IMPORTANT CONCEPTS
Suppose a man has to pay Rs. 156 after 4 years and the
rate of interest is 14% per annum. Clearly, Rs. 100 at 14% will amount to Rs.
156 in 4 years. So, the payment of Rs. 100 now will clear off the debt of Rs.
156 due 4 years hence. We say that:
Sum due = Rs. 156 due 4 years hence;
Present
Worth (P.W.) = Rs. 100;
True
Discount (T.D.) = Rs. (156 - 100) = Rs. 56
(Sum due) - (P.W.).
We
define : T.D. = Interest on P.W.
Amount
= (P.W.) + (T.D.).
Interest is reckoned on P.W. and true discount
is reckoned on the amount.
IMPORTANT FORMULAE
Let
rate = R% per annum and Time = T years. Then,
1.
P.W.=[100 x Amount /100 + (R x
T)
=100 x T.D./ RxT
2. T.D.=[(P.W.) x R x T /100]
= [ Amount x RxT/100 + (R x T)]
3.(S.I.)*(T.D.)
/(S.I.)-(T.D.)
4.
(S.I.) - (T.D.) - S.I. on T.D.
5. When the sum is put at compound interest,
then
P.W. = Amount/[1 +R/100]^T
SOLVED EXAMPLES
Ex. 1. Find the present worth of Rs. 930 due 3 years
hence at 8% per annum. Also find the discount.
Sol.
P.W=100 x Amount /[100 + (R x T)]
=Rs.100
x 930/100+ (8x3)
= (100x930)/124
= Rs. 750,
T.D.
= (Amount) - (P.W.) = Rs. (930 - 750) = Rs. 180.
Ex. 2. The true discount on a bill due 9 months hence at
12% per annum is Rs. Find the amount of the bill and its present worth.
Sol. Let amount be Rs. x. Then,
x*R*T/100
+ (R x T)
=T.D.
=>x
* 12*3/ 4/[100+[12*3/4]]
=540
x=
540x109 = Rs.6540
Amount
- Rs. 6540. P.W. = Rs. (6540 - 540) - Rs. 6000.
Ex. 3. The true discount on a certain sum of money due 3
years hence is Rb. 250 and the simple interest on the same sum for the same
time and at the same rate is Rs. 375. Find the sum and the rate percent.
Sol. T.D. = Rs. 250 and S.I. = Rs. 375.
Sum
due =S.I. xT.D./ S.I. -T.D.
=375x250/375-
250
=Rs.750.
Rate=[100*375/750*3]%=16
2/3%
Ex.
4. The difference between the simple interest and true discount on a certain
sum
of
money for 6 months at 12—% per annum is Rs. 25. Find the sum.
Sol. Let the sum be Rs. x. Then,
T.D.
= (x*25/2*1/2)/(100+(25/2*1/2))=x*25/4*4/425=x/17
S.I=x*25/2*1/2*1/100=x/16
x/16-x/17=25
=>17x-16x=25*16*17
=>x=6800
Hence,
sum due = Rs. 6800.
Ex.
5. A bill falls due in 1 year. The creditor agrees to accept immediate payment
of the half and to defer the payment of the other half for 2 years. By this
arrangement
ins Rb. 40. What is the amount of the bill, if the money
be worth 12-z% ?
Sol. Let the sum be Rs. x. Then,
[x/2+(x/2*100)/100+(25/2*2)]-[(x*100)/(100+25/2*1]
=40
=>x/2+2x/5-8x/9=40
=>x=3600
Amount
of the bill - Rs. 3600.
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