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19 March, 14:00

A horizontal plane is ruled with parallel lines 5 inches apart. A five inch needle is tossed randomly onto the plane. The probability that the needle will touch a line is given below,

P = 2/π ∫π/2 0 sinθ dθ

where θ is the acute angle between the needle and any one of the parallel lines.

1. Find this probability. (Round your answer to one decimal place.)

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Answers (1)
  1. 19 March, 14:41
    0
    Answer: 0.6

    Step-by-step explanation:

    To get the probability P, we need to evaluate the definite integral given.

    P = 2/π ∫π/2 0 sinθ dθ

    Integration of sinθ is - cosθ

    P = 2/Π{-cosθ} ... (1)

    Substituting the upper limit of the integral which is Π/2 into equation 1;

    P1 = 2/Π{-cosΠ/2}

    P1 = 2/Π{0} since cosΠ/2 is "zero"

    Similarly substituting the value at the lower limit which is "zero" into equation (1)

    P2 = 2/Π{-cos0}

    P2 = 2/Π{-1} since cos0 is 1

    P2 = - 2/Π

    The probability P will be equal to P2-P1 {upper limit value - lower limit value}

    P = 0 - (-2/Π)

    P = 2/Π

    P = 0.6 (to 1d. p)
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