Review Game Zone
Games
Test
Preview
Back
Match it!
Match it! Select the correct answer from the pull down...Good luck!
Which transformation best describes the image of an object viewed through a microscope?
6 inches
fourth
rotation of 180 counter clockwise
translation
(-3,1)
rotation of 270 degrees counterclockwise
dilation
dilation
Which Transformation will result in an image which is similar but not congruent to the pre image?
6 inches
fourth
rotation of 180 counter clockwise
translation
(-3,1)
rotation of 270 degrees counterclockwise
dilation
dilation
A figure is located entirely in the third quadrant. If it is reflected over the y axis, in which quadrant will its image lie?
6 inches
fourth
rotation of 180 counter clockwise
translation
(-3,1)
rotation of 270 degrees counterclockwise
dilation
dilation
Which transformation describes a sliding box across a floor?
6 inches
fourth
rotation of 180 counter clockwise
translation
(-3,1)
rotation of 270 degrees counterclockwise
dilation
dilation
Triangle JKL has vertices J (2,3), K(3,1), and L (3,3). A Translation maps the point J to J' (3,3)What are the coordinates of K'
6 inches
fourth
rotation of 180 counter clockwise
translation
(-3,1)
rotation of 270 degrees counterclockwise
dilation
dilation
A rectangular photo with dimensions of 1.5 inches wide by 2 inches long is enlarged to a length of 8 inches. What is the width of the enlarged print?
6 inches
fourth
rotation of 180 counter clockwise
translation
(-3,1)
rotation of 270 degrees counterclockwise
dilation
dilation
Which of the following transformation has the same result as a rotation of 90 degrees clockwise?
6 inches
fourth
rotation of 180 counter clockwise
translation
(-3,1)
rotation of 270 degrees counterclockwise
dilation
dilation
The vertex of a figure is located at (2,4). The figure is rotated and the image of vertex is located at (-2,-4). Which of these describes the transformation
6 inches
fourth
rotation of 180 counter clockwise
translation
(-3,1)
rotation of 270 degrees counterclockwise
dilation
dilation
Check it!