Examples

Basic generalized normal calculation

Suppose $X \sim 𝒩 (- 3,4)$ . Find $P [X \geq - 1.7]$ .

Solution

First write $X$ as a linear transformation of $Z$ :

X \sim 2 Z - 3

Then:

X \geq - 1.7 ⟺ Z \geq 0.65

Look in a table to find that $Φ (0.65) \approx 0.74$ and therefore:

\begin{matrix} P [Z \geq 0.65] ≫ ≫ 1 - P [Z \leq 0.65] \\ ≫ ≫ \approx 1 - 0.74 ≫ ≫ 0.26 \end{matrix}

Find the number $a$ such that $P [- a \leq Z \leq + a] = 2 / 3$ .

Solution

First convert the question:

\begin{matrix} P [- a \leq Z \leq + a] & ≫ ≫ F_{Z} (a) - F_{Z} (- a) \\ ≫ ≫ Φ (a) - Φ (- a) \\ ≫ ≫ 2 Φ (a) - 1 \end{matrix}

Solve for $a$ so that this value is $2 / 3$ :

2 Φ (a) - 1 = 2 / 3 ≫ ≫ Φ (a) = 5 / 6 ≫ ≫ a = Φ^{- 1} (5 / 6)

Use a $Φ$ table to conclude $a \approx 0.97$ .

Suppose that the height of an American male in inches follows the normal distribution $𝒩 (71,6.25)$ .

(a) What percent of American males are over 6 feet, 2 inches tall?

(b) What percent of those over 6 feet tall are also over 6 feet, 5 inches tall?

Solution

(a) Let $H$ be a random variable measuring the height of American males in inches, so $H \sim 𝒩 ({71,2.5}^{2})$ . Thus $H \sim 2.5 Z + 71$ , and:

\begin{matrix} P [H > 74] & ≫ ≫ 1 - P [H \leq 74] \\ ≫ ≫ 1 - P [2.5 Z + 71 \leq 74] \\ ≫ ≫ 1 - P [Z \leq 1.20] \\ ≫ ≫ 1 - 0.8849 \approx 11.5 % \end{matrix}

(b) We seek $P [H > 77 | H > 72]$ as the answer. Compute as follows:

\begin{matrix} P [H > 77 | H > 72] & = \frac{P [H > 77]}{P [H > 72]} \\ ≫ ≫ \frac{P [2.5 Z + 71 > 77]}{P [2.5 Z + 71 > 72]} \\ ≫ ≫ \frac{1 - P [Z \leq 2.4]}{1 - P [Z \leq 0.4]} = \frac{1 - 0.9918}{1 - 0.6554} \approx 2.38 % \end{matrix}

Suppose $X \sim 𝒩 (5, σ^{2})$ , and suppose you know $P [X > 9] = 0.2$ .

Find the approximate value of $σ$ using a $Φ$ table.

Solution

X \sim 𝒩 (5, σ^{2}) ⟹ X \sim σ Z + 5

So $1 - P [X \leq 9] = 0.2$ and thus $P [σ Z + 5 \leq 9] = 0.8$ . Then:

P [σ Z + 5 \leq 9] = P [Z \leq 4 / σ]

so $P [Z \leq 4 / σ] = 0.8$ .

Looking in the chart of $Φ$ for the nearest inverse of 0.8, we obtain $4 / σ = 0.842$ , hence $σ = 4.75$ .