1 / 27

Objective: Prove quadrilateral conjectures by using triangle congruence postulates and theorems

4.5 Properties of Quadrilaterals. Objective: Prove quadrilateral conjectures by using triangle congruence postulates and theorems. Warm-Up:. How are the quadrilaterals in each pair alike? How are they different?. Parallelogram vs Square. Rhombus vs Square. Alike:. 4 = sides

Download Presentation

Objective: Prove quadrilateral conjectures by using triangle congruence postulates and theorems

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript


  1. 4.5 Properties of Quadrilaterals Objective: Prove quadrilateral conjectures by using triangle congruence postulates and theorems Warm-Up: How are the quadrilaterals in each pair alike? How are they different? Parallelogram vs Square Rhombus vs Square Alike: 4 = sides Opp <‘s = Diagonals perp. Alike: Opp sides || & Different: Sq 4 right <‘s Sq 4 sides Different: Sq has 4 right <‘s

  2. Quadrilateral: Any four sided polygon. Trapezoid: A quadrilateral with one and only one pair of parallel sides. Parallelogram: A quadrilateral with two pairs of parallel sides. Rhombus: A quadrilateral with four congruent sides. Rectangle: A quadrilateral with four right angles. Square: A quadrilateral with four congruent sides and four right angles.

  3. PROPERTIES OF SPECIAL QUADRILATERALS: PARALLELOGRAMS: Both pairs of opposite sides are parallel Both pairs of opposite sides are congruent Both pairs of opposite sides angles are congruent Consecutive angles are supplementary Diagonals bisect each other A diagonal creates two congruent triangles (it’s a turn – NOT a flip)

  4. P L M G Theorem: A diagonal of a parallelogram divides the parallelogram into two congruent triangles.

  5. PROPERTIES OF SPECIAL QUADRILATERALS: RECTANGLES: Rectangles have all of the properties of parallelograms plus: Four right angles Congruent Diagonals Perpendicular Sides

  6. PROPERTIES OF SPECIAL QUADRILATERALS: RHOMBUSES: Rhombuses have all of the properties of parallelograms plus: Four congruent sides Perpendicular diagonals Diagonals bisect each other

  7. PROPERTIES OF SPECIAL QUADRILATERALS: SQUARES: Squares have all of the properties of parallelograms, rectangles & rhombuses.

  8. Parallelogram Square Rectangle Rhombus Note: Sum of the interior <‘s of a quadrilateral = _____

  9. Example: Find the indicated measures for the parallelogram WXYZ 5 W X 2.2 Z Y m<WXZ = _____ m<ZXY = _____ m<W = _____ XY = _____ Perimeter of WXYZ= _____ m<WZX = _____

  10. Example: ABDE is a parallelogram & BC BD A B E C D If m<BDC = , find m<EAB. _______ If m<DBC = , m<BCD=6x, find m<EAB ______ If m<DBC = , m<BCD=6x, find m<ABD ______

  11. Example: Find the indicated measure for the parallelogram A m<A = ______ ( B D C

  12. Example: Find the indicated measure for the parallelogram R Q QR = ______ 6x-2 10 S x+4 T

  13. Example: Find the indicated measure for the parallelogram C D ( CD = ______ E F x-7

  14. Example: Find the indicated measure for the parallelogram M N ( m<N = ______ P O

  15. Example: Find the indicated measure for the parallelogram E H ( m<G = ______ F G

  16. Homework: • Practice Worksheet

  17. Parallelograms & Factoring Objective: Identify the missing component of a given parallelogram through the use of factoring. Warm-Up: What is the first number that has the letter “a” in its name?

  18. Example: Find the indicated measure for the parallelogram B A AD = ______ ( C ( D

  19. Example: Find the indicated measure for the parallelogram D E ( m<E = ______ ( G F

  20. Example: Find the indicated measure for the parallelogram R Q ( QR = ______ ( S T

  21. Example: Find the indicated measure for the parallelogram P Q ( m<R = ______ ( S R

  22. Collins Writing: • How could you determine the sum of the interior angles of a quadrilateral?

  23. Homework: • Practice Worksheet

  24. P • Given: L Parallelogram PLGM with diagonal LM 2 • Prove: 1 ∆LGM ∆MPL 4 3 M G • REASONS • STATEMENTS

  25. A B • Given: Parallelogram ABCD with diagonal BD 1 3 • Prove: 4 ∆ABD ∆CDB 2 5 6 D C • REASONS • STATEMENTS

  26. Theorem: Opposite sides of a parallelogram are congruent. • Given: Parallelogram ABCD with diagonal BD • Prove: AB CD & AD CB • REASONS • STATEMENTS

  27. Theorem: Opposite angles of a parallelogram are congruent. • Given: Parallelogram ABCD with diagonals BD & AC • Prove: <BAD <DCB & <ABC <CDA • REASONS • STATEMENTS

More Related