Angle Converter

The Best Online Angle Converter Tool

Angle Converter Tool

Quick Angle Converter Tool 

Angle converter is an online tool that converts angles given in numbers into units.  Angle calculator has the ability to turn a line or circle so that it is perpendicular to another, or coincides, with a third. To get an understanding: an angle is the degree at which a line or circle is tilted with respect to another.
Knowing how to work with angles is crucially vital in many fields, including geometry, trigonometry, geography, mapping, and construction. The angle across two lines can be measured with the aid of a protractor.

Angle Calculator: How does it work?

Angle calculator converts degrees and radians that are two popular angular units of measure. Because there are 360 degrees in a whole circle, two radians indicate the distance a line is from itself. An angle can be measured with the use of a protractor; get familiar with its use or print out a protractor to use on your next project.
You can choose the unit you want to convert to required radians from the list of input units. In the list of output units, choose the unit you want to convert to. The inputs box on the left should be filled up with the number to convert from. The output box will indicate the conversion entry at the same time.

How to calculate conversion unit

By utilizing a conversion factor, conversions are carried out. Converting between units is a straightforward multiplication task once you know the conversion factor:

S * C = E
In this equation, S stands for the starting value, C for the calculator, and E for the final converted value. Simply multiply by the amount in the right row of the table below to change any number into degrees, such as 5 radians. 5 radians multiplied by 57.29578 [radians per degree] yields 286.4789 degrees. Divide by the value in the column on the right or multiply by the reciprocal, 1/x, to change from degrees back to units in the left column. 
286.4789 degrees / 57.29578 radians = 5 radians 

What is an Angle? 

You must know what angle is before you calculate it through an angle converter. The angle is a point where two parallel rays meet at a common point, called a vertex, to produce an angle. You might be interested in knowing this, “Why do we need to use angles?” 
If you want to know the tower's distance from you or and the angle between both the ground and the tower's top will allow you to get a rough estimate of the tower's height. By using an angle converter, the same method can be used to determine the size of the moon or, with the correct instruments, the size of Earth.
 The angle at which you toss an object is also important for determining its distance. Angles have applications outside geometry, but for the time being we'll stick to that. Size allows us to classify angles as follows:
Acute angle= it ranges from 0° to 90°
Right angle= it is only 90°
Straight angle= it is always 180°
Obtuse angle= it ranges between 80° to 190°
Reflex angle= it lies between 180° to 360°

Angle converter helps in: 

The angle converter will convert the angle measured from the perspective of the target that is known as the incidence angle. It is the sum of the roll and pitch angles, and it reflects the tilt of the satellite with respect to the ground normal. When talking about tools, the field of view is the vantage point in an angle converter. Angel converter also shows field view by combining the pitch and roll angles, it depicts the direction at which the satellite is pointed relative to the horizon.
It can check the size of radian (s):
Angle converter is also helpful if you want to know the size of angle in different units. These units name(s) list is provided as: 

  • Degrees, 
  • minutes of arc (arcmin)
  • seconds of arc (arcsec)
  • Radians  (rad)
  • Gradians (gon)
  • Π radians 
  • Turns (tr)

Angle converter is helpful in converging degrees into radians 

When it comes to angles, the radian is the standard. To make it more, have a look at this example. An angle of 57.2958 degrees, or 1 radian, is the one that produces an arc with a length equal to the radius, R.
Since 2 radians constitute a full rotation, 2R is the corresponding value for the circumference. Angle converter will convert most frequent angles to simplify things for you:

  • It is easy to convert degrees to radians once you realize that 180 degrees is equal to radians.
  • Radians are calculated as: radians = /180 * degrees

This implies that the formula for converting radians to degrees is constant:

Degree = 180 / radians
So, here's a case in point: The radian equivalent of a 300-degree angle is what?

The formula for radians is: rad = /180 * 300

Methods for Changing Degrees

It is not uncommon to see degrees accompanied by arcminutes and arcseconds. Coordinates are just one common application of such notation. In an angle converter by using degree, minutes, or seconds DMS, you must know how to get the decimal equivalent. To get this, the solution is simple; just visualize degrees as hours. 
A degree is equivalent to sixty minutes, just as an hour is sixty minutes. It's important to note that each minute in both circumstances consists of sixty seconds. So, 3600 seconds are equal to one degree:

  • Each degree is equal to 3600 seconds of arc, or 60 minutes of arc.

It's simple to work out the formula once you have the insight:

The formula for converting degrees, minutes, and seconds to the decimal system is:

To convert the degrees of 48°37'45" to decimal format, consider the following:
48°37'52" = 48 + 37/60 + 52/3600 = 48.6311°
Thus, 48°37'45" equates to 48.6311°.

How to change other units:

Degrees and radians are the standard units of measurement for describing the size of an angle. On the other hand, when using an angle converter you should not discount the possibility of encountering other troops. One of them is a twist. There are two radians in a whole rotation. 
The formula for converting degrees to turns is:  turn = degrees / 360°, 
And, for converting radians to turns is:  turn = radians / 2.

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