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Question
Eight coins are tossed once, find the probability of getting atleast two tails
Solution
Eight coins are tossed simultaneously one time = one coin is tossed eight times.
Let S be the sample space.
S = {H, T} × {H, T} × ………….. × {H, T} 8 times
Let A be the event of getting exactly two heads,
B be the event of getting atleast two tails and
C be the event of getting atmost two tails.
When eight coins are tossed, the number of elements in the sample space
n(S) = 28 = 256
n(A) = 8C2
= `(8 xx 7)/(1 xx 2)`
= 28
n(B) = 8C2 + 8C3 + 8C4 + 8C5 + 8C6 + 8C7 + 8C8
= n(S) – (8C8 + 8C1)
= n(S) – {n(Event of getting all heads) + n(Event of getting one head)}
= n(S) – (1 + 8)
= 256 – 9
= 247
n(C) = 8C0 + 8 C1 + 8 C2
= `1 + 8 + (8 xx 7)/(1 x 2)`
= 1 + 8 + 28
= 37
P(getting atleast two tails ) =
P(B)= `("n"("B"))/("n"("S"))`
P(B) = `247/256`
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