Mark Scheme (Results) January 2011 - Maths Genie

Mark Scheme (Results) January 2011 GCE GCE Core Mathematics C4 (6666) Paper 1 Edexcel Limited. Registered in England and Wales No. 4496750 Registered ...

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Mark Scheme (Results) January 2011

GCE

GCE Core Mathematics C4 (6666) Paper 1

Edexcel Limited. Registered in England and Wales No. 4496750 Registered Office: One90 High Holborn, London WC1V 7BH

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January 2011 Publications Code UA026241 All the material in this publication is copyright © Edexcel Ltd 2011

General Instructions for Marking 1. The total number of marks for the paper is 75. 2. 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)



Marks should not be subdivided.

3. Abbreviations These are some of the traditional marking abbreviations that will appear in the mark schemes. •

bod – benefit of doubt



ft – follow through



the symbol



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



will be used for correct ft

The second mark is dependent on gaining the first mark

January 2011 Core Mathematics C4 6666 Mark Scheme Question Number

∫ x sin 2 x dx = −

1.

=

[

π

...

]02

=

Scheme

Marks



M1 A1 A1

x cos 2 x + 2

...

cos 2 x dx 2 sin 2 x + 4

π

M1 M1 A1

4 [6]

2.

At t = 3

dI = −16 ln ( 0.5 ) 0.5t dt dI = −16 ln ( 0.5 ) 0.53 dt = −2 ln 0.5 = ln 4

M1 A1 M1 M1 A1 [5]

GCE Core Mathematics C4 (6666) January 2011

1

Question Number

Scheme

Marks

3. (a)

5 A B = + ( x − 1)( 3x + 2 ) x − 1 3x + 2 5 = A ( 3 x + 2 ) + B ( x − 1)

5 = 5A ⇒ A = 1 5 5 = − B ⇒ B = −3 3

x →1

x→−

(b)



2 3

5 dx = ( x − 1)( 3x + 2 )



M1 A1 A1

(3)

3 ⎞ ⎛ 1 − ⎜ ⎟ dx ⎝ x − 1 3x + 2 ⎠ = ln ( x − 1) − ln ( 3 x + 2 )

( +C )

ft constants

M1 A1ft A1ft (3)

(c)





⎛1⎞ ⎜ ⎟ dy ⎝ y⎠ ln ( x − 1) − ln ( 3x + 2 ) = ln y

5 dx = ( x − 1)( 3x + 2 )

K ( x − 1) 3x + 2 K 8= 8 64 ( x − 1) y= 3x + 2 y=

Using ( 2, 8 )

M1

( +C )

M1 A1

depends on first two Ms in (c) M1 dep depends on first two Ms in (c)

M1 dep A1

(6) [12]

GCE Core Mathematics C4 (6666) January 2011

2

Question Number 4.

Scheme

Marks

(a)

JJJG AB = −2i + 2 j − k − ( i − 3 j + 2k ) = −3i + 5 j − 3k

M1 A1

(2)

(b)

r = i − 3 j + 2k + λ ( −3i + 5 j − 3k )

M1 A1ft

(2)

or (c)

r = −2i + 2 j − k + λ ( −3i + 5 j − 3k )

JJJG AC = 2i + pj − 4k − ( i − 3 j + 2k )

JJJG or CA

= i + ( p + 3) j − 6k ⎛ 1 ⎞ ⎛ −3 ⎞ JJJG JJJG ⎜ ⎟⎜ ⎟ AC. AB = ⎜ p + 3 ⎟ . ⎜ 5 ⎟ = 0 ⎜ −6 ⎟ ⎜ −3 ⎟ ⎝ ⎠⎝ ⎠ −3 + 5 p + 15 + 18 = 0 Leading to p = −6 (d)

AC 2 = ( 2 − 1) + ( −6 + 3) + ( −4 − 2 ) 2

2

2

M1

M1 A1

( = 46 )

AC = √ 46

B1

(4)

M1

accept awrt 6.8

A1 (2) [10]

GCE Core Mathematics C4 (6666) January 2011

3

Question Number

Scheme

Marks

5. (a)

( 2 − 3x )

−2

⎛ 3 ⎞ = 2 ⎜1 − x ⎟ ⎝ 2 ⎠

−2

−2

B1

−2

⎛ 3 ⎞ ⎛ 3 ⎞ −2. − 3 ⎛ 3 ⎞ −2. − 3. − 4 ⎛ 3 ⎞ ⎜ 1 − x ⎟ = 1 + ( −2 ) ⎜ − x ⎟ + ⎜− x⎟ + ⎜ − x ⎟ + ... 1.2 ⎝ 2 ⎠ 1.2.3 ⎝ 2 ⎠ ⎝ 2 ⎠ ⎝ 2 ⎠ 27 2 27 3 = 1 + 3x + x + x + ... 4 2 1 3 27 27 −2 ( 2 − 3x ) = + x + x 2 + x3 + ... 4 4 16 8 (b)

