Solution :
Let x and y be the ages of Ani and Biju respectively. Then,
According to Question,
x + y = \(\pm 3\)
Dharam’s age = 2x, and Cathy’s age = \(y\over 2\)
Clearly, Dharam is older than Cathy.
So, 2x – \(y\over 2\) = 30
\(\implies\) 4x – y = 60
Thus, we have these two linear equations,
x – y = 3 …….(1)
4x – y = 60 ……….(2)
or x – y = -3 ……..(3)
4x – y = 60 ……..(4)
On Subtracting equation (2) from (1), we get
-3x = -57 \(\implies\) x = 19
Put the value of x = 19 in equation (1), we get
19 – y = 3 \(\implies\) y = 16
Now, On Subtracting equation (3) from (4), we get
3x = 63 \(\implies\) x = 21
Put the value of x = 21 in equation (3), we get
21 – y = – 3 \(\implies\) y = 24
Hence, Ani’s age is 19 years and Biju’s is 16 years
or Ani’s age is 21 years and Biju’s age is 24 years
