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Date November 2016 Marks available 5 Reference code 16N.2.AHL.TZ0.H_11
Level Additional Higher Level Paper Paper 2 Time zone Time zone 0
Command term Find Question number H_11 Adapted from N/A

Question

A Chocolate Shop advertises free gifts to customers that collect three vouchers. The vouchers are placed at random into 10% of all chocolate bars sold at this shop. Kati buys some of these bars and she opens them one at a time to see if they contain a voucher. Let P ( X = n ) be the probability that Kati obtains her third voucher on the n th  bar opened.

(It is assumed that the probability that a chocolate bar contains a voucher stays at 10% throughout the question.)

It is given that P ( X = n ) = n 2 + a n + b 2000 × 0.9 n 3 for n 3 ,   n N .

Kati’s mother goes to the shop and buys x  chocolate bars. She takes the bars home for Kati to open.

Show that P ( X = 3 ) = 0.001 and P ( X = 4 ) = 0.0027 .

[3]
a.

Find the values of the constants a and b .

[5]
b.

Deduce that P ( X = n ) P ( X = n 1 ) = 0.9 ( n 1 ) n 3 for n > 3 .

[4]
c.

(i)     Hence show that X has two modes m 1 and m 2 .

(ii)     State the values of m 1 and m 2 .

[5]
d.

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

[3]
e.

Markscheme

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

P ( X = 3 ) = ( 0.1 ) 3    A1

= 0.001    AG

P ( X = 4 ) = P ( V V V ¯ V ) + P ( V V ¯ V V ) + P ( V ¯ V V V )    (M1)

= 3 × ( 0.1 ) 3 × 0.9 (or equivalent)     A1

= 0.0027    AG

[3 marks]

a.

METHOD 1

attempting to form equations in a and b     M1

9 + 3 a + b 2000 = 1 1000   ( 3 a + b = 7 )    A1

16 + 4 a + b 2000 × 9 10 = 27 10 000   ( 4 a + b = 10 )    A1

attempting to solve simultaneously     (M1)

a = 3 ,   b = 2    A1

METHOD 2

P ( X = n ) = ( n 1 2 ) × 0.1 3 × 0.9 n 3    M1

= ( n 1 ) ( n 2 ) 2000 × 0.9 n 3    (M1)A1

= n 2 3 n + 2 2000 × 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]

b.

METHOD 1

EITHER

P ( X = n ) = n 2 3 n + 2 2000 × 0.9 n 3    (M1)

OR

P ( X = n ) = ( n 1 2 ) × 0.1 3 × 0.9 n 3    (M1)

THEN

= ( n 1 ) ( n 2 ) 2000 × 0.9 n 3    A1

P ( X = n 1 ) = ( n 2 ) ( n 3 ) 2000 × 0.9 n 4    A1

P ( X = n ) P ( X = n 1 ) = ( n 1 ) ( n 2 ) ( n 2 ) ( n 3 ) × 0.9    A1

= 0.9 ( n 1 ) n 3    AG

METHOD 2

P ( X = n ) P ( X = n 1 ) = n 2 3 n + 2 2000 × 0.9 n 3 ( n 1 ) 2 3 ( n 1 ) + 2 2000 × 0.9 n 4    (M1)

= 0.9 ( n 2 3 n + 2 ) ( n 2 5 n + 6 )    A1A1

 

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

 

= 0.9 ( n 1 ) ( n 2 ) ( n 2 ) ( n 3 )    A1

= 0.9 ( n 1 ) n 3    AG

[4 marks]

c.

(i)     attempting to solve 0.9 ( n 1 ) n 3 = 1 for n     M1

n = 21    A1

0.9 ( n 1 ) n 3 < 1 n > 21    R1

0.9 ( n 1 ) n 3 > 1 n < 21    R1

X has two modes     AG

 

Note: Award R1R1 for a clearly labelled graphical representation of the two inequalities (using P ( X = n ) P ( X = n 1 ) ).

 

(ii)     the modes are 20 and 21     A1

[5 marks]

d.

METHOD 1

Y B ( x ,   0.1 )    (A1)

attempting to solve P ( Y 3 ) > 0.5 (or equivalent eg  1 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

n = 0 x P ( X = n ) > 0.5    (A1)

attempting to solve for x     (M1)

x = 27    A1

[3 marks]

e.

Examiners report

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Syllabus sections

Topic 4—Statistics and probability » SL 4.1—Concepts, reliability and sampling techniques
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Topic 4—Statistics and probability » SL 4.3—Mean, median, mode. Mean of grouped data, standard deviation. Quartiles, IQR
Topic 4—Statistics and probability » SL 4.6—Combined, mutually exclusive, conditional, independence, prob diagrams
Topic 4—Statistics and probability

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