Show that $\text{P}(X=3)=0.001$ and $\text{P}(X=4)=0.0027$.

Find the values of the constants $a$ and $b$.

Deduce that $\frac{\text{P}(X=n)}{\text{P}(X=n-1)}=\frac{0.9(n-1)}{n-3}$ for $n>3$.

(i)     Hence show that $X$ has two modes $m_1$ and $m_2$.

(ii)     State the values of $m_1$ and $m_2$.

Determine the minimum value of $x$ such that the probability Kati receives at least one free gift is greater than 0.5.

* This question is from an exam for a previous syllabus, and may contain minor differences in marking or structure.

$\text{P}(X=3)=(0.1{)}^3$    A1

$=0.001$    AG

$\text{P}(X=4)=\text{P}(VV\overline{V}V)+\text{P}(V\overline{V}VV)+\text{P}(\overline{V}VVV)$    (M1)

$=3\times (0.1{)}^3\times 0.9$ (or equivalent)     A1

$=0.0027$    AG

[3 marks]

METHOD 1

attempting to form equations in $a$ and $b$     M1

$\frac{9+3a+b}{2000}=\frac{1}{1000}(3a+b=-7)$    A1

$\frac{16+4a+b}{2000}\times \frac{9}{10}=\frac{27}{10000}(4a+b=-10)$    A1

attempting to solve simultaneously     (M1)

$a=-3,b=2$    A1

METHOD 2

$\text{P}(X=n)=\left(\begin{array}{c}n-1\\ 2\end{array}\right)\times {0.1}^3\times {0.9}^{n-3}$    M1

$=\frac{(n-1)(n-2)}{2000}\times {0.9}^{n-3}$    (M1)A1

$=\frac{n^2-3n+2}{2000}\times {0.9}^{n-3}$    A1

$a=-3,b=2$    A1

Note: Condone the absence of ${0.9}^{n-3}$ in the determination of the values of $a$ and $b$.

[5 marks]

METHOD 1

EITHER

$\text{P}(X=n)=\frac{n^2-3n+2}{2000}\times {0.9}^{n-3}$    (M1)

OR

$\text{P}(X=n)=\left(\begin{array}{c}n-1\\ 2\end{array}\right)\times {0.1}^3\times {0.9}^{n-3}$    (M1)

THEN

$=\frac{(n-1)(n-2)}{2000}\times {0.9}^{n-3}$    A1

$\text{P}(X=n-1)=\frac{(n-2)(n-3)}{2000}\times {0.9}^{n-4}$    A1

$\frac{\text{P}(X=n)}{\text{P}(X=n-1)}=\frac{(n-1)(n-2)}{(n-2)(n-3)}\times 0.9$    A1

$=\frac{0.9(n-1)}{n-3}$    AG

METHOD 2

$\frac{\text{P}(X=n)}{\text{P}(X=n-1)}=\frac{\frac{n^2-3n+2}{2000}\times {0.9}^{n-3}}{\frac{{(n-1)}^2-3(n-1)+2}{2000}\times {0.9}^{n-4}}$    (M1)

$=\frac{0.9(n^2-3n+2)}{(n^2-5n+6)}$    A1A1

Note: Award A1 for a correct numerator and A1 for a correct denominator.

$=\frac{0.9(n-1)(n-2)}{(n-2)(n-3)}$    A1

$=\frac{0.9(n-1)}{n-3}$    AG

[4 marks]

(i)     attempting to solve $\frac{0.9(n-1)}{n-3}=1$ for $n$     M1

$n=21$    A1

   R1

   R1

$X$ has two modes     AG

Note: Award R1R1 for a clearly labelled graphical representation of the two inequalities (using $\frac{\text{P}(X=n)}{\text{P}(X=n-1)}$).

(ii)     the modes are 20 and 21     A1

[5 marks]

METHOD 1

$Y\sim \text{B}(x,0.1)$    (A1)

attempting to solve $\text{P}(Y⩾3)>0.5$ (or equivalent eg $1-\text{P}(Y⩽2)>0.5$) for $x$     (M1)

Note: Award (M1) for attempting to solve an equality (obtaining $x=26.4$).

$x=27$    A1

METHOD 2

$\sum _{n=0}^x\text{P}(X=n)>0.5$    (A1)

attempting to solve for $x$     (M1)

$x=27$    A1

[3 marks]