Translations
Reflections
Rotations
Dialations
Combination
100

A point is located at P(3,4) on a coordinate plane. If you translate the point 5 units to the left and 2 units down, what are the new coordinates of the point, P′?

P′=(−2,2)

100

A point is located at A(4,7) on a coordinate plane. What are the coordinates of its image, A′, after a reflection over the y-axis?

A′=(−4,7)

100

A point is located at B(3,5) on a coordinate plane. What are the coordinates of its image, B′, after a 90° clockwise rotation about the origin?

B′=(5,−3)

100

A point is located at C(3,2) on a coordinate plane. What are the coordinates of its image, C′, after a dilation from the origin with a scale factor of 5?

C′=(15,10)

100

A point is located at P(2,3). First, it's translated 4 units to the right and 2 units down to create the image P′. Then, P′ is reflected over the x-axis to create the final image P′′. What are the coordinates of P′′

P′′=(6,−1)

200

Triangle XYZ has vertices at X(1,2), Y(4,5), and Z(5,1). Find the coordinates of the vertices of the image, triangle X′Y′Z′, after a translation of 3 units to the right and 4 units up.

X′=(4,6)

Y′=(7,9)

Z′=(8,5)

200

A rectangle has vertices at Q(1,1), R(1,4), S(6,4), and T(6,1). Find the coordinates of the vertices of the image, rectangle Q′R′S′T′, after a reflection over the x-axis.

Q′=(1,−1)

R′=(1,−4)

S′=(6,−4)

T′=(6,−1)

200

Triangle CAT has vertices at C(2,2), A(5,5), and T(5,2). Find the coordinates of the vertices of the image, triangle C′A′T′, after a 180° rotation about the origin.

C′=(−2,−2)

A′=(−5,−5)

T′=(−5,−2)

200

A trapezoid has vertices at A(4,8), B(10,8), C(12,4), and D(2,4). Find the coordinates of the vertices of the image, A′B′C′D′, after a dilation from the origin with a scale factor of 1/2.

A′=(2,4)

B′=(5,4)

C′=(6,2)

D′=(1,2)

200

A square has a vertex at A(−1,4). The square undergoes three transformations in order:

  1. A 90° clockwise rotation about the origin.

  2. A reflection over the y-axis.

  3. A dilation from the origin with a scale factor of 2.

What are the final coordinates of the vertex, A′′′?

A′′′=(−8,2)

300

A line segment AB is translated to create the image A′B′. The original coordinates were A(−5,8) and the new coordinates are A′(2,4). Describe the translation in words and write a rule for it in the form (x,y)→(x+a,y+b).

(x+7,y−4).

300

The point P(5,−8) is reflected to create an image at P′(5,8). Was the line of reflection the x-axis or the y-axis?

reflection is over the x-axis

300

A point K(−2,7) is rotated about the origin to create an image at K′(−7,−2). Describe the rotation in degrees and direction (clockwise or counterclockwise).

The rotation was 90° counterclockwise about the origin.

300

A line segment PQ is dilated from the origin to create the image P′Q′. The original coordinates of one endpoint were P(4,−6) and the new coordinates are P′(6,−9). What was the scale factor of the dilation?

The scale factor was 1.5 (or 3/2).

300

Point B(3,1) is transformed to the final image B′′(−3,−4). Describe a possible two-step sequence of transformations that could make this happen using first a rotation and then a translation.

A possible sequence is: a 180° rotation about the origin, followed by a translation of 3 units down.

400

A parallelogram was translated according to the rule (x,y)→(x−6,y+3). After the translation, one of the vertices of the image is at C′(1,−2). What were the original coordinates of that vertex, C?

C=(7,−5)

400

Point W(−2,6) is first reflected over the y-axis to create point W′. Then, point W′ is translated 5 units down to create point W′′. What are the coordinates of the final point, W′′?

W′′=(2,1)

400

Point J(4,1) is first rotated 90° clockwise about the origin to create point J′. Then, point J′ is translated 6 units to the left to create point J′′. What are the coordinates of the final point, J′′?

J′′=(−5,−4)

400

A triangle was dilated from the origin with a scale factor of 7. After the dilation, one of the vertices of the image is at M′(14,−35). What were the original coordinates of that vertex, M?

M=(2,−5)

400

A point, M, was transformed to create the image M′′(−12,5). The sequence of transformations was:

  1. A translation of 2 units left and 1 unit down.

  2. A dilation from the origin with a scale factor of 3.

What were the original coordinates of point M?

M=(−2,8/3)

500

A point M(x,−3) is translated 4 units to the right and 5 units up. Its image, M′, has coordinates (1,y). Find the values of x and y.

M=(−3,−3)

500

A triangle has a vertex at F(−3,y). After a reflection over the x-axis, the corresponding vertex of the image is at F′(x,5). Find the values of x and y.

F=(−3,−5)

500

A point Q(x,−4) is rotated 90° counterclockwise about the origin. Its image, Q′, has coordinates (4,6). Find the values of x and y if the image was actually Q′(y,6). Find the value of x.

Q=(6,−4)

500

A point T(x,8) is dilated from the origin with a scale factor of 4. Its image, T′, has coordinates (12,y). Find the values of x and y.

T=(3,8)

500

Point Z(4,y) is transformed by a sequence. First, it's reflected over the x-axis to create Z′. Then, Z′ is rotated 90° counterclockwise about the origin to create the final point Z′′(5,x). Find the values of x and y.

y=5 and x=4