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In Austria, 30% of the population has a blood type of O+, 33% has A+, 12% has B+, 6% has AB+, 7% has O-, 8% has A-, 3% has B-, and 1% has AB-. If 15 Austrian citizens are chosen at random, what is the probability that 3 have a blood type of O+, 2 have A+, 3 have B+, 2 have AB+, 1 has O-, 2 have A-, 1 has B-, and 1 has AB-?

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Answer: The probability that 3 have a blood type of O+, 2 have A+, 3 have B+, 2 have AB+, 1 has O-, 2 have A-, 1 has B-, and 1 has AB- is 0.0011%

Explanation: For calculate the probability, we have to use multinomial distribution:

P=n![tex]\frac{n!}{n1!n2!n3!..nk!} (p1n^{1} p2n^{2}p3n^{3}..pkn^{k})[/tex]

n: number of trials, p: probability for each possible outcome, k: number of possible outcomes.

The probability of each blood type are:

  • P1(0+)=0.30
  • P2(A+)=0.33
  • P3(B+)=0.12
  • P4(AB+)=0.06
  • P5(0-)=0.07
  • P6(A-)=0.08
  • P7(B-)=0.03
  • P8(AB-)=0.01

If 15 Austrian citizens are chosen at random, there are 15 trials. n=15

for n1=3 because 3 P(0+)

for n2=2 because 2 P(A+)

for n3=3 because 3 P(B+)

for n4=2 because 2 P(AB+)

for n5=1 because 1 P(0-)

for n6=2 because 2 P(A-)

for n7=1 because 1 P(B-)

for n8=1 because 1 P(AB-)

k=8 (because there are 8 possibilities)

[tex]P=\frac{15!}{3!2!3!2!1!2!1!1} (0.30^{3}0.33^{2}0.12^{3}0.06^{2}0.07^{1}0.08^{2}0.03^{1}0.01^{1})[/tex]

P=0.000011

Px100=0.0011

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