10) which of the following statements is true? events m and e are
a) mutually exclusive
b) not exclusive
c) complement
d) independent
11) what is the probability that the employee has only one degree, p(i∩m̅) or (m∩i̅) = _?
a) 15/34
b) 17/34
c) 19/34
d) 21/34
evaluate the expression.
12) which of the following is equal to _np_4/_nc_4 (for n 4)
a) 6
b) 24
c) 120
d) 720
solve the problem.
13) you have 6 letters consisting of one i, two a’s and three m’s. if the letters are randomly arranged in order, what is the probability that the arrangement spells the word “mamami”? hint: the number of the partition is needed!
a) 1/720
b) 1/360
c) 1/60
d) 1/120
find the mean of the data summarized in the given frequency distribution.
14) the manager of a bank recorded the amount of time each customer spent waiting in line during peak business hours one monday. the frequency distribution below summarizes the results. find the mean waiting time. round your answer to one decimal place.
waiting time (minutes) | numebr of customers (f) | xmid | fxmid
ll ~ ul | | |
0 ~ 8 | 14 | 4 | 56
9 ~ 17 | 20 | 13 | 260
18 ~ 26 | 6 | 22 | 132
a) 9.6 min
b) 10.5 min
c) 11.2 min
d) 12.9 min
solve the problem.
15) if {x_1, x_2, …, x_n} with average of 8, range of 30, risk of 7, then ∑x² - n(̅x)²/(n - 1) = _
a) 64
b) 49
c) 900
d) 15
16) in problems 16 through 18, given the whisker - and - box plot of a data set of the weights (in pounds) of 30 newborn babies as {x_1, x_2, x_3, …, x_30} and ∑x = 225.0 and ∑x² = 1948.5. find the second quartile q2 = _
a) 7.7
b) 1.3
c) 7.0
d) 6.4
17) find sample mean ̅x = _
a) 7.4
b) 7.5
c) 7.0
d) 7.2

Question

10) which of the following statements is true? events m and e are
a) mutually exclusive
b) not exclusive
c) complement
d) independent
11) what is the probability that the employee has only one degree, p(i∩m̅) or (m∩i̅) = _?
a) 15/34
b) 17/34
c) 19/34
d) 21/34
evaluate the expression.
12) which of the following is equal to _np_4/_nc_4 (for n > 4)
a) 6
b) 24
c) 120
d) 720
solve the problem.
13) you have 6 letters consisting of one i, two a’s and three m’s. if the letters are randomly arranged in order, what is the probability that the arrangement spells the word “mamami”? hint: the number of the partition is needed!
a) 1/720
b) 1/360
c) 1/60
d) 1/120
find the mean of the data summarized in the given frequency distribution.
14) the manager of a bank recorded the amount of time each customer spent waiting in line during peak business hours one monday. the frequency distribution below summarizes the results. find the mean waiting time. round your answer to one decimal place.
waiting time (minutes) | numebr of customers (f) | xmid | fxmid
ll ~ ul | | |
0 ~ 8 | 14 | 4 | 56
9 ~ 17 | 20 | 13 | 260
18 ~ 26 | 6 | 22 | 132
a) 9.6 min
b) 10.5 min
c) 11.2 min
d) 12.9 min
solve the problem.
15) if {x_1, x_2, …, x_n} with average of 8, range of 30, risk of 7, then ∑x² - n(̅x)²/(n - 1) = _
a) 64
b) 49
c) 900
d) 15
16) in problems 16 through 18, given the whisker - and - box plot of a data set of the weights (in pounds) of 30 newborn babies as {x_1, x_2, x_3, …, x_30} and ∑x = 225.0 and ∑x² = 1948.5. find the second quartile q2 = _
a) 7.7
b) 1.3
c) 7.0
d) 6.4
17) find sample mean ̅x = _
a) 7.4
b) 7.5
c) 7.0
d) 7.2

Accepted Answer

# Explanation:
## Step1: Recall permutation and combination formulas
The formula for permutation $_{n}P_{r}=\frac{n!}{(n - r)!}$ and for combination $_{n}C_{r}=\frac{n!}{r!(n - r)!}$. Then $\frac{_{n}P_{4}}{_{n}C_{4}}=\frac{\frac{n!}{(n - 4)!}}{\frac{n!}{4!(n - 4)!}}$.
## Step2: Simplify the expression
$\frac{\frac{n!}{(n - 4)!}}{\frac{n!}{4!(n - 4)!}}=\frac{n!}{(n - 4)!}	imes\frac{4!(n - 4)!}{n!}=4!$.
## Step3: Calculate factorial value
Since $4!=4	imes3	imes2	imes1 = 24$.

# Answer:
12) B. 24

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QUESTION IMAGE

Question

Explanation:

Step1: Recall permutation and combination formulas

Step2: Simplify the expression

Step3: Calculate factorial value

Answer: