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A function that translates a point ((x, y)) to the right by (a) units and up by (b) units can be expressed as (f(x, y) = (x + a, y + b)). This means you simply add (a) to the x-coordinate and (b) to the y-coordinate of the original point. In function notation, if (f(x, y)) represents the original point, the translated point can be represented as (f'(x, y) = (x + a, y + b)).
What else can I help you with?
What would be the orientation of the figure L after a translation of 8 units to right and 3 units up?
The orientation of figure L would remain unchanged after a translation of 8 units to the right and 3 units up. Translation moves a figure without altering its shape, size, or direction. Thus, while the position of figure L will change, its orientation will stay the same.
What is the rule for a reflection across the origin followed by a translation 3 units to the right and 4 units up?
A reflection across the origin transforms a point ((x, y)) to ((-x, -y)). After this reflection, a translation of 3 units to the right and 4 units up shifts the point to ((-x + 3, -y + 4)). Therefore, the combined rule for the transformation is given by the mapping ((x, y) \to (-x + 3, -y + 4)).
What is the rule for the transformation formed by a translation 6 units to the left and 4 units up?
Which transformations could have been used to move the platter to the new location? A. a translation 9 units left and a translation 3 units down B. a reflection across MN and a translation 4 units left C. a reflection across MN and a translation 8 units left D. a rotation 180° clockwise about N and a translation 4 units left
How do you graph ( 2.5 3.5 )?
Normally it would be a point which is 2.5 units to the right of the origin and 3.5 units up.
What if your friend is graphing the point (25) . Her first step is to start at the origin and go up 2 2 units. Is her method correct?
To graph the point (2, 5) - if that's what you mean - you need to start from the origin, and go 2 units to the right, and 5 up. You can also go 5 units up first, and THEN 2 units to the right. You can even go part of the way to the right (for instance, 1 unit), then some units up, and then later go the remaining unit to the right. But in this case, you need to keep track of how many units you already walked in each direction.
What translation moves a triangle 4 units to the right and 8 units up?
the translation of 2 is the one that triangle moves by 4 units right and 8 units up
What are the coordinates of the point (12) after a translation right 9 units and up 3 units?
The coordinates are (10, 5).
Which rule describes a translation that is 8 units to the right and 2 units up?
(x,y) > (x + 8, y + 2)
What is the image point of (8,−2)(8,-2)(8,−2) after a translation right 5 units and up 2 units?
If you we're at the point (8,-2) and you went 5 units right and 2 units up, you'd be at (13,0).
What is a type of transformation in which you move a points of a figure the same number of units up or down and left or right?
translation
What is the rule for a reflection across the origin followed by a translation 3 units to the right and 4 units up?
A reflection across the origin transforms a point ((x, y)) to ((-x, -y)). After this reflection, a translation of 3 units to the right and 4 units up shifts the point to ((-x + 3, -y + 4)). Therefore, the combined rule for the transformation is given by the mapping ((x, y) \to (-x + 3, -y + 4)).
What is a translation of down 7 units and 3 units up?
The vector sum of (7 units down) + (3 units up) is (4 units down).
What is the rule for the transformation formed by a translation 6 units to the left and 4 units up?
Which transformations could have been used to move the platter to the new location? A. a translation 9 units left and a translation 3 units down B. a reflection across MN and a translation 4 units left C. a reflection across MN and a translation 8 units left D. a rotation 180° clockwise about N and a translation 4 units left
How to translate the coordinates of a point?
Here's an example: In the coordinate plane, the point is translated to the point . Under the same translation, the points and are translated to and , respectively. What are the coordinates of and ? Any translation sends a point to a point . For the point in the problem, we have the following. So we have . Solving for and , we get and . So the translation is unit to the right and units up. See Figure 1. We can now find and . They come from the same translation: unit to the right and units up. The three points and their translations are shown in Figure 2.
What is the rule for a reflection across the y-axis followed by a translation 1 unit to the right and 4 units up?
(x' , y') = (-x + 1 , y + 4)
Which rule describes a translation that is 6 units to the left and 4 units up?
(x,y)--(x-4,y+6)
What is the rule for the transformation formed by a translation 8 units to the left and 9 units up?
(x1, y1) = (x - 8, y + 9)
