![]() This form allows you to quickly write the equation without needing the y-intercept. The equation of a line in the point-slope form is $$y-y_1=m\left(x-x_1\right) $$Įxample: Given a line passing through the point $$$(2,5) $$$ with a slope of $$$3 $$$, its equation in the point-slope form is $$$y-5=3(x-2) $$$. This form is useful when you know a point on the line and its slope but not the y-intercept. ![]() In this form, the equation of a line is expressed using its slope $$$m $$$ a specific point $$$\left(x_1,y_1\right) $$$. This means that for every unit increase in $$$x $$$, $$$y $$$ increases by $$$2 $$$ units, and the line crosses the y-axis at the point $$$(0,3) $$$. The equation of a line in the slope-intercept form is $$y=mx+b $$Įxample: Consider a line with a slope of $$$2 $$$ and a y-intercept of $$$3 $$$. The slope determines the line's steepness, while the y-intercept indicates where the line crosses the y-axis. This widely-used form represents a line's equation using its slope $$$m $$$ and y-intercept $$$b $$$. Let's explore these forms in more detail. Each form serves specific purposes and offers insights into a line's characteristics and behavior. There are different forms of equations of lines that are used to represent linear relationships on a coordinate plane. It provides a mathematical description of how the line behaves. The equation of a line is a fundamental concept in algebra that represents a straight line on a coordinate plane. It will also provide step-by-step explanations to help you understand the process. The calculator will immediately show the calculated line equation. Double-check your inputs to ensure accuracy.Ĭlick the "Calculate" button to find the equation of the line based on the provided inputs. Depending on the chosen type, enter the required inputs. ![]() You can opt for slope and point, or two points. Tailored for students, educators, engineers, and math enthusiasts, it helps to calculate line equations with no effort. ![]() Introducing the Line Calculator, a tool for quickly and accurately finding line equations. ![]()
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