All solutions here are SUGGESTED. Mr. Teng will hold no liability for any errors. Comments are entirely personal opinions.
Numerical Answers (click the questions for workings/explanation)
Question 1:
Question 2:
Question 3:
Question 4:
Question 5:
Question 6: 
Question 7: 
Question 8: 
Question 9: 
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latex 0.0336; \bar{y}=0.64, s^2 = 0.0400
latex \frac{48+x}{80+x}, \frac{32+x}{80+x}; x= 16; \frac{25}{32}; \frac{7}{16}; \frac{341}{8930}
latex 0.773; 0.0514; 0.866; 0.362![[showhide type="Q1" more_text="Q1" less_text="Hide Q1"] [/showhide] [showhide type="Q2" more_text="Q2" less_text="Hide Q2"] [/showhide] [showhide type="Q3" more_text="Q3" less_text="Hide Q3"] [/showhide] [showhide type="Q4" more_text="Q4" less_text="Hide Q4"] [/showhide] [showhide type="Q5" more_text="Q5" less_text="Hide Q5"] [/showhide] [showhide type="Q6" more_text="Q6" less_text="Hide Q6"] Let](https://theculture.sg/wp-content/ql-cache/quicklatex.com-b58f775dfdd6f64d9c22ef8ee1bae7b8_l3.png "Rendered by QuickLaTeX.com")
latex X
latex X \sim \text{N} (\mu, \sigma^2) latex \text{P}( X \textless 1.6) = 0.2latex \text{P}( Z \textless \frac{1.6 – \mu}{\sigma}) = 0.2latex \frac{1.6 – \mu}{\sigma} = -0.8416212335 latex 1.6 = -0.8416212335 \sigma + \mu 
latex \text{P}( X \textgreater 1.75 ) = 0.3latex \text{P}( X \textless 1.75 ) = 0.7latex \text{P}( Z \textless \frac{1.75 – \mu}{\sigma} ) = 0.7latex \frac{1.75 – \mu}{\sigma} = 0.5244005101latex 1.75 = 0.5244005101 \sigma + \mu
latex \mu = 1.69241, \sigma = 0.1098079154
latex = 1.69
latex = 0.0121![[/showhide] [showhide type="Q7" more_text="Q7" less_text="Hide Q7"] (i) Let](https://theculture.sg/wp-content/ql-cache/quicklatex.com-e47d1520fb00fb05a6fe4391af606a20_l3.png "Rendered by QuickLaTeX.com")
latex X
latex X \sim \text{B}(8, 0.7)latex \text{P}(X =5) = 0.254
latex Y
latex Y \sim \text{B}(8, 0.3)latex \text{P}(Y \ge 4)latex = 1 – \text{P}(Y le 3)latex = 0.19410435 \approx 0.194 
latex W
latex W \sim \text{B} (6, 0.19410435)latex \text{P} ( W \le 2)latex = 0.9082304639 \approx 0.908![[/showhide] [showhide type="Q8" more_text="Q8" less_text="Hide Q8"] (i)](https://theculture.sg/wp-content/ql-cache/quicklatex.com-37414532452b62191f1a4a60fd8ec8f8_l3.png "Rendered by QuickLaTeX.com")
latex {{6}\choose{3}} \times 3! \times {{8}\choose{3}} \times 3! = 40320
latex \bigg[ {{5}\choose{1}} \times \frac{3!}{2!} + {{5}\choose{2}} \times 3! \bigg] \times {{7}\choose{1}} \times \frac{3!}{2!} = 1575
latex = \frac{1575}{6^3 \times 8^3} = 0.0142
latex \text{P}(\text{has~}2\text{~as~its~first~character}) = \frac{1}{6}latex \text{P}(\text{has~H~as~its~sixth~character}) = \frac{1}{8}latex \text{P}(\text{has~}2\text{~as~its~first~character~and~has~H~as~its~sixth~character}) = \frac{1}{6 \times 8} = \frac{1}{48}latex = \frac{1}{6} + \frac{1}{8} – 2(\frac{1}{48}) = \frac{1}{4}![[/showhide] [showhide type="Q9" more_text="Q9" less_text="Hide Q9"] (i) Graph to be inserted (ii) Using GC,](https://theculture.sg/wp-content/ql-cache/quicklatex.com-5f2b7042339baad0ede99fae6a8dbd3d_l3.png "Rendered by QuickLaTeX.com")
latex \text{r}=0.978
latex a=0.182, b=2.56 
latex y = 0.1821185456 x + 2.564419724
latex x = 2, y = 0.1821185456 (2) + 2.564419724latex \Rightarrow y = 2.9287
293.
(v)
Firstly, the linear model is not appropriate here. Since it suggests as the number of years increases, the weekly earnings will increase proportionately, which is not realistic.
Secondly, 
is out of data range and this is extrapolation, which is a bad practice since our trend might not continue out of data range.
[/showhide]
and 
are independent
denote the journey times, in minutes by bus and by train, respectively.
![[ \text{P}(X \textgreater 48) ]^2](https://theculture.sg/wp-content/ql-cache/quicklatex.com-edce0efae0e2d0b46ad32e62063e3ce2_l3.png "Rendered by QuickLaTeX.com")
. Thus, 
Hello!! Will you be uploading the answers for this paper? Thank you so much!!!!
yes, sorry was having a H2 math class for J2 just now.
it’s ok!! Thank u for doing this 🙂