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Date November 2008 Marks available 2 Reference code 08N.2.sl.TZ0.5
Level SL only Paper 2 Time zone TZ0
Command term Find Question number 5 Adapted from N/A

Question

The probability of obtaining heads on a biased coin is 0.18. The coin is tossed seven times.

Find the probability of obtaining exactly two heads.

[2]
a.

Find the probability of obtaining at least two heads.

[3]
b.

Markscheme

evidence of using binomial probability     (M1)

e.g. \({\rm{P}}(X = 2) = \left( {\begin{array}{*{20}{c}}
7\\
2
\end{array}} \right){(0.18)^2}{(0.82)^5}\)

\({\rm{P}}(X = 2) = 0.252\)     A1     N2

[2 marks]

a.

METHOD 1

evidence of using the complement     M1

e.g. \(1 - ({\rm{P}}(X \le 1))\)

\({\text{P}}(X \le 1) = 0.632\)    (A1)

\({\text{P}}(X \ge 2) = 0.368\)    A1     N2

METHOD 2

evidence of attempting to sum probabilities     M1

e.g. \({\text{P(2 heads) + P(3 heads)}} + \ldots + {\text{P(7 heads)}}\) , \(0.252 + 0.0923 + \ldots \)

correct values for each probability     (A1)

e.g. \(0.252 + 0.0923 + 0.0203 + 0.00267 + 0.0002 + 0.0000061\)

\({\text{P(}}X \ge {\rm{2) = 0}}{\rm{.368}}\)     A1     N2

[3 marks]

b.

Examiners report

Candidates who recognized binomial probability answered this question very well, using their GDC to perform the final calculations.

a.

Some candidates misinterpreted the meaning of "at least two" in part (b), and instead found \({\text{P(}}X > {\rm{2)}}\) . Others wrote down a correct interpretation but accumulated to in their GDC (e.g. binomcdf (7, 0.18, 2)). Still, the number of candidates who either left this question blank or approached the question without binomial considerations suggests that this topic continues to be neglected in some centres.

b.

Syllabus sections

Topic 5 - Statistics and probability » 5.8 » Binomial distribution.
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