Heights of adults vary according to anormal distribution with a mean of 5.5
feet and a standard deviation of 0.5
feet. Which of the following is the
probability that a randomly selected
adult has a height over 7 feet?
Answers
The probability that a randomly selected adult has a height over 7 feet is nearly 100%, which means it's very likely that a randomly selected adult will have a height over 7 feet in this normal distribution.
To find the probability that a randomly selected adult has a height over 7 feet in a normal distribution with a mean of 5.5 feet and a standard deviation of 0.5 feet, you can use the Z-score and the standard normal distribution table.
First, calculate the Z-score for a height of 7 feet using the formula:
Where:
- X is the value you're interested in (in this case, 7 feet).
- μ (mu) is the mean (5.5 feet).
- σ (sigma) is the standard deviation (0.5 feet).
Now, you have the Z-score, which represents how many standard deviations above the mean the height of 7 feet is.
Next, you can use a standard normal distribution table or calculator to find the probability associated with a Z-score of 3. In most standard normal distribution tables, a Z-score of 3 corresponds to a probability close to 1 (or 100%).
To know more about normal distribution:
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A.
x = 1
B.
x = 5
C.
x = 7
D.
x = 9
Answers
35 = 7x
--- ---
7 7
x = 5
Answers
21120*0.7=14784
14784/13.5=1095.111
21120*0.3=6336
6336/20=316.8
1095+317=1412
1412 vehicles are stuck in the traffic jam.
Answers
Answer:
(- 1, 4 )
Step-by-step explanation:
x = 1 is a vertical line passing through all points with an x- coordinate of 1
The point P(3, 4) is to units to the right of x = 1.
Hence the refection will be 2 units to the left of x = 1
P' = (1 - 2, 4 ) = (- 1, 4 )
2x + 3y = 13
x = 2
Answers
Plug in x = 2:
Multiply:
Subtract 4 to both sides:
Divide 3 to both sides:
So our solution is
2(2) + 3y = 13
4 + 3y = 13
- 4 - 4
3y = 9
3 3
y = 3
Answers
d=-25
Answers
breakeven
200000 = 25x
x = 8000
hope this help