Given about Builtrite,
Average cash flow u = $16000
standard deviation sd = $4000
for a cash flow of less than X = $9000, Z value is
Z = (X-u)/sd = (9000 - 16000)/4000 = -1.75
So, for Z less than -1.75, probability from the Z-table is 4%
So, probability of cash flow less than $9000 is 4%
Builtrite has calculated the average cash flow to be $16,000 with a standard deviation of $4000....
Builtrite has calculated the average cash flow to be $16,000 with a standard deviation of $4000. What is the probability of a cash flow being greater than $11,000? (Assume a normal distribution.) Group of answer choices A.10.56% B.39.44% C.60.56% D.89.44%
Builtrite has calculated the average cash flow to be $16,000 with a standard deviation of $4000. What cash flow would represent the bottom 3%? (Assume a normal distribution.) $8,480 $14,850 $23,520 $27,450
Builtrite has calculated the average cash flow to be $16,000 with a standard deviation of $4000. What cash flow would represent the top 3%? (Assume a normal distribution.) $8,480 $14,850 $23,520 $27,450
Builtrite has calculated the average cash flow to be $16,000 with a standard deviation of $4000. What cash flow would represent the top 3%? (Assume a normal distribution.) 10 $8,480 O $14,850 O $23,520 O $27,450
Builtrite has calculated the average cash flow to be $16,000 with a standard deviation of $4000. What cash flow would represent the top 3%? (Assume a normal distribution.) Group of answer choices A.$8,480 B.$14,850 C.$23,520 D.$27,450
Question 3 2 pts Builtrite has calculated the average cash flow to be $16,000 with a standard deviation of $4000. What is the probability of a cash flow being greater than $11,000? (Assume a normal distribution.) 10.56% O 39.44% O 60.56% O 89.44%
Jerry has calculated the average cash flow to be $16,000 with a standard deviation of $4,000. What is the probability of a cash flow being less than $9,000?
Tim has calculated the average cash flow to be $16,000 with a standard deviation of $4,000. What cash flow would represent the bottom 3%?
5.4.1 Question Help A population has a mean = 141 and a standard deviation o = 28. Find the mean and standard deviation of the sampling distribution of sample means with sample size n = 40. The mean is :-), and the standard deviation is 0;=0 (Round to three decimal places as needed.) 5.4.2 Question Help A population has a meanu - 74 and a standard deviation = 8. Find the mean and standard deviation of a sampling distribution of...
Q3(Sums)
The average score for games played in the NFL is 21.7 and the standard deviation is 9.3 points. 46 games are randomly selected. Round all answers to 4 decimal places where possible and assume a normal distribution. a. What is the distribution of a? 5 ~ N( Σ Σ--Ν( b.What is the distribution of c. P( > 22.0432) = d. Find the 73th percentile for the mean score for this sample size. e. P(20.1432 < E < 23.5856) =...