Question

Which of the following statements is true for a point in the first quadrant of the coordinate plane? A. To graph a point (x, y) in the first quadrant of the coordinate plane, move x units up from the origin

asked Dec 26, 2022 56.6k views

Which of the following statements is true for a point in the first quadrant of the coordinate plane?

A. To graph a point (x, y) in the first quadrant of the coordinate plane, move x units up from the origin and y units to the left.

B. To grab a point (x, y) in the first quadrant of the coordinate plane, move x units to the right of the origin and y units up.

C. To graph a point (x, y) in the first quadrant of the coordinate plane, move x units to the left of the origin and y units up.

C. To graph a point (x, y) in the first quadrant of the coordinate plane, move x units from the origins and Y units to the right.

D. To graph a point (x, y) in the first quadrant of the coordinate plane, move x units up from the origin and y units to the right.

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Gefei · Answer 1 · 2022-12-31T06:07:09+0000

Answer:

Choice B: Start at the origin. Move
units to the right, and
units upwards.

Explanation:

There are two axes on a typical Cartesian coordinate plane:

The horizontal
-axis, and
The vertical
-axis.

Many diagrams of a Cartesian plane would have arrows on these two axis. Typically, there would be:

a rightward arrow
$\verb!->!$ on the right-hand side of the horizontal
-axis, and
an upward arrow
$\uparrow$ at top of the vertical
-axis.

The arrow on the
-axis pointing rightward suggests that as a point move to the right, the
$x\!$ coordinate of that point would increase. Conversely, it would be necessary to move points to the right so as to increase their
$\! x$ -coordinates.

On the other hand, the arrow pointing upwards on the
-axis indicate that as a point move upward, the
$y\!$ coordinate of that point would increase. With a similar logic, it would be necessary to move points upward to increase their
$\! y$ -coordinates.

Besides, the origin (the intersection of the two axis, unless otherwise specified) would corresponds to
$(0,\, 0)$ . (That is:
x = 0 and
y = 0 .) If the origin
$(0,\, 0)\!$ is the starting point, it would be necessary to increase the
-coordinate by
$x\!$ units (by moving rightward
$x\!\!$ units) and increase the the
-coordinate by
$y\!$ units (by moving upwards
$y\!\!$ units) so as to reach the point
$(x,\, y)$ .

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