Dear Aspirants, Our IBPS Guide team is providing new series of Quants Questions for SBI Clerk/ IBPS Clerk Prelims so the aspirants can practice it on a daily basis. These questions are framed by our skilled experts after understanding your needs thoroughly. Aspirants can practice these new series questions daily to familiarize with the exact exam pattern and make your preparation effective.
1) The difference between CI and SI on a certain sum of money at 15% per annum for 3 years is Rs.4394.25. Find the simple interest earned at the same rate of interest for 2 years on the same sum.
A.Rs.18400
B.Rs.18500
C.Rs.16800
D.Rs.18600
E.None of these
2) Kanish invested Rs.8000 in a simple interest scheme at the rate of R% per annum for 3 years. Kanika invested Rs.7500 in a simple interest scheme at the rate of (R + 5)% per annum for 2 years. If the ratio of the interest received by Kanish and Kanika is 6:5, then find the value of R?
A.12
B.18
C.10
D.15
E.20
3) Leela invested Rs.x in a Simple interest scheme at the rate of R% per annum for 4 years. She received the amount of Rs.11109 for lending Rs.x for 2 years at 15% per annum Compound interest. If the simple interest she received after 4 years is Rs.6048, then find the value of R.
A.12
B.15
C.18
D.20
E.21
4) Rs.7500 was invested for 3 years, partly in bank A at the rate of 12% S.I per annum and Partly in bank B at the rate of 15% S.I per annum. Total interest received at the end of 3 years was Rs.3105. How much money was invested in bank B?
A.Rs.4280
B.Rs.3000
C.Rs.4700
D.Rs.4500
E.None of these
5) The sum Rs.16000 invested equally at two different rates of interest and the difference between the simple interest is Rs.1200 for 3 years. Find the difference between the rates of interest?
A.10%
B.5%
C.8%
D.12%
E.None of these
6) The difference between the simple interest and compound interest for 3 years at 12 % rate of interest per annum is Rs. 1123.2. Find the sum?
A.Rs. 30000
B.Rs. 36000
C.Rs. 32000
D.Rs. 25000
E.None of these
7) A sum of Rs.2900 amounts to Rs 3422 in 3 years at simple interest. If the interest rates were increased by 3% and rate of interest and sum invested is same, then find the total amount obtained?
A.Rs 4465
B.Rs 3683
C.Rs 3596
D.Rs 3096
E.Cannot be determined
8) Rahul invested Rs.x at the rate of 15% simple interest for 8 years and he also invested the same amount at the rate of 12% simple interest for same period. If the difference between the interest he received is Rs.4800, then find the value of x?
A.16000
B.18000
C.20000
D.15000
E.None of these
9) The interest earned on Rs.6800 at rate of x% compounded annually is Rs.1428 after 2 years. What would be the SI earned on the same sum at the rate of (x+5) % per annum after 3 years?
A.Rs. 3060
B.Rs. 5420
C.Rs. 4800
D.Rs. 3400
E.Rs. 4860
10) A invested Rs.4800 in scheme S which offers simple interest at x % per annum for 8 years. After 8 years, he received the interest amount is 300% more than that of the investment amount, then find the value of x?
A.20
B.25
C.30
D.40
E.None of these
Try SI and CI Questions For Online Mock Test
Answers :
1) Answer: D
Let the invested amount be Rs.P
D = [Pr2 (300+r)] / 1003
4394.25 = P*152 * (300+15) / 1000000
P= Rs.62000
Simple interest = 62000 * 2 * 15/100 = Rs.18600
2) Answer: D
SI received by Kanish = 8000 * R * 3/100 = 240R
SI received by Kanika = 7500 * (R + 5) * 2/100 = 150R + 750
240R/(150R + 750) = 6/5
200R = 150R + 750
R = 15%
3) Answer: C
11109 = x * (1 + 15/100)2
11109 = x * 23/20 * 23/20
x = Rs.8400
6048 = 8400 * R * 4/100
R = 18%
4) Answer: D
Let the amount invested in bank B = x
The amount invested in Bank A = 7500 – x
(7500-x)*3*12/100 + x*3*15/100 = 3105
x= 4500
5) Answer: B
8000*R1*3/100-8000*R2*3/100=1200
80*3(R1-R2) =1200
R1-R2=5%
6) Answer: D
The difference between the simple interest and compound interest for 3 years is,
Difference = [Sum* r2 * (r + 300)]/1003
1123.2 = [Sum*144*312]/1003
Sum = (1123.2*100*100*100)/(144*312)
Sum = Rs. 25000
7) Answer: B
SI = 3422 – 2900 = 522
Rate = SI * 100/(P * time) = 522 * 100/(2900 * 3) = 6%
New rate = 6 + 3 = 9%
New SI = 2900 * 9 * 3/100 = Rs. 783
Amount = P + SI = 2900 + 783 = 3683
8) Answer: C
SI=P * N * R/100
x * 15 * 8/100 – x * 12 * 8/100=4800
24x=480000
x=20000
9) Answer: A
According to the question,
6800*((x+100)/100)((x+100)/100) – 6800 = 1428
6800*((x+100)/100)((x+100)/100) = 8228
68 * (x+100)²/100 = 8228
(x+100)² = 12100
x+100 = 110
x= 10
For SI, R = 10+5 = 15 %
SI = 6800 * 15 * 3/100=Rs. 3060
10) Answer: E
SI=P * N * R/100
400/100 * 4800=4800 * 8 * x/100
x =50%
11) Certain sum of money is invested at the rate of 20% simple interest for 5 years after which the amount is invested at the rate of 15% compound interest for 2 years. If the final amount is Rs.7935, then find the initial sum?
