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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 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).
How would you graph x equals 3 y equals -3?
6
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 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
What happens when you translate a figure down 3 units then up 3 units?
The figure will remain in the same position it started as.
What describes the translation of the graph of y x2 to obtain the graph of y -x2 - 3?
A reflection about the x-axis (in other words, turned upside down) and then moved down three units. So basically, it'll end up as an upside down parabola (not squashed, stretched, or anything) with its vertex (which is a maximum) at (0,-3).
