Answer:
a) P=0.2503
b) P=0.2759
c) P=0.3874
d) P=0.2051
Step-by-step explanation:
We have this information:
25% of American households have only dogs (one or more dogs)
15% of American households have only cats (one or more cats)
10% of American households have dogs and cats (one or more of each)
50% of American households do not have any dogs or cats.
The sample is n=10
a) Probability that exactly 3 have only dogs (p=0.25)
[tex]P(x=3)=\binom{10}{3}0.25^30.75^7=120*0.01563*0.13348=0.25028[/tex]
b) Probability that exactly 2 has only cats (p=0.15)
[tex]P(x=2)=\binom{10}{2}0.15^20.85^8=45*0.0225*0.27249=0.2759[/tex]
c) Probability that exactly 1 has cats and dogs (p=0.1)
[tex]P(x=1)=\binom{10}{1}0.10^10.90^0=10*0.1*0.38742=0.38742[/tex]
d) Probability that exactly 4 has neither cats or dogs (p=0.5)
[tex]P(x=4)=\binom{10}{4}0.50^40.50^6=210*0.0625*0.01563=0.20508[/tex]