2

27 2 27 3 ⎛1 3 ⎞ f ( x ) = ( a + bx ) ⎜ + x + x + x + ... ⎟ 16 8 ⎝4 4 ⎠ 3a b Coefficient of x; + =0 ( 3a + b = 0 ) 4 4 27a 3b 9 Coefficient of x 2 ; + = ( 9a + 4b = 3) 16 4 16 Leading to a = −1, b = 3

(c) Coefficient of x 3 is

27a 27b 27 27 + = × ( −1) + × 3 8 16 8 16 27 = 16

3

M1 A1

M1 A1

(5)

M1

A1 either correct

M1 A1 M1 A1

(5)

M1 A1ft

cao

A1

(3) [13]

GCE Core Mathematics C4 (6666) January 2011

4

Question Number

Scheme

Marks

6. (a)

dx 1 = , dt t

dy = 2t dt dy = 2t 2 dx

M1 A1

Using mm′ = −1 , at t = 3 1 18 1 y − 7 = − ( x − ln 3) 18

m′ = −

(b)

x = ln t ⇒ t = e x y =e −2 V =π

∫ (e

2x

M1 A1

− 2 ) dx 2

∫ (e

M1 A1

(6)

B1 2x

(c)

M1 A1

2x

(3)

M1

− 2 ) dx = 2

=

∫ (e

4x

− 4 e 2 x + 4 ) dx

e4 x 4 e2 x − + 4x 4 2

M1 M1 A1

ln 4

⎡ e4 x 4 e2 x ⎤ π⎢ − + 4 x ⎥ = π ⎡⎣( 64 − 32 + 4 ln 4 ) − ( 4 − 8 + 4 ln 2 ) ⎤⎦ 2 ⎣ 4 ⎦ ln 2

M1

= π ( 36 + 4 ln 2 )

A1 (6) [15]

Alternative to (c) using parameters V =π



∫ (t

2 1⎞ ⎛ 2 ⎜ ( t − 2 ) × ⎟ dt = t⎠ ⎝

2



− 2)

2

dx dt dt

4⎞ ⎛ 3 ⎜ t − 4t + ⎟ dt t⎠ ⎝

t4 − 2t 2 + 4 ln t 4 The limits are t = 2 and t = 4 =

M1 M1 M1 A1

4

⎡t4 ⎤ π ⎢ − 2t 2 + 4 ln t ⎥ = π ⎡⎣( 64 − 32 + 4 ln 4 ) − ( 4 − 8 + 4 ln 2 ) ⎤⎦ ⎣4 ⎦2 = π ( 36 + 4 ln 2 )

M1 A1 (6)

GCE Core Mathematics C4 (6666) January 2011

5

Question Number

Scheme

Marks

7.

x = 3 ⇒ y = 0.1847 x = 5 ⇒ y = 0.1667

(a)

awrt B1 awrt or 16 B1 (2)

(b)

(c)

I≈

1 ⎡ 0.2 + 0.1667 + 2 ( 0.1847 + 0.1745 ) ⎤⎦ 2⎣ ≈ 0.543

dx = 2 (u − 4) du

B1 M1 A1ft

0.542 or 0.543

A1

(4)

B1

∫ 4 + √ ( x −1) ∫ ∫ 1

dx =

1 × 2 ( u − 4 ) du u

8⎞ ⎛ ⎜ 2 − ⎟ du u⎠ ⎝ = 2u − 8ln u x = 2 ⇒ u = 5, x = 5 ⇒ u = 6 =

M1 A1 M1 A1 B1

[ 2u − 8ln u ] 5 = (12 − 8ln 6 ) − (10 − 8ln 5)

M1

⎛5⎞ = 2 + 8ln ⎜ ⎟ ⎝6⎠

A1

6

(8) [14]

GCE Core Mathematics C4 (6666) January 2011

6

Further copies of this publication are available from Edexcel Publications, Adamsway, Mansfield, Notts, NG18 4FN Telephone 01623 467467 Fax 01623 450481 Email [email protected] Order Code UA026241 January 2011 For more information on Edexcel qualifications, please visit www.edexcel.com/quals Edexcel Limited. Registered in England and Wales no.4496750 Registered Office: One90 High Holborn, London, WC1V 7BH