Answer:
See explanation.
Step-by-step explanation:
We are looking at a geometric distribution.
The probability of selecting a brown peanut is .12 = p
The probability of not selecting a brown peanut is .88 = q
The probability mass function is p(y) = (.88)^(y-1) * (.12)
a) p(7) = (.88)^6 * .12 = .0557
b) p(7 <= y <= 8) = p(7) + p(8)
= .0557 + (.88)^7 * .12 = .1048
c) p(y <= 7) = p(0) + p(1) + ... + p(7)
= .12 + (.88)^1 * .12 + (.88)^2 * .12 + ... + (.88)^6 * .12 = .4713
d) The expect value is 1/p. So, 1/(.12) = 8.33 M&M's
Answer:
a) [tex]p(7) = 0.06[/tex]
b) [tex]p(7 \leq y \leq 8) = 0.10[/tex]
c) [tex]p(y \leq 7) =0.47[/tex]
d) [tex]\frac{1}{p} = 8.33 M\&M's[/tex]
Step-by-step explanation:
We are using geometric distribution.
The probability of selecting a brown peanut is p = 0.12
The probability of not selecting a brown peanut is q = 0.88
probability mass function is p(y) = (0.88)^(y-1) * (0.12)
a) [tex]p(7) = (0.88)^6 *0.12 = 0.06[/tex]
b) [tex]p(7 \leq y \leq 8) = p(7) + p(8)[/tex]
[tex]\ = 0.0557 + (0.88)^7 * 0.12 =0 .10[/tex]
c) [tex]p(y \leq 7) = p(0) + p(1) + ... + p(7)[/tex]
[tex]= 0.12 + (0.88)^1 * 0.12 + (0.88)^2 * 0.12 + ... + (0.88)^6 * 0.12 = 0.47[/tex]
d) The expected value is [tex]\frac{1}{p}[/tex].
So,
[tex]\frac{1}{0.12} = 8.33 M\&M's[/tex]
