22.COMPOUND INTEREST
Compound Interest: Sometimes it so happens that the
borrower and the lender agree to fix up a certain unit of time, say yearly or
half-yearly or quarterly to settle the previous account.
In such cases, the amount after first unit
of time becomes the principal for the second unit,the amount after second unit becomes the principal for the third unit
and so on.
After a specified period, the
difference between the amount and the money borrowed is called the Compound Interest (abbreviated as C.I.)
for that period.
IMPORTANT FACTS AND FORMULAE
Let Principal = P, Rate = R% per annum, Time = n years.
I. When interest is compound
Annually:
Amount
= P(1+R/100)n
II. When interest is compounded
Half-yearly:
Amount = P[1+(R/2)/100]2n
III. When interest is compounded
Quarterly:
Amount = P[ 1+(R/4)/100]4n
IV. When interest is
compounded AnnuaI1y but time is in fraction, say 3(2/5) years.
Amount
= P(1+R/100)3 x (1+(2R/5)/100)
V. When Rates are different for different years, say Rl%, R2%, R3% for
1st, 2nd and 3rd year
respectively.
Then,
Amount = P(1+R1/100)(1+R2/100)(1+R3/100)
VI.
Present worth of Rs.x due n years hence is given by :
Present
Worth = x/(1+(R/100))n
SOLVED EXAMPLES
Ex.1. Find compound interest on Rs.
7500 at 4% per annum for 2 years, compounded annually.
Sol.
Amount = Rs [7500*(1+(4/100)2] =
Rs (7500 * (26/25) * (26/25)) = Rs. 8112.
therefore, C.I. = Rs. (8112 - 7500) = Rs.
612.
Ex. 2. Find compound interest on
Rs. 8000 at 15% per annum for 2 years 4 months,
compounded annually.
Sol. Time = 2
years 4 months = 2(4/12)
years = 2(1/3) years.
Amount = Rs'. [8000 X (1+(15/100))2 X (1+((1/3)*15)/100)]
=Rs. [8000 * (23/20) * (23/20) * (21/20)]
= Rs. 11109. .
:. C.I. = Rs. (11109 - 8000)
= Rs. 3109.
Ex.
3. Find the compound interest on Rs. 10,000 in 2 years at
4% per annum, the
interest being compounded half-yearly. (S.S.C.
2000)
Sol.
Principal = Rs. 10000; Rate =
2% per half-year; Time = 2 years = 4 half-years.
Amount =
Rs [10000 * (1+(2/100))4] = Rs(10000 * (51/50) * (51/50)
* (51/50) * (51/50))
= Rs. 10824.32.
:. C.I. = Rs. (10824.32 - 10000) = Rs.
824.32.
Ex. 4. Find the compound interest on Rs. 16,000 at 20%
per annum for 9 months,
compounded quarterly.
Sol.
Principal = Rs. 16000; Time = 9 months =3 quarters;
Rate = 20% per annum = 5% per quarter.
Amount = Rs. [16000 x (1+(5/100))3] = Rs. 18522.
CJ. = Rs. (18522 - 16000) = Rs. 2522.
Ex. 5. If the simple interest on a sum
of money at 5% per annum for 3 years is Rs. 1200,
find the compound interest on the same sum for the same period at
the same rate.
Sol.
Clearly, Rate = 5% p.a., Time = 3
years, S.I.= Rs. 1200. . .
So principal=RS [100*1200]/3*5=RS
8000
Amount = Rs. 8000 x [1 +5/100]^3 -
= Rs. 9261.
.. C.I. = Rs. (9261 - 8000) = Rs.
1261.
Ex. 6. In what
time will Rs. 1000 become Rs. 1331 at 10% per annum compounded
annually? (S.S.C. 2004)
Sol.
Principal = Rs. 1000; Amount = Rs. 1331; Rate = 10% p.a. Let the time be n years. Then,
[ 1000 (1+ (10/100))n ]
= 1331 or (11/10)n = (1331/1000)
= (11/10)3
n = 3 years.
Ex. 7. If Rs. 600 amounts to Rs. 683.20 in two years compounded
annually, find the
rate of interest per annum.
Sol.
Principal = Rs. 500; Amount = Rs. 583.20; Time = 2 years.
Let
the rate be R% per annum.. 'Then,
[ 500 (1+(R/100)2 ] = 583.20 or
[ 1+ (R/100)]2 = 5832/5000 = 11664/10000
[ 1+ (R/100)]2 = (108/100)2 or 1 +
(R/100) = 108/100 or R = 8
So, rate = 8%
p.a.
