**Slope calculator**

## Find the Slant or Gradient Between Two Points

A slope calculator is a tool that will help you find the slant or gradient between two points in the Cartesian coordinate system.

It can be used to find the percentage incline between any two points, and it doesn’t require an equation.

The slope of a line has a positive, negative, zero, or undefined value depending on how it’s going – uphill or downhill.

**How to find a slope?**

To calculate the slope of a line, all you need is two points on that line. For example, if point A has coordinates (x_A; y_A) and point B has coordinates (xB;yB), then the slope between them would be m = Â²(y_A – y_B) / Â²(x_A – x_B) = y’ Ã— (y_A- y_B)/(x _ A – x_B).

It will give you value. If it’s negative, the slope is downhill; if it’s positive, then the slope is uphill and otherwise undefined. The gradient is calculated by taking the difference in y coordinates and dividing it by the difference between x coordinates. This is an amazing Online Class help tool for students looking to solve questions in the nick of time.

**Find the Slant or Gradient Between Two Points.**

The slope calculator determines the slant or gradient between two points in the Cartesian coordinate system. The slope is the amount of slant a line has and can have a positive, negative, zero, or undefined value.

On the left-hand side, you’ll enter Â²y_A – y _B) / (x_ A-x B). It will give you the slope or gradient for lines with two points, A and B.

It is found by taking the difference in y coordinates Â²y_A – y _B) / (x_ A-x B) and dividing it by the difference between x coordinates (x _A- x B).

You can also enter Â²y_ A – y _A) / (x_ A- x B). It will give you the slope of a line with only one point, at Â²y_A.

You’ll then input your starting point information, enter the slope from a point on this line to your desired endpoint, and see what these values are in terms of degree measure.

**How do you measure the area under the slope?**

The slope calculator determines the area under a line. To find the area, we need to know two points and their coordinates Â²x_A – x _B) / (y_ A- y B).

It will give you how much of this region extends underneath the function created by subtracting one coordinate from another.

**How do you measure the slope of a curve with the slope calculator?**

The slope calculator determines the slope of a curve if it is either linear or exponential.

Linear curves have infinite slopes and are thus undefined on this form, while exponentials will create an equation for you to solve that corresponds with its gradient as shown: Â²y = y_A * x^x _B).

The solution will also generate a table that displays how the function changes over time, and as such, you can see its slope.

**How to measure the length of a slope with the slope calculator?**

The length of a slope is the difference in y-coordinates divided by the difference in x-coordinates.

For instance, if you are at point A and want to find the slope of a line that will take you from there to B (a distance away), then this is how it would work.

The y-coordinate of point A is the height, and the x-coordinate is the width. The length of the slope would be found by dividing that distance (y_A – B) by that difference in x coordinates (x_A – x_B).

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