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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
Moving the shape up or down, and left or right but not turning it or changing its size.
Translation is sliding without turning. You can slide left or right, or up or down (or any combination).
Press menu twice to get to main menu. Scroll down to setup tab. Scroll right to units tab ( units tab does not appear on screen until you scroll far enough to the right) then scroll down to distance and speed and choose stature mile.
Make a little dot on the y-axis at the point y=3. Draw a line through that point that slopes down to the right, dropping down 4 units for each unit it progresses to the right, or rising 4 units for each unit it progresses to the left.
For this translation, you need to replace every occurence of "x" with "x-3", and every occurence of "y" with "y+5".
(2,1)
The vector sum of (7 units down) + (3 units up) is (4 units down).
translation
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
(x,y) (an arrow pointing right) (x (units right or left), y (units up or down) Right and up are positive numbers Left and down are negative numbers an example would be: Write the coordinate notation for 2 units right and 4 units down (x,y) (an arrow pointing right) (x+2, y-4)
1,-1
Y=|x+2|
Can someone please help me???
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).
In cartesian coordinates (x, y) = (3, -4)
A translation of a figure is when a figure changes it's position, And can be in the direction of up, down, left, right, and maybe diagonal.