Hello Aspirants. Welcome to Online Maths in AffairsCloud.com. Here we are creating question sample in Simple Interest, which is common for all the IBPS,SBI exam and other competitive exams. We have included Some questions that are repeatedly asked in exams !!
A.200
B.270
C.250
D.280
E.none of these
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Answer- B (270)
Explanation – 5x + 3y = z (total)
x + y = 6600
5x= 2(3y) [ condition given]
5x – 6y = 0
x + y = 6600
5x -6y = 0
Subtract both equations and you get x = 3600 so y = 3000
3600*.05 = 180
3000*.03 = 90
z (total) = 270
Explanation – 5x + 3y = z (total)
x + y = 6600
5x= 2(3y) [ condition given]
5x – 6y = 0
x + y = 6600
5x -6y = 0
Subtract both equations and you get x = 3600 so y = 3000
3600*.05 = 180
3000*.03 = 90
z (total) = 270
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A.2%
B.4%
C.8%
D.10%
E.None of these
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Answer – B (4%)
Explanation – let principal =x then SI= 4/25 x
let rate be ” r” then time =r years
SI= PXRXT /100
put all here all will cut and we left with
r ^2 =400/25 = 4%
Explanation – let principal =x then SI= 4/25 x
let rate be ” r” then time =r years
SI= PXRXT /100
put all here all will cut and we left with
r ^2 =400/25 = 4%
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A.10%
B.10.25%%
C.10.10%
D.10.80%
E.None of these
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Answer – B (10.25%)
Explanation –
Let the sum be Rs. 100. Then,
S.I. for first 6 months = Rs. [100 x 10 x 1] / [100×2]= Rs. 5.
S.I. for last 6 months = Rs.[105 x 10 x 1] / [100 x 2]= Rs. 5.25
So, amount at the end of 1 year = Rs. (100 + 5 + 5.25) = Rs. 110.25.
Effective rate = (110.25 – 100) = 10.25%.
Explanation –
Let the sum be Rs. 100. Then,
S.I. for first 6 months = Rs. [100 x 10 x 1] / [100×2]= Rs. 5.
S.I. for last 6 months = Rs.[105 x 10 x 1] / [100 x 2]= Rs. 5.25
So, amount at the end of 1 year = Rs. (100 + 5 + 5.25) = Rs. 110.25.
Effective rate = (110.25 – 100) = 10.25%.
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A.0.20%
B.0.30%
C.0.50%
D.0.80%
E.None of these
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Answer-B (0.30%)
SI=PXRXT/100 so,SI( 1) – SI (2)
[1500 x R1 x 3] /100 – [1500 x R2 x 3] /100 =13.5
4500 (R1 – R2) = 1350
R1 – R2 =1350/4500=0.30%
SI=PXRXT/100 so,SI( 1) – SI (2)
[1500 x R1 x 3] /100 – [1500 x R2 x 3] /100 =13.5
4500 (R1 – R2) = 1350
R1 – R2 =1350/4500=0.30%
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A.6400
B.6500
C.7200
D.7500
E.None of these
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Answer – A (6400)
Explanation –
Let the sum invested in Scheme A be Rs. x and that in Scheme B be Rs. (13900 – x).
Then, ( x X 14 X 2 ) /100 + [(13900 – x) X 11 X 2] /100= 3508
28x – 22x = 350800 – (13900 X 22)
6x = 45000
x = 7500.
So, sum invested in Scheme B = Rs. (13900 – 7500) = Rs. 6400.
Explanation –
Let the sum invested in Scheme A be Rs. x and that in Scheme B be Rs. (13900 – x).
Then, ( x X 14 X 2 ) /100 + [(13900 – x) X 11 X 2] /100= 3508
28x – 22x = 350800 – (13900 X 22)
6x = 45000
x = 7500.
So, sum invested in Scheme B = Rs. (13900 – 7500) = Rs. 6400.
