Differentiation and Integration Mark Scheme - Core 2

1.(a)B11

(b)M1

Allow all M marks for equivalent work with (n odd)

a =A12

Accept unsimplified

(c)M1
b =A12

(d)Substitution of x = 4 into M1
A1F2

ft wrong coeff of

[7]

2.(a)B11

Accept k = 2.5

(b)y = M1

Good attempt at integration;
condone absence of ‘+c’.

1 = m1

Valid start to find c

y = oeA1ft3

ft on their fractional value of k from (a)

must have y = … somewhere

eg k = 1.5  y = 2.8x2.5 – 1.8

[4]

3.(a)y = B11

(b)p = 5B1F

ft wrong coeff of giving integer p

Use of M1

OE; PI

Conclusion fully justifiedA1F3

ft one error

[4]

4.(a)(i)B1

PI by sight of

M1

One term correct

OEA13

(ii)When x = 2, A11

CSO AG (be convinced)

(b)When x = 2, y = 3 B1

For y = 3

gradient of normal = − 2M1

= 1 used

Equation normal M1

OE

Award at 1st correct formA14

[8]

5.= 2x + M1

Attempt at derivative

x = 1  = 4A1 cso

Tangent y = 4x – 5B1 ft

x3 – 4x2 + 5x – 2 = 0M1 A1 cao

(x – 1)2(x – 2) = 0M1

(use of factor theorem of division etc)
and no other values

 x = 2A1 cso

y = 3A1 cso

[5]

6.(a)M1

k = 8A1

A1F3

Condone use of decimals once in a or b ft wrong k

(b)M1

k = 6A1

At x = 2, A1F3

Use of decimal points penalised here if wrong k

[6]

7.(a)YP = 4B11

(b)B2,1,02

(B1ifonlyoneerrorintheexpansion)
ForB2thelastlineofthecandidate‘s
solutionmustbecorrect

y = 1 + 4x–1 + 4x–2

(c)M1

Indexreducedby1afterdifferentiatingx
toanegativepower

Atleast1terminxcorrectftonexpnA1ft

CSOFullcorrectsolution.ACFA13

(d)When x = 2, M1

Attempttofindy′(2).

Gradient =  1  1 =  2A12

AG(beconvinced-noerrorsseen)

(e) 2 m ′ =  1M1

m1m2=1OEstatedorused.PI

y 4 =m(x − 2)M1

C‘syPfrompart(a)ifnotrecovered;
mmustbenumerical.

A1ft

Ftoncandidate‘syPfrompart(a)ifnot recovered.

x 2y + 6 = 0A14

CAOMustbethisor0=x2y+6

[12]

8.(a)DifferentiationM1

at least one term correct

y = 2x + 2x–3A1

Accept unsimplified

... 4 when x = 2A1F3

ft numerical or sign error

(b)IntegrationM1

at least one term correct

A12

Accept unsimplified

[5]

9.h = 1B1

PI

f(x) =

Area ≈ h/2{…}
{…}= f(0) + f(3) + 2[f(1) + f(2)]M1

OEsummingofareasofthe‘trapezia’..

{…}= 1 + √8 + 2(√2 + 2)A1

OE

(Area ≈) 5.3284… = 5.328 (to 3dp)A14

CAOMustbe5.328

[4]

10.(a)(i)When x = 4, B11

AG Be convinced

(ii)B11

Accept k = –2

(iii) – 0M1

A power decreased by 1

A1;
A1ft3

candidate’s negative integer k

[−1 for >2 term(s)]

(iv)When x = 4, M1

Attempt to find y′′(4) reaching as far as two
simplified terms

Minimum since y′′(4) > 0E1ft2

candidate’s sign of y′′(4)

[Alternative: Finds the sign of y′(x) either side of the point
where x = 4, need evidence rather than just a statement: (M1)
Correct ft conclusion with valid reason E1ft]
[In both, condone absent statement y′(4)=0]

(b)(i)At P(1,8), = 12B11

AG Be convinced

(ii)Gradient of normal = M1

Use of or stating

m × m′ = 1

Equation of normal is M1

Can be awarded even if m = 12

12y – 96 = – x + 1
A13

Any correct form of the equation

(c)(i)dx =
…….. = M1

One power correct.A2,1,0ft3

A1 if 2 of 3 terms correct

candidate’s negative integer k

Condone absence of “+ c”

(ii) (*)B1ft

y = candidate’s answer to (c)(i) with tidied coefficients
and with ‘+c’.

