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Age of John’s father is three times the age of John. Five years ago, age of father was four times John’s age at that time. Find their present ages. Ans. Father’s age :- 45 yrs.  John’s age :- 15 yrs. B

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Let John's age be represented as 'x' years, and his father's age be represented as 'y' years.

Given conditions:

John's father is three times the age of John: y = 3x.
Five years ago, the father's age was four times John's age at that time: (y - 5) = 4(x - 5).
We'll solve the system of equations to find their present ages.

Substitute y = 3x from the first condition into the second condition:
(3x - 5) = 4(x - 5).

Expand and simplify the equation:
3x - 5 = 4x - 20.

Move all the terms involving 'x' to one side of the equation:
3x - 4x = -20 + 5.

Simplify:
-x = -15.

Multiply both sides of the equation by -1:
x = 15.

Substitute x = 15 into the first equation to find the father's age:
y = 3(15) = 45.

Therefore, the present age of John is 15 years, and the present age of his father is 45 years.

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