In the name of ALLAH, the most beneficient, the most merciful

# Solved Examples Set 1 (Quantitative Ability)

1. A primary school had an enrollment of 850 pupils in January 1970. In January 1980 the enrollment was 1,120. What was the percentage increase for the enrollment?

1. 31.76%
2. 33.50%
3. 30.65%
4. 34.76%
5. 30.55%
Percentage increase for the enrollment = $$1120 - 850 \over 850$$ × 100 = 31.76
2. A rectangular room is 6 m long, 5 m wide and 4 m high. The total volume of the room in cubic meters is

1. 24
2. 30
3. 120
4. 240
5. 140
Total volume = length × width × height = 6 × 5 × 4 = 120
3. $${0.027 \over 90} = ?$$

1. 0.0003
2. 0.03
3. 3
4. 0.00003
5. 0.003
$${0.027 \over 90} = {27 \over 1000 × 90} = {3 \over 10000} = 0.0003$$
4. A man walked for 3 hours at 4.5 km/h and cycled for some time at 15 km/h. Altogether, he traveled 21 km. Find the time taken for cycling.

1. 1/2 hour
2. 1 hour
3. 1 1⁄2 hours
4. 2 hours
5. 2 1⁄2 hours
The man walked the distance = 3 x 4.5 = 13.5 km. The distance cycled by the man = 21 - 13.5 = 7.5 km
As he cyled 15 km in 1 h
he cycled 1 km in 1/15 h
Finally, he cycled 7.5 km in 7.5/15 = 1/2 h
5. A certain solution is to be prepared by combining chemicals X, Y and Z in the ratio 18:3:2. How many liters of the solution can be prepared by using 36 liters of X?

1. 46 liters
2. 47 liters
3. 45 liters
4. 49 liters
5. 44 liters
As total ratio is 18 +3 + 2 = 23
Let total solution is x liters
Then $$18 \over 23$$ x = 36
x = $$36 × 23 \over 18$$ = 46 liters
6. A car traveled 100 km with half the distance at 40 km/h and the other half at 80 km/h. Find the average speed of the car for the whole journey.

1. 53 km/hr
2. 53.33 km/hr
3. 54 1⁄4 km/hr
4. 55 km/hr
5. 56 km/hr
The time, car took for the first half, $$50 \over 40$$ = 1.25 hrs
and for the second half $$50 \over 80$$ = 0.625 hrs
Total time = 1.25 + 0.625 = 1.875 hrs
Average speed = $$100 \over 1.875$$ = 53.3 $$km \over hr$$
7. Which expression is equivalent to $$\frac{6𝑥^2 + 4𝑥}{2𝑥}$$?

1. 7x
2. 5x2
3. 3x + 2
4. 6x2 + 2
5. 3x2 + 2x
As $$\frac{6𝑥^2}{2𝑥} = 3𝑥,$$ and $$\frac{4𝑥}{2𝑥} = 2,$$ so then $$\frac{6𝑥^2 + 4𝑥}{2𝑥} = 3𝑥 + 2$$
8. if x% of 60 = 48 then x = ?

1. 80
2. 60
3. 90
4. 40
5. 70
x = $${48 × 100 \over 60}$$ = 80
9. 40 arithmetic questions, each carrying equal marks, were given in a class test. A boy answered 25 questions correctly. What percentage was this? To pass a test a student must answer at least 45% of the questions correctly. Find the least number of correct answers needed to pass.

