Answer:
[tex]A'(4,-2)[/tex] [tex]B'(0,-5)[/tex] [tex]C'(-2,-2)[/tex] [tex]D'(2,1)[/tex]
Step-by-step explanation:
The given parallelogram has coordinates A(1, 1), B(5, 4), C(7, 1), and D(3, -2).
The rotation of [tex]180\degree[/tex]about the origin has the mapping;
[tex]P(x,y)\rightarrow P'(-x,-y)[/tex]
This implies that;
[tex]A(1,1)\rightarrow (-1,-1)[/tex]
[tex]B(5,4)\rightarrow (-5,-4)[/tex]
[tex]C(7,1)\rightarrow (-7,-1)[/tex]
[tex]D(3,-2)\rightarrow (-3,2)[/tex]
A translation of 5 units to the right and 1 unit down has the mapping;
[tex]P(x,y)\rightarrow P'(x+5,y-1)[/tex]
We apply this to the resulting coordinates to obtain;
[tex]A(1,1)\rightarrow (-1,-1) \rightarrow (-1+5,-1-1)=A'(4,-2)[/tex]
[tex]B(5,4)\rightarrow (-5,-1) \rightarrow (-5+5,-4-1)=B'(0,-5)[/tex]
[tex]C(7,1)\rightarrow (-7,-1)\rightarrow (-7+5,-1-1)=C'(-2,-2)[/tex]
[tex]D(3,-2)\rightarrow (-3,2)\rightarrow (-3+5,2-1)=D'(2,1)[/tex]
