Unit 2 MM1G3 b Triangle Inequality, Side-Angle Inequality and Exterior Angle Inequality.

Slides:

Advertisements

Similar presentations

5.5 INEQUALITIES IN TRIANGLES (PART TWO). Think back…. What do we remember about the exterior angles of a triangle?

Advertisements

Section 5-5 Inequalities for One Triangle

Use Inequalities in a Triangle Ch 5.5. What information can you find from knowing the angles of a triangle? And Vice Verca.

Geometry 5-5 Inequalities in Triangles Within a triangle: – the biggest side is opposite the biggest angle. – the smallest side is opposite the smallest.

Inequalities in One Triangle

Triangle Inequality Theorem:

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.

EXAMPLE 1 Relate side length and angle measure Draw an obtuse scalene triangle. Find the largest angle and longest side and mark them in red. Find the.

TODAY IN GEOMETRY…  Learning Target: 5.5 You will find possible lengths for a triangle  Independent Practice  ALL HW due Today!

Draw the following: 1. acute triangle 2.right triangle 3.obtuse triangle 4. acute, scalene triangle 5.obtuse, isosceles triangle 6. right, scalene.

Triangle Inequality Theorems Sec 5.5 Goals: To determine the longest side and the largest angle of a triangle To use triangle inequality theorems.

Lesson 4.3 – Triangle inequalities & Exterior Angles

Triangle Inequalities

Constructing Triangles

Properties of Triangles

A B C 12 We know ∠B = ∠C S TU 1214 We could write a proof to show ∠T ≠∠U *We could also prove that m ∠T > m ∠U, BUT theorem 1 tells us that!

EXAMPLE 1 Relate side length and angle measure Draw an obtuse scalene triangle. Find the largest angle and longest side and mark them in red. Find the.

Unit 2 Triangles Triangle Inequalities and Isosceles Triangles.

Triangle Inequality Theorem.  The sum of the two shorter sides of any triangle must be greater than the third side. Example: > 7 8 > 7 Yes!

5.5 Use Inequalities in a Triangle

Lesson 3-3: Triangle Inequalities 1 Lesson 3-3 Triangle Inequalities.

Use Inequalities in A Triangle

3.3 Triangle Inequality Conjecture. How long does each side of the drawbridge need to be so that the bridge spans the river when both sides come down?

5.5Use Inequalities in a Triangle Theorem 5.10: If one side of a triangle is longer than the other side, then the angle opposite the longest side is _______.

Comparing Measures of a Triangle There is a relationship between the positions of the longest and shortest sides of a triangle and the positions of its.

Triangle Inequalities

5.5 Inequalities in Triangles

5-5 Triangle Inequalities. Comparing Measures of a Triangle There is a relationship between the positions of the longest and shortest sides of a triangle.

4.7 Triangle Inequalities. Theorem 4.10 If one side of a triangle is longer than another side, then the angle opposite the longer side is larger than.

Topic 5-7 Inequalities in one triangle. How many different triangles can we make using these six pieces? 2 1.What are your guesses? 2.What guess is too.

Angle-Side Relationship  You can list the angles and sides of a triangle from smallest to largest (or vice versa) › The smallest side is opposite.

4.7 Triangle Inequalities. In any triangle…  The LARGEST SIDE lies opposite the LARGEST ANGLE.  The SMALLEST SIDE lies opposite the SMALLEST ANGLE.

1 Triangle Inequalities. 2 Triangle Inequality The smallest side is across from the smallest angle. The largest angle is across from the largest side.

LESSON 5-5 INEQUALITIES IN TRIANGLES OBJECTIVE: To use inequalities involving angles and sides of triangles.

Geometry Section 5.5 Use Inequalities in a Triangle.

4.7 Triangle Inequalities

5.5 Inequalities in Triangles Learning Target I can use inequalities involving angles and sides in triangles.

Lesson 5.5 Use Inequalities in a Triangle. Theorem 5.10 A B C 8 5 IF AB > BC, THEN C > A The angle opposite the longest side is the largest angle; pattern.

Inequalities in One Triangle Geometry. Objectives: Use triangle measurements to decide which side is longest or which angle is largest. Use the Triangle.

Triangle Inequalities Objectives: 1.Discover inequalities among sides and angles in triangles.

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

Chapter 4-3 Inequalities in One Triangle Inequalities in Two Triangles.

