JAMB UTME - Mathematics - 2008
Ajụjụ 2 Ripọtì
If 125x = 2010 find x
Akọwa Nkọwa
125x = 20
1xX2 + 2xX1 + 5xX0 = 20
X2 + 2X + 5 = 20
X2 + 2X - 15 = 0
(X + 5)( X - 3) = 0
X + 5 implies X = -5
X - 3 implies X = 3
But X cannot be negative
∴X = 3
Ajụjụ 3 Ripọtì
A binary operation * is defined on the set of positive integers is such x*y = 2x-3y+2 for all positive integers x and y. The binary operation is
Akọwa Nkọwa
X * Y = 2X - 3Y + 2
2*3 = 2(2) - 3(3) + 2
=4-9+2
= -3
But -3 does not belong to positive integer
Ajụjụ 4 Ripọtì
Find the number of ways of selecting 6 out of 10 subjects for an examination
Akọwa Nkọwa
Ajụjụ 5 Ripọtì
Which of the following angles is an exterior angle of a regular polygon?
Ajụjụ 6 Ripọtì
simplify 16−12×4−12×2713
Akọwa Nkọwa
Ajụjụ 7 Ripọtì
If p = varies inversely as the square of q and p=8 when q=4, find when p=32
Akọwa Nkọwa
P ∝ 1/q
P = k/q
K = q2P
= 428
∴P = 128/q
32 = 128/q
q2 = 128/32
q2 = 4
q = √4 = +/-2
Ajụjụ 8 Ripọtì
Evaluate ∫21(6x2−2x)dx
Akọwa Nkọwa
∫21(6x2−2x)dx=[6x33−2x22]21=[2x3−x2]21
= [2(2)3 - (2)2] – [2(1)3 - (1)2]
= [16-4] – [2-1]
= 12 – 1
= 11
Ajụjụ 9 Ripọtì
Make Q the subject of formula when L=43M√PQ
Akọwa Nkọwa
Ajụjụ 10 Ripọtì
If tan θ = 54 find sin2θ - cos2θ
Akọwa Nkọwa
(tan θ
= oppadj
)
|AB|2 = 52 + 42 →
|AB|2 = 41
→
AB = √41
sin2θ
- cos2θ
→
52√41
- (4√412
) = 2541
- 1641
= (941
)
Ajụjụ 11 Ripọtì
Find the capacity in liters of a cylindrical well of radius 1 meter and depth 14 meters
[π = 22/7]
Akọwa Nkọwa
V = πr2h
1m = 100cm
14cm = 1400cm
∴V=227×100x100x14001000=44,000liters
Ajụjụ 12 Ripọtì
Solve the quadratic inequalities x2 - 5x + 6 ≥0
Akọwa Nkọwa
x2 - 5x + 6 = 0
(X-2)(X-3) = 0
X-2 = 0 implies X = 2
X-3 = 0 implies X = 3
∴ x ≤ 2, x ≥ 3
Ajụjụ 13 Ripọtì
Express 1223456 to 3 significant figures
Ajụjụ 14 Ripọtì
A binary operation on the real set of numbers excluding -1 is such that for all m, n ∈ R, mΔn = m+n+mn. Find the identity element of the operation.
Akọwa Nkọwa
mΔn = m+n+mn
Let e be the identity element
∴mΔe = eΔm = m
m+e+me = m
e+me = m-m
e+me = 0
e(1+m) = 0
e = 0 / (1+m)
e = 0
Ajụjụ 15 Ripọtì
Add 11012,101112 and 1112
Ajụjụ 16 Ripọtì
The bar chart above shows the number of times the word a, and , in, it, the , to appear in a paragraph in a book. What is the ratio of the least frequent word?
Akọwa Nkọwa
Ratio of least to most = 3:12
= 3/12
= 1/4
Ajụjụ 17 Ripọtì
A book seller sells Mathematics and English books. If 30 customers buy Mathematics books, 20 customers buy English books and 10 customers buy the two books, How many customers has he altogether.
