Question

Using the given figure, the square ABCD is transformed to a new location.

The transformation shown is


RO,90°
DO,3
T(x, y) → (x + 5, y + 2)

Answer 1

@SnuggieLad

Answer 2

@Jhannybean

Answer 3

If a transformation T maps any point (x, y) to (x + m, y + n), then T is a
translation.

A translation moves or maps every point of the plane the same distance and direction. Translations can also be called a glide or slide.

The transformation of the figure is an Isometry
All of the points are translated a distance of \[\sqrt{29}\] units because i used this formula and plugge the length of DD'
D = (2, 0), and D' = (7, 2)

\[d=\sqrt{(x_{1}-x_2)^2 + (y_{1}-y_2)^2}\]

Answer 4

hb\[=\sqrt{(7-2)^2+(2-0)^2}\]
\[=\sqrt{(5)^2}+(2)^2\]
\[=\sqrt{(25+4}\]
\[=\sqrt{29} units\]

Answer 5

That's all i can do, also u will have the same answer if u work it out with the length AA'?
A = (0, 0), and A' = (5, 2)