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Questions
The sum of father’s age and twice the age of his son is 70. If we double the age of the father and add it to the age of his son the sum is 95. Find their present ages.
If twice the son’s age in years is added to the father’s age, the sum is 70. But, if twice the father's age is added to the son’s age, the sum is 95. Find the ages of father and son.
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Solution
Let the father’s age be x years and son’s age be y years.
Sum of father’s age and twice the age of his son is 70 so,
x + 2y = 70 ...(I)
Double the age of the father added to the age of his son the sum is 95.
2x + y = 95 ...(II)
Adding (I) and (II), we get,
\[\begin{array}{l}
\phantom{\texttt{0}}\texttt{ x + 2y = 70}\\
\phantom{\texttt{}}\texttt{+ 2x + y = 95}\\\hline \end{array}\]
∴ 3x + 3y = 165
Dividing by 3,
x + y = 55 ...(III)
\phantom{\texttt{0}}\texttt{ x + 2y = 70}\\
\phantom{\texttt{}}\texttt{- 2x + y = 95}\\
\hline\phantom{\texttt{}}\texttt{ (-) (-) (-)}\\
\hline \end{array}\]
∴ – x + y = – 25
∴ x – y = 25 ...(IV)
Adding (III) and (IV), we get,
\phantom{\texttt{0}}\texttt{ x + y = 55}\\
\phantom{\texttt{}}\texttt{+ x – y = 25}\\\hline \end{array}\]
∴ 2x = 80
∴ x = 40
Putting the value of x = 40 in equation (III),
x + y = 55
∴ 40 + y = 55
∴ y = 55 – 40
∴ y = 15
