Properties of Quadrilaterals Lesson 5 5 Properties of

Properties of parallelograms o o Opposite sides are parallel and congruent Opposite angles are

Properties of rectangles: o o o All properties of parallelograms apply All angles are

Properties of a kite: o o o Two disjoint pairs of consecutive sides are

Properties of a rhombus: o o o All properties of parallelograms apply All properties

Properties of a square: o o o All properties of a rectangle All properties

Properties of an isosceles trapezoid: o o o Legs are congruent (definition) Bases are

Given: ZRVA is a parallelogram A AV = 2 x – 4 Z RZ

Given: Rectangle MPRS S R MO congruent to PO Prove: ΔROS is isosceles M

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Properties of Quadrilaterals Lesson 5. 5

Properties of parallelograms o o Opposite sides are parallel and congruent Opposite angles are congruent Diagonals bisect each other Any pair of consecutive angles are supplementary

Properties of rectangles: o o o All properties of parallelograms apply All angles are right angles Diagonals are congruent

Properties of a kite: o o o Two disjoint pairs of consecutive sides are congruent Diagonals are perpendicular One diagonal is the perpendicular bisector of the other One diagonal bisects a pair of opposite angles (wy bisects <xwz and <xyz) One pair of opposite angles are congruent (<wxy and x <wzy) W y z

Properties of a rhombus: o o o All properties of parallelograms apply All properties of a kite apply All sides are congruent (equilateral) Diagonals bisect the angles Diagonals are perpendicular bisectors of each other Diagonals divide it into four congruent right triangles.

Properties of a square: o o o All properties of a rectangle All properties of a rhombus The diagonals form four isosceles triangles (45 -45 -90)

Properties of an isosceles trapezoid: o o o Legs are congruent (definition) Bases are parallel (definition) Lower base angles are congruent Upper base angles are congruent Diagonals are congruent Lower base angle is supplementary to upper base angle

Given: ZRVA is a parallelogram A AV = 2 x – 4 Z RZ = ½ x + 8 VR = 3 y + 5 ZA = y + 12 V R Find x. Find y. Find the perimeter. The opposite sides of a parallelogram are congruent, so we can write two equations. 2 x – 4 = ½ x + 8 3/ x – 4 = 8 2 3/ x = 12 2 x=8 AV = 12 & RZ = 12 3 y + 5 = y + 12 2 y + 5 = 12 2 y = 7 y = 3. 5 VR = 15. 5 & ZA = 15. 5 The perimeter is 12 + 15. 5 = 55 units.

Given: Rectangle MPRS S R MO congruent to PO Prove: ΔROS is isosceles M 1. 2. 3. 4. 5. 6. 7. 8. 9. □ MPRS MO PO SM RP M is a rt P is a rt M P ΔSMO ΔRPO SO RO ΔROS is isos. 1. 2. 3. 4. 5. 6. 7. 8. 9. O Given Opp sides in a □. In a □, all s are rt s. Same as 4. All rt s are . SAS CPCTC An isos Δ has 2 sides . P