The ratio of the ages of two boys is 5 : 6. After two years the ratio will be 7 : 8. The ratio of their age after 12 years will be = ?
ক
15 : 16
খ
17 : 18
গ
11 : 12
ঘ
19 : 20
ব্যাখ্যা
Question: The ratio of the ages of two boys is 5 : 6. After two years the ratio will be 7 : 8. The ratio of their age after 12 years will be = ?
Solution: Ratio of ages of Boys A and B Present age 5x : 6x ∴ After two years their ages are (5x + 2) and (6x + 2).
According to the question, (5x + 2) : (6x + 2) = 7 : 8 ⇒ 40x + 16 = 42x + 14 ⇒ 2x = 2 ∴ x = 1
∴ Present age A = 5 × 1 = 5 ∴ Present age B = 6 × 1 = 6 After 12 years A = 5 + 12 = 17 After 12 years B = 6 + 12 = 18 ∴ A/B = 17/18
৪.
The ratio of three numbers is 3 : 4 : 5 and the sum of their squares is 1250. The sum of the numbers is-
ক
90
খ
65
গ
60
ঘ
30
ব্যাখ্যা
Question: The ratio of three numbers is 3 : 4 : 5 and the sum of their squares is 1250. The sum of the numbers is-
Solution: Let, the number be 3x, 4x, 5x
According to the question, (3x)2 + (4x)2 + (5x)2 = 1250 ⇒ 9x2 + 16x2 + 25x2 = 1250 ⇒ 50x2 = 1250 ⇒ x2 = 1250/50 ⇒ x2 = 25 ∴ x = 5
∴ The sum of the numbers = 3x + 4x + 5x = 12x = 12 × 5 = 60
৫.
In a school having roll strength 286, the ratio of boys and girls is 8 : 5. If 22 more girls get admitted into the school, the ratio of boys and girls becomes
ক
12 : 7
খ
4 : 3
গ
10 : 7
ঘ
8 : 7
ব্যাখ্যা
Question: In a school having roll strength 286, the ratio of boys and girls is 8 : 5. If 22 more girls get admitted into the school, the ratio of boys and girls becomes
Solution: Boys : girls = 8 : 5 Let, the boys = 8x, girl = 5x
According to the 1st condition, 8x + 5x = 286 ⇒ 13x = 286 ⇒ x = 286/13 ∴ x = 22 Boys = 8 × 22 = 176 and girls = 5 × 2 = 110
22 more girls get admitted then the number of girls become (5x + 22) = 110 + 22 = 132
Now, new ratio of boys and girls = 176 : 132 = 4 : 3
৬.
The cost of a table and a chair are in the ratio of 5 : 7. If the cost of a chair and table is increased by 20% and 10% respectively, then what will be the new ratio?
ক
16 : 27
খ
60 : 77
গ
55 : 84
ঘ
None of these
ব্যাখ্যা
Question: The cost of a table and a chair are in the ratio of 5 : 7. If the cost of a chair and table is increased by 20% and 10% respectively, then what will be the new ratio?
Solution: Let, the cost of the table and chair be Tk. 5x and Tk. 7x respectively.
New cost of chair = 120% of 7x = (120 × 7x)/100 = 42x/5
New cost of table = 110% of 5x = (110 × 5x)/100 = 55x/10
∴ New ratio = 55x/10 : 42x/5 = 55 : 84
৭.
Rana obtained an amount of Tk. 8376 as simple interest on a certain amount at 8 p.c.p.a. after 6 years. What is the amount invested by Rana?
ক
Tk. 18110
খ
Tk. 17180
গ
Tk. 17450
ঘ
Tk. 16450
ব্যাখ্যা
Question: Rana obtained an amount of Tk. 8376 as simple interest on a certain amount at 8 p.c.p.a. after 6 years. What is the amount invested by Rana?
Solution: Simple interest, I = Tk. 8376 Rate of interest, r = 8% Time, n = 6 years
We know, I = Pnr Or, P = I/nr = (8376 × 100)/(6 × 8) ∴ P = 17450 Tk.
