Why does cos(-33pi)=-1?

How do I find the reference number if there is no denominator?

Comments

  • -33pi = -32pi - pi

    You can ignore multiples of 2pi like -32pi, since they don't change the value.

    cos(-33pi) = cos(-pi)

    NOW do you know why it's -1? -pi is -180 degrees.

  • Think about the graph of y = cos(x) over the interval [0, 2pi].

    You have the following values:

    y(0) = 1

    y(pi/2) = 0

    y(pi) = -1

    y(3pi/2) = 0

    y(2pi) = 1

    As you can see, cosine has a period of 2pi, and the argument (the value inside cosine) doesn't need to have a denominator, as 0, pi, 2pi, 3pi, etc... clearly equal either 1 or -1.

    Okay, basically, cosine has a period of 2pi, so you can add/subtract any interval of 2pi from a large argument (like -33pi) to find an easy to work with reference number. You can do this because angles larger than 360 degrees = 2pi simply revolve around the unit circle more than once.

    So add 17(2pi) = 34pi to to -33pi and you get just pi. Remember what I said earlier? Any angle larger than 2pi simply generations more revolutions.

    So:

    cos(-33pi + 34pi) = -1

    cos(pi) = -1

    TRUE

    Hope I helped! If you need additional explanation just say so.

  • Start by taking arccos(-1).

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