Mark Scheme (Results) Summer 2009

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1 Mark (Results) Summer 009 GCE GCE Mathematics (6684/01)

2 June Statistics S Mark Q1 [ X ~ B(0,0.15) ] P(X 6), = awrt Y ~ B(60,0.15) Po(9) for using Po(9) P(Y < 1), = awrt [ N.B. normal approximation gives 0.897, exact binomial gives 0.894] for a correct probability statement P(X 6) or P(X < 7) or P (X =0) + P (X = 1)+ P (X = )+ P (X =4) + P (X =5) + P (X =6). (may be implied by long calculation) Correct answer gets. allow 84.74% may be implied by using Po(9). Common incorrect answer which implies this is for a correct probability statement P(X 1) or P(X < 1) or P (X =0)+ P (X = 1)+ + P (X = 1) (may be implied by long calculation) and attempt to evaluate this probability using their Poisson distribution. Condone P (X 1) = for Correct answer gets Use of normal or exact binomial get B0 M0 A0, (), () [5] 6684/01 GCE Mathematics June 009

3 Q H 0 : λ =.5 (or λ = 5) H1: λ <.5 (or λ < 5) λ or µ X ~ Po(5) P(X < 1) = or CR X < 1 [0.0404<0.05 ] this is significant or reject H 0 or it is in the critical region There is evidence of a decrease in the (mean) number/rate of deformed blood cells (6) [6] 1 st for H 0 must use lambda or mu; 5 or.5. nd for H 1 must use lambda or mu; 5 or.5 1 st for use of Po(5) may be implied by probability( must be used not just seen) eg. P (X = 1 ) = would score A0 1 st for seen or correct CR nd for a correct statement (this may be contextual) comparing their probability and 0.05 (or comparing 1 with their critical region). Do not allow conflicting statements. nd is not a follow through. Need the word decrease, number or rate and deformed blood cells for contextual mark. If they have used in H 1 they could get B0 A0 mark as above except they gain the 1 st for P(X < 1) = or CR X < 0 nd for a correct statement (this may be contextual) comparing their probability and 0.05 (or comparing 1 with their critical region) They may compare with 0.95 (one tail method) or (one tail method) Probability is /01 GCE Mathematics June 009

4 Q A statistic is a function of X1, X,... X n that does not contain any unknown parameters The probability distribution of Y or the distribution of all possible values of Y (o.e.) Identify (ii) as not a statistic Since it contains unknown parameters Examples of other acceptable wording: µ and σ. e.g. is a function of the sample or the data / is a quantity calculated from the sample or the data / is a random variable calculated from the sample or the data e.g. does not contain any unknown parameters/quantities contains only known parameters/quantities only contains values of the sample Y is a function of X1, X,... X n that does not contain any unknown parameters is a function of the values of a sample with no unknowns is a function of the sample values B0 is a function of all the data values B0 A random variable calculated from the sample B0 A random variable consisting of any function B0B0 A function of a value of the sample B0 A function of the sample which contains no other values/ parameters B0 Examples of other acceptable wording All possible values of the statistic together with their associated probabilities 1 st for selecting only (ii) nd for a reason. This is dependent upon the first. Need to mention at least one of mu (mean) or sigma (standard deviation or variance) or unknown parameters. Examples since it contains mu since it contains sigma since it contains unknown parameters/quantities since it contains unknowns B0 () (1) d () [5] 6684/01 GCE Mathematics June 009 4

5 Q4 X~ B(0, 0.) P(X < ) = P(X < 9) = so P(X > 10) = Therefore the critical region is { X } { X 10} = awrt (0.08 or 0.084) 11 is in the critical region there is evidence of a change/ increase in the proportion/number of customers buying single tins for B(0,0.) seen or used 1 st for nd for rd for (X) < or (X) < or [0,] They get A0 if they write P(X < / X < ) 4 th (X) > 10 or (X) > 9 or [10,0] They get A0 if they write P(X > 10/ X > 9) 10 < X < etc is accepted To describe the critical regions they can use any letter or no letter at all. It does not have to be X. (5) (1) ft ft () [8] correct answer only 1 st for a correct statement about 11 and their critical region. nd for a correct comment in context consistent with their CR and the value 11 Alternative solution 1 st B0 P ( X 11) = = since no comment about the critical region nd a correct contextual statement. 6684/01 GCE Mathematics June 009 5

