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Showing quadrilaterals are parallelograms. Bell Ringer. Tell whether the quadrilateral is a parallelogram. Explain your reasoning. SOLUTION. The quadrilateral is not a parallelogram. It has two pairs of congruent sides, but opposite sides are not congruent. Example 1. Use Opposite Sides. - PowerPoint PPT Presentation

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Page 1: Showing quadrilaterals are parallelograms

Showing quadrilaterals are parallelograms

Page 2: Showing quadrilaterals are parallelograms

Bell Ringer

Page 3: Showing quadrilaterals are parallelograms

Use Opposite SidesExample 1

Tell whether the quadrilateral is a parallelogram. Explain your reasoning.

SOLUTION

The quadrilateral is not a parallelogram. It has two pairs of congruent sides, but opposite sides are not congruent.

Page 4: Showing quadrilaterals are parallelograms

Use Opposite AnglesExample 2

SOLUTION

The quadrilateral is a parallelogram because both pairs of opposite angles are congruent.

Tell whether the quadrilateral is a parallelogram. Explain your reasoning.

Page 5: Showing quadrilaterals are parallelograms

Now You Try

Tell whether the quadrilateral is a parallelogram. Explain your reasoning.

1.

In quadrilateral WXYZ, WX = 15, YZ = 20, XY = 15, and ZW = 20. Is WXYZ a parallelogram? Explain your reasoning.

3.

2.

ANSWERYes; both pairs of oppositesides are congruent.

No; opposite angles arenot congruent.ANSWER

ANSWER No; opposite sides are not congruent.

Page 6: Showing quadrilaterals are parallelograms

Example 3 Tell whether the quadrilateral is a parallelogram. Explain your reasoning.

a. b. c.

SOLUTION

U is supplementary to T and V (85° + 95° = 180°). So, by Theorem 6.8, TUVW is a parallelogram.

a.

G is supplementary to F (55° + 125° = 180°), but G is not supplementary to H (55° + 120° ≠ 180°). So, EFGH is not a parallelogram.

b.

Page 7: Showing quadrilaterals are parallelograms

Use Consecutive AnglesExample 3

D is supplementary to C (90° + 90° = 180°), but you are not given any information about A or B. Therefore, you cannot conclude that ABCD is a parallelogram.

c.

Page 8: Showing quadrilaterals are parallelograms

Example 4Tell whether the quadrilateral is a parallelogram. Explain your reasoning.

b.

SOLUTION

a. The diagonals of JKLM bisect each other. So, by Theorem 6.9, JKLM is a parallelogram.

a.

The diagonals of PQRS do not bisect each other. So, PQRS is not a parallelogram.

b.

Page 9: Showing quadrilaterals are parallelograms

Now You Try

4.

5.

ANSWER No; opposite angles arenot congruent (orconsecutive angles arenot supplementary).

Yes; one angle issupplementary to both ofits consecutive angles.

ANSWER

Tell whether the quadrilateral is a parallelogram. Explain your reasoning.

Page 10: Showing quadrilaterals are parallelograms

Now You Try

ANSWER Yes; the diagonals bisect each other.

No; the diagonals do notbisect each other.

ANSWER

7.

6.

Tell whether the quadrilateral is a parallelogram. Explain your reasoning.

Page 11: Showing quadrilaterals are parallelograms

Now You Try

Page 12: Showing quadrilaterals are parallelograms

Now You Try

Page 13: Showing quadrilaterals are parallelograms

Now You Try

Page 14: Showing quadrilaterals are parallelograms

Now You Try

Page 15: Showing quadrilaterals are parallelograms

Page 320

Page 16: Showing quadrilaterals are parallelograms

Complete page 320-321#s 8-24 even only

• Home Learning

• Page 323 #s 28-34 even only


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