Show:
Midpoint and Distance
Parallel Lines
Perpendicular Lines
Coordinate Geometry
Area
100

Pg 54, # 13

(6, 1)

100

Pg 201, # 13

y-4= 1/2 (x+2)

100

Pg 202 # 19

y-6=-3/2(x-6)

100

Pg 403 # 6

Scalene

100

pg 619, #10

20.3

200

Pg 54, # 23

18

200

Pg 202, # 24

No

200

Pg 202, #15

Yes

200

Pg 403 # 12

Square

200

pg 619, #16

3

300

Pg 54, #18

(0, -34)

300

Pg 202, #29

If that is the case, the lines are the same

300

Pg 203 # 37

Yes

300

Pg 403 # 16

Rhombus

300

Pg 619, #12

0.24

400

Pg 54, # 40

10, (1, 4)

400

Pg 203 #32

AB not parallel to CD

BC not parallel to AD

400

Pg 203 # 40

Responses will vary

Since the line perpendicular to the other two has, for example, a slope of a/b, then the slopes of the other two lines have to be -b/a.  Since they are the same, they must be parallel.

400

Pg 416 #5

M(-a, b), N(a, b)

PN = RM = sqrt(9a^2 + b^2)

400

Pg 621, #32

24.5

500

Pg 55, #58a

(-10, 8), (-1, 5), (8, 2)

500

Pg 201 #8

If the lines are not parallel, find where the lines intersect

No,

(16, 8)

500

Pg 203 # 42

No

500

Pg 417, #22

An altitude is a parallel line from a vertex of a triangle to the opposite base.  Using coordinate geometry, you should have shown that the intersection point of the altitude and the opposite side is the same point as the midpoint of that line

500

Pg 621, #43

12800