If Rs. 10 be allowed as true discount on a bill of Rs. 110 due at the end of a certain time. Then the discount allowed on the same sum due at the end of double the time is?

Required rate percent = (100 x 21) / {(161 - 21) x 2¹/₂} = 6%

? 1200/1016 = (100 + R x 5/2) / (100 + R x 7/12)
? 1200 x (100 + R x 7/12) = 1016 x (100 + R x 5/2)
? 3680 x R = 36800
? R = 10%
? Sum due = 1200 + S.I. on Rs. 1200 for 7 months at 10%. = Rs. 1270

SI on rupees 100 for 10 months at 6% per annum = (100 x 10 x 6)/(12 x 100) = Rs. 5.
? Amount = 100 + 5 = 105.
So true discount = 105 - 100 = Rs. 5

So If TD = 5 then sum due = 100
So, when TD = 26.25 the sum = (100 x 26.25) / 5 = Rs. 551.25

? 5 = {(3050 - 3000) / (3000 x T)} x 100
? T = 1/3 years = 4 months

Here sum is put on compound interest,
? P.W. = A / (1 + r / 100)ⁿ = 2420 / (1 + 10 / 100)² = 2420 x 100 / 121 = Rs. 2000
? T.D. = P.W. - P
? True discount = 2420 - 2000 = Rs. 420

S.P. = (102% of Rs. 600) = Rs. (102/100) x 600 = Rs. 612
? P.W. of Rs. 650.25 due 9 months later is Rs. 612.
? Rs. 38.25 is S.I. on Rs. 612 for 9 months
? Rate = (100 x 38.25) / (612 x 3/4)% = 8¹/₃%

R = (100 x T.D.) / (P.W. x T) = (100 x T.D.) / [(A - T.D.) x T]
= (100 x 60) / (1800 x 3) [ since P.W. = A - T.D.]
= 10%
? The rate per cent is 10% per annum

Since T.D. is S.I. on Rs. P.W.,
we have Rs. (810 - 750) or Rs. 60 as S.I. on Rs. 750 for 2 years
? Rate = (100 x 60) / (750 x 2) = 4%

P.W. of Rs. 901 due 9 months hence at 8%
= Rs { (100 x 901) / (100 + (8 x 3 / 4))} = Rs. (100 x 901) / 106
= Rs. 850

P.W. of Rs. 8285 due 6 months hence = Rs. { (100 x 8250) / {100 + (25 / 4 x 1 / 2)} } = Rs. 8000
? Rs. 8100 in cash is a better offer.