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Translations
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Fun Facts
100

Point A(–3, 5) is translated (x + 4, y – 7).
→ Find A′.

A′(1, –2)

100

Reflect point A(4, –3) over the x-axis.

A′(4, 3)

100

Rotate point A(3, 4) 90° counterclockwise.

A′(–4, 3)

100

Dilate point A(2, –3) by a scale factor of 2.

A′(4, –6)

100

Why are Cheerios good for?

Heart health

200

Triangle ABC has vertices
A(2, –1), B(–4, 3), C(5, 6).
It is translated by (x – 3, y + 2).
→ Find A′, B′, C′.

  • A(2, –1) → A′(–1, 1)

  • B(–4, 3) → B′(–7, 5)

  • C(5, 6) → C′(2, 8)

200

Reflect point D(–2, –7) over the line y = 3.

D′(–2, 13)

200

C(6, –1) 90° clockwise.

C′(–1, –6)

200

Triangle ABC has vertices
A(1, 2), B(–2, 4), C(3, –1).
Dilate the triangle by a scale factor of 3.


  • A′(3, 6)

  • B′(–6, 12)

  • C′(9, –3)

200

What is Obama’s last name?

Obama

300

A point is translated right 7 units and down 2 units and ends at (3, –6).
→ What was the original point?

Original point: (–4, –4)

300

Triangle ABC has vertices
A(2, –1), B(–4, 3), C(6, 5).
Reflect the triangle over the x-axis.


  • A′(2, 1)

  • B′(–4, –3)

  • C′(6, –5)

300

Triangle ABC has vertices
A(1, 2), B(–3, 4), C(5, –1).
Rotate the triangle 90° counterclockwise.

  • A′(–2, 1)

  • B′(–4, –3)

  • C′(1, 5)

300

Quadrilateral WXYZ has vertices
W(2, –1), X(4, 3), Y(–2, 5), Z(–4, 1).
Dilate the figure by a scale factor of â€“½.


  • W′(–1, ½)

  • X′(–2, –3/2)

  • Y′(1, –5/2)

  • Z′(2, –½)

300

What is the turtles name that is hung up on Mrs. Yassins door?

Georgie

400

Triangle RST is translated so that
R(–1, 4) → R′(3, –2).
→ Write the translation rule and find S′ and T′ if
S(2, 6), T(–3, 1).

  • Translation: right 4, down 6

  • Rule: (x + 4, y – 6)


  • S(2, 6) → S′(6, 0)

  • T(–3, 1) → T′(1, –5)


400

Square PQRS has vertices
P(–3, 1), Q(1, 1), R(1, 5), S(–3, 5).
Reflect the square over the line x = –1.


  • P′(1, 1)

  • Q′(–3, 1)

  • R′(–3, 5)

  • S′(1, 5)

400

Square PQRS has vertices
P(2, 1), Q(4, 1), R(4, 3), S(2, 3).
Rotate the square 90° clockwise.


  • P′(1, –2)

  • Q′(1, –4)

  • R′(3, –4)

  • S′(3, –2)

400

Triangle RST has vertices
R(–2, 1), S(4, 3), T(2, –5).
It is dilated about the origin so that R′(–5, 2.5).
Find the scale factor

Scale factor: 2.5

400

How many lives does a cat have?

9
500

  1. Triangle JKL is translated by (x + a, y + b).
    If J(–2, 1) → J′(5, –3) and K(4, –1) → K′(11, –5),
    → Find a and b

a = 7, b = –4

500

Triangle JKL is reflected over the line y = –x.
If
J(2, –3), K(–1, 4), L(5, 1),
find J′, K′, L′.


  • J′(3, –2)

  • K′(–4, 1)

  • L′(–1, –5)

500

Triangle JKL is rotated 270° counterclockwise about the origin.
If
J(–2, 1), K(3, 4), L(1, –5),
find J′, K′, L′.


  • J′(1, 2)

  • K′(4, –3)

  • L′(–5, –1)

500

A point G(–6, 4) is dilated by a factor of k to G′(9, –6).
Find k 


k = –1.5

500

How many Earths can fit inside the sun?

Around a million.