Mark (Results) Summer 0 GCE Core Mathematics C4 (6666) Paper
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General Marking Guidance All candidates must receive the same treatment. Examiners must mark the first candidate in exactly the same way as they mark the last. Mark schemes should be applied positively. Candidates must be rewarded for what they have shown they can do rather than penalised for omissions. Examiners should mark according to the mark scheme not according to their perception of where the grade boundaries may lie. There is no ceiling on achievement. All marks on the mark scheme should be used appropriately. All the marks on the mark scheme are designed to be awarded. Examiners should always award full marks if deserved, i.e. if the answer matches the mark scheme. Examiners should also be prepared to award zero marks if the candidate s response is not worthy of credit according to the mark scheme. Where some judgement is required, mark schemes will provide the principles by which marks will be awarded and exemplification may be limited. When examiners are in doubt regarding the application of the mark scheme to a candidate s response, the team leader must be consulted. Crossed out work should be marked UNLESS the candidate has replaced it with an alternative response.
EDEXCEL GCE MATHEMATICS General Instructions for Marking. The total number of marks for the paper is 75.. The Edexcel Mathematics mark schemes use the following types of marks: M marks: method marks are awarded for knowing a method and attempting to apply it, unless otherwise indicated. A marks: Accuracy marks can only be awarded if the relevant method (M) marks have been earned. B marks are unconditional accuracy marks (independent of M marks) should not be subdivided.. Abbreviations These are some of the traditional marking abbreviations that will appear in the mark schemes and can be used if you are using the annotation facility on epen. bod benefit of doubt ft follow through the symbol will be used for correct ft cao correct answer only cso - correct solution only. There must be no errors in this part of the question to obtain this mark isw ignore subsequent working awrt answers which round to SC: special case oe or equivalent (and appropriate) dep dependent indep independent dp decimal places sf significant figures The answer is printed on the paper The second mark is dependent on gaining the first mark 4. All A marks are correct answer only (cao.), unless shown, for example, as A ft to indicate that previous wrong working is to be followed through. After a misread however, the subsequent A marks affected are treated as A ft, but manifestly absurd answers should never be awarded A marks.
General Principles for Core Mathematics Marking (But note that specific mark schemes may sometimes override these general principles). Method mark for solving term quadratic:. Factorisation ( x + bx + c) = ( x + p)( x + q), where pq = c, leading to x =... ( ax + bx + c) = ( mx + p)( nx + q), where pq = c and mn = a, leading to x =. Formula Attempt to use correct formula (with values for a, b and c), leading to x =. Completing the square Solving + bx + c = 0 x b : ( ) x± ± q± c, q 0, leading to x = Method marks for differentiation and integration:. Differentiation Power of at least one term decreased by. ( x n x n ). Integration Power of at least one term increased by. ( x n x n+ ) Use of a formula Where a method involves using a formula that has been learnt, the advice given in recent examiners reports is that the formula should be quoted first. Normal marking procedure is as follows: Method mark for quoting a correct formula and attempting to use it, even if there are mistakes in the substitution of values. Where the formula is not quoted, the method mark can be gained by implication from correct working with values, but may be lost if there is any mistake in the working. Exact answers Examiners reports have emphasised that where, for example, an exact answer is asked for, or working with surds is clearly required, marks will normally be lost if the candidate resorts to using rounded decimals. Answers without working The rubric says that these may not gain full credit. Individual mark schemes will give details of what happens in particular cases. General policy is that if it could be done in your head, detailed working would not be required.
June 0 6666 Core Mathematics C4 Mark. (a) ( ) ( ) x 0 ( A) = A x + Bx x + Cx B = x = C C = any two constants correct A Coefficients of x 0= 9A+ B B = all three constants correct A (4) (b)(i) + x x ( x ) = ln x ln ( x ) + x + C ( ) = ln x ln x + C x ( ) ( ) ( ) ( ) Aft Aft (ii) f( x) lnx ln( x ) = x = ln ln 5 ln ln 5 = ln +... 5 4 = + ln 0 5 A (6) [0]
. (a) dv V x x = = cso B () (b) dv 0.048 = = dt dv dt x At x = 8 0.048 = = 0.0005 ( cms ).5 0 4 dt 8 A () (c) ( ) ds S = 6x = x B ds ds 0.048 = = x dt dt x At x = 8 ds = 0.04 ( cm s ) dt A () [6]
. (a) ( ) ( ) f x =......... x 6 = 6 9 (... ) 9, 6, or equivalent B 5 ( )( ) ( )( )( ) ( ) ( ) =... + ( )( kx) ; + kx + kx +... ; Aft!... 9 x 4 = + + or + x 9 A 4 4 40 = + x+ x + x +... 9 7 79 A (6) 4 4 40 g x = x+ x x +... Bft () 9 7 79 (b) ( ) h 4 4 40 = + + + +... 9 7 79 A () 8 6 0 = + x+ x + x +... 9 7 79 [9] (c) ( x) ( x) ( x) ( x)
4. ydy = Can be implied. Ignore integral signs B cos x = sec x ( ) tan y x C = + A π y =, x = 4 π = tan + C 4 Leading to C = tan y = x or equivalent A (5) [5]
5. (a) Differentiating implicitly to obtain ± ay y y and/or ± bx dy 48 y... 54... A dy 9x y 9x + 8xy or equivalent B dy ( 48y + 9x ) + 8xy 54 = 0 dy 54 8xy 8 6xy = = 48y + 9x 6y + x (b) 8 6xy = 0 Using x = or y = y x 6y + 9 y 54 = 0 y y Leading to or 4 6y + 8 6 = 0 or 4 8 y = 6 or d d 6 9 54 0 + x x= x x 4 4 6 x x 0 A (5) + = 4 x = 6 y =, or x =, A A Substituting either of their values into xy = to obtain a value of the other variable.,,, both A (7) []
6. (a) cost dt B dy 8costsint dt A dy 8costsint = cost 4sint = cost dy tan t k = A (5) (b) When π t = x =, y = can be implied B π m = tan ( = ) y = x y = x A (4) (c) x = sin t = sin tcost ( ) x = sin tcos t = cos t cos t x Alternative to (c) y y = 4 4 sin t+ cos t = ( y ) or equivalent A () y = cost+ [] x + = A () 4
7. (a) x 4 y ln ln4 ln6 ln8 0.69.9605.04 4.589 Area = (...) B ( ( ) )... 0.69+.9605 +.04 + 4.589 4.97989... 7.49 7.49 cao A (4) (b) (c) x = x ln x x 4 = x ln x x 9 ( + C) A (4) x ln x= x ln x x A 4 4 4 4 x ln x x = 4 ln 8 4 ln 9 9 9 ( 6ln...)... n = Using or implying ln = n ln 46 8 = ln 9 A () []
8. (a) 8 0 uuur AB = = 4 A () (b) (c) 0 r = + t 0 t 7 t uur CP = + t = t 0 + t t 8 r = + t Aft () 4 A 7 t t 0. = 4 + 4t+ t 0 + t = 0 t Leading to t = 4 A 0 8 Position vector of P is + 4 = 6 + 4 7 A (6) [0] Alternative working for (c) 8 t 5 t uur CP = + t = t 9 4+ t t+ A 5 t t 9. = 0+ 4t+ t 9+ t+ = 0 t + Leading to t = A 8 6 Position vector of P is + = 6 4+ 7 A (6)
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