It cannot.
It is the Cartesian equation of an ellipse.
A straight line, equals 180 degree.
A linear equation ?
The two equations represent the same straight line.
If: y = 5x and y = 3 -x Then: 5x = 3 -x => 5x +x = 3 => 6x = 3 => x = 1/2 By substitution point of contact is at: (1/2, 5/2)
The Cartesian coordinates in the form of the linear equation y = mx+c is a straight line that can be plotted on a graph where m is the slope and c is the intercept through the y axis. For example: y = 3x+2 means that 3 is the slope and that 2 is the intercept and when plotted on a x axis and y axis graph will produce a straight line. The idea of Cartesian coordinates was the brainchild of the French mathematician Rene Descartes in the early 17th century.
The vertex coordinate point of the vertex of the parabola y = 24-6x-3x^2 when plotted on the Cartesian plane is at (-1, 27) which can also be found by completing the square.
It is not. It is called a LINEAR equation. This is because the word linear refers to a line and, if the solutions of the equation, in the form of ordered pairs (x,y), were plotted on a Cartesian plane, they would all lie on a straight line.
When plotting a straight line on the Cartesian plane
-6
If you put an 'equals' sign ( = ) between the 'By' and the 'Cz', you have the generic equation for any straight line in 3-dimensional Cartesian coordinates.
It works out as: 2 times the square root of 5
This is a point on the cartesian coordinate plane... (10,13)
A linear equation is one which represents a straight line. When drawn (y plotted against x), a degree 1 polynomial produces a straight line.
Its diagonals intersect each other at right angles when plotted on the Cartesian plane Its diagonal lengths are 2 times square root of 10 and 8 times square root of 10 Its area is 0.5 times product of its diagonals equals 80 square units
x = 4 is a straight line that is vertical when plotted on the xy graph, where y is the vertical axis and x is the horizontal axis. A vertical line has an infinite slope; the slope is infinity
Quadrants I, III and IV.