Difference between revisions of "Coordinate system"

Line 1: Line 1:
The coordinate system is often used in geometry. The cordinate system is organized to 4 quadrants. In the first quadrant, both (x,y) are positive. In the second quadrant x is negative, while y is positive.In the third quadrant, both (x,y) are negative. Finally, in the fourth quadrant x is positive while y is negative. To find the slope of a line on the coordinate system with points <math>(x_1, y_1); (x_2, y_2)</math> we need to compute <math>\frac{y_2-y_1}{x_2-y_2}</math>. The slope is usually expressed as <math>m</math>. Also, there is the point-slope form which states <math>y=m \cdot x + b</math> for some real numbers b,x,y.
+
The coordinate system is often used in geometry. The cordinate system is organized to 4 quadrants. In the first quadrant, both (x,y) are positive. In the second quadrant x is negative, while y is positive.In the third quadrant, both (x,y) are negative. Finally, in the fourth quadrant x is positive while y is negative. To find the slope of a line on the coordinate system with points <math>(x_1, y_1); (x_2, y_2)</math> we need to compute <math>\frac{y_2-y_1}{x_2-y_2}</math>. The slope is usually expressed as <math>m</math>. Also, there is the point-slope form which states <math>y=m \cdot x + b</math> for some real numbers b,x,y. Also, if two lines are perpendicular, then product of the slopes is -1. (For example, the slope could be -3/4 and 4/3.) The coordinate system is also widely useful were right triangle, since there is 90 degrees.

Revision as of 00:15, 25 January 2016

The coordinate system is often used in geometry. The cordinate system is organized to 4 quadrants. In the first quadrant, both (x,y) are positive. In the second quadrant x is negative, while y is positive.In the third quadrant, both (x,y) are negative. Finally, in the fourth quadrant x is positive while y is negative. To find the slope of a line on the coordinate system with points $(x_1, y_1); (x_2, y_2)$ we need to compute $\frac{y_2-y_1}{x_2-y_2}$. The slope is usually expressed as $m$. Also, there is the point-slope form which states $y=m \cdot x + b$ for some real numbers b,x,y. Also, if two lines are perpendicular, then product of the slopes is -1. (For example, the slope could be -3/4 and 4/3.) The coordinate system is also widely useful were right triangle, since there is 90 degrees.