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Translation down 3 units refers to the movement of a geometric figure or point in a downward direction along the vertical axis by three units. This means that every point of the figure or point is shifted straight down, reducing its y-coordinate by 3. For example, if a point originally at (x, y) is translated down 3 units, its new position will be (x, y - 3).
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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
What rule describes a translation that is 4 units to the right and 5 units down?
A translation that moves a point 4 units to the right and 5 units down can be described by the rule ( (x, y) \rightarrow (x + 4, y - 5) ). This means that for any point ((x, y)), you add 4 to the x-coordinate and subtract 5 from the y-coordinate to find the new position after the translation.
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 (10-60) translated 40 units down and 30 units left?
To translate the point (10, -60) 40 units down, you subtract 40 from the y-coordinate, resulting in -100. To translate it 30 units left, you subtract 30 from the x-coordinate, resulting in -20. Therefore, the new coordinates after the translation are (-20, -100).
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 image point of (0,4) after a translation right 2 units and down 3 units?
(2,1)
What rule describes a translation that is 3 units to the right and 5 units down?
For this translation, you need to replace every occurence of "x" with "x-3", and every occurence of "y" with "y+5".
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
What rule describes a translation that is 4 units to the right and 5 units down?
A translation that moves a point 4 units to the right and 5 units down can be described by the rule ( (x, y) \rightarrow (x + 4, y - 5) ). This means that for any point ((x, y)), you add 4 to the x-coordinate and subtract 5 from the y-coordinate to find the new position after the translation.
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 are the coordinates of the point (12) after a translation right 9 units and up 3 units?
The coordinates are (10, 5).
Which of the following equations is the translation 2 units down of the graph of y x?
Y=|x+2|
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 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 are the coordinates if it is 4 units down and 3 units to the right?
In cartesian coordinates (x, y) = (3, -4)
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
