5.6 Proving Quadrilaterals are Parallelograms
Objectives: Prove that a quadrilateral is a parallelogram.
Theorems Theorem: If both pairs of opposite sides of a quadrilateral are congruent, then the quadrilateral is a parallelogram. ABCD is a parallelogram.
Theorems Theorem: If both pairs of opposite angles of a quadrilateral are congruent, then the quadrilateral is a parallelogram. ABCD is a parallelogram.
Theorems Theorem: If an angle of a quadrilateral is supplementary to both of its consecutive angles, then the quadrilateral is a parallelogram. ABCD is a parallelogram. x°x° (180 – x) ° x°x°
Theorems Theorem: If the diagonals of a quadrilateral bisect each other, then the quadrilateral is a parallelogram. ABCD is a parallelogram.
Ex. 1: Proof of Theorem 1 Statements: 1. AB ≅ CD, AD ≅ CB. 2. AC ≅ AC 3. ∆ABC ≅ ∆CDA 4. BAC ≅ DCA, DAC ≅ BCA 5. AB ║CD, AD ║CB. 6. ABCD is a Reasons: 1. Given
Ex. 1: Proof of Theorem 1 Statements: 1. AB ≅ CD, AD ≅ CB. 2. AC ≅ AC 3. ∆ABC ≅ ∆CDA 4. BAC ≅ DCA, DAC ≅ BCA 5. AB ║CD, AD ║CB. 6. ABCD is a Reasons: 1. Given 2. Reflexive Prop. of Congruence
Ex. 1: Proof of Theorem 1 Statements: 1. AB ≅ CD, AD ≅ CB. 2. AC ≅ AC 3. ∆ABC ≅ ∆CDA 4. BAC ≅ DCA, DAC ≅ BCA 5. AB ║CD, AD ║CB. 6. ABCD is a Reasons: 1. Given 2. Reflexive Prop. of Congruence 3. SSS Congruence Postulate
Ex. 1: Proof of Theorem 1 Statements: 1. AB ≅ CD, AD ≅ CB. 2. AC ≅ AC 3. ∆ABC ≅ ∆CDA 4. BAC ≅ DCA, DAC ≅ BCA 5. AB ║CD, AD ║CB. 6. ABCD is a Reasons: 1. Given 2. Reflexive Prop. of Congruence 3. SSS Congruence Postulate 4. CPCTC
Ex. 1: Proof of Theorem 1 Statements: 1. AB ≅ CD, AD ≅ CB. 2. AC ≅ AC 3. ∆ABC ≅ ∆CDA 4. BAC ≅ DCA, DAC ≅ BCA 5. AB ║CD, AD ║CB. 6. ABCD is a Reasons: 1. Given 2. Reflexive Prop. of Congruence 3. SSS Congruence Postulate 4. CPCTC 5. Alternate Interior s Converse
Ex. 1: Proof of Theorem 1 Statements: 1. AB ≅ CD, AD ≅ CB. 2. AC ≅ AC 3. ∆ABC ≅ ∆CDA 4. BAC ≅ DCA, DAC ≅ BCA 5. AB ║CD, AD ║CB. 6. ABCD is a Reasons: 1. Given 2. Reflexive Prop. of Congruence 3. SSS Congruence Postulate 4. CPCTC 5. Alternate Interior s Converse 6. Def. of a parallelogram.
Ex. 2: Proving Quadrilaterals are Parallelograms As the sewing box below is opened, the trays are always parallel to each other. Why?
Ex. 2: Proving Quadrilaterals are Parallelograms Each pair of hinges are opposite sides of a quadrilateral. The 2.75 inch sides of the quadrilateral are opposite and congruent. The 2 inch sides are also opposite and congruent. Because opposite sides of the quadrilateral are congruent, it is a parallelogram. By the definition of a parallelogram, opposite sides are parallel, so the trays of the sewing box are always parallel.
Another Theorem ~ Theorem—If one pair of opposite sides of a quadrilateral are congruent and parallel, then the quadrilateral is a parallelogram. ABCD is a parallelogram. A BC D
Ex. 3: Proof of Theorem Given: BC ║DA, BC ≅ DA Prove: ABCD is a Statements: 1. BC ║DA 2. DAC ≅ BCA 3. AC ≅ AC 4. BC ≅ DA 5. ∆BAC ≅ ∆DCA 6. AB ≅ CD 7. ABCD is a Reasons: 1. Given
Ex. 3: Proof of Theorem Given: BC ║DA, BC ≅ DA Prove: ABCD is a Statements: 1. BC ║DA 2. DAC ≅ BCA 3. AC ≅ AC 4. BC ≅ DA 5. ∆BAC ≅ ∆DCA 6. AB ≅ CD 7. ABCD is a Reasons: 1. Given 2. Alt. Int. s Thm.
Ex. 3: Proof of Theorem Given: BC ║DA, BC ≅ DA Prove: ABCD is a Statements: 1. BC ║DA 2. DAC ≅ BCA 3. AC ≅ AC 4. BC ≅ DA 5. ∆BAC ≅ ∆DCA 6. AB ≅ CD 7. ABCD is a Reasons: 1. Given 2. Alt. Int. s Thm. 3. Reflexive Property
Ex. 3: Proof of Theorem Given: BC ║DA, BC ≅ DA Prove: ABCD is a Statements: 1. BC ║DA 2. DAC ≅ BCA 3. AC ≅ AC 4. BC ≅ DA 5. ∆BAC ≅ ∆DCA 6. AB ≅ CD 7. ABCD is a Reasons: 1. Given 2. Alt. Int. s Thm. 3. Reflexive Property 4. Given
Ex. 3: Proof of Theorem Given: BC ║DA, BC ≅ DA Prove: ABCD is a Statements: 1. BC ║DA 2. DAC ≅ BCA 3. AC ≅ AC 4. BC ≅ DA 5. ∆BAC ≅ ∆DCA 6. AB ≅ CD 7. ABCD is a Reasons: 1. Given 2. Alt. Int. s Thm. 3. Reflexive Property 4. Given 5. SAS Congruence Post.
Ex. 3: Proof of Theorem Given: BC ║DA, BC ≅ DA Prove: ABCD is a Statements: 1. BC ║DA 2. DAC ≅ BCA 3. AC ≅ AC 4. BC ≅ DA 5. ∆BAC ≅ ∆DCA 6. AB ≅ CD 7. ABCD is a Reasons: 1. Given 2. Alt. Int. s Thm. 3. Reflexive Property 4. Given 5. SAS Congruence Post. 6. CPCTC
Ex. 3: Proof of Theorem Given: BC ║DA, BC ≅ DA Prove: ABCD is a Statements: 1. BC ║DA 2. DAC ≅ BCA 3. AC ≅ AC 4. BC ≅ DA 5. ∆BAC ≅ ∆DCA 6. AB ≅ CD 7. ABCD is a Reasons: 1. Given 2. Alt. Int. s Thm. 3. Reflexive Property 4. Given 5. SAS Congruence Post. 6. CPCTC 7. If opp. sides of a quad. are ≅, then it is a .