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11 November, 16:40

What is the angular position in radians of the minute hand of a clock at 2:55?

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Answers (2)
  1. 11 November, 16:51
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    Refer to the diagram shown.

    There are twelve 5-minute divisions.

    Each 5-minute division is equal to 360°/12 = 30°.

    By convention, angles are measured counterclockwise from the positive x-axis.

    The angular position of the minute hand at 2:55 is

    θ = 90° + 30° = 120°

    Because 360° = 2π radians, therefore

    θ = (120/360) * 2π = (2π) / 3 radians = 2.0944 radians

    Answer: (2π) / 3 radians ofr 2.0944 radians.
  2. 11 November, 16:53
    0
    (2pie radian/12) * 11 = 5.7566 radian
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