Answer:
A)0.0357
B) 0.1255
C) 0.475
Step-by-step explanation:
A) To find the probability of event A = {19 reds, 19 greens, and 2 blacks} in 40 spins, the formula is given as
P(R_19,G_19,B_2) = S•P(R)^(nr) •P(G)^(ng)•P(B)^(nb)
Where;
S = total number of outcomes
P(R) = Probability of a red space
P(G) = Probability of a green space
P(B) = Probability of a black space
nr = number of red spaces =19
ng = number of green spaces = 19
nb = number of black spaces = 2
So, let's calculate them;
S = 40!/(19!•19!•2!) = 27569305764000
P(R) = 19/40 ; P(G) = 19/40 ; P(B) = 2/40
Thus,P(R_19,G_19,B_2) = 27569305764000•(19/40)^(19)•(19/40)^(19)•(2/40)^(2) = 0.0357
B) Formula for the probability of the event G19 is given as;
P(G_19) = C(40,19)•P(G)^(ng)•P(O)^(no)
Where, P(O) is probability of other ball = 21/40
n(o) is number of other balls = 21
C(40,19) is 40 combination 19 using combination formula. Thus, C(40,19) = 40!/((19!)(21!)) = 131282408400
Thus,
P(G_19) = 131282408400•(19/40)^(19)•(21/40)^(21) = 0.1255
C)To solve this;
If we bet for red, we know that P(Red) = 19/40
Also, if we bet for green, we know that P(G) = 19/40
Thus probability of winning bet is;
P(winning bet) = (1/2)P(R) + (1/2)P(G)
P(winning bet) = (1/2)(19/40) + (1/2 (19/40) = 19/80 + 19/80 = 38/80 = 19/40 = 0.475