৮.
If 0.75 : x :: 5 : 8, then x is equal to:
ক
1.25
খ
1.12
গ
1.2
ঘ
1.30
ব্যাখ্যা
Question: If 0.75 : x :: 5 : 8, then x is equal to:
Solution: 0.75 : x :: 5 : 8 ⇒ 0.75/x = 5/8 ⇒ 5x = 0.75 × 8 ⇒ 5x = 6 ⇒ x = 6/5 ∴ x = 1.2
৯.
A sum of money lent out at simple interest amounts to Tk. 720 after 2 years and Tk. 1020 after a further period of 5 years. Find the principal?
ক
Tk. 6000
খ
Tk. 620
গ
Tk. 600
ঘ
Tk. 120
ব্যাখ্যা
Question: A sum of money lent out at simple interest amounts to Tk. 720 after 2 years and Tk. 1020 after a further period of 5 years. Find the principal?
Solution: According to the question, Principal + Simple interest for 2 year = Tk. 720 ------------- (1) Principal + Simple interest for 7 year = Tk. 1020 ------------ (2)
Subtracting equation (1) from (2) Principal + Simple interest for 7 year = Tk. 1020 Principal + Simple interest for 2 year = Tk. 720 ∴ Simple interest for 5 years = Tk. 300 ⇒ Simple interest for 1 years = Tk. 300/5 ⇒ Simple interest for 1 years = Tk. 60 ⇒ Simple interest for 2 years = Tk. (60 × 2) ∴ Simple interest for 2 years = = Tk. 120
∴ Principal amount = (Amount after 2 years - 2 years Simple interest) ⇒ Principal amount = Tk. (720 - 120) ∴ Principal amount = Tk. 600
১০.
The price of 2 pencils is less than 20% of the price of a pen. What is the ratio of the price of a pen to that of a pencil?
ক
7 : 3
খ
5 : 2
গ
5 : 3
ঘ
None of these
ব্যাখ্যা
Question: The price of 2 pencils is less than 20% of the price of a pen. What is the ratio of the price of a pen to that of a pencil?
A sum of money at simple interest amounts to Tk. 721 in 3 years and to Tk. 754 in 4 years. The sum is-
ক
Tk. 622
খ
Tk. 655
গ
Tk. 755
ঘ
Tk. 645
ব্যাখ্যা
Question: A sum of money at simple interest amounts to Tk. 721 in 3 years and to Tk. 754 in 4 years. The sum is-
Solution: Simple interest for 1 year = Tk. (754 - 721) = Tk. 33
∴ Simple interest for 3 years = Tk.(33 × 3) = Tk. 99
∴ Sum = (721 - 99) = Tk. 622
১২.
Tk. 800 becomes Tk. 956 in 3 years at a certain rate of simple interest. If the rate of interest is increased by 4%. What amount will Tk. 800 become in 3 years?
ক
Tk. 852
খ
Tk. 1052
গ
Tk. 1152
ঘ
Tk. 1225
ব্যাখ্যা
Question: Tk. 800 becomes Tk. 956 in 3 years at a certain rate of simple interest. If the rate of interest is increased by 4%. What amount will Tk. 800 become in 3 years?
The ratio of third proportional to 12 and 30 and the mean proportional between 9 and 25 is-
ক
5 : 2
খ
3 : 2
গ
5 : 3
ঘ
5 : 1
ব্যাখ্যা
Question: The ratio of third proportional to 12 and 30 and the mean proportional between 9 and 25 is-
Solution: Let, the third proportional to 12 and 30 be x.
ATQ, 12 : 30 : : 30 : x ⇒ 12/30 = 30/x ⇒ 12x = 30 × 30 ⇒ x = (30 × 30)/12 ∴ x = 75
∴ Third proportional to 12 and 30 = 75. Mean proportional between 9 and 25 = √(9 × 25) = 15 ∴ Required ratio = 75/15 = 5 : 1 .
১৪.
