A father is three times old as his son. Six years ago, he was five times as old as his son. Find their current age

Question

Mathematics

Karly Barajas

24 April, 04:38

A father is three times old as his son. Six years ago, he was five times as old as his son. Find their current age

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Answers (2)

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Sullivan Riggs · Answer 1

Answer : son is 12 years, and the father is 36 years.

Step-by-step explanation : Define F as fathers age and S as sons age right now.

Then now they are

(1) 3S = F

and six years ago they were

(2) 5 * (S-6) = F-6

calculate 5 * (S-6)

5S - 30 = F-6

Subtract left and right side by - F

Add 30 to left and right side

5S - F = 24

Put (2) 3S = F into the equation above

5S - 3S = 24

2S = 24

S = 12

insert result in (2) 3S = F

3*12 = F

36 = F

So the son is 12 years, and the father is 36 years.

Keagan Norris · Answer 2

The son is 12 years, and the father is 36 years.

Step-by-step explanation:

Define F as fathers age and S as sons age right now.

Then now they are

(1) 3S = F

and six years ago they were

(2) 5 * (S-6) = F-6

calculate 5 * (S-6)

5S - 30 = F-6

Subtract left and right side by - F

Add 30 to left and right side

5S - F = 24

Put (2) 3S = F into the equation above

5S - 3S = 24

2S = 24

S = 12

insert result in (2) 3S = F

3*12 = F

36 = F

So the son is 12 years, and the father is 36 years.