6 Q5 X = the number of errors in 000 words so X ~Po(6) P(X > 4) = 1 - P(X < ) = = awrt Y = the number of errors in 8000 words. Y ~ Po(4) so use a Normal approx Y ~N(4, 4 ) () Require P(Y < 0) = P Z < 4 = P(Z < ) = = 0.89 awrt (0.7~0.9) [N.B. Exact Po gives 0.4 and no gives 0.07] for seeing or using Po(6) for 1 - P(X < ) or 1 [P(X = 0 ) + P(X = 1 ) + P(X = ) + P(X = )] awrt (7) [10] SC If B(000, 0.00) is used and leads to awrt allow B0 If no distribution indicated awrt scores but any other awrt scores B0 1 st for identifying the normal approximation 1 st for [mean = 4] and [sd = 4 or var = 4] These first two marks may be given if the following are seen in the standardisation formula : 4 4 or awrt 4.90 nd for attempting a continuity correction (0/ is acceptable) rd for standardising using their mean and their standard deviation. nd correct z value awrt or this may be awarded if see or 4 4 th for 1 - a probability from tables (must have an answer of < 0.5) rd answer awrt sig fig in range /01 GCE Mathematics June 009 6

7 Q6 P(A >) = 5 = 0.4 ( 0.4 ) 8,= or 15 (1), () f(y) = y d (F( y) = 15 dy 0 y 0 y 5 otherwise Shape of curve and start at (0,0) () () x 5 5 Point (5, 0) labelled and curve between 0 and 5 and pdf > 0 (e) (f) (g) (e) (f) (g) Mode = y y 15 E(Y) = d y = = 15 or y P( ) dy Y > = = = = or 1 F() correct answer only(cao). Do not ignore subsequent working for cubing their answer to part cao for attempt to differentiate the cdf. They must decrease the power by 1 fully correct answer including 0 otherwise. Condone < signs for shape. Must curve the correct way and start at (0,0). No need for y = 0 (patios) lines for point (5,0) labelled and pdf only existing between 0 and 5, may have y=0 (patios) for other values cao 1 st for attempt to integrate their yf(y) y n y n+1. nd for attempt to use correct limits cao for attempt to find P(Y > ). e.g. writing 5 their f (y) must have correct limits or writing 1 F() (1) () () [1] 6684/01 GCE Mathematics June 009 7

8 Q7 (e) (e) E(X ) = (by symmetry) 1 1 0< x <, gradient = = and equation is y = x so a = 1 4 b - 1 x passes through (4, 0) so b = ( 4 ) ( 4 ) E( X ) = x d x+ x x dx = x x x = 1+ = 4 or X ) E( X) =, = (so σ = = 0.816) (*) Var(X) = E( [ ] q 1 1 P(X < q) = x dx=, q = 1 so q = = awrt 1.41 (1), () - σ = so - σ, + σ is wider than IQR, therefore greater than 0.5 [15] cao for value of a. for value of b 1 st for attempt at ax using their a. For attempt they need x 4. Ignore limits. nd for attempt at bx ax use their a and b. For attempt need to have either x or x 4. Ignore limits 1 st correct integration for both parts rd for use of the correct limits on each part nd for either getting 1 and or awrt.67 somewhere or 4 or awrt th for use of E( [ ] () cso (7), () X ) E( X ) must add both parts for E (X ) and only have subtracted the mean once. You must see this working rd σ = or or better with no incorrect working seen. for attempting to find LQ, integral of either part of f(x) with their a and b = 0.5 ax ax Or their F(x) = 0.5 i.e. = 0. 5 or bx + 4a b = 0. 5 with their a and b If they add both parts of their F(x), then they will get M0. 1 st for a correct equation/expression using their a nd for or awrt 1.41 for a reason based on their quartiles Possible reasons are P( - σ <X< + σ )= allow awrt < LQ(1.414) for correct answer > 0.5 NB you must check the reason and award the method mark. A correct answer without a correct reason gets M0 A0 6684/01 GCE Mathematics June 009 8

9 Q8 X ~Po() P(X = 4) = 4 e 4! = awrt 0.09 Y ~Po(8) P(Y >10) = 1- P(Y < 10) = = awrt F = no. of faults in a piece of cloth of length x F ~Po( x ) x 15 e = e = , e = These values are either side of 0.80 therefore x = 1.7 to sf Expected number with no faults = = 960 Expected number with some faults = = 40 So expected profit = , = () () (4), (4) [1] for use of Po() may be implied awrt 0.09 for Po(8) seen or used for 1 - P(Y < 10) oe awrt st for forming a suitable Poisson distribution of the form e λ = st x for use of lambda as (this may appear after taking logs) 15 nd for attempt to consider a range of values that will prove 1.7 is correct OR for use of logs to show lambda = nd correct solution only. Either get 1.7 from using logs or stating values either side S.C for e = x = 1.7 to sf allow nd A0 1 st for one of the following 100 p or 100 (1 p) where p = 0.8 or /15. 1 st for both expected values being correct or two correct expressions. nd for an attempt to find expected profit, must consider with and without faults nd correct answer only. 6684/01 GCE Mathematics June 009 9

Mark Scheme (Results) June 2008

Mark Scheme (Results) June 2008 Mark (Results) June 8 GCE GCE Mathematics (6684/) Edexcel Limited. Registered in England and Wales No. 44967 June 8 6684 Statistics S Mark Question (a) (b) E(X) = Var(X) = ( ) x or attempt to use dx µ