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Worksheet: Dilation Transformation Matrix

In this worksheet, we will practice finding the matrix representation of dilations as geometric linear transformations.

Q1:

Consider the transformation represented by the matrix  3 0 0 3  .

What is the image of the square with vertices ( 0 , 0 ) , ( 0 , 1 ) , ( 1 , 0 ) , and ( 1 , 1 ) under this transformation?

  • Aa kite with vertices ( 0 , 0 ) , ( 0 , 1 ) , ( 1 , 0 ) , and ( 3 , 3 )
  • Ba kite with vertices ( 0 , 0 ) , ( 1 , 3 ) , ( 3 , 1 ) , and ( 3 , 3 )
  • Ca square with vertices ( 0 , 0 ) , ( 0 , 1 ) , ( 1 , 0 ) , and ( 1 , 1 )
  • Da square with vertices ( 0 , 0 ) , ( 0 , 3 ) , ( 3 , 0 ) , and ( 3 , 3 )
  • Ea square with vertices ( 0 , 0 ) , ( 0 , 1 ) , ( 1 , 0 ) , and ( 3 , 3 )

What geometric transformation does this matrix represent?

  • Aa dilation with scale factor 3 and center the origin
  • Ba rotation about the origin by an angle of 3 ∘
  • Ca stretch in the 𝑦 -direction
  • Da stretch in the π‘₯ -direction
  • Ea dilation by a factor of 3 with its center at the point ( 1 , 1 )

Q2:

Describe the geometric effect of the transformation produced by the matrix  0 βˆ’ 3 3 0  .

  • Aa dilation with center the origin and scale factor 3 followed by a βˆ’ 9 0 ∘ rotation about the origin
  • Ba dilation with center the origin and scale factor 3 followed by a reflection in the line 𝑦 = π‘₯
  • Ca dilation with center the origin and scale factor 3 followed by a reflection in the line 𝑦 = βˆ’ π‘₯
  • Da dilation with center the origin and scale factor 3 followed by a 9 0 ∘ rotation about the origin
  • Ea dilation with center the origin and scale factor 3 followed by a 1 8 0 ∘ rotation about the origin

Q3:

A dilation with center the origin is composed with a rotation about the origin to form a new linear transformation. The transformation formed sends the vector  3 4  to  βˆ’ 3 3 5 6  .

Find the matrix representation of the transformation formed.

  • A  βˆ’ 1 1 0 0 1 4 
  • B  5 βˆ’ 1 2 1 2 5 
  • C  βˆ’ 1 2 . 9 2 1 . 4 4 1 . 4 4 1 2 . 9 2 
  • D  5 βˆ’ 1 2 1 2 5 
  • E  5 1 2 1 2 5 

Find the scale factor of the original dilation.

  • Ascale factor = 13
  • Bscale factor = √ 1 1 9
  • Cscale factor = 154
  • Dscale factor = 169
  • Escale factor = 13

Q4:

The unit square, with vertices 𝑂 ( 0 , 0 ) , 𝐴 ( 1 , 0 ) , 𝐡 ( 1 , 1 ) , and 𝐢 ( 0 , 1 ) , is transformed by a rotation and then a dilation. Its image under this combined transformation is 𝑂 𝐴 𝐡 𝐢 β€² β€² β€² , as shown in the diagram.

What are the coordinates of 𝐴 β€² ?

  • A ο€Ό 3 2 , βˆ’ 3 2 
  • B ο€Ό 2 3 , βˆ’ 2 3 
  • C ο€Ό 2 3 , 2 3 
  • D ο€Ό 3 2 , 3 2 
  • E ο€Ό 3 2 , 3 2 

What is the matrix of the combined transformation?

  • A ⎑ ⎒ ⎒ ⎣ 3 2 βˆ’ 3 2 3 2 3 2 ⎀ βŽ₯ βŽ₯ ⎦
  • B ⎑ ⎒ ⎒ ⎣ 2 3 βˆ’ 2 3 2 3 2 3 ⎀ βŽ₯ βŽ₯ ⎦
  • C ⎑ ⎒ ⎒ ⎣ 3 2 βˆ’ 3 2 βˆ’ 3 2 3 3 ⎀ βŽ₯ βŽ₯ ⎦
  • D ⎑ ⎒ ⎒ ⎣ 2 3 βˆ’ 2 3 βˆ’ 2 3 2 3 ⎀ βŽ₯ βŽ₯ ⎦
  • E ⎑ ⎒ ⎒ ⎣ 3 2 3 2 βˆ’ 3 2 3 2 ⎀ βŽ₯ βŽ₯ ⎦

Q5:

Which of the following compositions of transformations is represented by the matrix  0 βˆ’ 2 βˆ’ 2 0  ?

  • Aa dilation with center the origin and scale factor 2 followed by a reflection in the line 𝑦 = π‘₯
  • Ba dilation with center the origin and scale factor βˆ’ 2 followed by a reflection in the line 𝑦 = βˆ’ π‘₯
  • C a dilation with center the origin and scale factor 2 followed by a reflection in the line 𝑦 = βˆ’ π‘₯
  • Da dilation with center the origin and scale factor βˆ’ 2 followed by a reflection in the line 𝑦 = π‘₯
  • Ea rotation by 1 8 0 ∘ about the origin followed by a reflection in the line 𝑦 = π‘₯

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