9.01 Translations
A translation occurs when we move an object or shape from one place to another without changing its size, shape or orientation. Sometimes called a slide, a translation moves every point on an object or shape the same distance in the same direction. We can translate points, lines or polygons on the $xy$xy-plane by moving them left, right, up or down any number of units.
Horizontal translations
If we translate horizontally, only the $x$x value is changing.
In this diagram above, the image is a translation of $7$7 units right. We can look at the coordinates of the preimage and image.
| Preimage | Image |
|---|---|
| $\left(-5,1\right)$(−5,1) | $\left(2,1\right)$(2,1) |
| $\left(-4,7\right)$(−4,7) | $\left(3,7\right)$(3,7) |
| $\left(0,2\right)$(0,2) | $\left(7,2\right)$(7,2) |
Notice how the coordinate of the vertex of the triangle has changed from $\left(-5,1\right)$(−5,1) to $\left(2,1\right)$(2,1) and that the $y$y coordinate has not changed at all.
Vertical translations
If we translate vertically, only the y value is changing.
In this diagram, the image is a translation of $5$5 units up. We can look at the coordinates of the preimage and image.
| Preimage | Image |
|---|---|
| $\left(1,-3\right)$(1,−3) | $\left(1,2\right)$(1,2) |
| $\left(3,-1\right)$(3,−1) | $\left(3,4\right)$(3,4) |
| $\left(7,-6\right)$(7,−6) | $\left(7,-1\right)$(7,−1) |
Notice how the coordinate of the vertex of the triangle has changed from $\left(1,-3\right)$(1,−3) to $\left(1,2\right)$(1,2) and that the $x$x coordinate has not changed at all.
Combined translations
An object can be translated both horizontally and vertically.
Exploration
Use the red sliders at the bottom to translate the object. Move the vertices on the original Object to change the shape of the triangle.
If you are given the coordinates of the Image, what information do you need to find the coordinates of the Preimage Object and vice versa?
Practice questions
Question 1
What translation is required to get from triangle $ABC$ABC to triangle $A'B'C'$A′B′C′?
$9$9 units to the left
A$10$10 units to the left
B$9$9 units to the right
C$10$10 units to the right
D
Question 2
What is the translation of the trapezoid $ABCD$ABCD to the trapezoid $A'B'C'D'$A′B′C′D′?
The other trapezoid is labeled $A'$A′, $B'$B′, $C'$C′, and $D'$D′, with similar positioning of the vertices relative to the trapezoid on the left side where vertex $A'$A′ is at A'(-10, 2), vertex $B'$B′is at B'(-9, -6), vertex $C'$C′is at C'(-6, -6) and vertex $D'$D′is at D'(-5, 2).
$9$9 units left and $3$3 units up
A$3$3 units right and $9$9 units up
B$3$3 units left and $9$9 units down
C$9$9 units right and $3$3 units down
D
Question 3
Point $A$A is translated $3$3 units down and $4$4 units to the right, where it now overlaps point $B$B$\left(5,-2\right)$(5,−2).
What were the original coordinates of point $A$A?
$A$A$=$=$\left(\editable{},\editable{}\right)$(,)