5.6 Indirect Proof and Inequalities in Two triangles.

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5.6 Indirect Proof and Inequalities in Two Triangles

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Presentation transcript:

5.6 Indirect Proof and Inequalities in Two triangles

Indirect proof starts by Assuming the opposite of the truth. Statement: In a right triangle, the triangle does not have more than one right angle. What would you assume if you want to prove the statement correct by an indirect proof?

Indirect proof starts by Assuming the opposite of the truth. Statement: In a right triangle, the triangle does not have more than one right angle. What would you assume if you want to prove the statement correct by an indirect proof? Assume the triangle has two right angles.

Proving by an Indirect Method Assume that triangle ABC does have more then one right angle. So measure of angles A and B are both 90 degrees. Thus, But the sum of the three angles in a triangle equal 180 degrees, So, angle C equal 0 degrees, which is impossible. Angles in a triangle must be greater then 0. Therefore, the assumption is wrong. Thus, In a right triangle, the triangle does not have more then one right angle.

Proving by an Indirect Method Assume that triangle ABC does have more then one right angle. So measure of angles A and B are both 90 degrees. But the sum of the three angles in a triangle equal 180 degrees, Thus, So, angle C equal 0 degrees, which is impossible. Angles in a triangle must be greater then 0. Therefore, the assumption is wrong. Thus, In a right triangle, the triangle does not have more then one right angle.

Proving by an Indirect Method Assume that triangle ABC does have more then one right angle. So measure of angles A and B are both 90 degrees. But the sum of the three angles in a triangle equal 180 degrees, Thus, So, angle C equal 0 degrees, which is impossible. Angles in a triangle must be greater then 0. Therefore, the assumption is wrong. Thus, In a right triangle, the triangle does not have more then one right angle.

Proving by an Indirect Method Assume that triangle ABC does have more then one right angle. So measure of angles A and B are both 90 degrees. But the sum of the three angles in a triangle equal 180 degrees, Thus, So, angle C equal 0 degrees, which is impossible. Angles in a triangle must be greater then 0. Therefore, the assumption is wrong. Thus, In a right triangle, the triangle does not have more then one right angle.

Proving by an Indirect Method Assume that triangle ABC does have more then one right angle. So measure of angles A and B are both 90 degrees. But the sum of the three angles in a triangle equal 180 degrees, Thus, So, angle C equal 0 degrees, which is impossible. Angles in a triangle must be greater then 0. Therefore, the assumption is wrong. Thus, In a right triangle, the triangle does not have more then one right angle.

Hinge Theorem If you have two sides of two different triangles congruent, then the set of sides with the larger angle between them has the larger side across from it.

Hinge Theorem Which side is larger?

Converse The converse of the hinge theorem is also true: If the two sides of one triangle are congruent to two sides of another triangle, and the third side of the first triangle is greater than the third side of the second triangle, then the included angle of the first triangle is larger than the included angle of the second triangle.converse In some textbooks, the theorem and its converse are written as the SAS Inequality Theorem and the SSS Inequality Theorem respectively.SASSSS

Hinge Theorem Which angle is larger ?

Here is a link to see how this works 5-5 The Hinge Theorem - Mr. Self - Cleveland High School

What are the possible measurements of Angle C Use an inequality

Homework Page #8 – 28 even

Homework Page 305 – 306 #7 – 19 odd, 27,29