Akọwa Nkọwa
n(M) only = 30-10 = 20
n(E) only = 20-10 = 10
n(M∩E) = 10
∴M∪E = 20+10+10
= 40
Ajụjụ 18 Ripọtì
If x > 0, find the range of number x-3, 3x+2,x-1, 4x, 2x-1, x-2, 2x-2, 3x and 3x+1
Akọwa Nkọwa
x-3, 3x+2,x-1, 4x, 2x-1, x-2, 2x-2, 3x, 3x+1
Range = 3x+2 - (x-3)
= 3x+2 - x - 3
= 2x + 5
Ajụjụ 19 Ripọtì
In the diagram < OPQ is
Ajụjụ 20 Ripọtì
Evaluate ∫π2−π2cosxdx
Akọwa Nkọwa
∫π2−π2cosxdx=[sinx]π2−π2=sinπ2−sin−π2
= sin90 – sin-90
= sin90 – sin270
= 1 – (-1)
= 1+1
= 2
Ajụjụ 21 Ripọtì
The locus of a point equidistant from two points p(6,2) and R(4,2) is a perpendicular bisector of PR passing through
Akọwa Nkọwa
Ajụjụ 23 Ripọtì
The fifth term of an A.P is 24 and the eleventh term is 96. Find the first term.
Akọwa Nkọwa
U5 = 24, n = 5 and U11 = 96, n = 11
Un = a + (n-1)d
24 = a + (5-1)d imply 24 = a+4d .....eqn1
96 = a + (11-1)d imply 96 = a+10d ...eqn2
eqn1 - eqn2 -72 = -6d
d = 72/6 = 12
but 24 = a+4d
24 = a + 4(12)
24 = a + 48
a = 24-48
a = -24
Ajụjụ 24 Ripọtì
Find the gradient of a line which is perpendicular to the line with the equation 3x + 2y + 1 = 0
Akọwa Nkọwa
3X + 2Y + 1 = 0
2Y = -3X - 1
−32X−12
Gradient of 3X + 2Y +1 = 0 is -3/2
Gradient of a line perpendicular to 3X + 2Y + 1 = 0
=−1÷32=−1×−23=23
Ajụjụ 25 Ripọtì
If 1+√21−√2
is expressed in the form of x+y√2 find the values of x and y
Akọwa Nkọwa
Ajụjụ 26 Ripọtì
calculate the simple interest on N6,500 for 8 years at 5% per annum.
Ajụjụ 27 Ripọtì
Find the mean deviation of 2, 4, 5, and 9
Ajụjụ 29 Ripọtì
Find the area of the figure given
Akọwa Nkọwa
Area of semicircle + Area of rectangle
A = 12πr2 + LB
A = 12×2277×(52)2+(15×5)
= 12×227×254+75
A = 27528+751
275+210028=237528
A = 84.8cm2
Ajụjụ 30 Ripọtì
Find the range of values of x which satisfy the inequalities 4x - 7 ≤ 3x and 3x - 4 ≤ 4x
Akọwa Nkọwa
4X - 7 ≤
3X and 3X - 4 ≤
4X
4X - 3X ≤
7 and 3X - 4X ≤
4
X ≤
7 and -X ≤
4 = X ≥
-4
Range -4 ≤
x ≤
7
Ajụjụ 31 Ripọtì
In the diagram, find the size of the angle marked ao
Akọwa Nkọwa
2 x s = 280o(Angle at centre = 2 x < at circum)
S = 280o2
= 140
< O = 360 - 280 = 80o
60 + 80 + 140 + a = 360o
(< in a quad); 280 = a = 360
a = 360 - 280
a = 80o
Ajụjụ 32 Ripọtì
In how many ways can the letters of the word ACCEPTANCE be arranged?