A.Rs.2000
B.Rs.2500
C.Rs.3000
D.Rs.4000
E.Rs.4500
12) A sum of Rs.(P+2000) is invested in SI for 2 years at 20% per annum and also a sum of Rs.(2P-4000) is invested in CI for 2 years at same rate. If the difference between the interest earned is Rs.3200, then find the value of P.
A.12000
B.15000
C.24000
D.20000
E.none of these
13) Ajay invested Rs. 56000 in two schemes A and B. Amount invested in scheme A is 33.33% more than B. Ajay earn 8% per annum from A and 10% per annum from B in simple interest. Find total interest earned by Ajay after four years.
A.Rs. 18840
B.Rs. 19740
C.Rs. 19840
D.Rs. 18740
E.None of these
14) Aman invested Rs. 1440 for 2 year at the rate of x% in the scheme X at compound interest annually and gets a total amount of Rs. 2560. If he invested Rs.3500 in scheme Y at simple interest for 6 years at same rate. Then find the total simple interest earned by Aman from scheme Y.
A.Rs. 7000
B.Rs. 8500
C.Rs. 10,200
D.Rs. 6800
E.None of these
15) The difference between the Simple Interest and Compound Interest incurred on an amount of Rs.1200 in 2 years was Rs.5.88. Find the rate of interest.
A.7%
B.8%
C.9%
D.10%
E.None of these
16) Anju deposited Rs.24000 in a bank offering 15% Compound interest for 3 years compounded annually. What is the total interest received by Anju?
A.Rs.12501
B.Rs.14850
C.Rs.16251
D.Rs.17851
E.None of these
17) Mr.Anish invested Rs.52000 in two different schemes which offers SI at different rate of interest 13% and 8% respectively. If at the end of 2 years he earned overall interest is Rs.11920, then find the sum which is invested at 8% rate of interest?
A.Rs.32000
B.Rs.16000
C.Rs.20000
D.Rs.36000
E.Can’t be determined
18) The difference between the compound interest and simple interest for the sum of Rs.25000 at the end of two years at the rate of 20% per annum?
A.Rs.1200
B.Rs.1400
C.Rs.1500
D.Rs.1600
E.None of these
19) Arun invested Rs.5000 in a bank at Simple interest for 2 years and receives an interest of Rs.500. What is the rate of interest?
A.3%
B.5%
C.7%
D.9%
E.None of these
20) If Rs.11750.4 amount is received for lending Rs.x for 3 years at 20% per annum compound interest, find the value of x?
A.Rs.6500
B.Rs.6800
C.Rs.7200
D.Rs.7800
E.Rs.7500
Try SI and CI Questions For Online Mock Test
Answers :
11) Answer: C
SI = P * N * R/100
CA = P * (1 + R/100)n
Amount earning simple interest = P + P * 20 * 5/100 = 2P
7935 = 2P * (1 + 15/100)2
7935 = 2P * 1.3225
P = 3000
12) Answer: A
Difference between interests = Rs.3200
(2P-4000)[(1+(20/100))2-1] – ((P+2000)*2×20)/100 =3200
(2P-4000)(11/25) – (10(P+2000))/25 =3200
P=Rs.12000
13) Answer: C
Ratio of amount invested in A and B = 4:3
Amount invested in A = 4/7 x 56000 = 32000
Amount invested in Scheme B = 3/7 x 56000 = 24000
Total interest earned = 32000 x 8% x 4 + 24000 x 10% x 4 = 10240 + 9600 = Rs. 19840
14) Answer: A
Amount invested by Aman = Rs. 1440
And he gets after 2 years = Rs. 2560
Then, according to the question,
2560 = 1440 × (1 + R/100)2
256/144 = (1 + R/100)2
4/3 = (100 + R)/100
400 = 300 + 3R
R = 33 1/3%
So, the simple interest earned by Aman is,
= 3500 × 100/3 × 6/100
= Rs. 7000
15) Answer: A
Difference=Pr2/(100)2
5.88=1200* r2/100*100
5.88*10000/1200= r2
r2=49
r=7%
16) Answer: A
Interest received by Anju = 24000 * ((1 + 0.15)3 – 1)
= Rs.12501
17) Answer: B
Let amount invested in 1st scheme be x,
Amount invested in 2nd scheme be 52000-x
It is given that,
x=Rs.36000
Therefore amount invested in 2nd scheme = 52000-36000 = Rs.16000
18) Answer: E
Difference = (25000 * 20 * 20)/(100 * 100)
= Rs.1000
19) Answer: B
Given that, SI = Rs.500, n = 2 years and P = Rs.5000
SI = Pnr/100
r = (100 * SI)/(P * n)
= (100 * 500)/(5000 * 2)
= 5%
20) Answer: B
CA = P * (1 + r/100)n
11750.4 = x * (1 + 20/100)3
x = 6800
This post was last modified on April 4, 2023 6:39 pm