Matrix Transformations (DP IB Applications & Interpretation (AI): HL): Exam Questions

3 hours30 questions
1a
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2 marks

Write down the matrix that represents a rotation of 225° clockwise about the origin.

1b
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2 marks

Write down the matrix that represents a reflection in the y-axis.

1c
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2 marks

Find a single matrix that represents the composite transformation consisting of the transformation in part (a) followed by the transformation in part (b).

1d
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2 marks

Hence find the coordinates of the image of the point (4,1) after a rotation of 225° clockwise about the origin followed by a reflection in the y-axis.

2a
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2 marks

The diagram below shows a triangle .

q2-3-6-matrix-transformations-diagrams-medium

Write down the position matrix of the triangle ABC.

2b
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3 marks

The triangle ABC is to be mapped to triangle A'B'C' by a single transformation defined by the transformation matrix (1001).

Find the position matrix of the mapped image and draw triangle A'B'C' on the diagram.

2c
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2 marks

Describe fully the transformation that triangle ABC has undergone.

3a
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2 marks

Points in a plane are subjected to a transformation T that transforms a point (x, y) to the point (x', y'), where T is defined by

 T:(x'y')=(4000.5)(xy)

Describe in words the transformation T.

3b
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2 marks

Find the matrix T1.

3c
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2 marks

Hence find the coordinates of the point (x, y) if (x', y')=(12,4).

4a
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2 marks

A quadrilateral has vertices (2, 1), (4, 4), (7, 1) and (9, 4).

Find the area of the quadrilateral.

4b
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2 marks

The quadrilateral undergoes a transformation represented by the matrix (2143).

Find the determinant of the transformation matrix.

4c
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2 marks

Hence find the area of the image.

5
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5 marks

An object undergoes a vertical stretch with scale factor 2 followed by a reflection in the x-axis. The position matrix of the image is (254321).

Use a matrix method to find the coordinates of the object before the transformation.

6a
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5 marks

The points A(7,3) and B(2, 6) are transformed to become the points A'(18, 8) and B'(12, 16) respectively.

Find the 2×2 matrix T that represents the linear transformation.

6b
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3 marks

Given that point C(4,5) is transformed by T2, find the coordinates of the image point C'.

7a
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3 marks

An object is reflected in the line y=33x.

Write down the matrix that represents the transformation.

7b
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3 marks

P is a vertex of the object that is being reflected.

Find the coordinates of P if the coordinates of its image P' are (2, 23).

8a
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2 marks

The triangle PQR, with vertices P(1, 1), Q(5, 3) and R(9,2), is translated by the vector (72) and then enlarged by a scale factor of 3 with the centre of enlargement at the origin.

Find a single transformation in the form AX+b that maps PQR onto P'Q'R'.

8b
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3 marks

Hence determine the coordinates of P'Q'R'.

9a
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3 marks

Find the 2×2 transformation matrices that represent the following transformations:

(i) R, a rotation of π4 radians anti-clockwise

(ii) S, a reflection in the line y=x

(iii) T, a stretch with scale factor 5 parallel to the y-axis.

9b
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4 marks

Find a single transformation matrix that represents the composite transformation 

(i) RT3 

(ii) R8STS

9c
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2 marks

Find the coordinates of the image of the point A(3,1) after it has undergone the composite transformation specified in part (b)(i).

9d
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1 mark

State the name of the single transformation that is equivalent to the composite transformation specified in part (b)(ii).

10a
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3 marks

The triangle PQR with position matrix T0 has vertices P(5, 2),Q(3, 1) and R(5,4).  

The triangle is transformed by the transformation matrix  M=(012120).  

 Tn denotes the position matrix of the image triangle after PQR has been transformed  times by matrix M.

By multiplying two appropriate single transformation matrices together, verify that the matrix M is an enlargement by scale factor 12 followed by a 90° clockwise rotation.

10b
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2 marks

Explain why the area of the triangle with position matrix T1 will be 14 of the area of triangle PQR.   

10c
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3 marks

Find T2,and hence the coordinates of the image triangle after triangle PQR is transformed twice by matrix M.

1a
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3 marks

Find a single matrix to represent the composite transformation comprising a reflection in the x-axis followed by a rotation of  60° counter-clockwise about the origin.

1b
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2 marks

Hence find the coordinates of the image of the point (7,5), which undergoes the composite transformation stated in part (a).

2a
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3 marks

The diagram below shows the triangle ABC.

mi_q2a_3-6_matrix-transformations_hard_ib_ai_hl_maths_dig

Write down the matrix that will rotate the triangle about the origin so that [AC] is parallel to the x-axis.

2b
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3 marks

Find the position matrix of the mapped image.

2c
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2 marks

Hence find the area of the triangle.

3a
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2 marks

Points in a plane are subjected to a transformation T:(xy)(x'y'), where T is defined by:

 T:(x'y')=(12323212)(xy)+(p6)           

Given that a point A(4, q) is mapped to A'(73, 23+7) , find p and q, where p,q.

3b
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4 marks

Given that Tcomprises two individual transformations describe in full the composite transformation T.

4a
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3 marks

A parallelogram with a base length of 2.5 cm undergoes a transformation represented by the matrix (8373) 

Given that the area of the image after the transformation is 48 cm2, find the area of the original parallelogram.

4b
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2 marks

Hence find the perpendicular height of the original parallelogram.

5a
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3 marks

A function f  is defined by f(x)=x2.

Given that g(x)=12f(4x) , describe fully the transformation that maps f(x)g(x).

5b
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3 marks

Hence find the single matrix that represents this transformation.

6
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6 marks

The points A(4, 9) and B(-3, -11) are transformed by T  to become the points A'(3,8) and B'(2,6) respectively.

