Modules 5 & 6 Triangle Congruence Proofs

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Presentation transcript:

Modules 5 & 6 Triangle Congruence Proofs

Lesson 5.2 – ASA Triangle Congruence Theorem ASA Practice Included Side – a side that is in between two angles when discussing triangle congruency statements.

Lesson 5.3 – SAS Triangle Congruence Theorem SAS Practice Included Angle – an angle that is in between two sides when discussing triangle congruency statements.

Lesson 5.4 – SSS Triangle Congruence Theorem SSS Practice

Lesson 6.2 – AAS Triangle Congruence Theorem Non-Included Side – a side that is not in between two angles when discussing triangle congruency statements. AAS Practice

NON-CONGRUENCE – AAA and SSA AAA does NOT guarantee congruence – Two triangles can have the same angle measures but not be the same size. These triangles are NOT the congruent since they are not the same size. Is there anything about these triangles other than their angles that is the same? Answer – THEIR SHAPE IS THE SAME!

NON-CONGRUENCE – SSA (don’t write this backwards ever!!) But why does SSA not prove congruence?

NON-CONGRUENCE – SSA (don’t write this backwards ever!!) But why does SSA not prove congruence?

Lesson 6.3 – HL Triangle Congruence Theorem This is actually a special case of SSA that works!

Lesson 6.3 – HL Triangle Congruence Theorem Take our triangle from our SSA exploration:

Lesson 6.3 – HL Triangle Congruence Theorem Take our triangle from our SSA exploration:

Lesson 6.3 – HL Triangle Congruence Theorem Imagine if we keep shortening the red leg of the triangle:

Lesson 6.3 – HL Triangle Congruence Theorem Imagine if we keep shortening the red leg of the triangle:

Lesson 6.3 – HL Triangle Congruence Theorem Imagine if we keep shortening the red leg of the triangle:

Lesson 6.3 – HL Triangle Congruence Theorem Imagine if we keep shortening the red leg of the triangle:

Lesson 6.3 – HL Triangle Congruence Theorem Imagine if we keep shortening the red leg of the triangle:

Lesson 6.3 – HL Triangle Congruence Theorem Imagine if we keep shortening the red leg of the triangle:

Lesson 6.3 – HL Triangle Congruence Theorem Imagine if we keep shortening the red leg of the triangle: When the leg gets as short as possible, what angle do we have here? A right angle! So this is a right triangle! HL Practice