Geometry (all content)
Quadrants of the coordinate plane
Learn about the 4 quadrants that make up a coordinate plane. Created by Sal Khan and Monterey Institute for Technology and Education.
Want to join the conversation?
- witch quadrant dose (0,0) lie in or (0,9)(15 votes)
- Say for (0,0) that it is the origin, and for (0,9) that it is on the y axis.(18 votes)
- I know this sounds crazy but could we have a 3d object in a graph?
To graph the area or mass of the object?(14 votes)
- Yes, you can have a 3d-object in a 3d-graph. But you don't need this to graph the area/mass. You simply make a function for the area or mass and graph that.(9 votes)
- what if (0, -7) ?
in which quadrants is?(5 votes)
- Points on the axes aren't in any quadrant.(16 votes)
- name the quadrant in which the point is located (20,5)(6 votes)
- quadrant I is the answer(2 votes)
- all of these comments are over 5 years ago and thats flipping insane-(10 votes)
- bro all the comments are 7 years old for me.(2 votes)
- So what happens if a point is plotted on the origin (0,0)?(7 votes)
- Then you would just refer to the point as being on the origin. 0 is not negative or positive so it cannot fall within the other quadrants.(8 votes)
- what does the y mean in y axis(5 votes)
- The 'y' doesn't have a meaning. it is just a letter associated with that axis.(6 votes)
- why is it called the "y" and "x" axis? Is there a certain meaning for them? 🤷🏼♀️(6 votes)
- Not at all.they indicate the horizontal and vertical line.there just variables.(4 votes)
- So how do we determine the quadrant if either x or y is equal to 0??(5 votes)
- The point does not reside in either quadrant. We would say that it is on the axis.(7 votes)
- what if the x/y axis is on the same number what will happened.(4 votes)
- If for example (2,2) it would just go on the y-axis on the number 2.(1 vote)
In which quadrant is the point negative 7 comma 7 located? So let's just review what a quadrant is. A quadrant are each of the four sections of the coordinate plane. And when we talk about the sections, we're talking about the sections as divided by the coordinate axes. So this right here is the x-axis and this up-down axis is the y-axis. And you can see it divides a coordinate plane into four sections. We call each of these sections quadrants. This one over here, where both the x-values and the y-values are positive, we call the first quadrant. And we use the Roman numeral I. Then if we kind of move counterclockwise around the coordinate plane, this quadrant where the x-values are negative and the y-values are positive, we call this the second quadrant. I could write it. We call this the second quadrant. Then we go down here where both the x-values are negative and the y-values are negative. We call this the third quadrant, once again using Roman numerals. Then finally the quadrant where the x-values are positive but the y-values are negative, we call this the fourth quadrant. So let's see which quadrant the point negative 7 comma 7 is located. So there's two ways to think about it. You could just say, look, we have a negative x-value. Our x-value is negative, so we're going to move to the left. So we're going to be on this side. We're going to be on this side right here of the coordinate plane. Just by the fact that the x-value is negative, we're going to be either in the second or the third quadrant. Now, we know that the y-value is positive. We know that the y-value is positive. So if the x-value is negative and the y-value is positive, we're going to land someplace right over here in the second quadrant. The other way to think about it is you could literally just plot this point and see that it falls in the second quadrant. So let's do that. If x is negative 7. So that's negative 1, negative 2, negative 3, negative 4, negative 5, negative 6, negative 7. Did I do that right? 1, 2, 3 4, 5, 6, 7. So this is x is negative 7. And then we have to go up 7 because y is equal to positive 7. So 1, 2, 3, 4, 5, 6 7. So the point negative 7 comma 7 is right over here, clearly lies in the second quadrant.