a. Refer to Example 5.2. What is the probability that a randomly chosen eight-week-old baby smiles between two and 18 seconds?

P(2 x 18) = (base)(height) = (18 – 2)\left(\frac{1}{23}\right) = \frac{16}{23}

b. Find the 90^th percentile for an eight-week-old baby's smiling time.

b. Ninety percent of the smiling times fall below the 90^th percentile, k, so P(x k) = 0.90.

c. Find the probability that a random eight-week-old baby smiles more than 12 seconds knowing that the baby smiles more than eight seconds.

c. This probability question is a conditional. You are asked to find the probability that an eight-week-old baby smiles more than 12 seconds when you already know the baby has smiled for more than eight seconds.

Find P(x > 12|x > 8) There are two ways to do the problem. For the first way, use the fact that this is a conditional and changes the sample space. The graph illustrates the new sample space. You already know the baby smiled more than eight seconds.

Write a new f(x): f(x) = \frac{1}{23-\text{ 8}} = \frac{1}{15} for 8 x 23.

P(x > 12|x > 8) = (23 − 12)\left(\frac{1}{15}\right) = \frac{11}{15}

For the second way, use the conditional formula from Probability Topics with the original distribution X ~ U(0, 23):

P(A|B) = $\frac{P(A\text{ AND }B)}{P(B)}$

For this problem, A is (x > 12) and B is (x > 8).

So, P(x > 12|x > 8) = $\frac{(x>12\text{ AND }x>8)}{P(x>8)}=\frac{P(x>12)}{P(x>8)}=\frac{\frac{11}{23}}{\frac{15}{23}}=\frac{11}{15}$

a. What is the probability that a person waits fewer than 12.5 minutes?

a. Let X = the number of minutes a person must wait for a bus. a = 0 and b = 15. X ~ U(0, 15). Write the probability density function. f (x) = \frac{1}{15-0} = \frac{1}{15} for 0 ≤ x ≤ 15.

Find P (x 12.5). Draw a graph.

The probability a person waits fewer than 12.5 minutes is 0.8333.

b. On the average, how long must a person wait? Find the mean, μ, and the standard deviation, σ.

b. μ = $\frac{a+b}{2}$ = $\frac{15+0}{2}$ = 7.5. On the average, a person must wait 7.5 minutes.

σ = $\sqrt{\frac{(b-a{)}^2}{12}}=\sqrt{\frac{(\mathrm{15}-0{)}^2}{12}}$ = 4.3. The standard deviation is 4.3 minutes.

c. Ninety percent of the time, the minutes a person must wait falls below what value?

c. Find the 90^th percentile. Draw a graph. Let k = the 90^th percentile.

$P(xk)=(\text{base})(\text{height})=(k-0)(\frac{1}{15})$ $0.90=\left(k\right)\left(\frac{1}{15}\right)$ $k=(0.90)(15)=13.5$ k is sometimes called a critical value. The 90^th percentile is 13.5 minutes. Ninety percent of the time, a person must wait at most 13.5 minutes.

a. The probability that a randomly selected nine-year-old child eats a doughnut in at least two minutes is _______.

a. 0.5714

b. Find the probability that a different nine-year-old child eats a doughnut in more than two minutes given that the child has already been eating the doughnut for more than 1.5 minutes.

The second question has a conditional probability. You are asked to find the probability that a nine-year-old child eats a doughnut in more than two minutes given that the child has already been eating the doughnut for more than 1.5 minutes. Solve the problem two different ways (see Example 5.3). You must reduce the sample space. First way: Since you know the child has already been eating the doughnut for more than 1.5 minutes, you are no longer starting at a = 0.5 minutes. Your starting point is 1.5 minutes.

Write a new f(x):

Find P(x > 2|x > 1.5). Draw a graph.

b. $\frac{4}{5}$

1. Find the probability that a randomly selected furnace repair requires more than two hours.
2. Find the probability that a randomly selected furnace repair requires less than three hours.
3. Find the 30^th percentile of furnace repair times.
4. The longest 25 percent of furnace repair times take at least how long? (In other words: find the minimum time for the longest 25 percent of repair times.) What percentile does this represent?
5. Find the mean and standard deviation.

a. To find f(x): f (x) = $\frac{1}{4-1.5}$ = $\frac{1}{2.5}$ so f(x) = 0.4

P(x > 2) = (base)(height) = (4 – 2)(0.4) = 0.8

b. P(x 3) = (base)(height) = (3 – 1.5)(0.4) = 0.6

The graph of the rectangle showing the entire distribution would remain the same. However the graph should be shaded between x = 1.5 and x = 3. Note that the shaded area starts at x = 1.5 rather than at x = 0; since X ~ U(1.5, 4), x cannot be less than 1.5.

c.

 

P (x k) = 0.30 P(x k) = (base)(height) = (k – 1.5)(0.4) 0.3 = (k – 1.5) (0.4); Solve to find k: 0.75 = k – 1.5, obtained by dividing both sides by 0.4 k = 2.25 , obtained by adding 1.5 to both sides The 30^th percentile of repair times is 2.25 hours. 30 percent of repair times are 2.5 hours or less.

d.

 

P(x > k) = 0.25 P(x > k) = (base)(height) = (4 – k)(0.4) 0.25 = (4 – k)(0.4); Solve for k: 0.625 = 4 − k, obtained by dividing both sides by 0.4 −3.375 = −k, obtained by subtracting four from both sides: k = 3.375 The longest 25 percent of furnace repairs take at least 3.375 hours (3.375 hours or longer). Note: Since 25 percent of repair times are 3.375 hours or longer, that means that 75 percent of repair times are 3.375 hours or less. 3.375 hours is the 75^th percentile of furnace repair times.

e. $\mu =\frac{a+b}{2}$ and $\sigma =\sqrt{\frac{{(b-a)}^2}{12}}$

$\mu =\frac{1.5+4}{2}=2.75$ hours and $\sigma =\sqrt{\frac{{(4–1.5)}^2}{12}}=0.7217$ hours