What is the translation of the trapezium $ABCD$ABCD to the trapezium $A'B'C'D'$A′B′C′D′?
Two trapeziums are plotted on the cartesian plane, $ABCD$ABCD and $A'B'C'D'$A′B′C′D′, suggesting $A'B'C'D'$A′B′C′D′ is a translation of $ABCD$ABCD. For Trapezium $ABCD$ABCD, vertex A is on $\left(4,-5\right)$(4,−5), vertex B is on $\left(7,-5\right)$(7,−5), vertex C is on $\left(8,-8\right)$(8,−8), and vertex D is on $\left(3,-8\right)$(3,−8). For Trapezium $A'B'C'D'$A′B′C′D′, vertex A' is on $\left(-3,-5\right)$(−3,−5), vertex B' is on $\left(0,-5\right)$(0,−5), vertex C' is on $\left(1,-8\right)$(1,−8), and vertex D' is on $\left(-4,-8\right)$(−4,−8). The coordinates of the vertices are not explicitly given or labeled.
$7$7 units left
$7$7 units right
$6$6 units right
$6$6 units left
What translation is required to get from triangle $ABC$ABC to triangle $A'B'C'$A′B′C′?
What is the translation of the polygon $ABCDEFG$ABCDEFG to the polygon $A'B'C'D'E'F'G'$A′B′C′D′E′F′G′?
What is the translation of the trapezium $ABCD$ABCD to the trapezium $A'B'C'D'$A′B′C′D′?