values for the third side of a triangle with sides 11 and 19?
19 — 11 = 8 lower bound
19 + 11 = 30 upper bound
8 < x < 30
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Hinge Theorem and Converse
If two sides of one triangle are congruent to two sides of another triangle …
• If the included angles are not congruent, then the longer third side is across from the larger included angle.
• If the third sides are not congruent, then the larger included angle is across from the longer third side.
A
B CFE
D
∠∠ > ⇔ >Em mB AC DF
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Example: Find the range of values for x.
1.
2.
(2x+8)°
26°
7
8
< + <
− < <
− < <
0 2x 8 26
8 2x 18
4 x 9
64°
35°
x+7 2x−5
< − − < +0 2x 5 and 2x 5 x 7
<
<
5 2x
2.5 x
− <
<
x 5 7
x 12
< <2.5 x 12