Question
In the question, two Quantities I and II are given. You
have to solve both the Quantity to establish the correct relation between Quantity-I and Quantity-II and choose the correct option. Quantity-I: Average present age of 'Akash', 'Binod' and 'Charu' is 19 years. Three years ago from now, sum of ages of 'Akash' and Binod' was 34 years. Find the age of 'Charu' four years hence from now. Quantity-II: 22 yearsSolution
ATQ,
Quantity I:
Sum of present ages of 'Akash’ and 'Binod' = 34 + 2 X 3 = 34 + 6 = 40 years
Present age of 'Charu' = 3 X 19 - 40 = 17 years
So, age of 'Charu' 4 years hence from now = 17 + 4 = 21 years
So, Quantity I = 21 years
Quantity II:
Quantity II = 22 years
Therefore, Quantity-I < Quantity-II
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