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You will take a 30 pt quiz on Mon-Tues, March 5-6. Topics:

A trapezoid midsegment is a segment connecting the midpoints of the non-parallel sides of a trapezoid.

C-44 (p 275) states that the midsegment of a trapezoid is parallel to the bases and its length is half the sum of the bases.

A rectangle is an equiangular parallelogram.

Also, we proved (fill-in-the-blank attached later) that the diagonals of a rectangle are congruent (and bisect each other) (C-52).

We completed practice problems related to kites, trapezoids, isosceles trapezoid, and C-44.

There was a short homework to add on to previous homework #16: p 276-7: 6-7, 14-16, p 283: 15.

You will take a 30 pt quiz on Mon-Tues, March 5-6. Topics:

- definitions of trapezoid, kite, and parallelogram
- C-32-41 (polygon sums, kite, trapezoid), C-44 (below)
- Slope Formula and Midpoint Formula
- HW #14-16 (application of all content just mentioned)

A trapezoid midsegment is a segment connecting the midpoints of the non-parallel sides of a trapezoid.

C-44 (p 275) states that the midsegment of a trapezoid is parallel to the bases and its length is half the sum of the bases.

A rectangle is an equiangular parallelogram.

Also, we proved (fill-in-the-blank attached later) that the diagonals of a rectangle are congruent (and bisect each other) (C-52).

We completed practice problems related to kites, trapezoids, isosceles trapezoid, and C-44.

There was a short homework to add on to previous homework #16: p 276-7: 6-7, 14-16, p 283: 15.