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A.2500
B.3000
C.3500
D.4000
E.None of these
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Answer – D (4000)
Explanation –
Difference between the compound interest and simple interest for 2 years = D= p(r/100)^2
P= Dx(100 /R)^2 = 90x100x100 /15×15=4000
Explanation –
Difference between the compound interest and simple interest for 2 years = D= p(r/100)^2
P= Dx(100 /R)^2 = 90x100x100 /15×15=4000
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A.1180
B.1120
C.1200
D.1250
E.None of these
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Answer – B (1120)
Explanation – SI = PXRXT/100
make equation for both,and equate
Explanation – SI = PXRXT/100
make equation for both,and equate
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A.780
B.992
C.848
D.700
E.None of these
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Answer – B (992)
Explanation –
S.I = Rs. (920 – 800) = Rs. 120; P = Rs. 800, T = 3 yrs
use SI=Px R x T/100 so, R = Si x 100 /Px t = ( 100 X 120 ) / 800 X 3 = 5%
New rate = (5 + 3) % = 8%
New S.I. = Rs. (800 X 8 X 3)/100 == Rs. 192.
New amount = Rs. (800 + 192) = Rs. 992
Explanation –
S.I = Rs. (920 – 800) = Rs. 120; P = Rs. 800, T = 3 yrs
use SI=Px R x T/100 so, R = Si x 100 /Px t = ( 100 X 120 ) / 800 X 3 = 5%
New rate = (5 + 3) % = 8%
New S.I. = Rs. (800 X 8 X 3)/100 == Rs. 192.
New amount = Rs. (800 + 192) = Rs. 992
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A.Rs 5000
B.Rs 6500
C.Rs 8000
D.Rs 10000
E.None of these
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Answer – A (Rs 5000)
Explanation:-Let x, y and z be the amounts invested in schemes A, B and C respectively. Then,
add individual interest to get total using Si= pxrxt/100
[x x 10 x 1]/100 + [y x 12 x 1]/100 + [z x 15 x 1]/100 = 3200
10x + 12y + 15z = 320000…. (i)Now, z = 240% of y =(12/5)y……… (ii)And, z = 150% of x =(3/2)x so,x=(2/3 )z = (2/3) x value of z from ii
x= (2/3) x (12/5) y = (8/5)y………..(iii)
From (i), (ii) and (iii), we have :
16y + 12y + 36y = 320000
64y = 320000
y = 5000
Sum invested in Scheme B = Rs. 5000
Explanation:-Let x, y and z be the amounts invested in schemes A, B and C respectively. Then,
add individual interest to get total using Si= pxrxt/100
[x x 10 x 1]/100 + [y x 12 x 1]/100 + [z x 15 x 1]/100 = 3200
10x + 12y + 15z = 320000…. (i)Now, z = 240% of y =(12/5)y……… (ii)And, z = 150% of x =(3/2)x so,x=(2/3 )z = (2/3) x value of z from ii
x= (2/3) x (12/5) y = (8/5)y………..(iii)
From (i), (ii) and (iii), we have :
16y + 12y + 36y = 320000
64y = 320000
y = 5000
Sum invested in Scheme B = Rs. 5000
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A.39 years
B.41 years
C.45 years
D.50 years
E.None of these
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Answer – D (50 years)
Explanation –
We have, A1 = Rs. 400, A2 = Rs. 200, R1 = 10%, R2 = 4%
Time (T) = [A1 – A2] x 100 divide by A2R1 – A1R2
= [400 – 200]x 100 divide by [200 x 10 – 400 x 4]= 20000/400 = 50 Years.
Explanation –
We have, A1 = Rs. 400, A2 = Rs. 200, R1 = 10%, R2 = 4%
Time (T) = [A1 – A2] x 100 divide by A2R1 – A1R2
= [400 – 200]x 100 divide by [200 x 10 – 400 x 4]= 20000/400 = 50 Years.
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