Solution:Let total amount of work ‘P’ = 20(5x + 3) units {LCM of 20 and (5x + 3)}
Efficiency of Ramesh = 20(5x + 3)/(5x + 3) = 20 units per day
Efficiency of Suresh = 20(5x + 3)/20 = (5x + 3) units per day
Since, Ramesh and Suresh together alternately worked for (4x + (24/7)) days
So, Ramesh worked for (2x + 2) days and Suresh worked for (2x + (10/7)) days
So, 20(2x + 2) + (5x + 3)(2x + (10/7)) = 20(5x + 3)
70x² - 328x - 110 = 0
70x² - 350x + 22x - 110 = 0
(70x + 22)(x - 5) = 0
x = 5 or x = -(22/70) {not possible}
So, x = 5
For Mahesh, Mukesh and Manish:
Time taken by Mahesh and Mukesh together to complete the work = x + y = (y + 5) days
Let total amount of work ‘Q’ = (y + 5)(y + 6) units
Efficiency of Mahesh and Mukesh together
= {(y + 5)(y + 6)}/(y + 5) = (y + 6) units per day
Similarly, efficiency of Mukesh and Manish together
= {(y + 5)(y + 6)}/(y + 6) = (y + 5) units per day
ATQ;
Amount of work ‘Q’ completed by Mahesh and Mukesh together in 3(x - 2 = 5 - 2) days = 3(y + 6) units
Amount of work ‘Q’ completed by Mukesh and Manish together in ‘y + 1’ (y + 4 - 3) days = (y + 1)(y + 5) units
Amount of work ‘Q’ left = (y + 5)(y + 6) - 3(y + 6) - (y + 1)(y + 5) = (2y + 7) units
So, Time taken by Manish to complete (2y + 7) units of work
= {(8y + 13)/6} - (y + 1) = (2y + 7)/6 days
So, efficiency of Manish = {(2y + 7)}/{((2y + 7)/6)} = 6 units per day
So, {(y + 5)(y + 6)}/{(y + 11)} = 6
y² + 5y - 36 = 0
y² + 9y - 4y - 36 = 0
y(y + 9) - 4(y + 9) = 0
(y + 9)(y - 4) = 0
y = 4 or y = -9 (not possible)
Efficiency of Mukesh = y + 5 - 6 = 4 + 5 - 6 = 3 units per day
Efficiency of Mahesh = y + 6 - 3 = 4 + 3 = 7 units per day
For Suresh:
Total work = 20 × (5x + 3) = 20 × (5 × 5 + 3) = 560 units
Efficiency = 5x + 3 = 5 × 5 + 3 = 28 units per day
Desired time = (0.75 × 560)/28 = 15 days
Hence, option a.
