Identify the equation that matches the graph.

Determine the equation of the line that is PERPENDICULAR to the line
and contains the point (-2, 6).

The x-intercept shown on the graph is_______.

The x-intercept shown on the graph is ______.

Find the slope for the following equation 9x + 2y = 9.

Calculate the slope of the following 12x - 6y = 30.

In mathematics, the equation of a straight line describes the relationship between the coordinate points that comprise that line. It can be expressed in several ways and contains information about a line's slope, x-intercept, and y-intercept.
A straight line's standard form is given by the equation ax + by = c, where a, b, and c are real numbers. Let's illustrate how to put the equation y = 3x - 1 in standard form. Add 2x to neither side of the equation, and we get
y - 3x = 3x - 1 - 3x
= y - 3x = -1
= 3x - y = 1
As a result, we arrive at the line's standard form, which is 3x - y = 1

Identify equation is written in STANDARD form.

Identify the y intercept.
2x – y = 3

Find the y-intercept in the equation x + 2y = 4.

Give the x-intercept
5y + 3x = 30

Give the y-intercept
3x + y = 5

Identify the y-intercept of the line.

Find the x and y intercepts
4x - 5y = 40

Give the y-intercept
3x + 5y = 30

Give the x - intercept
3x + 5y = 30

Calculate the slope of the line 5x - 10y = 21.