What is the difference between 0 digree and 360 digree?
Answers
Answer:
Step-by-step explaination:
Difference= (-)
Therefore,
360-0
=360 degree
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/
/
/
o--------->
In that sense, a 0 degree angle would be a "degenerate angle", meaning
one that no longer quite fits the definition, since it is only one
ray, not two:
o--------->
And angles, thought of this way, can only have a measure less than 180
degrees, since we always measure the short way around.
But another way to think of an angle is as the "space" between two
rays, so that our first figure includes two angles, one on the
"inside" and the other on the "outside"; one less than 180 degrees,
and one greater. In that sense, our second figure shows both a 0
degree angle and a 360 degree angle, and they are different parts of
the figure.
Thirdly, an angle can be thought of as a rotation, as if we started
at one of the rays and turned it to the other. Then our figure
represents the result of many possible angles, starting at either ray
and going clockwise (which we give a negative measure) or
counterclockwise (which we give a positive measure) until we reach the
other ray. That distance we rotate may be just part of a circle or
more than one time around (60, -60, 300, -300, 420 degrees, and so
on). In this view, our single ray can be seen as 0, 360, -360, 720
degrees, and any other multiple of 360 degrees.
So, does a 0 degree angle equal a 360 degree angle? Only in the first
sense of the three.
If you have any further questions, feel free to write back.