Some of you must have heard about the third of a complete turn. It is important to know that the word one-third in mathematics refers to dividing. A 360-degree rotation is one full turn. If you turn your key in the direction of 1/3, you need to understand how many degrees it turns or how many degrees in a third of a full turn are there. Moreover, let’s consider how many 30 degrees angles does it take to make a full turn?

**1. How are the Degrees in a Third of a Full Turn calculated?**

There are** 120 degrees** in a third of a full turn. To resolve this, you first need to start with 360 degrees and since it’s the third of a full turn, you need to divide it by 3.

This can be calculated as **360/3 = 120**. Therefore, the thirds in a full turn comprise 120 degrees.

**2. What is a Degrees of a Full Turn?**

Full turn means to turn around until it points in the same direction again. The full turn depicts **360 degrees. **(See What is a Circle Degree Chart?)

**3. How many 30 Degrees Angles does it take to make a Full Turn?**

Now that we learned the degrees of a full turn, let us calculate how many 30 degree angles does it take to make a full turn. The 360 degrees makes a full turn. So, if you turn around in a full circle, you need to turn it 360 degrees. The halfway turn of a circle is 180 degrees. There are **twelve** 30 degrees to make a full turn as 30 × 12 = 360. Or, you can simply divide 360 by 30 as 360/30 = 12. (See How many vertices does a triangle have?)

**4. Does 360 Degrees End up in the Same Place?**

It doesn’t happen usually as one may see the pattern for a 360 which means someone switched or changed their mind twice. The person may include the opposite of what he took up and then return to his original opinion. 360 degrees basically refers to degrees of a full turn which means taking a turn until it **reaches the same point**. (See Can a triangle have any parallel sides?)

**5. How many Degrees does 360 degrees take to make a full turn?**

The angle for 360 degrees makes** eight 45 degrees.** A full turn means turning in the same direction.

**6. How many 60 Degrees does it take to make a Full Turn?**

Angles are measured in degrees just like the degrees in a third of a full turn and there are 360 degrees in one rotation which completes one full circle.

Since 60 × 6 = 360, **six **60 degrees angles take a full turn.

An alternative step can be written as, 360/60 = 6. (See What is 20% of 70?)

**7. How many Degrees in an Angle turn ¼ of a Circle?**

A circle has a shape that is 360º. The number of degrees that make 1/4th of a circle is:

¼ × 360 = **90º. **Also, check out What does a 90 Angle look like?

**8. How many 180 Degrees does it take to make a Full Turn?**

The 180-degree angle is a straight angle, basically the exact half of a circle. It is half of a full angle considering the full rotation of 180 degrees angles. Half of 360 degrees is 180 degrees, therefore** twice or two times **will make 2a full turn. (See How many sides does a pentagon have?)

**9. Why is 360 Degrees called a Full Circle?**

You might think about what reasons it could be mathematically to say 360 degrees a complete circle. 360 is divisible by any number between 1 and 10, except 7. It is divided into 24 different numbers. For example, 1, 2, 3, 4, 5, 6, 8, 9, 10, 12, 15, 18, 20, 24, 30, 36, 40, 45, 60, 72, 90, 120, 180 and 360 itself. This has positive integers with values up to 360. On the other hand, the number 360 has had some special characteristics of its own since Babylonian times. Must read what is a polygon shape?

**10. What is a Semicircle?**

A semicircle is a** line passing through the center which touches the two ends of the circle and divides the circle into two halves; **by joining two semicircles we get a circular shape. The area of a semicircle is half of the area of a circle. Moreover, when the area of a circle is πr², it means the area of the semicircle is 1/2 of that value. Here r is the radius. The value of π is 3.14 or 22/7 if we speak mathematically.

Every rotation means 360 degrees. I hope this article has solved the question regarding the degrees in a third of a full turn.