Answer:
The present age of Sam is 20 years .
Step-by-step explanation:
Given as :
Let The age of John = J years
Let The age of Sam = S years
∵ Sam is 12 years older than John
so, The age of Sam = 12 + The age of John
i.e S = 12 + J .....1
Again
Before 5 years ago
The age of Sam = 5 times age of John
So, (S - 5) = 5 × (J - 5)
Or, S - 5 = 5 J - 25
Or, 5 J - S = 25 - 5
Or, 5 J - S = 20 .........2
Solving eq 1 and eq 2
[5 J - (12 + J)] = 20
Or, 5 J - 12 - J = 20
Or, 4 J = 20 + 12
Or, 4 J = 32
∴ J = [tex]\frac{32}{4}[/tex]
i.e J = 8 years
So, The age of John = J = 8 years
Put The value of J into eq 1
∵ S = 12 + J
So, S = 12 + 8
i.e S = 20 years
So, The present age of Sam = S = 20 years .
Hence, The present age of Sam is 20 years . Answer
Answer:
Sam is 20 years old now.
Step-by-step explanation:
Given:
Sam is 12 years older than John.
For the last four years, Sam and John have been friends.
Five years ago, Sam was 5 times as old as John.
Now, to find the age of Sam now.
Let the age of Sam be [tex]x.[/tex]
And the age of John be [tex]y.[/tex]
As, Sam is 12 years older than John.
Thus, [tex]x=12+y[/tex] .....( 1 )
Now, to get the age:
According to question:
[tex]x-5=5(y-5)[/tex]
[tex]x-5=5y-25[/tex]
[tex]x=5y-20[/tex] .....( 2 )
Now, substituting the value of equation (1) in equation (2) we get:
[tex]12+y=5y-20[/tex]
Getting the variables in one side and numbers on the other we get:
[tex]12+20=5y-y[/tex]
[tex]32=4y[/tex]
Dividing both sides by 4 we get:
[tex]8=y[/tex]
[tex]y=8.[/tex]
The age of John = 8 years.
Now, putting the value of [tex]y[/tex] in equation (1) we get:
[tex]x=12+y[/tex]
[tex]x=12+8\\x=20.[/tex]
Age of Sam = 20 years.
Therefore, Sam is 20 years old now.
