Welcome to your ACT 1 Geo: Use coordinates to solve problems

$Q_{1}:$ What happens to the $x$-coordinate of a point after a reflection over the $y$-axis?

$Q_{2}:$ Which transformation changes the size of a figure but preserves its shape?

$Q_{3}:$ When a point is reflected over the $x$-axis, what happens to its y-coordinate?

$Q_{4}:$ What is the result of a $180$-degree rotation about the origin on the coordinates of a point $(x, y)$?

$Q_{5}:$ When you translate a figure, what happens to all its coordinates?

$Q_{6}:$ If a figure is dilated with a scale factor of $2$, what happens to the coordinates of its vertices?

$Q_{7}:$ What is the effect of a $90$-degree clockwise rotation on the coordinates of a point $(x, y)$?

$Q_{8}:$ If a figure is reflected over the line $y = x$, what happens to the coordinates of its points?

$Q_{9}:$ How do you find the image coordinates of a point after a given rotation about a fixed point other than the origin?

$Q_{10}:$ When a point is reflected over the $y$-axis, what happens to its $x$-coordinate?

$Q_{11}:$ Which transformation changes both the size and shape of a figure?

$Q_{12}:$ If a point is translated $3$ units to the right and $2$ units up, what are its new coordinates if it was originally at $(x, y)$?

$Q_{13}:$ What happens to the coordinates of a point after a $270$-degree counterclockwise rotation about the origin?

$Q_{14}:$ If you dilate a figure with a scale factor of $0.5$, what happens to the coordinates of its vertices?

$Q_{15}:$ What is the effect of a $45$-degree counterclockwise rotation on the coordinates of a point $(x, y)$?

$Q_{16}:$ If a figure is reflected over the $x$-axis, what happens to the $y$-coordinates of its points?

$Q_{17}:$ How do you calculate the midpoint of a line segment with endpoints at $(x_{1}, y_{1})$ and $(x_{2}, y_{2})$?

$Q_{18}:$ What is the effect on the coordinates of a point after a dilation with a scale factor of 3 centered at the origin?

$Q_{19}:$ If a point is translated $4$ units to the left and $1$ unit down, what are its new coordinates if it was originally at $(x, y)$?

$Q_{20}:$ When a figure is rotated $180$ degrees about the origin, what happens to the coordinates of its points?

$Q_{21}:$ If a figure is dilated with a scale factor of $1$, what happens to the coordinates of its vertices?

$Q_{22}:$ What is the result of a reflection over the line $y = -x$ on the coordinates of a point $(x, y)$?

$Q_{23}:$ How can you determine if a figure has been subjected to a translation when you have its pre-image and image coordinates?

$Q_{24}:$ If you reflect a point over the line $y = x$, what happens to its $x$-coordinate?

$Q_{25}:$ What transformation is applied to the coordinates of a point after a $360$-degree rotation about the origin?