- #1
sara_87
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Homework Statement
what is cos(2n*pi)
Homework Equations
The Attempt at a Solution
I understand that cos(npi)=(-1)^n
so is cos(2n*pi)=2(-1)^n ??
How Can I Simplify the Expression cos(2n*pi)?
- Thread starter sara_87
- Start date
In summary, the conversation discusses the function cos(2n*pi) and its relationship to the cosine function. It is mentioned that cos(npi) = (-1)^n and that cosine is periodic with a period of 2pi. The conversation concludes that cos(2n*pi) must always equal 1 as long as n is an integer.
what is cos(2n*pi)
I understand that cos(npi)=(-1)^n
so is cos(2n*pi)=2(-1)^n ??
- #2
cristo
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Make the substitution m=2n in cos(mπ)=(-1)^m
- #3
sara_87
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so you mean cos(2n^2)=(-1)^2n
??
??
- #4
cristo
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No, I mean cos(2n pi)=(-1)^{2n}
- #5
HallsofIvy
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Do you know what cos(0) is? Do you know that cosine is periodic with period 2 pi?
- #6
sara_87
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yep cos0=1
yep, cos is periodic with period 2pi
yep, cos is periodic with period 2pi
- #7
HallsofIvy
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So cos(2n pi)= cos(0+ n(2pi))= ?
- #8
sara_87
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oh right,
so =(-1)^(n+1)
is that right?
so =(-1)^(n+1)
is that right?
- #9
Mark44
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No. Look at posts 4 and 7.sara_87 said:
- #10
HallsofIvy
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HallsofIvy said:
sara_87 said:
HallsofIvy said:
Okay, what does "periodic" mean?sara_87 said:
- #11
boombaby
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...I think it is necessary to know the graph of cos(x), which may help a lot. so, find one.
edit (:shy: trying not to be ambiguous)
...I think it is necessary for one to know the graph of cos(x), which may also help a lot. (regardless of this particular problem)...
"periodic" is really the key
edit (:shy: trying not to be ambiguous)
...I think it is necessary for one to know the graph of cos(x), which may also help a lot. (regardless of this particular problem)...
"periodic" is really the key
Last edited:
- #12
HallsofIvy
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It might help. It is not necessary. All that is necessary is to know what "periodic" means. No computation is required.
- #13
sara_87
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I understand that periodic means that cosine function repeats after multiples of 2 pi. but how would that have anything to do with writing cos(2n*pi) ?
cos (npi)=(-1)^n because as long as n is an integer, the value will alternate from -1 and 1 (clearly form the graph)
cos (npi)=(-1)^n because as long as n is an integer, the value will alternate from -1 and 1 (clearly form the graph)
- #14
HallsofIvy
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Would it be easier if it were written n*(2pi) rather than 2n*pi? This is about multiples of 2pi!sara_87 said:
cos(2pi)= cos(0+ 2pi)= cos(0)= 1
cos(4pi)= cos(2pi+ 2pi)= cos(2pi)= 1
cos(6pi)= cos(4pi+ 2pi)= cos(4pi)= 1
- #15
sara_87
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oh right! so cos(n2pi) has to always be 1...i feel very stupid, i should have known that. for all n, cos(2npi) must be 1 as long as n is an integer.
thank you very much
thank you very much
1. What is the meaning of cos(2n*pi)?
Cos(2n*pi) refers to the cosine function with an argument of 2n times pi, where n is any integer. This expression represents the cosine of an angle that is a multiple of 360 degrees, which is equivalent to one full rotation on a unit circle.
2. How does cos(2n*pi) relate to the unit circle?
When graphed on a unit circle, the cosine function with an argument of 2n times pi will produce a wave-like pattern that repeats every 360 degrees or 2pi radians. This is because the cosine function represents the x-coordinate of a point on the unit circle, and as the angle increases by a multiple of 360 degrees, the x-coordinate will return to its original value.
3. What is the range of values for cos(2n*pi)?
The range of values for cos(2n*pi) is between -1 and 1. This is because the cosine function can never produce a value outside of this range, as it represents the ratio of the adjacent side to the hypotenuse in a right triangle.
4. How can cos(2n*pi) be used in real-world applications?
Cos(2n*pi) can be used in a variety of real-world applications, such as in physics, engineering, and navigation. It can be used to calculate the amplitude of a wave, the position of an object in circular motion, or the phase difference between two waves.
5. Can cos(2n*pi) have a value of 0?
Yes, cos(2n*pi) can have a value of 0 when the argument is a multiple of 90 degrees or pi/2 radians. This occurs at angles of 0, 90, 180, 270 degrees, and so on, where the cosine function will output a value of 0. This can also be seen on the unit circle, where the x-coordinate of these angles is 0.
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