To find the probability of Jim, Bruce, Valerie, and Simeon being selected in that order, we need to calculate the probability of each individual being selected, considering that the choices are made without replacement.
The probability of Jim being selected first is 1/33, since there are 33 members total and we are selecting one at a time.
The probability of Bruce being selected second is 1/32, as there are 32 members remaining after Jim has been selected.
The probability of Valerie being selected third is 1/31, since there are 31 members remaining after Jim and Bruce have been selected.
The probability of Simeon being selected fourth is 1/30, as there are 30 members remaining after Jim, Bruce, and Valerie have been selected.
To calculate the overall probability, we multiply these individual probabilities:
P(Jim, Bruce, Valerie, Simeon) = (1/33) * (1/32) * (1/31) * (1/30)
Rounding this value to the sixth decimal place, we get:
P(Jim, Bruce, Valerie, Simeon) ≈ 0.000003
Assume that Jim Bruce Valerie is Simeon are four of 33 members of the class and that four of the class members will be chosen randomly to deliver their reports during the next class meeting what is the probability that Jim Bruce Valerie and salmon are selected in that order use decimal four and the decimals had to be rounded to the sixth Place.
1 answer