Ex. 8.
If the compound interest on a certain sum at 16 (2/3)% to 3 years is Rs.1270,
find the simple interest on the same sum at the same rate and f or the same
period.
Sol. Let the sum be Rs. x. Then,
C.I. = [ x * (1 + ((
50/(3*100))3
- x ] = ((343x / 216) - x) = 127x / 216
127x /216 = 1270 or x =
(1270 * 216) / 127 = 2160.
Thus, the sum is Rs. 2160
S.I. =
Rs ( 2160 * (50/3) * 3 *
(1 /100 ) ) = Rs. 1080.
Ex. 9. The difference between the compound
interest and simple interest on a
certain sum at 10% per annum for
2 years is Rs. 631. Find the sum.
Sol. Let the sum be Rs. x. Then,
C.I. = x ( 1 + ( 10 /100 ))2 -
x =
21x / 100 ,
S.I. = (( x * 10 * 2) / 100) = x / 5
(C.I) - (S.I) = ((21x /
100 ) - (x / 5 )) = x / 100
( x / 100 ) =
632 x
= 63100.
Hence, the sum is Rs.63,100.
Ex. 10. The difference between the
compound interest and the simple interest accrued on an
amount of Rs. 18,000 in 2 years was Rs. 405. What was the rate
of interest p.c.p.a. ? (Bank
P.O. 2003)
Sol. Let the rate be R% p.a. then,
[ 18000 ( 1 + ( R
/ 100 )2 ) - 18000 ] - ((18000 * R * 2) / 100 ) = 405
18000 [ ( 100 +
(R / 100 )2 / 10000) - 1 -
(2R / 100 ) ] = 405
18000[( (100 + R ) 2 - 10000 - 200R) /
10000 ] = 405
9R2 / 5 =
405 R2 =((405 * 5 ) / 9) = 225
R = 15.
Rate = 15%.
Ex. 11. Divide Rs. 1301 between A and B, so that the amount of
A after 7 years is equal to the amount of B after 9 years,
the interest being compounded at 4% per
annum.
Sol. Let the two parts be Rs. x and Rs. (1301 - x).
x(1+4/100)7 =(1301-x)(1+4/100)9
x/(1301-x)=(1+4/100)2=(26/25*26/25)
625x=676(1301-x)
1301x=676*1301
x=676.
So,the parts are rs.676 and rs.(1301-676)i.e rs.676
and rs.625.
Ex.12. a certain sum amounts to rs.7350
in 2 years and to rs.8575 in 3 years.find the sum and rate percent.
S.I on rs.7350 for 1 year=rs.(8575-7350)=rs.1225.
Rate=(100*1225/7350*1)%=16 2/3%
Let the sum be rs.x.then,
X(1+50/3*100)2=7350
X*7/6*7/6=7350
X=(7350*36/49)=5400.
Sum=rs.5400.
Ex.13.a sum of money amounts to rs.6690
after 3 years and to rs.10,035 after 6 years on compound interest.find the sum.
Sol. Let the
sum be rs.P.then
P(1+R/100)3=6690…(i) and P(1+R/100)6=10035…(ii)
On dividing,we get (1+R/100)3=10025/6690=3/2.
Substituting this value in (i),we get:
P*3/2=6690 or P=(6690*2/3)=4460
Hence,the sum is rs.4460.
Ex.14. a sum of money doubles itself at
compound interest in 15 years.in how many years will it beco,e eight times?
P(1+R/100)15=2P
(1+R/100)15=2P/P=2
LET P(1+R/100)n=8P
(1+R/100)n=8=23={(1+R/100)15}3[USING
(I)]
(1+R/100)N=(1+R/100)45
n=45.
Thus,the required time=45 years.
Ex.15.What
annual payment will discharge a debt of Rs.7620 due in 3years at
16 2/3% per
annum interest?
Sol. Let each installment beRs.x.
Then,(P.W. of Rs.x due 1
year hence)+(P>W of Rs.x due 2 years hence)+(P.W of Rs. X due 3
years hence)=7620.
\ x/(1+(50/3*100))+ x/(1+(50/3*100))2 + x/(1+(50/3*100))3=7620
Û(6x/7)+(936x/49)+(216x/343)=7620.
Û294x+252x+216x=7620*343.
Û x=(7620*343/762)=3430.
\Amount of each installment=Rs.3430.