GEOMETRY CHAPTER 6 LESSON 4

Use Properties of Rectangles

Use Properties of Rectangles and Algebra

Proving Rectangle Relationships

Rectangles and Coordinate Geometry

100

If AB = 10 in rectangle ABCD, what is CD?

CD = 10

100

In rectangle ABCD, m∠DAC = 38. What is m∠CAB?

m∠CAB = 52.

100

In parallelogram ABCD, AB = 15. What is the value of CD so that ABCD is a rectangle?

CD = 15.

100

In rectangle ABCD, line AB = 32. What is line CD?

CD = 32

200

What is a rectangle?

A rectangle is a parallelogram with four right angles.

200

In rectangle ABCD, m∠CAB = 37. What is m∠ACD?

m∠ACD = 37.

200

In rectangle ABCD, the two diagonals seg AC and seg BD meet at point E. If AE = 40, what is the value of BE + CE + DE?

BE + CE + DE = 120.

200

In parallelogram ABCD, AB = 6 and AD = 8. What is the value of BD to prove that ABCD is a rectangle?

BD = 10.

300

In rectangle ABCD, the two diagonals seg AC and seg BD meet at point E. Name all segments congruent to seg AE.

seg BE, seg CE, and seg DE

300

In rectangle ABCD, m∠DAB = x² + 14x - 5. What is the value of x?

x = 5.

300

In parallelogram ABCD, which pairs of lines should be congruent so that ABCD is a rectangle?

line AB and line DC ; line AD and line BC ; line AC and line BD

300

What are the two formulas you can use to prove if a quadrilateral is a rectangle?

Distance Formula and Slope Formula

400

In rectangle ABCD, the two diagonals seg AC and seg BD meet at point E. If m∠AEB = 111, what is m∠ADB?

m∠ADB = 55.5.

400

In rectangle ABCD, the two diagonals seg AC and seg BD meet at point E, and m∠DCA = 29. What is m∠AED?

m∠AED = 58.

400

State the theorem for proving that parallelograms are rectangles.

If the diagonals of a parallelogram are congruent, then the parallelogram is a rectangle.

400

Quadrilateral ABCD has vertices A(-10, 2), B(-8, -6), C(5, -3), and D(2, 5). Is quadrilateral ABCD a rectangle?

No.

500

State all five properties of rectangles.

All four angles are right angles.

Opposite sides are parallel and congruent.

Opposite angles are congruent.

Consecutive angles are supplementary.

Diagonals bisect each other.

500

In rectangle ABCD, the two diagonals seg AC and seg BD meet at point E, and m∠CAB = 5x - 5. If m∠DEC = 120, what is x + m∠ADB?

x + m∠ADB = 7 + 60 = 67.

500

State a paragraph proof of the following statement: If a parallelogram has one right angle, then it is a rectangle.

Assume ABCD is a parallelogram, and ∠B is a right angle. Because ABCD is a parallelogram and has one right angle, then it has four right angles (since opposite angles are congruent and consecutive angles are supplementary). So by the definition of a rectangle, ABCD is a rectangle.

500

Quadrilateral ABCD has vertices A(x, y), B(5, 5), C(6, -2) and D(-1, -3). What is the value of x + y?

x + y = -2 + 4 = 2.