Transformation Knockout Jeopardy Template

Translations

Reflections

Rotations

Dilations

Compositions of Reflections

100

Translate the point (6, 5) two left and three up.

(4, 8)

100

When you start at (4, 5) and reflect over the x-axis, where does the point land?

(4, -5)

100

Rotate the point (5, 4) 90 degrees counterclockwise

(-4,5)

100

The triangle ABC has coordinates A(4, 6), B(2, 5), and C(3, 9). If it is dilated by a magnitude of 3, what are the new coordinates?

A'(12, 18) B'(6, 15) C'(18, 27)

100

R(x-axis)*T(3, 4)

(6, 7)

(9, -11)

200

Translate the point (-3, 2) four left and 2 down

(-7, 0)

200

Starting at (-5, -9) and reflecting over the line y = x, where does the point stop?

(-9, -5)

200

Rotate the point (2, -4) 270 degrees counterclockwise

(-4, -2)

200

The rectangle ABCD has coordinates A(2, 10), B(-1, -5), C(-12, 4), and D(-9, -2). If it is dilated by a magnitude of 7, what are the new coordinates?

A'(14, 70) B'(-7, -35) C'(-84, 28) D'(-63, -14)

200

T(2, 5) * r(90 degrees, O)

(-3, 4)

(-2, 2)

300

What is the translation rule for moving a point from (5, 6) to (2, 9)

(x - 3, y + 3)

300

When you start at (6, 2) and reflect of the y-axis, what is the new point?

(-6, 2)

300

Rotate the point (1, 7) 180 degrees counterclockwise

(-1, -7)

300

The triangle ABC has coordinates A(15, 10), B(20, -5), and C(45, 25). If it is dilated by a magnitude of 1/5, what are the new coordinates?

A'(3, 2) B'(4, -1) C'(9, 5)

300

r(180 degrees, O) * R(y-axis)

(-4, 6)

(-4, -6)

400

What is the rule for translating a point from (-6, -1) to (-3, -6)

(x + 3, y - 5 )

400

Starting at (-10, 11), where do you end up when reflecting over the line y = -x?

(-11, 10)

400

Rotate the point (-7, -2) 90 degrees counterclockwise

(2, -7)

400

The rectangle ABCD has coordinates A(24, 12), B(-4, -8), C(-12, -4), and D(-36, -16). If it is dilated by a magnitude of 1/4, what are the new coordinates?

A'(6, 3) B'(-1, -2) C'(-3, -1) D'(-9, -4)

400

R(y = x) * T(-4, -2)

(4, 5)

(3, 0)

500

Where does the point (23, 11) end up if you translate it 31 to left or 56 up?

(-8, 67)

500

Starting at the point (-3, 5), where does it end when reflecting over the point x = -1?

(1, 5)

500

Rotate the point (-8, -10) 270 degrees counterclockwise

(-10, 8)

500

The triangle ABC has coordinates A(2, 10), B(-1, -5), and C(-12, 4). If it is dilated by a magnitude of 20, what are the new coordinates?

A'(40, 200) B'(-20, -100) C'(-240, 80)

500

r(270 degrees, O) * R(y = -x)

(7, -8)

(-7, -8)