Gradians to Radians (grad to rad)

Gradians to Radians (grad to rad) conversion calculator

Radians to Gradians (Swap units)

100g = 1.5708rad

Note: You can increase or decrease the accuracy of this answer by selecting the number of significant figures required from the options above the result.

Gradians to Radians conversion formula

Radians = Gradians / 63.66199048

Gradians to Radians calculation

Radians = Gradians / 63.66199048

Radians = 100 / 63.662

Radians = 1.5708

About Gradians

Gradians, also known as gons or grads, divide a circle into 400 equal parts. This means that a right angle is equal to 100 gradians, a full circle is 400 gradians, and so on. Gradians were introduced as an alternative to degrees and radians, aiming to provide a more convenient and decimal-based system for measuring angles.

While gradians are not as commonly used as degrees or radians, they do have their applications. For example, they are often used in surveying and navigation, where angles need to be measured and calculated with high precision. Additionally, gradians can be easily converted to degrees or radians, making them a versatile unit of measurement.

While radians are the standard unit for measuring angles in mathematics and physics, gradians offer an alternative system that can be useful in specific fields. Whether it's for precise measurements in surveying or for converting between different angle units, gradians provide a decimal-based approach to quantifying angles.

About Radians

Radians are a unit of measurement used in mathematics and physics to quantify angles. Unlike degrees, which divide a circle into 360 equal parts, radians divide a circle into 2π (approximately 6.28) equal parts. This unit is particularly useful in trigonometry and calculus, as it simplifies many mathematical calculations involving angles.

The concept of radians is based on the relationship between the length of an arc and the radius of a circle. One radian is defined as the angle subtended by an arc that is equal in length to the radius of the circle. In other words, if we were to take a circle with a radius of 1 unit and measure an arc along its circumference that is also 1 unit long, the angle formed at the center of the circle would be 1 radian.

Radians are advantageous because they allow for more straightforward calculations involving angles in trigonometric functions and calculus. Many mathematical formulas and equations involving angles become simpler when expressed in radians. Additionally, radians are dimensionless, meaning they do not have any units associated with them. This property makes it easier to perform calculations and conversions involving angles in various systems of measurement.

 

Gradians to Radians table

Starting value
Increment
Accuracy
Gradians
Radians
0g
0.00000rad
1g
0.01571rad
2g
0.03142rad
3g
0.04712rad
4g
0.06283rad
5g
0.07854rad
6g
0.09425rad
7g
0.10996rad
8g
0.12566rad
9g
0.14137rad
10g
0.15708rad
11g
0.17279rad
12g
0.18850rad
13g
0.20420rad
14g
0.21991rad
15g
0.23562rad
16g
0.25133rad
17g
0.26704rad
18g
0.28274rad
19g
0.29845rad
Gradians
Radians
20g
0.31416rad
21g
0.32987rad
22g
0.34558rad
23g
0.36128rad
24g
0.37699rad
25g
0.39270rad
26g
0.40841rad
27g
0.42411rad
28g
0.43982rad
29g
0.45553rad
30g
0.47124rad
31g
0.48695rad
32g
0.50265rad
33g
0.51836rad
34g
0.53407rad
35g
0.54978rad
36g
0.56549rad
37g
0.58119rad
38g
0.59690rad
39g
0.61261rad
Gradians
Radians
40g
0.62832rad
41g
0.64403rad
42g
0.65973rad
43g
0.67544rad
44g
0.69115rad
45g
0.70686rad
46g
0.72257rad
47g
0.73827rad
48g
0.75398rad
49g
0.76969rad
50g
0.78540rad
51g
0.80111rad
52g
0.81681rad
53g
0.83252rad
54g
0.84823rad
55g
0.86394rad
56g
0.87965rad
57g
0.89535rad
58g
0.91106rad
59g
0.92677rad
Gradians
Radians
60g
0.94248rad
61g
0.95819rad
62g
0.97389rad
63g
0.98960rad
64g
1.00531rad
65g
1.02102rad
66g
1.03673rad
67g
1.05243rad
68g
1.06814rad
69g
1.08385rad
70g
1.09956rad
71g
1.11526rad
72g
1.13097rad
73g
1.14668rad
74g
1.16239rad
75g
1.17810rad
76g
1.19380rad
77g
1.20951rad
78g
1.22522rad
79g
1.24093rad