Congruent Transformations Jeopardy Template

Translations

Rotations

Reflections

Sequence

100

What is a translation in geometry?

A figure that moves in the same direction and the same distance on a coordinate plane.

100

What is a rotation in geometry?

When a figure turns around a center of rotation.

100

What is a reflection in geometry?

A figure that flips over a line of reflection.

100

What is a sequence of transformations?

When more than one transformtion is performed to change the orientation of a shape in the coordinate plane.

200

How do you translate a point A(2, 3) by 3 units to the right and 2 units down?

(2, 3) --> (x + 3, y - 2)

200

Define the center of rotation.

The point in the middle of a rotation.

200

What are the properties of a shape after it is reflected over the x-axis?

The same side lengths and same angles.

200

List the types of transformations that can be combined in a sequence.

Translation, Reflection, Rotation

300

Describe the effect of translating a shape on its size and orientation.

The size doesn't change. The orientation does change.

300

If a point B(4, 2) is rotated 90⁰ clockwise about the origin, what are the new coordinates?

2, -4

300

If point C(3, 4) is reflected over the y - axis, what are the new coordinates?

(-3,4)

300

What happens to the cooridinates of a rotation that is 180⁰ in either direction?

The cooridinates of a rotation of 180⁰ become the opposite of the original (x,y) --> (-x,-y).

400

If a triangle has vertices at A(1, 1), B(2, 3), and C(3, 1), what are the new coordinates after a translation of (x + 4, y - 2)?

A (5, -1) B (6, 1) C (7, -1)

400

How does the angle of rotation affect the position of a shape?

The angle of rotation determines which direction a figure is rotated.

400

How do reflections affect the orientation of a shape?

A reflection changes the shapes orientation by flipping the shape over a line of reflection.

400

If a square is first translated 2 units right and then rotated 90⁰ clockwise, what is the final position of a vertex originally at D(1, 1)?

D' (1,1) --> (3,1) --> (1, -3)

500

Explain how to write the rule when doing a translation.

(x, y) --> x -- add to go right subtract to go left / y -- add to go up subtract to go down

500

Rotate a triangle with vertices at A(0, 0), B(0, 2), and C(2, 0) by 180⁰ around the origin. What are the coordinates.

A (0, 0) B (0, -2) C (-2, 0)

500

Describe the process of reflecting a triangle over the y-axis.

A triangle reverses its direction of orientation. The x in the coordinates of its verticies become the opposite sign of its original verticies.

500

If a triangle is first translated 3 units left, 2 units up and then rotated 90⁰ counterclockwise, what is the final position of a vertex originally at C(-2,1)?

C'' = (-2,1) ---> (-5, 3) ---> (-3, -5)