Find the linear equation with ordered pair solutions: (-6,-2), (-3,0), (0,2).

Solutions

Expert Solution

Answer: The linear equation is,

Explanation: The given points are .

The linear equation can be find out by taking any two pair of the given ordered pair.

Using the formula for a line connecting two points (x₁, y₁) and (x₂, y₂) which is given as,

putting all the known values,

subtracting 2 from each side

This is the linear equation.

milcah answered 1 year ago

Next > < Previous

Related Solutions

Find the solutions of the equation 4x^2 + 3 = 2x

Find all solutions of the equation x^{5}=2

Find the equation of the line through the point P = (0,2,−1) that is perpendicular to...

Find the equation of the line through the point P = (0,2,−1) that is perpendicular to both ⃗v = 〈3,0,1〉 and ⃗w = 〈1,−1,2〉. v and w are vectors by the way

An equation is given cos(theta/2) − 1 = 0 (a) Find all solutions of the equation.

An equation is given cos(theta/2) − 1 = 0 (a) Find all solutions of the equation.θ = (b) Find the solutions in the interval [0, 2π).θ =

A third-order homogeneous linear equation and three linearly independent solutions are given below. Find a particular...

A third-order homogeneous linear equation and three linearly independent solutions are given below. Find a particular solution satisfying the given initial conditions. y(3)+2y''-y'-2y=0; y(0)=1, y'(0)=2, y''(0)=0, y1=ex , y2=e-x, y3=e-2x Find the particular solution.

Convert (6, 5pi/6) to exact rectangular coordinates. Then give another ordered pair with a negative r...

Convert (6, 5pi/6) to exact rectangular coordinates. Then give another ordered pair with a negative r and negative theta for the point (6, 5pi/6)

find real solutions : x^3+6x^2-6=0

let p = 1031, Find the number of solutions to the equation x^2 -2 y^2=1 (mod...

let p = 1031, Find the number of solutions to the equation x^2 -2 y^2=1 (mod p), i.e., the number of elements (x,y), x,y=0,1,...,p-1, which satisfy x^2 - 2 y^2=1 (mod p)

Find the 'least square linear regression line' for the following cases: (x,y)coordinates (-1,0), (0,2), (1,4), (2,5)...

Find the 'least square linear regression line' for the following cases: (x,y)coordinates (-1,0), (0,2), (1,4), (2,5) (However, use the gradient descent method and use cost function to get it) (Explain the changing process of cost functuon, gradient, and intercept together)

For the following Cauchy-Euler equation, find two solutions of the homogeneous equation and then use variation...

For the following Cauchy-Euler equation, find two solutions of the homogeneous equation and then use variation of parameters to find xp. Before solving for xp you need to divide the equation by t2 to have the correct forcing function f(t). t2x'' − 2tx' + 2x = 8t xp =__________________

Subjects