ACT 1 Geo: Use coordinates to solve problems

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?

It remains the same.

It becomes its negative.

It is squared.

It is halved.

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

Translation

Rotation

Dilation

Reflection

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

It remains the same.

It becomes its negative.

It is squared.

It is halved.

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

$(-x, -y)$

$(-y, x)$

$(y, -x)$

$(x, y)$

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

They remain the same.

They become negative

They increase by a fixed amount.

They are squared.

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

They are divided by $2$.

They are multiplied by $2$.

They are squared.

They remain the same.

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

$(-y, x)$

$(y, -x)$

$(-x, -y)$

$(x, y)$

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

They remain the same.

They become negative.

They switch places.

They are squared.

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

Subtract the coordinates of the fixed point from the original point, apply rotation, then add the fixed point's coordinates.

Divide the coordinates of the fixed point by the scale factor.

Add the coordinates of the fixed point to the original point.

Multiply the coordinates of the fixed point by the scale factor.

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

It remains the same.

It becomes its negative.

It is squared.

It is halved.

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

Translation

Rotation

Dilation

Reflection

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

$(x + 3, y + 2)$

$(x - 3, y + 2)$

$(x + 2, y + 3)$

$(x + 3, y - 2)$

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

$(-y, x)$

$(y, -x)$

$(-x, -y)$

$(x, y)$

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

They are divided by $0.5$.

They are multiplied by $0.5$.

They are squared.

They remain the same.

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

$(-y, x)$

$(y, -x)$

$(-x, -y)$

$(x, y)$

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

They remain the same.

They are squared.

They switch places.

They become negative.

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

$ ( \frac{(x_{1} + x_{2})}{ 2}, \frac{(y_{1} + y_{2}){ 2} ) $

$ ( \frac{(x_{1} - x_{2})}{ 2}, \frac{(y_{1} - y_{2}){ 2} ) $

$ (x_{1} + x_{2}, y_{1} + y_{2})$

$(x_{1} * x_{2}, y_{1} * y_{2})$

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

They are divided by $3$.

They are multiplied by $3$.

They are squared.

They remain the same.

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

$(x - 4, y - 1)$

$(x + 4, y + 1)$

$(x - 1, y - 4)$

$(x - 4, y + 1)$

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

They remain the same.

They become negative.

They switch places.

They are squared.

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

They are divided by $1$.

They are multiplied by $1$.

They are squared.

They remain the same.

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

$(-y, -x)$

$(y, -x)$

$(-x, y) $

$(x, -y)$

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

Check if all coordinates have been multiplied by the same factor.

Check if the $x$-coordinates are the same and the $y$-coordinates are the same.

Check if the $x$-coordinates have been added by the same amount and the $y$-coordinates have been added by the same amount.

Check if the $x$-coordinates have been squared and the $y$-coordinates have been squared.

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

It remains the same.

It becomes its negative.

It is squared.

It is halved.

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

No transformation, the point remains the same.

A $90$-degree counterclockwise rotation.

A reflection over the $x$-axis.

A dilation with a scale factor of $0$.

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