Question: 1 -
Present ages of Sameer and Anand are in the ratio of 5 : 4 respectively. Three years hence, the ratio of their ages will become 11 : 9 respectively. What is Anand's present age in years?
-
None of these
-
40
-
24
-
27
Answer:
24
Solution:
Let the present ages of Sameer and Anand be 5x years and 4x years respectively.
Then,
5x + 3
=
11
4x + 3
9
9(5x + 3) = 11(4x + 3)
45x + 27 = 44x + 33
45x - 44x = 33 - 27
x = 6.
Anand's present age = 4x = 24 years.
Let the present ages of Sameer and Anand be 5x years and 4x years respectively.
Then, | 5x + 3 | = | 11 |
4x + 3 | 9 |
9(5x + 3) = 11(4x + 3)
45x + 27 = 44x + 33
45x - 44x = 33 - 27
x = 6.
Anand's present age = 4x = 24 years.
Question: 2 -
Father is aged three times more than his son Ronit. After 8 years, he would be two and a half times of Ronit's age. After further 8 years, how many times would he be of Ronit's age?
-
11/4times
-
3 times
-
2 times
-
5/2times
Answer:
2 times
Solution:
Let Ronit's present age be x years. Then, father's present age =(x + 3x) years = 4x years.
(4x + 8) =
5
(x + 8)
2
8x + 16 = 5x + 40
3x = 24
x = 8.
Hence, required ratio =
(4x + 16)
=
48
= 2.
(x + 16)
24
Let Ronit's present age be x years. Then, father's present age =(x + 3x) years = 4x years.
(4x + 8) = | 5 | (x + 8) | |
2 |
8x + 16 = 5x + 40
3x = 24
x = 8.
Hence, required ratio = | (4x + 16) | = | 48 | = 2. |
(x + 16) | 24 |
Question: 3 -
A is two years older than B who is twice as old as C. If the total of the ages of A, B and C be 27, then how old is B?
-
8
-
10
-
9
-
7
Answer:
10
Solution:
Let C's age be x years. Then, B's age = 2x years. A's age = (2x + 2) years.
(2x + 2) + 2x + x = 27
5x = 25
x = 5.
Hence, B's age = 2x = 10 years.
Let C's age be x years. Then, B's age = 2x years. A's age = (2x + 2) years.
(2x + 2) + 2x + x = 27
5x = 25
x = 5.
Hence, B's age = 2x = 10 years.
Question: 4 -
The sum of ages of 5 children born at the intervals of 3 years each is 50 years. What is the age of the youngest child?
-
None of these
-
8 years
-
10 years
-
4 years
Answer:
4 years
Solution:
Let the ages of children be x, (x + 3), (x + 6), (x + 9) and (x + 12) years.
Then, x + (x + 3) + (x + 6) + (x + 9) + (x + 12) = 50
5x = 20
x = 4.
Age of the youngest child = x = 4 years.
Let the ages of children be x, (x + 3), (x + 6), (x + 9) and (x + 12) years.
Then, x + (x + 3) + (x + 6) + (x + 9) + (x + 12) = 50
5x = 20
x = 4.
Age of the youngest child = x = 4 years.
Question: 5 -
A father said to his son, "I was as old as you are at the present at the time of your birth". If the father's age is 38 years now, the son's age five years back was:
-
19 years
-
33 years
-
38 years
-
14 years
Answer:
14 years
Solution:
Let the son's present age be x years. Then, (38 - x) = x
2x = 38.
x = 19.
Son's age 5 years back (19 - 5) = 14 years.
Let the son's present age be x years. Then, (38 - x) = x
2x = 38.
x = 19.
Son's age 5 years back (19 - 5) = 14 years.