2020 - JAMB Mathematics Past Questions and Answers - page 1
Evaluate (212)\(_3\) - (121)\(_3\) + (222)\(_3\)
(313)\(_3\)
(1000)\(_3\)
(1020)\(_3\)
(1222)\(_3\)
When working in base 3, the largest number is 2. Just like in base 10, whenever you get a sum of values up to 3, you write 0 and carry over 1 and added to the next digit.
Hence,
212
- 121
+ 222
= 1020
Ans: (1020)\(_3\)
Factorise (4a + 3) \(^2\) - (3a - 2)\(^2\)
(a + 1)(a + 5)
(a - 5)(7a - 1)
(a + 5)(7a + 1)
a(7a + 1)
The goal of factorization is to breakdown the given number into a simpler one. The result is usually two or more expressions that when multiplied gives the original number.
Recall that a\(^2\) - b\(^2\) = (a + b) (a - b)
Hence,
(4a + 3) \(^2\) - (3a - 2)\(^2\) => (a + b) (a - b)
= ([4a + 3] + [3a - 2])([4a + 3] + [3a - 2])
= (4a + 3 + 3a - 2)(4a + 3 - 3a + 2)
= (7a + 1)(a + 5)
= (a + 5) (7a + 1)
Ans: (a + 5) (7a + 1)
Find all median of the numbers 89, 141, 130, 161, 120, 131, 131, 100, 108 and 119
131
125
123
120
To find the median, we first arrange in ascending order:
89, 100, 108, 119, 120,130, 131, 131, 141, 161
Since there are even number of items, we take the avarage of the two middle items:
Median = \(\frac{120 + 130}{2}\) = 125
Find all real number x which satisfy the inequality \(\frac{1}{3}\) (x + 1) - 1 > \(\frac{1}{5}\)(x + 4)
x < 11
x < -1
x > 6
x > 11
What we need is a solution set that satisfies the given inequality. Each value in the solution set will satisfy the inequality and no other value will satisfy the inequality.
\(\frac{1}{3}\) (x + 1) - 1 > \(\frac{1}{5}\)(x + 4) = \(\frac{x + 1}{3} - 1\) > \(\frac{x + 4}{5}\)
\(\frac{x + 1}{3} - \frac{x + 4}{5} -1\) > 0
= \(\frac{5x + 5 - 3x - 12}{15}\)
2x - 7 > 15
2x > 22
Divide through by 2:
x > 11
Express each number in \(\frac{0.02174 \times 1.2047}{0.023789}\) to two significant figures and then evaluate
0
0.9
1.1
1.2
\(\frac{0.021741 \times 1.2047}{0.023789}\) = \(\frac{0.0255 \times 1.2}{0.024}\)
= \(\frac{0.0264}{0.024}\)
= 1.1
Four boys and ten girls can cut a field first in 5 hours. If the boys work at \(\frac{5}{4}\) the rate at which the girls work, how many boys will be needed to cut the field in 3 hours?
180
60
25
20
Let x = numbers of boys that can work at \(\frac{5}{4}\) the rate as 10 girls
Then,
1 hrs, x boys will work for \(\frac{\frac{1}{5} \times 10}{4}\)
x = \(\frac{5}{4}\) x 10
= 8 boys
This means that 8 boys will do the work of ten girls at the same rate
4 + 8 = 12 boys cut the field in 5 hrs for 3 hrs,
\(\frac{12 \times 5}{3}\) boys will be needed
= 20 boys.
What is the circumference of latitude 0\(^o\)S if R is the radius of the earth?
cos \(\theta\)
2\(\pi\)R cos \(\theta\)
R sin \(\theta\)
2 \(\pi\) r sin \(\theta\)
The circumference of latitude 0\(^o\)s = 2\(\pi\)r cos \(\theta\)
Where R is the radius of the earth, as given in the question.
A room is 12m long, 9m wide and 8m high. Find the cosine of the angle which a diagonal of the room makes with the floor of the room
\(\frac{15}{17}\)
\(\frac{8}{17}\)
\(\frac{8}{15}\)
\(\frac{12}{17}\)
- Draw a rectangle with edges ABCD to represent the floor.
- Draw a line from A to C, representing the diagonal of the floor
Use Pythagoras theorem to calculate the diagonal (AC):
AC\(^2\) = 144 + 81 = \(\sqrt{225}\)
AC = 15cm
Given that height(h) of room 8m, let's find the cosine of the angle which a diagonal of the room (EC) makes with the floor.
EC\(^2\) = AC\(^2\) + h\(^2\)
EC\(^2\) = 15\(^2\) + 8\(^2\)
\(\frac{adj}{Hyp} = \frac{15}{17}\)
EC\(^2\) = \(\sqrt{225 + 64}\)
EC = \(\sqrt{289}\)
EC = 17
\(Cos\theta\) = Adjacent/Hypoteneous
= 15/17
The goals scored by 40 football teams from three league divisions are recorded below
| No of goals | 0 | 1 | 2 | 3 | 4 | 5 | 6 |
| Frequency | 4 | 3 | 15 | 16 | 1 | 0 | 1 |
What is the total number of goals scored by all the teams?
21
40
91
96
\(\begin{array}{c|c|} x & F & Frequency(fx)\\ 0 & 4 & 0 \\ 1 & 3 & 3\\ 2 & 15 & 30 \\ 3 & 16 & 48\\ 4 & 1 & 4 \\ 5 & 0 & 0 \\ 6 & 1 & 6 \\ & \sum Fx = 91& \end{array}\)
\(\sum fx\) = 91
In a class of 150 students, the sector in a pie chart representing the students offering physics has angle 12\(^o\). How many students are offering physics?
18
15
10
5
Number of students offering physics are
\(\frac{12}{360}\) x 150
= 5