Geometry Jeopardy Jeopardy Template

Transformations

Congruence

Angles

Polygons

Middles

100

I am a rotation. I move points like this: (x,y) --> (-y,x)

90 degrees counterclockwise

100

I divide angles or segments into two equal parts.

I am an angle or segment bisector

100

180(n-2)/n

The number of degrees in an interior angle of an n-gon

100

I am a parallelogram with 4 congruent sides whose diagonals meet at 90 degree angles

I am a rhombus

100

I am [(x1 +x2)/2, (y1+y2)/2]

I am the midpoint formula

200

I am a composition of transformations [r(y=x) o T(-1,-2)]. Where do I move point (3,5)? Name the steps.

(3,5)+(-1,-2)-->(2,3)_____r(y=x)(2,3)-->(3,2)

200

I want to show that two lines are parallel using a two-column proof. This is my overall strategy.

Find alternate interior angles of the two lines I want to prove are parallel and then prove they are congruent some other way (e.g., CPCTC)

200

I am the exterior angle theorem for triangles. According to me....

An exterior angle of a triangle is equal to the sum of the two non-adjacent angles

200

I have two sets of congruent adjacent sides, one set of congruent angles, and a bisected diagonal

I am a kite

200

I am a line formed from finding the midpoints of two sides of a triangle. I am equal to some fraction of the side of the triangle I am parallel to. What is that fraction?

I am a midsegment. The fraction is half.

300

I am r(x-axis). I move point (2,-6) to

(2,6)

300

Two triangles are sitting next to each other so that corresponding sides partially overlap. This is your three-part strategy to prove they are congruent.

Reflexive Property, Addition Postulate, and Substitution

300

I am the largest angle in a triangle. I sit across from what size side?

The largest side

300

I am the sum of the exterior angles for ANY polygon

I am 360 degrees

300

The best strategy to find the value of angles bisected by a segment (angles with variables)

Set one equal to the other

400

I am a rectangle with center (4,0). Half of me is above the x-axis and half is below. I want to stand out, to move so that I look different. _____What should I do? _____Explain why._____A) Rotate 180 degrees about (4,0) _____B) Reflect over the line x=4 _____C) Rotate 180 degrees about the origin OR _____D) Reflect over the x-axis

C, rotate 180 degrees about the origin

400

Suppose you have a kite. You know it's a kite, but that's not in the givens. You want to show that the bisected diagonal has congruent pieces. Unfortunately, those sides aren't part of the triangles you can prove congruent. Your strategy?

1) Prove whatever triangles you can are congruent 2) Use CPCTC to find corresponding parts that will allow you to prove that the triangles WITH the bisected diagonal pieces are congruent 3) Use CPCTC once more to finish

400

You set some quantities equal to 180 degrees. You NEVER EVER set others equal to 180. Which are YES and which are NO?

YES: the angles inside a triangle, supplementary angles, and all the angles forming a straight line NO: SIDES of a triangle or other polygon, vertical angles, or bisected angles

400

If an octagon is rotated around its center, this is the minimum number of degrees it must be rotated to carry it onto itself

45 degrees

400

Define centroid

The intersection of lines drawn from a vertex of a triangle to the midpoint on the opposite side

500

I am a point. I go on a trip. Here is my itinerary: R(270) o r(y=-x) o T(-5,7). If I am (6,-2) at the beginning, I become what by the end?

1) Add (6,-2) & (-5,7)-->(1,5) _____2) Move (x,y) to (-y,-x)-->(-5,-1)_____3) Turn like this (x,y) to (y,-x)-->(-1,5)

500

A pair of angles is congruent. What can we say about their supplements?

Their supplements are also congruent

500

Define corresponding angles

Angles in the same position relative to a transversal cutting two parallel lines

500

Share the similarities and differences among regular trapezoids, isosceles trapezoids, and parallelograms (only talk about angles)

Differences: Parallelograms have congruent pairs of opposite angles and isosceles trapezoids have congruent base angles (congruent upper base angles and congruent lower base angles) Similarities: All three have supplementary same-side angles

500

Define incenter

The intersection of angle bisectors drawn from a vertex of a triangle to the angle opposite