QUESTION IMAGE
Question
geometry b
9.1 translations (worksheet)
graph the image of the figure using the transformation given.
- translation: 4 units right and 1 unit down
- translation: 5 units left
- translation: 2 units right
- translation: 5 units left
- translation: (x, y)→(x + 1, y + 2)
- translation: (x, y)→(x - 2, y - 2)
Step1: Recall translation rules
For a translation of $a$ units right and $b$ units down, the rule for a point $(x,y)$ is $(x + a,y - b)$. For $a$ units left and $b$ units up, the rule is $(x - a,y + b)$. For a general rule $(x,y)\to(x + m,y + n)$, we add $m$ to the $x$-coordinate and $n$ to the $y$-coordinate of each vertex of the figure.
Step2: Apply rules to vertices
- For "4 units right and 1 unit down": If a vertex has coordinates $(x,y)$, its new coordinates are $(x + 4,y - 1)$. Plot the new - positioned vertices and connect them to get the translated figure.
- For "5 units left": If a vertex has coordinates $(x,y)$, its new coordinates are $(x-5,y)$. Plot the new - positioned vertices and connect them.
- For "2 units right": If a vertex has coordinates $(x,y)$, its new coordinates are $(x + 2,y)$. Plot the new - positioned vertices and connect them.
- For "5 units left": If a vertex has coordinates $(x,y)$, its new coordinates are $(x-5,y)$. Plot the new - positioned vertices and connect them.
- For $(x,y)\to(x + 1,y + 2)$: For each vertex $(x,y)$ of the original figure, find the new vertex $(x + 1,y + 2)$. Plot these new vertices and connect them.
- For $(x,y)\to(x - 2,y - 2)$: For each vertex $(x,y)$ of the original figure, find the new vertex $(x - 2,y - 2)$. Plot these new vertices and connect them.
Since this is a graph - based problem, the actual answer would be the correctly - plotted translated figures on the given coordinate grids. But the general steps to achieve the answer are as above. In a practical sense, you would take each vertex of the original figure, apply the appropriate translation rule, and then redraw the figure using the new vertices.
Snap & solve any problem in the app
Get step-by-step solutions on Sovi AI
Photo-based solutions with guided steps
Explore more problems and detailed explanations
Step1: Recall translation rules
For a translation of $a$ units right and $b$ units down, the rule for a point $(x,y)$ is $(x + a,y - b)$. For $a$ units left and $b$ units up, the rule is $(x - a,y + b)$. For a general rule $(x,y)\to(x + m,y + n)$, we add $m$ to the $x$-coordinate and $n$ to the $y$-coordinate of each vertex of the figure.
Step2: Apply rules to vertices
- For "4 units right and 1 unit down": If a vertex has coordinates $(x,y)$, its new coordinates are $(x + 4,y - 1)$. Plot the new - positioned vertices and connect them to get the translated figure.
- For "5 units left": If a vertex has coordinates $(x,y)$, its new coordinates are $(x-5,y)$. Plot the new - positioned vertices and connect them.
- For "2 units right": If a vertex has coordinates $(x,y)$, its new coordinates are $(x + 2,y)$. Plot the new - positioned vertices and connect them.
- For "5 units left": If a vertex has coordinates $(x,y)$, its new coordinates are $(x-5,y)$. Plot the new - positioned vertices and connect them.
- For $(x,y)\to(x + 1,y + 2)$: For each vertex $(x,y)$ of the original figure, find the new vertex $(x + 1,y + 2)$. Plot these new vertices and connect them.
- For $(x,y)\to(x - 2,y - 2)$: For each vertex $(x,y)$ of the original figure, find the new vertex $(x - 2,y - 2)$. Plot these new vertices and connect them.
Since this is a graph - based problem, the actual answer would be the correctly - plotted translated figures on the given coordinate grids. But the general steps to achieve the answer are as above. In a practical sense, you would take each vertex of the original figure, apply the appropriate translation rule, and then redraw the figure using the new vertices.