(‘y =’PI by next line)

When x = 1, y = 8 8 = 2 – 16 – 7 + cM1

Substitute. (1,8) in attempt to find constant of integration

A13

Accept c = 29 after (*), including y =, stated

[17]

11.(a)y(0) = 6, y(1) = –1B1B1
Sign change, so root betweenE13

(b)(i)y = 2 …M1A1

M1for

… = 9B1

y = 3M1A15

M1forasderivof1stterm

(ii)At SP = 9M1

OrB1forx=9verified,thenB1fory=–27

So x = 9A1F

f.t.numericalerroriny

and y = –27A13

(iii)At SP y = B1
This is positive, so minimumE1F2

f.t.wrongvalueforyatSP

[13]

12.h = 0.5B1

Integral = h/2{…}

{…}= [f(1) + f(2.5) + 2 (f(1.5) +f(2))]M1

Where f(x) = 2x – 1.

={1+(4√2 –1) +2[(2√2 –1) + 3]}A1
{4√2 –1=4.65685..} {2√2 –1=1.82842…}

All 4 terms correct.[accept 3 dp or better for each term or 15.31(37…) seen or 3.82(8…) seen if index or surd form not given]

Integral to 3sf = 3.83A14

cao Must be 3.83

[4]

13.(a) (+c)M1A12

M1 for the correct power of x

(b)Substitution of x = 2m1

A1F

ft wrong coeff ; decimals not Allowed

... = A1F3

ditto

[5]

14.(a)(i)M1A12

M1 if index correct or for example ;

Condone for

(ii)Substitution of x = 4m1

= 12.8A1F2

ft wrong coefficient of

(b)Required Area = area of  – 12.8M1

Condone eg area of  = 4 × 5

= = 3.2A1F2

ft wrong answer to (a)(ii) provided answer > 0

[6]

15.(a)y = 1 – 8x–3M1A12

(b)At SP, 8x–3 = 1m1

SP is (2, 3)A1A13

NMS x = 2, B1 y = 3, B1

(c)y = 24x–4m1A1F

m1 if index correct;

ft numerical error or y = –8x–3

...= at SPA1F

ft wrong coefficient of x–4

so SP is minE1F4

ft wrong (non-zero) value of y at SP;

allow ‘y = 24x–4 > 0’ without a value

[9]

16.(a)Use of y = nx n–1M1

coeff or index right or both approx right

y = A12

(b)(i)M1

Coeff or index right or consistent with each other

A12

Accept unsimplified

(ii)Substituting x = 8 in integralM12

not in y or y’

A1F

ft wrong coeff of x; allow decimals

[6]

17.(a)B11

(b)M1A1

M1 for with c’s non-integer value of p

... = 67 ½ A1F3

f.t. wrong coefficient of

[4]

18.y=M1A1
x=8y=A1F

ft num error; accept 2.67 OB; NMS 2 out of 3

[3]

19.(a)B11

(b)Integn of 3 terms of correct degreeB1B1B13

Accept unsimp; condone no +c

[4]

20.(a)Deriv of is kx½M1

y = 1–½A1
y(0) =1, y(1) = – ½A1F

ft error in coeff of x½

Conclusion drawn (AG)E14

Magnitudes (OE) must be mentioned

(b)(i)M1A12

At least one term correct for M1 Accept unsimp; condone no +c

(ii)Substitution of x = 1m1
Area =A1F2

ft num error leading to positive answer

[8]

21.(a)arc = x B1

Accept if seen on a diagram

5 sides + arc  5x + x = 10B12

ag convincingly shown

(b)(i)Area of triangle = x2 sin60°M1

= x2A1

Area of sector = x2M1

= x [10 – 5x]A1

A = x2 – x2 + 5xA15

ag convincingly shown

(ii) = x – 5x + 5M1

At least one term correct or answer a multiple of
correct answer

A max  = 0m1

Putting = 0 and first step to solve

 5x – x = 5

x = oe {= 1.209489...}A13

Accept 1.21
oe must not have fractions in the numerator or denominator

(iii){= –4.13...}B1ft

Onlyft if one slip in finding A'

...... < 0  maximumE12

ft sign of

[12]

22.(a)y = 2x – 8x– ³M1A1

M1 if at least one term correct

Attempt to solve y = 0m1
x4 = 4A1F

ft one error in coeff

x = ±2A1F

both needed; accept ; ft error in coeff

y = 4A16

Allow even if only one x found dec approx penalise once only

NMS 2/6 for (±1.4, 4), 1/6 for (1.4, 4), 1/6 for x = ±1.4

(b)(i)Result convincingly establishedM1A12

M1 for reasonable attempt

(ii)u² – 5u + 4 = 0B1

NMS 1/3 for 4 correct values of x

u = 1 or 4B1
x = ±1 or ±2B13

All four needed

(iii)B1B1

B1 for each term

Evaluation of M1.

where a, b are possible values found in (ii); OE

... = A1F

ft error in coeffs (not in limits of integration)

Area = M1

independent of previous M1

... = A16

convincingly established (AG)

[17]

South Wolds Comprehensive School1