Question

father's age is three times the sum of age of his two children. after 5 year his age will be twice the sum of age of two children. find the age of father

Answer 1

Given that Father's age is three times the age of his two sons. Now, it is also given, after 5 years, his age will be twice the sum of the ages of his son. Therfore, after 5 years age of father will be 3(x+y)+5 and age of the sons will be x+5 and y+5. Thus the age of the father is 45.

Answer 2

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$\bold{\Huge\red{\boxed{{{Answer}}}}}$

✒ Age is father is 45 years

$\bold{\Huge\blue{\boxed{{{Given}}}}}$

✒ Father's age is three times the sum of ages of his two children.

✒ After 5 years, his age will be twice the sum of ages of two children.

$\bold{\Huge\pink{\boxed{{{To\: Find}}}}}$

✒ Age of Father = ?

$\bold{\huge\green{\boxed{{{Explanation}}}}}$

✏ let the age of father to be 'x' year.

✏ let the age of father to be 'x' year.✏ let the age of his 2 sons to be 'y' year.

So,

$\boxed{=> x = 3y .........(1)}$

⭐ Now, A.T.Q (After 5 years, his age will be twice the sum of ages of two children.)

✏ Age of father

$\boxed {\bold{= (x + 5) \: years}}$

✏ Sum of age of his two sons = [ y + 2(5) ]

$\boxed{ \bold{= (y + 10) years}}$

⭐ Now Again, A.T.Q (After 5 years, his age will be twice the sum of ages of two children.)

$\boxed{=> x + 5 = 2}$

$\boxed{=> x + 5 = 2y + 20}$

$\boxed{=> x - 2y = 15 .............(2)}$

Now,

⭐ From equation (1) and (2)

✏ Putting the value of equation (1) and (2) we get,

$\boxed{=> 3y - 2y = 15}$

$\boxed{=> y = 15 }$

✏ Putting the value of (y = 15) equation (1) we get,

$\boxed{=> x = 3(15)}$

$\boxed{=> x = 45}$

Hence, the age of father is 45 years.

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