# Tangent of angle calculator

## Angle

## Tangent of angle

Our tangent of angle calculator makes it easy to find the tangent of an angle. Simply enter the values of the opposite and adjacent sides of the triangle, and our calculator will automatically calculate the tangent of the angle for you. This tool is perfect for students, engineers, and anyone else who needs to calculate tangent values quickly and accurately.

## What is Tangent of Angle?

In geometry, tangent is a trigonometric function that describes the ratio of the opposite side to the adjacent side of a right-angled triangle. The tangent of an angle is defined as the ratio of the length of the opposite side to the length of the adjacent side of a right triangle. It is represented by the symbol 'tan' and is commonly used in mathematics, engineering, and physics.

## Tangent of Angle Formula

The formula for calculating the tangent of an angle is:

tan( α ) = \dfrac{\text{opposite}}{\text{adjacent}}

Where α is the angle, and opposite and adjacent are the lengths of the sides of the right-angled triangle.

### Example

Let's take an example to understand how to calculate the tangent of an angle using our calculator.

Suppose we have a right-angled triangle with an angle of 60 degrees. To find the tangent of the angle, we can use our calculator as follows:

- Enter the value of the angle into the 'α' field.
- Choose the degree from the select box.

Our calculator will then show the result, which is 1.73. This means that the tangent of the angle is 1.73.

## Conclusion

In conclusion, the tangent of an angle is an important trigonometric function that is commonly used in various fields. Our tangent of angle calculator makes it easy to find the tangent values quickly and accurately. So, whether you are a student, engineer, or anyone else who needs to calculate tangent values, our calculator is a perfect tool for you. Use our calculator today and make your calculations easier!

## Tags

- Area
- Volume
- Perimeter
- Side
- Height
- Diagonal
- Radius
- Median
- Bisector
- Angle
- Theorems