Akọwa Nkọwa
ACCEPTANCE = 10 Letters
A = 2 letters
C = 3 letters
E = 2 letters
Can be arranged in 10! / (2!3!2!) ways
Ajụjụ 33 Ripọtì
Differentiate sin x - x cos x
Akọwa Nkọwa
sin x - x cos x
dy/dx = cos x - [1.cos x + x -sin x]
= co x - [cos x - x sin x]
= cos x - cos x + x sin x
= x sin x
Ajụjụ 34 Ripọtì
Factorize complete;y (4x+3y)2 - (3x-2y)2
Akọwa Nkọwa
(4x+3y)2 - (3x-2y)2
(4x+3y+3x-2y)(4x+3y-(3x-2y))
(4x+3y+3x-2y)(4x+3y-3x+2y)
(x+5y)(7x+y)
Ajụjụ 36 Ripọtì
The result of rolling a fair die 150 times is ass summarized in the table above. What is the probability of obtaining a 5
Akọwa Nkọwa
Total possible outcome
12+18+x+30+2x+45 = 105+3x
∴105+3x = 150
3x = 150-105
3x = 45
x = 15
P(obtaining 5) =2x(105+3x)Butx=15=2(15)(105+3(15))=30(105+45)=30150=15
Ajụjụ 38 Ripọtì
If logx1/264 = 3, find the value of x
Akọwa Nkọwa
If logx1/264 = 3
(X 1/2)3 = 64
(X 1/2)3 = 4 3
X 1/2 = 4
X = 42
X = 16
Ajụjụ 39 Ripọtì
If X = {n2 + 1:n = 0,2,3} and Y = {n+1:n=2,3,5}, find X∩Y.
Ajụjụ 40 Ripọtì
The probability of picking a letter T fr4om the word OBSTRUCTION is
Akọwa Nkọwa
OBSTRUCTION
Total possible outcome = 11
Number of chance of getting T = 2
P(picking T) = 2/11
Ajụjụ 41 Ripọtì
Evaluate (38÷12+12)(18×23+13)
Akọwa Nkọwa
Ajụjụ 42 Ripọtì
Find the area of the figure above
[π = 22/7]
Akọwa Nkọwa
Area of the figure = Area of rect + area of semi circle
=L×h+12πr25×15+12×227×(52)2=75+(22×25)2×7=75+92328=84.8cm
Ajụjụ 43 Ripọtì
The cost of kerosine per liter increase from N60 to N85. What is the percentage rate of increase?
Akọwa Nkọwa
N85 - N60 = N25 increase
∴ percentage increase =2560×1001=1253=41.67%=42%
Ajụjụ 44 Ripọtì
What is the mean of the data t, 2t-1, t-2, 2t-1, 4t and 2t+2?
Akọwa Nkọwa
Ajụjụ 45 Ripọtì
The result of rolling a fair die 150 times is as summarized in the table given.
Number123456Frequency1218x302x45
What is the probability of obtaining a 5?
Akọwa Nkọwa
Number123456Frequency1218x302x45
12 + 18 + x + 30 + 2x + 45 = 150
3x + 105 = 150
3x = 150 - 105
3x = 45
x = 453
x = 15
probability of 5 = 30150
= 15
Ajụjụ 46 Ripọtì
The solution of the quadratic inequality (x2 + x - 12) ≥ 0 is
Akọwa Nkọwa
(x2 + x - 12) ≥
0 , (x - 3)(x + 4) ≥
0
For the condition to hold, each of (x - 3) and (x + 4) must be of the same sign
.i.e. x - 3 ≥
0 and x + 4 ≥
0
or x - 3≤
0 and x + 4 ≤
0
when x ≥
3, the condition is satisfied
when x ≥
-4, the condition is not satisfied.
when x ≤
3, the condition is not satisfied
when x ≤
-4 , the condition is not satisfied. Thus, the solution of the inequality is x ≥
3 or x ≤
-4 ,
Ajụjụ 47 Ripọtì
Find the median of 4, 1, 4, 1, 0, 4, 4, 2 and 0
Akọwa Nkọwa
Arrange in ascending order:
0, 0, 1, 1, 2, 4, 4, 4, 4
Position of median = N+1 / 2 = 9+1 / 2 = 5th
Median = 2
Ajụjụ 48 Ripọtì
In the diagram above ∠OPQ is
Akọwa Nkọwa
a = a(base ∠s of Iss Δ)
∴ a+a+74 = 180
2a + 74 = 180
2a = 180-74
2a = 106
a = 53
∴∠OPQ = 53∘
Ajụjụ 49 Ripọtì
If 2x2 - kx - 12 is divisible by x-4, Find the value of k.
Akọwa Nkọwa
2x2 - kx - 12 is divisible by x-4
implies x is a factor ∴ x = 4
f(4) implies 2(4)2 - k(4) - 12 = 0
32 - 4k - 12 = 0
-4k + 20 = 0
-4k = -20
k = 5
