Thank you for using the timer - this advanced tool can estimate your performance and suggest more practice questions. We have subscribed you to Daily Prep Questions via email.
Customized for You
we will pick new questions that match your level based on your Timer History
Track Your Progress
every week, we’ll send you an estimated GRE score based on your performance
Practice Pays
we will pick new questions that match your level based on your Timer History
Not interested in getting valuable practice questions and articles delivered to your email? No problem, unsubscribe here.
Thank you for using the timer!
We noticed you are actually not timing your practice. Click the START button first next time you use the timer.
There are many benefits to timing your practice, including:
Your score will improve and your results will be more realistic
Is there something wrong with our timer?Let us know!
Attached pdf of this Article as SPOILER at the top! Happy learning!
Hi All,
I have recently uploaded a video on YouTube to discuss Co-ordinate Geometry Basics in Detail:
Following is covered in the video
¤ XY or 2D Plane ¤ Introduction to Quadrants ¤ x-intercept and y-intercept ¤ Distance between two points ¤ Distance of a point from origin ¤ Slope of a line ¤ Sign of slope of a line ¤ Slope of Parallel and Perpendicular lines
XY or 2D Plane
XY Plane is a 2D Plane which contains the x-axis and the y-axis. x-axis is horizontal axis and y-axis is vertical axis.
¤ Each point in the XY Plane has two co-ordinates (x,y) ¤ x is the x co-ordinate, y is the y co-ordinate
Attachment:
xy plane.jpg [ 13.63 KiB | Viewed 1124 times ]
Introduction to Quadrants
x-axis and y-axis divide the XY plane into 4 quadrants.
¤ \(1^{st}\) Quadrant : x +ve, y +ve ¤ \(2^{nd}\) Quadrant : x -ve, y +ve ¤ \(3^{rd}\) Quadrant : x -ve, y -ve ¤ \(4^{th}\) Quadrant : x +ve, y -ve
Attachment:
Quadrants.jpg [ 31.7 KiB | Viewed 1144 times ]
x-intercept and y-intercept
x-intercept : Point where a line touches the x-axis y-intercept : Point where a line touches the y-axis
Attachment:
Intercepts.jpg [ 19.33 KiB | Viewed 1127 times ]
Distance between two points
Distance, d, between two points A (x1,y1) and B(x2,y2) on a XY plane is given by
d = \(\sqrt{((𝒙_𝟐 − 𝒙_𝟏)^𝟐 + (𝒚_𝟐 − 𝒚_𝟏)^𝟐)}\)
Attachment:
Distance between points.jpg [ 18.78 KiB | Viewed 1136 times ]
Distance of a point from Origin
Distance, d, of a point A (a,b) from origin (0,0) is given by
Distance from origin.jpg [ 17.25 KiB | Viewed 1106 times ]
Slope of a Line
Slope of a line is an indication of how inclined the line is as compared to positive x-axis.
¤ Slope(m) of line(l) passing through points A and B is given by m = \(\frac{(𝒚_𝟐 − 𝒚_𝟏)}{(𝒙_𝟐 − 𝒙_𝟏)}\)
Attachment:
Slope of a line.jpg [ 18.51 KiB | Viewed 1136 times ]
Sign of slope of a line
¤ Positive Slope: Line tilted towards right ¤ Negative Slope: Line tilted towards left ¤ Zero Slope: Line parallel to x-axis ¤ Infinite Slope: Line parallel to y-axis
Attachment:
Sign of slope.jpg [ 22.08 KiB | Viewed 1145 times ]
Slope of Parallel and Perpendicular Lines
If two lines are Parallel, then their slopes will be equal.
¤ If we have two parallel lines \(L_1\) and \(L_2\), with below equations ¤ Line L1 : y = \(m_1\)x + \(c_1\) ¤ Line L2 : y = \(m_2\)x + \(c_2\) ¤ then \(m_1\) = \(m_2\)
Attachment:
Parallel Lines.jpg [ 4.93 KiB | Viewed 1125 times ]
If two lines are Perpendicular, then product of their slopes will be equal to -1
¤ If we have two perpendicular lines \(L_1\) and \(L_2\), with below equations ¤ Line L1 : y = \(m_1\)x + \(c_1\) ¤ Line L2 : y = \(m_2\)x + \(c_2\) ¤ then \(m_1\) * \(m_2\) = -1
Attachment:
Perpendicular Lines.jpg [ 3.41 KiB | Viewed 1125 times ]