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Which of the following describes how to graph the line whose equation is y = 2/3x - 1?
answer options are:
Plot the point (0, -1), move up 3 and right 2, plot the point, and draw the line through these 2 points.
Plot the point (0, -1), move up 2 and right 3, plot the point, and draw the line through these 2 points.
Plot the point (-1, 0), move up 2 and right 3, plot the point, and draw the line through these 2 points. **Weegy:** Plot the point (0, -1), move up 2 and right 3, plot the point, and draw the line through these 2 points. The line has gradient 2/3 so moves up 2 units for every 3 across, and when x=0, y=-1. (More)

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Asked 5/27/2012 12:48:58 PM

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Which of the following describes how to translate the graph y = |x| to obtain the graph of y = |x| - 4? **Weegy:** where are the choices? **User:** Which of the following describes how to translate the graph y = |x| to obtain the graph of y = |x| - 4?
4 units up
4 units down
4 units left
4 units right **Weegy:** 4 units down is the answer. If the 4 was in the absolute value brackets, it would be left 4. (More)

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Asked 5/27/2012 10:18:57 PM

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If the graph of y = |x| is translated so that the point (1, 1) is moved to (1, 4), what is the equation of the new graph?
y = |x - 3|
y = |x| - 3
y = |x + 3|
y = |x| + 3 **Weegy:** B. y = |x| - 3 **User:** Which of the following describes how to translate the graph y = |x| to obtain the graph of y = |x - 1| - 1?
1 unit left and 1 unit down
1 unit left and 1 unit up
1 unit right and 1 unit down
1 unit right and 1 unit up **Weegy:** 1 unit to the right and one unit down is the correct answer.
a positive number inside of the brackets moves to the left while a negative moves to the right. Outside of the brackets a negative moves down and a positive moves up. **User:** Which of the following describes how to translate the graph y = |x| to obtain the graph of y = |x + 7|?
7 units up
7 units down
7 units left
7 units right (More)

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Expert Answered

Updated 348 days ago|9/19/2014 8:02:47 AM

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If the graph of y = |x| is translated so that the point (1, 1) is moved to (1, 4), y = |x| + 3

is the equation of the new graph .

y is 3 units up .

is the equation of the new graph .

y is 3 units up .

Added 348 days ago|9/19/2014 8:00:46 AM

7 units left can describe how to translate the graph y = |x| to obtain the graph of y = |x + 7| .

Added 348 days ago|9/19/2014 8:02:47 AM

Which of the following describes how to translate the graph y = |x| to obtain the graph of y = |x - 1| - 1?
1 unit left and 1 unit down
1 unit left and 1 unit up
1 unit right and 1 unit down
1 unit right and 1 unit up **Weegy:** 4 units down is the answer. If the 4 was in the absolute value brackets, it would be left 4. **User:** Which of the following describes how to translate the graph y = |x| to obtain the graph of y = |x - 1| - 1?
1 unit left and 1 unit down
1 unit left and 1 unit up
1 unit right and 1 unit down
1 unit right and 1 unit up **Weegy:** 1 unit right and 1 unit down. Source: (More)

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Asked 5/28/2012 3:27:24 PM

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Which of the following describes how to translate the graph y = |x| to obtain the graph of y = |x + 7|?
7 units up
7 units down
7 units left
7 units right **Weegy:** 4 units down is the answer. If the 4 was in the absolute value brackets, it would be left 4. (More)

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Expert Answered

Updated 5/29/2014 9:27:07 AM

1 Answer/Comment

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