1 .In question, the given pie-chart shows the amount spent by a country on various sports during the year FY 2012-13.

image
If the total amount spent on sports during FY 2012 -13 was Rs. 1200000, then how much amount was spent on Basketball?
A.  125000 Rs.
B.  160000 Rs
C.  150000 Rs
D.  180000 Rs
View Answer Discuss in Forum

2 .In question, the given pie-chart shows the amount spent by a country on various sports during the year FY 2012-13.

image
If the total money spent is Rs. 2000000, how much more amount was spent on Cricket with respect to Tennis and Golf?
A.  50000 Rs
B.  60000 Rs
C.  70000 Rs
D.  80000 Rs
View Answer Discuss in Forum

3 .In question, the given pie-chart shows the amount spent by a country on various sports during the year FY 2012-13.

image
The amount spent on Football is what per cent of the amount spent on Tennis?
A.  90%
B.  110%
C.  150%
D.  120%
View Answer Discuss in Forum

4 .In question, the given pie-chart shows the amount spent by a country on various sports during the year FY 2012-13.

image
The amount spent on Hockey is what per cent more than the amount spent on Golf?
A.  10%
B.  20%
C.  30%
D.  40%
View Answer Discuss in Forum

5 .
The Unit Digit in the product $7^{71} \times 6^{63} \times 3^{65}$ is
A.  1
B.  2
C.  3
D.  4
View Answer Discuss in Forum

6 .
The sum of all natural numbers from 51 to 100 is:
A.  5050
B.  4275
C.  4025
D.  3775
View Answer Discuss in Forum

7 .
Let N be the greatest number that will divide 1305, 4665 and 6905 leaving the same remainder in each case. Then, sum of the digits in N is:
A.  4
B.  5
C.  6
D.  8
View Answer Discuss in Forum

8 .
The simplified value of $\sqrt {32} + \sqrt {48} \over \sqrt 8 + \sqrt {12}$ is:
A.  3
B.  2
C.  6
D.  4
View Answer Discuss in Forum

9 .
How much does ($\sqrt {12} + \sqrt {18}$) exceed ($2\sqrt 3 + 2\sqrt 2$) ?
A.  2
B.  $\sqrt 3$
C.  $\sqrt 2$
D.  3
View Answer Discuss in Forum

10 .
Find the sum of : (1 - $1 \over n + 1$) + (1 - $2 \over n + 1$) + (1 - $3 \over n + 1$) + .................. + (1 - $n \over n + 1$)
A.  n
B.  $1\over 2$n
C.  n + 1
D.  $1 \over 2$ (n + 1)
View Answer Discuss in Forum




Sponsored Links

Copyright 2018 | Privacy Policy | Terms and Conditions | Contact us | Advertise

@