Warm-up: Find the missing side lengths and angle measures This triangle is an equilateral triangle 10 feet 25 feet This triangle is an isosceles triangle.

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Triangle Inequalities

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Presentation transcript:

Warm-up: Find the missing side lengths and angle measures This triangle is an equilateral triangle 10 feet 25 feet This triangle is an isosceles triangle Date: Topic: Triangle Inequalities (6.2)

Side – Angle Relationships In a triangle, the larger angle is opposite the longer side. List the angles from smallest to largest: The smallest side is is opposite is the smallest angle. The next biggest side is is opposite is the next biggest angle. The largest side is is opposite is the largest angle. From smallest to largest:,,

Side – Angle Relationships In a triangle, the longer side is opposite the larger angle. List the sides from shortest to longest: The smallest angle isis opposite is the shortest side. The next largest angle is is opposite is the next longest side. The largest angle is is opposite is the longest side. From shortest to longest:,,

Can a triangle have sides with lengths 1 in, 2 in, and 5 in? 5 inch side 1 inch side 2 inch side Triangle Inequality Theorem The sum of the lengths of any two sides of a triangle is greater than the length of the third side = 3 3 < 5 We cannot have a triangle with lengths 1 in, 2 in, and 5 in. A B C

A C Determine if the given measure can be lengths of a triangle: 4 cm, 5 cm, 6 cm? 8 cm, 12 mm, 4 cm? B The Triangle Inequality Theorem: The sum of the lengths of any two sides of a triangle is greater than the length of the third side. 4 cm + 5 cm > 6 cm YES, since it works for all comparisons cm cm > 1.2 cm + 4 cm NO, since it doesn’t work for this comparison 5 cm + 6 cm > 4 cm 4 cm + 6 cm > 5 cm >

Find the range of values for s for the given triangle. s + 4 > 7 Answer: The length of s is greater than 3 and less than 11 s + 7 > > s so, s > 3 so, s > –3 (not valid because lengths of sides must be positive) so, s < 11 Combine the two valid statements: 3 < s <

We need to find the size of the third angle: Compare the lengths of the sides of the following triangle. List the sides from longest to shortest. 85° List the sides from longest to shortest:

In triangle ABC, AB = 9 cm, BC = 16 cm and AC = 24 cm. List the angles of the triangle in order from largest to smallest. List the angles from largest to smallest: 9 cm 16 cm 24 cm A B C