100% Real Neco 2016 further mathematics Objectives And Theory Answers.

F/MATH OBJ:
1DCEBDBABAC.

11ABDDDCCDAC.

21CDBACAEBCB.

31CEAEEDEBBD

41CEBCDDCDDA





1a)
A=(2 -1)(1 3)
|A|=(2*3--1)
|A|=6+1
|A|=7
since the determinant of A is not 0 the A is not non singular matrix
To find A^-1
A^-1=(3 1)(-1 2)
then 1/7(3 1)(-1 2)
A^-1=(3/7 1/7)(-1/7 2/7)


2a)
3root2-3root5/5root2+2roo5
conjugate=5root2-2root5
=(3root2-3root5)(5root2-2root5)/(5root2+2root5)(5root2-2root5)
=(15*2-6root10-15root10-6*5)/(25*2-10root10+10root10-4*5)
=(30-31root10-30)/(50-20)
=-31root10/30


2b)
cosx=adj/hyp=12/13
then tanx=opp/adj=5/12
siny=3/5
tany=3/4
tan(x+y)=tanx+tany/1-tanxtany
=(5/12+3/4)/(1-(5/12)(3/4)
=(14/12)/(1-15/48)
=36/125+18/125+16/125
=70/125
=14/25


3a)
Pr(A passed)=4/5,pr(A failed)=1/5
Pr(B passed)=3/5,Pr(B failed)=2/5
Pr(C passed)-2/5,Pr(C failed)=3/5
Pr(atleast one passed)
=4/5*2/5*3/5+3/5*1/5*3/5+2/5*1/5*2/5
=24/125+9/125+4/125
=47/125


3b)
Pr(atleast one failed)
=4/5*3/5*3/5+3/5*2/5*1/5+4/5*2/5*2/5
=101/125


4)
(3+2y)^5 with (a+b)^5 shows
a=3,b=2y
Using pascals triangle the coefficient of (a+b)^5 are 1,5,10,10,5 and 1
(3+2y)^5
=(3)^5+5(3)^4(2y)+10(3)^3(2y)^2+10(3)^2(2y)^3+5(3)(2y)^4+(2y)^5
=243+810y+1080y^2+720y^3+240y^4+32y^5
(3.04)^5=(3+0.04)^5
=3^5+5(3)^4(0.04)+10(3)^2(0.04)^2+10(3)^2(0.04)^3+5(3)(0.04)^4+(0.04)^5
=243+5*81(0.04)+10*27(0.0016)+10*9(0.000064)+15(0.0000026)+0.0000001
=243+16.2+0.432+0.00576+0.000039+0.0000001
=259.63783


11a)
5x^2-2x+3=0
Divide both sides by 5
x^2-2/5x+3/5=0--eq1
Compare eq1 above with
x^2-(alpha+Beta)x+alphabeta=o
alpha+beta=2/5
alphabeta=3/5


11ai)
alpha^3+beta^3=(alpha+beta)(alpha+beta)^2-3alphabeta
=2/5(2/5)^2-3(3/5)
=2/5(4/25-9/5)
=2/5(-41/25)
=-82/125


11aii)
Sum of alpha +1/beta and beta+1/alpha
=(alphabeta+1)/beta +(alpha beta + 1)/alpha
=alphabeta^2+alpha^2beta+beta/alphabeta
=alphabeta(alpha+beta)+(alpha+beta)/alphabeta
product root
(alpha +1/beta)(beta+1/alpha)
=alpha(beta+1/alpha)=1/beta(beta+1/alpha)
=alphabeta+1+1+1q/alphabeta
sum=alphabeta(alpha+beta)+(alpha+beta)/alphabeta
=3/5(2/5)+(2/5)
=6/25+2/5
=(6+10)/25
=16/25
Product alphabeta+2+1/alphabeta
=3/5+2+1/(3/5)
=3/5+2/1+5/3
=64/15
Recall
x^2-(alpha+beta)+alphabeta=0
x^2-16/25x+64/15=0


11bi)
f(x)=x^3+2x-kx-6
x-2=0
x=+2
f(2)=2^3+2(2)^2-k(2)-6=0
8+8-2k-6=0
16-6-2k0
10-2k=0
2k=10
k=10/2
k=5


11bii)
(x^2+4x+3)
(x-2)rootx^3+2x^2-5x-6
=x^3-2x^2
=4x^2-5x
=4x^2-8x
=3x-6
=3x-6
=0
=>x^2+4x+3
=x^2+3x+x+3
=x(x+3)+1(x+3)
=(x+1)(x+3)
the remaining factors of f(x) are (x+1) and (x+3)


11biii)
Zero of f(x)
x-2=0,then x=2
x+1=0, then x=-1
x+3=0, then x=-3
Zeros of f(x) are 2,-1 and -3


10a)
T4=ar^4=162---(1)
T8=ar^7=4374---(2)
Divide (2) by (1)
4374/162=ar^7/ar^4
2187/81=r^3
27=r^3
r=3root27
r=3
Recall(1)
T5=ar^4=162
162=a(3)^4
a=162/81=2


10ai)a=1st,T2=ar,T3=ar^2
a=2,T2=2*3=6,T3=2*3^2=18
therefore the three terms are 2,6 and 18
10aii)
Sn=a(r^n-1)/(r-1)
=2(3^10-1)/(3-1)
Sn=2(3^10-1)/2
=59049-1
=59048


10b)
a=6,c=60,Sn=330
Sn=n/2(a+c)
330=n/2(6+60)
300*2=n(66)
660=n(60)
n=660/66
=60
L=a+(n-1)d
60=6+(10-1)d
60=6+9d
60-6=9d
54=9d
d=54/9
d=6



10c)
T2=ar=6---(1)
T4=ar^3=54---(2)
divide 2 by 1
54/6=ar^3/ar
9=r^2
r=root9
r=3
Recall(1)
ar=6
a(3)=6
a=6/3
a=2
Tn=ar^n-1
Tn=2(3)^n-1


15a)
Rank correlation=1-6ED^2/n(n^2-1)
Rank correlation =1-(6*50)/8(64-1)
=1-348/504
=1-0.691
=0.309


15b)
Pr
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