This quadrilateral is a because .

both pairs of sides are parallel

This quadrilateral is a because .

both pairs of sides are parallel

all sides and angles are congruent

U6L14 Coordinate Proof

Quiz

•

Mathematics

•

9th - 12th Grade

•

Practice Problem

•

Medium

•

CCSS

3.G.A.1, HSG.GPE.B.7, 5.G.B.4

+4

Standards-aligned

Maria Cruz Farooqi

Used 2+ times

FREE Resource

16 questions

Show all answers

1.

DROPDOWN QUESTION

1 min • 1 pt

rhombus

Pythagorean

exactly the same

not really a

Tags

CCSS.HSG.GPE.B.7

2.

DROPDOWN QUESTION

1 min • 1 pt

congruent

parallelogram

slopes

Tags

CCSS.6.G.A.3

3.

DROPDOWN QUESTION

1 min • 1 pt

Can we find the area of triangle EFG ? That seems tricky, because we don’t know the (a) of the triangle using EG as the base. However, angle EFG seems like it could be a (b) . In that case, we could use sides EF and FG as the base and height.
To see if EFG is a right angle, we can calculate (c) .

height

right angle

slopes

Tags

CCSS.HSG.GPE.B.7

4.

DROPDOWN QUESTION

1 min • 1 pt

opposite reciprocals

right

base

25

50

Tags

CCSS.HSG.GPE.B.7

5.

DROPDOWN QUESTION

1 min • 1 pt

The quadrilateral is most specifically a (a) , because (b) .

rhombus

all sides are of equal measure

rectangle

opposite sides are congruent

trapezoid

only one pair of sides is parallel

parallelogram

Tags

CCSS.5.G.B.4

6.

DROPDOWN QUESTION

1 min • 1 pt

The quadrilateral is most specifically a (a) , because (b) .

trapezoid

rhombus

rectangle

square

exactly one pair of sides is parallel

all sides meet at right angles

no sides are congruent of parallel

Tags

CCSS.3.G.A.1

7.

DROPDOWN QUESTION

1 min • 1 pt

The quadrilateral is most specifically a (a) , because (b) .

trapezoid

rhombus

rectangle

square

all sides meet at right angles

no sides are congruent of parallel

it is equiangular

Tags

CCSS.3.G.A.1

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U6L14 Coordinate Proof

16 questions

Can we find the area of triangle EFG ? That seems tricky, because we don’t know the (a) of the triangle using EG as the base. However, angle EFG seems like it could be a (b) . In that case, we could use sides EF and FG as the base and height.
To see if EFG is a right angle, we can calculate (c) .

The quadrilateral is most specifically a (a) , because (b) .

The quadrilateral is most specifically a (a) , because (b) .

The quadrilateral is most specifically a (a) , because (b) .

This quadrilateral is a (a) because (b) .

This quadrilateral is a (a) because (b) .

Choose ALL answers that describe the polygon.

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U6L14 Coordinate Proof

16 questions

The quadrilateral is most specifically a ​ (a) ​ , because ​ ​ (b) .

The quadrilateral is most specifically a ​ (a) , because ​ ​ (b) .

The quadrilateral is most specifically a ​ (a) , because ​ ​ (b) .

This quadrilateral is a ​ (a) because ​ ​ (b) .

This quadrilateral is a​ (a) because ​ ​ (b) .

Choose ALL answers that describe the polygon.

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Similar Resources on Wayground

Popular Resources on Wayground

Discover more resources for Mathematics

The quadrilateral is most specifically a (a) , because (b) .

The quadrilateral is most specifically a (a) , because (b) .

The quadrilateral is most specifically a (a) , because (b) .

This quadrilateral is a (a) because (b) .

This quadrilateral is a (a) because (b) .