Transformations Jeopardy Template

Transformations

Reflections

Translations

Rotations

Multiple Transformations

200

This transformation is also known as a slide.

What is a translation?

200

Reflect the point (1, 3) across the x-axis.

(1, -3)

200

Translate the point (-2, -3) by (x, y) --> (x + 2, y - 1).

(0, -4)

200

Rotate the point (2, -1) 90 degrees clockwise around the origin.

(-1, -2)

200

Triangle ABC is translated and the image is labeled DEF. Triangle DEF is then rotated and the new image is labeled GHI. Which point in triangle GHI is the image of point C?

Point I

400

This transformation is also called a flip.

What is a reflection?

400

Reflect the line segment from (-2, 1) to (-3, -3) across the y-axis.

(2, 1) to (3, -3)

400

Translate the line segment with endpoints at (1, -3) and (-2, 3) by (x, y) --> (x – 2, y – 2).

(-1, -5) to (-4, 1)

400

Rotate the line segment with endpoints at (3, -3) and (-2, 1) 90 degrees counterclockwise around the origin.

(3, 3) to (-1, -2)

400

Reflect the point (3, -2) across the x-axis and then translate it by (x, y) --> (x – 1, y +1).

(2, 3)

800

This transformation is also known as a turn.

What is a rotation?

800

Reflect the triangle with vertices at (3, -2), (-4, 3) and (-2, -2) across the x-axis.

(3, 2), (-4, -3) and (-2, 2)

800

Translate the triangle with vertices at (2, 3), (4, 3) and (-1, -2) by (x, y) --> (x + 2, y – 2).

(4, 1), (6, 1) and (1, -4)

800

Rotate the triangle with vertices at (0, 3), (2, -1) and (-1, -3) 180 degrees around the origin.

(0, -3), (-2, 1) and (1, 3)

800

Translate the point (-1, -1) by (x, y) --> (x – 2, y -1) and then rotate the image by 90 degrees counterclockwise around the origin.

(2, -3)

1000

Riding on an escalator is an example of this kind of transformation.

What is a translation?

1000

Reflect the triangle with vertices at (0, 0), (2, 2) and (-1, -3) across the y-axis.

(0, 0), (-2, 2), and (1, -3)

1000

Translate the triangle with vertices at (1, 1), (-2, 2) and (3, -1) by (x, y) --> (x + 4, y + 0).

(5, 1), (2, 2) and (7, -1)

1000

Rotate the triangle with vertices at (0, 0), (-2, -3) and (1, 1) 90 degrees counterclockwise around the origin.

(0, 0), (3, -2) and (-1, 1)

1000

Rotate the point (3, -2) by 180 degrees around the origin and then reflect the image across the y-axis.

(3, 2)

2000

This kind of transformation can be done around the origin or around another point.

What is a rotation?

2000

Reflect the triangle with vertices at (2, 1), (3, 2) and (5, -2) across the line x = 1.

(0, 1), (-1, 2) and (-3, -2)

2000

Translate the triangle with vertices at (0, 2), (2, 0) and (-3, -3) two units down and four units right.

(4, 0), (6, -2) and (1, -5)

2000

Rotate the triangle with vertices at (2, 0), (2, 3) and (0, 3) 180 degrees around the point (2, 0).

(2, 0), (2, -3) and (4, -3)

2000

Reflect the point (-5, 1) across the x-axis, then translate the image by (x, y) (x + 1, y - 2), then rotate the new image by 90 degrees clockwise around the origin.

(-3, 4)