Triangle Inequalities

Triangle Inequalities

Homework: Maintenance Sheet 17 *Due Thursday

Pythagorean Theorem.

Triangle Inequalities

You found the relationship between the angle measures of a triangle. Recognize and apply properties of inequalities to the measures of the angles.

Homework: Maintenance Sheet 17 *Due Thursday

Triangle Inequalities

6.5 & 6.6 Inequalities in One and Two Triangle

Bellwork 1) AG = 18 cm. What is AD? 2) Solve for x.

Inequalities and Triangles

Triangle Inequalities

Triangle Inequalities

Try This… Measure (using your ruler), three segments 2 inches

LESSON 5-5 INEQUALITIES IN TRIANGLES OBJECTIVE: To use inequalities involving angles and sides of triangles.

TRIANGLE INEQUALITY THEOREM

Class Greeting.

Use Inequalities in a Triangle

TRIANGLE INEQUALITY THEOREM

Triangle Inequalities

TRIANGLE INEQUALITY THEOREM

EXAMPLE 1 Relate side length and angle measure

TRIANGLE INEQUALITY THEOREM

Triangle Inequalities

Inequalities in Triangles

List the angles and sides from smallest to largest

Triangle Inequalities

Triangle Inequalities

Presentation transcript:

Unit 2 MM1G3 b Triangle Inequality, Side-Angle Inequality and Exterior Angle Inequality

Exterior Angle Inequality

Triangle Inequality Examples

Triangle Inequality The sum of the measures of any two sides of a triangle must be greater than the measure of the third side. R ST RS + ST > TRST + TR > RSRS + TR > ST

Example 1: Can the measurements 3, 8, and 12 form a triangle?

Solution: Begin with the measures of the two smaller sides, 3 and 8. To form a triangle, their sum must be greater than the measure of the third side, which is 12. However, 3+8<12. Therefore, these measurements cannot form a triangle

Example 2: Can the measurements 1, 1, and 2 form a triangle?

Solution: Begin with the measures of the two smaller sides, 1 and 1. To form a triangle, their sum must be greater than the measure of the third side, which is 2. However, 1+1=2. Therefore, these measurements cannot form a triangle. 11 2

Example 3: Can the measurements 3, 4, and 5 form a triangle?

Solution: Begin with the measures of the two smaller sides, 3 and 4. To form a triangle, their sum must be greater than the measure of the third side, which is >5 These measurements satisfy the triangle inequality. Therefore, a triangle can be formed

It is not necessary to verify the inequality for each pair of sides. As long as the sum of the measures of the two smaller sides is greater than the measure of the third side, then the sum of the measures of any other pair must be greater than the measure of the remaining side. Example: Since 3+4>5, then 3+5>4 and 4+5>

If we know the lengths of two sides of a triangle, we can determine the possible lengths for the third side. Example 4:A triangle has two sides with lengths 5 cm and 8 cm. What are the possible lengths for the third side? 8 cm 5 cm 8 cm 5 cm ? ?

To find the possible lengths of the third side, find the sum and the difference of the two given lengths. 8 cm - 5 cm = 3 cm 8 cm + 5cm = 13cm The length of the third side must be between these two values, but cannot include them. 3 cm < third side < 13 cm

Let’s test this result. The triangle has two sides that measure 5 cm and 8 cm. And: 3 cm < third side < 13 cm Can the third side measure 4 cm? The triangle would have sides 5 cm, 8 cm, and 4 cm. Adding the two smaller sides, 5 cm + 4 cm > 8 cm Remember: The sum of any two sides must be greater than the third side.

Try These: D

B

A

C

C

Side Angle Inequality

Side-Angle Inequality

Examples

In a triangle, the largest angle is opposite the longest side and vice versa. Likewise, the smallest angle is opposite the shortest side and vice versa. CB A 85º 60º 35º

Example 1: In the triangle below, list the sides in order from longest to shortest. Solution: 25º50º 105 º ZY X

Example 2:In the triangle below, list the angles in order from largest to smallest. Solution: 6 cm 5 cm 10 cm RQ P

Example 3: Solution: F E D x + 132x x

Summary  In a triangle, the largest angle is opposite the longest side and vice versa.  Likewise, the smallest angle is opposite the shortest side and vice versa.

Side-Angle Inequality

Try These: B

B

C