Known equation: y = 2x+10
Perpendicular equation: 2y = -x+10
Both equations intersect at: (-2, 6)
Distance from (2, 4) to (-2, 6) is sq rt of 20 using the distance formula
They are the x any y axes that are perpendicular to each other and intersect at zero on the Cartesian plane.
A line is perpendicular to a plane when it is perpendicular on two lines from the plane
An isometry that moves or maps every point of the plane the same distance and direction is a translation, which is one of 4 transformations that can be plotted on the Cartesian plane.
The equation will be perpendicular to the given equation and have a slope of 3/4:- Perpendicular equation: y--3 = 3/4(x--2) => 4y--12 = 3x--6 => 4y = 3x-6 Perpendicular equation in its general form: 3x-4y-6 = 0
The 'abscissa' is the x coordinate on the Cartesian plane and the 'ordinate' is the y coordinate on the Cartesian plane
The perpendicular distance from (2, 4) to the equation works out as the square root of 20 or 2 times the square root of 5
The x and y axes on the Cartesian plane are perpendicular to each other at the point of origin
It works out as: 2 times the square root of 5
A Cartesian Plane.
Equation: 5x-2y = 3 Perpendicular equation: 2x+5y = -14 Both equations intersect at: (-13/29, -76/29) Perpendicular distance to 3 decimal places: 3.714
If you mean the perpendicular distance then it is worked out as follows:- Equation: y = 2x+10 Perpendicular slope: -1/2 Perpendicular equation: y-4 = -1/2(x-2) => 2y = -x+10 The two equations intersect at: (-2,6) Perpendicular distance is the square root of: (-2-2)2+(6-4)2 = 4.472 to 3 d.p.
It is the Cartesian plane created by the French mathematician Rene Descartes
This is a point on the cartesian coordinate plane... (10,13)
On the Cartesian plane the x and y axes meet at the origin and are perpendicular to each other
They are the x any y axes that are perpendicular to each other and intersect at zero on the Cartesian plane.
The cartesian coordinates are plotted on the cartesian plane
what are the parts of the Cartesian plane ?