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Korvikt [17]
2 years ago
9

Which rule describes a composition of transformations that maps pre-image PQRS to image P"Q"R"S"?

Mathematics
2 answers:
riadik2000 [5.3K]2 years ago
6 0

Answer:

Option D is correct.

The rule describe a composition is, r_{y-axis} o R_{0,270^{\circ}}(x, y)

Step-by-step explanation:

From the given figure:

The coordinates of PQRS are;

P = (1,1)

Q= (1, 5)

R=(3, 5)

S = (3, 1)

First apply the rule of 270°  counterclockwise rotation  about the origin is given by;

R_{0,270^{\circ}}(x, y) \rightarrow (y , -x)

Apply the rule of 270 degree counterclockwise rotation on PQRS:

P(1, 1) \rightarrow (1 , -1)

Q(1, 5) \rightarrow (5, -1)

R(3, 5) \rightarrow (5, -3)

S(3, 1) \rightarrow (1 , -3)

Next apply y-axis the rule of reflection  i.e

r_{y-axis}(x, y) \rightarrow (-x, y)

(1, -1) \rightarrow (-1 , -1)=P"

(5 -1) \rightarrow (-5 , -1) =Q"

(5, -3) \rightarrow (-5 , -3)=R"

(1, -3) \rightarrow (-1 , -3)=S"

Therefore, the rule describe a composition of transformation that maps pre-image PQRS to image P"Q"R"S" is;  r_{y-axis} o R_{0,270^{\circ}}(x, y)





FinnZ [79.3K]2 years ago
3 0

The correct option is Option D \boxed{{r_{y-axis}}o{R_{0,270^\circ }}\left({x,y}\right)} .

Further explanation:

A translation is a transformation that transforms the figure with a fixed distance in the same direction.

A rotation is the transformation that rotates the figure with given angles.

Given:

It is given that the two transformations that maps pre-image PQRS to image {\text{P''Q''R''S''}} .

Step by step explanation:

Step 1:

It can be seen from the given figure that that the pre image is in the first quadrant and the image is the third quadrant.

The coordinates in the second quadrant represents as \left({-x,y}\right)  and in the third quadrant represents as \left({-x,-y}\right)  if x,y  are positive.

Therefore, the rotation is in the counter clockwise direction of 270^\circ .

Step 2:

The rotation of 270^\circ  in the counter clockwise direction represents the coordinates as,  

  \left({x,y}\right)\to\left({y,-x}\right)

It can be seen that the coordinate of {\text{PQRS}}  are as follows,

\begin{aligned}P=\left({1,1}\right)\hfill\\Q=\left(1,5}\right)\hfill\\R=\left({3,5}\right)\hfill\\S=\left({3,1}\right)\hfill\\\end{aligned}

Then after rotation of 270^\circ  counterclockwise on {\text{PQRS}}  \left( {x,y}\right)\to\left({y,-x}\right)   as,

  \begin{gathered}P\left({1,1}\right)\to\left({1,-1}\right)\hfill\\Q\left({1,5}\right)\to\left({5,1}\right)\hfill\\R\left({3,5}\right)\to\left({5,-3}\right)\hfill\\S\left({3,1}\right)\to\left({1,-3}\right)\hfill\\\end{gathered}

Step 3:

Now apply the rule of y  axis of reflection {R_{y-axis}}\left({x,y}\right)\to\left({-x,y}\right)  on the above transformation as,

\begin{gathered}\left({1,-1}\right)\to\left({-1,1}\right)=P''\hfill\\\left({5,1}\right)\to\left({-5,-1}\right)=Q''\hfill\\\left({5,-3}\right)\to\left({-5,-3}\right)=R''\hfill\\\left({1,-3}\right)\to\left({-1,-3}\right)=S''\hfill\\\end{gathered}

Therefore, the given transformation is the rotation of 270^\circ  counterclockwise followed by y  axis of reflection.

Therefore, this is the composition of transformation.

The composition of the given transformation can be written as,

   {r_{y-axis}}o{R_{0,270^\circ}}\left({x,y}\right)

Therefore, option D {r_{y-axis}}o{R_{0,270^\circ}}\left({x,y}\right)  is correct.

Learn more:  

  • Learn more about what is the final transformation in the composition of transformations that maps pre-image abcd to image a"b'c"d"? a translation down and to the right a translation up and to the right a 270° rotation about point b' a 180° rotation about point b' <u>brainly.com/question/2480946</u>
  • Learn more about the transformation of function <u>brainly.com/question/7297858 </u>
  • Learn more about midpoint of the segment <u>brainly.com/question/3269852</u>

Answer details:

Grade: High school

Subject: Mathematics

Chapter: Transformations

Keywords: transformations, dilation, translation, rotation, counterclockwise, angle, clockwise, coordinates, mapping, rigid transformation, right side, left side, quadrant, composition.

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