Vocabulary
Points, Lines, and Planes
Angle Relationships
Distance and Midpoint
Proofs
100

Angles that add up to 90 degrees.

Complementary Angles.

100

If a plane does not have a single script capital letter labeling it, how else can we label/name a plane? Using what?

three points on the plane that are not all on the same line

100

What type of angles are these?

complementary

100

Provide the midpoint formula.

(x2+x1)/2 ,  (y2+y1)/2

100

Your first reason is always....

Given

200

Angles across from one another that are congruent. 

Vertical angles. 

200

Name a set of collinear points.


I and G, I and J, G and J, F and G, F and D, G and D

200

What type of angles are these?

vertical

200

Provide the distance formula. 

200

The last statement is always what you are...

trying to prove

300

Angles that are both next to one another and add up to 180 degrees. 

Linear Pair.

300

Name a point which is noncoplanar to the rest?

K I or J

300

Find x.

x = 10

300

Find the midpoint between ( - 1, 4 ) and ( 7, 2 )

( 3, 3 )

300
What property represents the following? 

Symmetric.

400

Angles that are next to one another.

Adjacent Angles.

400

Provide 3 names for the following plane.

Plane HGF, plane HGD, plane HDF

400

Find x.

x = 34

400

Find the distance between ( -2, 3 ) and ( 3, - 9 )

d = 13

400

What would the missing reason be? 

Linear pairs add up to 180 degrees. 

500

Define collinear, coplanar, bisector, and say what type of angles perpendicular lines make.

Same line, same plane, cuts in half (two congruent parts), right angles. 

500

Provide seven names for the following line.

line m, line WX, line XW, line WY, line YW, line XY, line YX

500

Find x.

x = 10

500

Determine if the following segments are congruent. Are they equal in measure?

Yes. Both equal the square root of 17. 

500

What property represents the following?

Transitive.

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