The function rule T–4, 6(x, y) could be used to describe which translation?

left 4, up 6

To understand the translation described by the function rule T–4, 6(x, y), we need to break it down into its components.

In general, a function rule for a translation describes how each point on a coordinate plane is shifted. The first number in the function rule represents the horizontal shift (left or right), and the second number represents the vertical shift (up or down).

In this case, the function rule T–4, 6(x, y) tells us that each point (x, y) is shifted horizontally by -4 units and vertically by 6 units.

To determine the type of translation represented by this function rule, we can envision a point on a coordinate plane and apply the shifts. Let's say we have a point (2, 3).

To shift this point horizontally by -4 units, we need to subtract 4 from the x-coordinate. So, the new x-coordinate would be 2 - 4 = -2.

To shift the point vertically by 6 units, we add 6 to the y-coordinate. So, the new y-coordinate would be 3 + 6 = 9.

Therefore, the point (2, 3) is translated to (-2, 9) by the given function rule.

The translation represented by the function rule T–4, 6(x, y) is a horizontal shift of -4 units (to the left) and a vertical shift of 6 units (upwards).

parallelogram

vbf

frdffcfh