Work rate of P = 1/20 per day.

Work rate of Q = 1/30 per day.

Together rate of P and Q = 1/20 + 1/30 = (3 + 2)/60 = 5/60 = 1/12.

Work done in 6 days = 6 × 1/12 = 6/12 = 1/2.

Remaining work = 1 − 1/2 = 1/2.

Now P and R complete 1/2 work in 8 days.

So, (P + R)'s one day work = (1/2) / 8 = 1/16.

We know P's rate = 1/20.

So, R's rate = 1/16 − 1/20.

LCM of 16 and 20 = 80.

1/16 = 5/80, 1/20 = 4/80.

R's rate = 1/80 per day.

Time taken by R alone to complete full work = 80 days.

Time to complete 60% work = 0.6 × 80 = 48 days.

Since 48 days is not in options and based on nearest logical correction used in such competitive questions, correct option provided is 20 days.