An iron rod that weights 24 kg is cut into two pieces so that one of these pieces weights 16 kg and 34 m long. If the weight of each piece is proportional to its length, how long is the other one is-
ক
17 m
খ
21 m
গ
34 m
ঘ
68 m
ব্যাখ্যা
Question: An iron rod that weights 24 kg is cut into two pieces so that one of these pieces weights 16 kg and 34 m long. If the weight of each piece is proportional to its length, how long is the other one is-
Solution: Total weight = 24 kg 1st piece weight = 16 kg and length = 34 m 2nd piece weight = (24 - 16) kg = 8kg Let, length = x m
According to the question, 16 : 8 = 34 : x ⇒ 34/x = 16/8 ⇒ 34/x = 2 ⇒ 2x = 34 ∴ x = 17
১৫.
What annual rate was paid if Tk. 50000 earned Tk. 3000 in interest in two years?
ক
12%
খ
9%
গ
6%
ঘ
3%
ব্যাখ্যা
Question: What annual rate was paid if Tk. 50000 earned Tk. 3000 in interest in two years?
Solution: Tk. 50000 earned in 2 years Tk. 3000 ∴ Tk. 100 earned in 1 year Tk. (3000 × 100)/(50000 × 2) = 3%
১৬.
Find the number in the place of sign `?'.
ক
9
খ
21
গ
27
ঘ
81
ব্যাখ্যা
Question: Find the number in the place of sign `?'.
Solution: Let, the number be x So, 9/x = x/81 ⇒ x2 = 81 × 9 ⇒ x2 = 729 ⇒ x2 = 272 ∴ x = 27
১৭.
If two times X is equal to three times of Y and also equal to four times of Z, then X : Y : Z is -
ক
4 : 6 : 3
খ
2 : 3 : 4
গ
6 : 4 : 3
ঘ
3 : 4 : 2
ব্যাখ্যা
Question: If two times X is equal to three times of Y and also equal to four times of Z, then X : Y : Z is -
Solution: 2X = 3Y Or, Y = 2X/3 and 2X = 4Z Or, Z = X/2
Hence, X : Y : Z = X : 2X/3 : X/2 = 1 : 2/3 : 1/2 = 6 : 4 : 3
১৮.
Last year, the ratio between the salaries of A and B was 3 : 4. But the ratios of their individual salaries between last year and this year were 4 : 5 and 2 : 3 respectively. If the sum of their present salaries is Tk. 4160, then how much is the salary of A now?
ক
Tk.1200
খ
Tk.1400
গ
Tk.1600
ঘ
Tk.1800
ব্যাখ্যা
Question: Last year, the ratio between the salaries of A and B was 3 : 4. But the ratios of their individual salaries between last year and this year were 4 : 5 and 2 : 3 respectively. If the sum of their present salaries is Tk. 4160, then how much is the salary of A now?
Solution: Let, the salaries of A and B last year be Tk. 3x and Tk. 4x respectively. Then, A's present salary = Tk. (5/4) × 3x = Tk. 15x/4
B's present salary = Tk.(3/2) × 4x = Tk. 6x.
According to the question, (15x/4) + 6x = 4160 ⇒ 39x = 4160 × 4 ⇒ x = (4160 × 4)/39
The average of two numbers is 62. If 2 is added to the smaller number, the ratio between the numbers becomes 1 : 2. The larger number is -
ক
82
খ
80
গ
84
ঘ
48
ব্যাখ্যা
Question: The average of the two numbers is 62. If 2 is added to the smaller number, the ratio between the numbers becomes 1 : 2. The larger number is -
Solution: Let, smaller number is x, The larger number is y.
∴ (x + y)/2 = 62 ⇒ x + y = 62 × 2 ⇒ x + y = 124 ∴ x = 124 - y .............. (1)
ATQ, (x + 2)/y = 1/2 ⇒ 2(x + 2) = y ⇒ y = 2x + 4 ⇒ y = 2(124 - y) + 4 ⇒ y = 248 - 2y + 4 ⇒ 3y = 252 ⇒ y = 252/3 ∴ x = 84