Dear Aspirants,
Directions (1-5): Study the pie charts carefully to answer the questions that follow.
Percent wise distribution of players (Male and Female) and female players who play five different sports-
Note- Some values are missing, you have to calculate these values as per given data.
Q1. What is the approximate average number of female players who play football, Hockey and Lawn Tennis together?
Q3. What is the respective ratio of the number of male players who play cricket and number of female players who play Hockey?
Q5. Number of female players who play Lawn Tennis is approximately what per cent more than the total number of players who play Hockey?
Q6. 32, 49, 83, 151, 287, 559, ?
Q11. I.9x²-27x+20=0
II.6y²-5y+1=0
II. 2y²-19y+44=0
II.2y²-7y+6=0
II.y²-4y-21=0
II.3y²+10y-8=0
Quantitative Aptitude Quiz For SBI PO/Clerk Prelims
Numerical Ability or Quantitative Aptitude Section has given heebie-jeebies to the aspirants when they appear for a banking examination. As the level of every other section is only getting complex and convoluted, there is no doubt that this section, too, makes your blood run cold. The questions asked in this section are calculative and very time-consuming. But once dealt with proper strategy, speed, and accuracy, this section can get you the maximum marks in the examination. Following is the Quantitative Aptitude quiz to help you practice with the best of latest pattern questions.
Directions (1-5): Study the pie charts carefully to answer the questions that follow.
Percent wise distribution of players (Male and Female) and female players who play five different sports-
Note- Some values are missing, you have to calculate these values as per given data.
Q1. What is the approximate average number of female players who play football, Hockey and Lawn Tennis together?
620
333
230
630
340
Solution:
Q2. What is the difference between the number of the male players who play football and the number of male players who play Cricket? 94
84
216
240
184
Solution:
Number of males who play Football = 714 – 260 = 454
Number of males who play Cricket = 1470 – 800 = 670
Difference = 670 – 454 =216
Number of males who play Cricket = 1470 – 800 = 670
Difference = 670 – 454 =216
Q3. What is the respective ratio of the number of male players who play cricket and number of female players who play Hockey?
20 : 7
4 : 21
20 : 3
3 : 20
None of these
Solution:
Q4. What is the total number of female players who play football, cricket and Hockey together? 1224
1334
1424
1564
1360
Solution:
Total number of females who plays Football, Cricket and Hockey = 260 + 800 + 300 = 1360
Q5. Number of female players who play Lawn Tennis is approximately what per cent more than the total number of players who play Hockey?
4%
5 %
4.8%
5.5%
6.5%
Solution:
Directions (6-10): What should come in place of question mark (?) in the following number series? Q6. 32, 49, 83, 151, 287, 559, ?
1118
979
1103
1120
1220
Solution:
Q7. 462, 552, 650, 756, 870, 992, ? 1040
1122
1132
1050
950
Solution:
Q8. 15, 18, 16, 19, 17, 20, ? 23
22
16
18
24
Solution:
Q9. 1050, 420, 168, 67.2, 26.88, 10.752, ? 4.3008
6.5038
4.4015
5.6001
2.4004
Solution:
Q10. 0, 6, 24, 60, 120, 210, ? 343
280
335
295
336
Solution:
Directions (11-15): In each of the following questions two equations are given. Solve the equations and give answer— Q11. I.9x²-27x+20=0
II.6y²-5y+1=0
If x<y
If x≤y
x=y or relationship between x and y cannot be established.
If x≥y
If x>y
Solution:
Q12. I. 3x²-22x+40=0 II. 2y²-19y+44=0
If x<y
If x≤y
x=y or relationship between x and y cannot be established.
If x≥y
If x>y
Solution:
Q13. I.2x²-11x+14=0 II.2y²-7y+6=0
If x<y
If x≤y
x=y or relationship between x and y cannot be established.
If x≥y
If x>y
Solution:
Q14. I.x²=49 II.y²-4y-21=0
If x<y
If x≤y
x=y or relationship between x and y cannot be established.
If x≥y
If x>y
Solution:
Q15. I.3x²-13x-10=0 II.3y²+10y-8=0
If x<y
If x≤y
x=y or relationship between x and y cannot be established.
If x≥y
If x>y
Solution:
No comments:
Post a Comment