Short Questions (Question 3 & 4)

Question 3 (4 marks):
Diagram shows a standard normal distribution graph.

Diagram

The probability represented by the area of the shaded region is 0.2881.
(a) Find the value of h.
(b) X is a continuous random variable which is normally distributed with a mean, μ and a variance of 16.
Find the value of μ if the z-score of X = 58.8 is h.


Solution:
(a)
P(X < h) = 0.5 – 0.2881
P(X < h) = 0.2119
P(X < –0.8) = 0.2119
h = –0.8

(b)

$\begin{array}{l}X=58.8\\ \frac{X-\mu }{\sigma }=\frac{58.8-\mu }{\sigma }\\ Z=\frac{58.8-\mu }{4}\\ h=\frac{58.8-\mu }{4}\\ -0.8=\frac{58.8-\mu }{4}\\ -3.2=58.8-\mu \\ \mu =58.8+3.2\\ \mu =62\end{array}$

Question 4 (4 marks):
A voluntary body organizes a first aid course 4 times per month, every Saturday from March until September.
[Assume there are four Saturdays in every month]

Salmah intends to join the course but she might need to spare a Saturday per month to accompany her mother to the hospital. The probability that Salmah will attend the course each Saturday is 0.8. Salmah will be given a certificate of monthly attendance if she can attend the course at least 3 times a month.

(a) Find the probability that Salmah will be given the certificate of monthly attendance.

(b) Salmah will qualify to sit for the first aid test if she obtains more than 5 certificates of monthly attendance.
Find the probability that Salmah qualifies to take the first aid test.


Solution:
(a)

$\begin{array}{l}P\left(X=r\right)={}^{n}C{}_r{p}^r{q}^{n-r}\\ p=0.8,q=0.2,n=4,r=3,4\\ \\ P\left(X\ge 3\right)\\ =P\left(X=3\right)+P\left(X=4\right)\\ ={}^{4}C{}_3{\left(0.8\right)}^3{\left(0.2\right)}^1+{}^{4}C{}_4{\left(0.8\right)}^4{\left(0.2\right)}^0\\ =0.4096+0.4096\\ =0.8192\end{array}$

(b)

$\begin{array}{l}P\left(X=r\right)={}^{n}C{}_r{p}^r{q}^{n-r}\\ p=0.8192,q=0.1808,n=7,r=6,\text{ 7}\\ \\ P\left(X>5\right)\\ =P\left(X=6\right)+P\left(X=7\right)\\ ={}^{7}C{}_6{\left(0.8192\right)}^6{\left(0.1808\right)}^1+\\ {}^{7}C{}_7{\left(0.8192\right)}^7{\left(0.1808\right)}^0\\ =0.3825+0.2476\\ =0.6301\end{array}$