Given a sequence of Bernoulli trials with n=6, k is

Tazmin Horton

Tazmin Horton

Answered question

2021-09-24

Given a sequence of Bernoulli trials with n=6, k is at least 1, and p=0.25, find the binomial probability.

Answer & Explanation

cheekabooy

cheekabooy

Skilled2021-09-25Added 83 answers

Step 1
binomial probability:
P(x=k)=nckpkqnk(1)
where
P(x=k)= probability of x=k
n= number of trials
p= probability of success
q=1p= probabiliy of failure
Step 2
number of trials n=6
k is at least 1
p=0.25
q=1p=10.25=0.75
binomial probability for k is at least 1
=P(xk)
=P(x1)
=1P(x=0)
=1({6}c0p0q60) [from (1)]
=1({6}c0(0.25)0(0.75)6)
=1(1)(1)(0.17797851562)ZSJ=10.17797851562
=0.82202148437
=0.82 [rounded to two decimal]
binomial probability is 0.82

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