Quadrants on a graph

Quadrants on a graph


Quadrants on a graph

there are four regions formed around it, and those regions are called quadrants. So, every plane has four quadrants each bounded by half of the axes. Each quadrant is denoted by Roman numerals and named as Quadrant I, Quadrant II, Quadrant III, and Quadrant IV based on their position with respect to the axes.Quadrant Definition: A quadrant can be defined as a region/part of a cartesian plane which is obtained when the two axes intersect each other. It is used to determine the position of a point in a plane.


If we observe the horizontal axis 'x', as we move from left to right, we see that the value of the coordinates increases. Similarly, on the vertical axis 'y', as we go in the upward direction, the value goes on increasing. So, the sign convention of the four quadrants will be as shown below: The numbers in the quadrant are the ordered pair (a, b) where 'a' is the x- coordinate and 'b' is the y-coordinate.

The x and the y axes divide the plane into four graph quadrants.These are formed by the intersection of the x and y axes and are named as: Quadrant I, II, III, and IV. In words, we call them first, second, third, and fourth quadrant. All the quadrants are different from each other based on the position and symbol of the x and y-coordinates.A 2-dimensional graph, This graph is divided into four quadrants, or sections, based on those values. The first quadrant is the upper right-hand corner of the graph, the section where both x and y are positive. The second quadrant, in the upper left-hand corner, includes negative values of x and positive values of y. The third quadrant, the lower left-hand corner, includes negative values of both x and y. Finally, the fourth quadrant, the lower right-hand corner, includes positive values of x and negative values of y. (Source:study.com)


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