Given that the point C(5,7) is transformed by T3, find the coordinates of the image point C '.

7a
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5 marks

Consider matrix A, where A=(4236),  which represents a series of transformations in the following order: 

  • A transformation represented by the matrix (4236)

  • A counter-clockwise rotation of 270°

  • A single transformation represented by the matrix B 

Find matrix B and describe the effect of the transformation it represents in full.

7b
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2 marks

Find B1.

7c
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2 marks

Compare the matrix B with its inverse and explain any similarities that can be observed.

8a
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1 mark

The triangle PQR with vertices P(4,1), Q(2, 6) and R(4, 2)  is enlarged by a scale factor of 5 with the centre of enlargement at X(3,1). The enlarged shape has coordinates P'Q'R'.

Write down the column vector required to translate the centre of enlargement to the origin.

8b
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2 marks

Write down the position matrix of the vertices of the triangle after undergoing the translation stated in part (a).

8c
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2 marks

Find a single transformation in the form AX+b that will map the coordinates of the vertices of the triangle after they have been translated to their final position P'Q'R'.

8d
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2 marks

Hence determine the coordinates of P'Q'R'.

9a
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4 marks

The matrices R, S and T  are defined by R=(12323212), S=(2003) and T=(10049).  

Triangle X is mapped onto triangle Y  by the transformation represented by R3STS.

Describe in full the two geometric transformations, A and B, that are equivalent to R3STSand map triangle X onto triangle Y .

 

9b
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3 marks

The coordinates of triangle Y are (2,8), (2, 12) and (14, 3).

Find the area of triangle X.

10a
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3 marks

The quadrilateral PQRS with position matrix T0 has vertices P(0,0),  Q(0,9), R(6,9), and S(6,0).

Tn denotes the position matrix of the image quadrilateral after PQRS has been transformed n times by matrix M.

After a transformation, represented by the matrix M, where M=AX+b, the position matrix of the image quadrilateral T1has vertices P'(6,1), Q'(6, 5), R'(10, 5) and S'(10,1).

Find M

10b
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2 marks

Find the position matrix of the image quadrilateral T2.

10c
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3 marks

Find the perimeter of the shape formed by the quadrilaterals T0, T1and  T2.

1a
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3 marks

A geometric transformation T:(x y)(x'y') is defined by

T:(x'y')=(12121212)(xy)

Given that T is a composite function comprising a transformation defined by the matrix A followed by a rotation of  π4 rad clockwise:

(i) Find A. 

(ii) Describe fully the single geometric transformation represented by A.

1b
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4 marks

After being transformed by T, an additional transformation B is undergone. The final position of the points is a reflection of their initial position in the line y=x.

Find B.

2
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8 marks

A trapezoid ABCD is shown in the diagram below.

By first transforming the trapezoid so that the base is parallel to the y-axis, calculate the area of the trapezoid.

3
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7 marks

Points in a plane are subject to a transformation AB that transforms a point (x,y) to the point (x', y'), where A and Bare defined by

 A=(4613), B=(2002) 

The position matrix of a series of transformed points is X'=(240120189). 

Given that the final position matrix of the points X'' is a reflection in the y-axis from their original position, find X''.

4
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6 marks

A triangle ABC undergoes a transformation represented by the matrix (3135) after which it has an area of 48 cm2

The original triangle ABC is then transformed by A, where A is defined as a stretch with scale factor 3 parallel to the x-axis and a stretch with scale factor p parallel to the y-axis. 

Given that the area of triangle ABC after being transformed by A is 84 cm2, find p.

5
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5 marks

Consider the functions y=f(x) and y=g(x) defined by f(x)=2x2 and g(x)=3x+5

Let the transformation of a point be represented by T:(xf(x))(xgf(x))

Use a matrix method to determine the coordinates of a point P after undergoing the transformation T, given that P'(2, 29).

6
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6 marks

T is a 2×2 matrix (2bcd) that represents the transformation of points A(1,6) and B(4,2) to A'(2p,18) points and B'(10,3p) respectively.

Given that point C(2,5) is transformed by T2, find the coordinates of the image point C'.

7
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4 marks

Show that a transformation matrix representing a reflection is a self-inverting matrix

8a
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2 marks

Consider the general complex number z=x+yi with position vector (xy) and a second complex number z1.

State the two transformations that occur when z is multiplied by z1.

8b
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2 marks

Hence write down the single matrix,T that represents the two transformations from part (a).

8c
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4 marks

Given that z=1+2i and z1=333i and using the result from part (b), find the position vector of the result of zz1.

8d
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2 marks

By multiplying the two numbers together in their complex form, verify that your answer to part (c) is correct.

9
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5 marks

The matrices R, S and T are defined by R, a stretch with scale factor 4 and y-axis invariant, S, a reflection in the line y=x and T=(abcd)

Triangle X is mapped onto triangle Y by the transformation represented by R3TS.

Given triangle Y is a rotation of triangle X by  π4 rad clockwise about the origin, find T.

10a
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6 marks

The triangle PQR with position matrix T0 has vertices P(0, 4), Q(8,3),  and R(7,7). 

The triangle is transformed by a matrix M comprising a counter-clockwise rotation of  π3  about the point (2,1).

Given that Tndenotes the position matrix of the image triangle after PQR has been transformed n times by matrix M, find T3.

10b
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4 marks

The same original triangle PQR is transformed by a matrix N comprising a clockwise rotation of  π3  about the origin followed by a translation of (34)

Rndenotes the position matrix of the image triangle after PQR has been transformed n times by matrix N.

Find the distance between the vertices corresponding to the initial point P of the triangle with position matrix T3 and the triangle with position matrix R1.