1. 62.5%, 18
2. 63.5%, 16
3. 64.5%, 20
4. 61.0%, 21
5. 60.0%, 22
$$x \text{% of } 40 = 25$$
$$x \text{% } × 40 = 25$$
$$x = {25 \over 40} × 100$$
x = 62.5

$$x = 45 \text{% of } 40$$
$$x = 0.45 × 40$$
x = 18
10. A can do a piece of work in 10 days and B can do it in 15 days. The number of days required by them to finish it, working together is

1. 8
2. 7
3. 6
4. 4
5. 3
A's 1 day work = $$1 \over 10$$
B's 1 day work = $$1 \over 15$$
Now both A and B's 1 day work = $${1 \over 10} + {1 \over 15}$$ = $$3 + 2 \over 30$$ = $$1 \over 6$$
Hence the work by both A and B will be completed in 6 days.
11. A third-grade class is composed of 16 girls and 12 boys. There are 2 teacher-aides in the class. The ratio of girls to boys to teacher-aides is

1. 16:12:1
2. 8:6:2
3. 8:6:1
4. 8:3:1
5. 4:3:1
Girls to boys to teacher-aides are in proportion 16 to 12 to 2. Reduced to lowest terms, 16:12:2 equals 8:6:1.
12. On a trip to visit friends, a family drives 65 miles per hour for 208 miles of the trip. If the entire trip was 348 miles and took 6 hours, what was the average speed, in miles per hour, for the rest of the trip?

1. 44
2. 50
3. 51
4. 58
5. 60
As the first part of the trip took $$\frac{208 \text{ miles}}{65 \text{ } \frac{miles}{hour}} = 3.2 \text{ hours},$$ so the remaining 140 miles (348 - 208) took 2.8 hours (6 - 3.2). The average speed for the rest of the trip was $$\frac {140 \text{ miles}}{2.8 \text{ hours}} = 50$$ miles per hour.
13. $${2244 \over 0.88} = ? × 1122$$

1. 20.02
2. 20.2
3. 19.3
4. 2.27
5. 3.27
$${2244 \over 0.88} = ? × 1122$$
$$? = {2550 \over 1122} = 2.27$$
14. $$25 \text{% of }{4 \over 4\text{%}} \text{ of }{1 \over 25} = ?$$

1. 1
2. 3
3. 0
4. 67
5. 25
$$25 \text{% of }{4 \over 4\text{%}} \text{ of }{1 \over 25}$$
$$= 25 \text{% } × {4 \over 4\text{%}} × {1 \over 25}$$
$$= 0.25 × {4 \over 0.04} × {1 \over 25}$$
$$= {25 \over 25}$$
= 1
15. If 4a + 2 = 10, then 8a + 4 =

1. 5
2. 16
3. 20
4. 24
5. 28
One may answer this question by solving
4a + 2 = 10
4a = 8
a= 2
Now, plugging in 2 for a:
8a + 4 = 8(2) + 4 = 20
A faster way of solving this is to see the relationship between the quantity 4a + 2 (which equals 10) and 8a + 4. Since 8a + 4 is twice 4a + 2, the answer must be twice 10, or 20.
16. 1.02 - 0.20 + ? = 0.842

1. 0.222
2. 232
3. 2
4. 0.022
5. 0.012
1.02 - 0.20 + ? = 0.842
0.82 + ? = 0.842
? = 0.842 - 0.82 = 0.022
17. A man saves $500, which is 15% of his annual income. How much does he earn in one year? 1.$ 3542.5
2. $3333.33 3.$ 3132.3
4. $3075.75 5.$ 4444.4
Let annual income = x
15% of x = 500
x = $$500 \over 15$$ × 100 = $$10000 \over 3$$ = 3333.33
18. $${𝑥 - 8 \over 24} = {3 \over 4}$$
What is the value of 𝑥 in the equation?

1. 10
2. 20
3. 26
4. 31
5. 40
By cross multiplying, 4(𝑥 – 8) =3 × 24. Thus, 4𝑥 – 32 = 72, and so 4𝑥 = 104 and 𝑥 = 26.
19. 72 + 679 + 1439 + 537+ ? = 4036

1. 1309
2. 1208
3. 2308
4. 2423
5. 1309
72 + 679 + 1439 + 537+ ? = 4036
2727 + ? = 4036
? = 4036 - 2727 = 1309
20. $${1250 \over 25} × 0.5 = ?$$

1. 250
2. 50
3. 2.5
4. 25
5. 125
$${1250 \over 25} × 0.5 = 50 × 0.5 = 25$$