QUESTION IMAGE
Question
7 graph the image of the figure. translation: 4 units right and 5 units down polygon
Step1: Recall translation rule
For a point $(x,y)$ translated 4 units right and 5 units down, the new - point is $(x + 4,y-5)$.
Step2: Identify original points
Assume the vertices of the polygon are $A(x_1,y_1)$, $B(x_2,y_2)$ and $C(x_3,y_3)$. From the graph, if we assume $A(- 2,3)$, $B(1,2)$ and $C(0,4)$.
Step3: Calculate new points
For point $A$: $x_1=-2,y_1 = 3$, new point $A'$ has coordinates $(-2 + 4,3-5)=(2,-2)$.
For point $B$: $x_2 = 1,y_2=2$, new point $B'$ has coordinates $(1 + 4,2-5)=(5,-3)$.
For point $C$: $x_3=0,y_3 = 4$, new point $C'$ has coordinates $(0 + 4,4-5)=(4,-1)$.
Step4: Graph new polygon
Plot the points $A'(2,-2)$, $B'(5,-3)$ and $C'(4,-1)$ on the coordinate - plane and connect them to form the translated polygon.
Since we can't actually graph in this text - based format, the key is to find the new coordinates of the vertices of the polygon. The new coordinates of the vertices of the translated polygon are found as above.
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Step1: Recall translation rule
For a point $(x,y)$ translated 4 units right and 5 units down, the new - point is $(x + 4,y-5)$.
Step2: Identify original points
Assume the vertices of the polygon are $A(x_1,y_1)$, $B(x_2,y_2)$ and $C(x_3,y_3)$. From the graph, if we assume $A(- 2,3)$, $B(1,2)$ and $C(0,4)$.
Step3: Calculate new points
For point $A$: $x_1=-2,y_1 = 3$, new point $A'$ has coordinates $(-2 + 4,3-5)=(2,-2)$.
For point $B$: $x_2 = 1,y_2=2$, new point $B'$ has coordinates $(1 + 4,2-5)=(5,-3)$.
For point $C$: $x_3=0,y_3 = 4$, new point $C'$ has coordinates $(0 + 4,4-5)=(4,-1)$.
Step4: Graph new polygon
Plot the points $A'(2,-2)$, $B'(5,-3)$ and $C'(4,-1)$ on the coordinate - plane and connect them to form the translated polygon.
Since we can't actually graph in this text - based format, the key is to find the new coordinates of the vertices of the polygon. The new coordinates of the vertices of the translated polygon are found as above.