Math, asked by rahahul4954, 1 year ago

On a ruler's tombstone, it is said that one sixth of his life was spent in childhood and one twelfth as a teenager. One seventh of his life passed between the time he became an adult and the time he married; five years later, his son was born. Alas, the son died four years before he did. He lived to be twice as old as his son did. How old did the ruler live to be ?
A) 84 years
B) 72 years
C) 82 years
D) 64 years

Answers

Answered by Anonymous
1
Hey mate ^_^

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Answer:
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Let the age of ruler is x so that of son =  \frac{x}{2}

(Given)

Now according to the given condition:

x = ( \frac{x}{6} ) + ( \frac{x}{12} ) + ( \frac{x}{7} ) + 5 + ( \frac{x}{2} ) + 4

x = ( \frac{14x}{84} ) + ( \frac{7x}{84} ) + ( \frac{12x}{84} ) + ( \frac{42x}{84} ) + 9

x = ( \frac{75x}{84} ) + 9

 9 = ( \frac{84x}{84} ) - ( \frac{75x}{84} )

9 = ( \frac{9x}{84} )

1 = ( \frac{x}{84} )

84 = x

Therefore,

Correct option A) 84 Years.

#Be Brainly❤️
Answered by Anonymous
3
Q:

On a ruler's tombstone, it is said that one sixth of his life was spent in childhood and one twelfth as a teenager. One seventh of his life passed between the time he became an adult and the time he married; five years later, his son was born. Alas, the son died four years before he did. He lived to be twice as old as his son did. How old did the ruler live to be ?

A) 84 yearsB) 72 yearsC) 82 yearsD) 64 years

Answer:   A) 84 years 

Explanation:

Let the age of ruler is x so that of son = x/2 (given)

Now according to the given condition 
(x/6) + (x/12) + (x/7) + 5 + (x/2) + 4 = x
=> x = 84

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