The number of terms in the expansion (a+b+c+d)^20
Q5
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(1) 100^x (log 4 base x - log root2 base x )..Find Min and max values.
a. 0,infinity
b. -infinity, infinity
c. infinity,-infinity
d.none
Sub prime numbers X,Y,Z where, Sub prime num means p+1. p= prime number. X>Y>Z>100. Which would be the closet value of (XYZ) ??
6X106 ( X indicate=product ) number is given. How many possible numbers are there greater than 6X106 using 00,55,66,999 is given. ( repetition is not allowed )a.180 b. 720 c. 520
101+........+n=sum S.. n=149, then which is the highest value of prime number divides S.
a. 7
b.11
c. 13
d.17
x is smallest number such that x/2 is perfect square and x/3 is perfec cube...finf no of divisors of x..
hey guys!!!
Is there any page on pagal guy site,which keeps us updated regarding the b-scool forms(i.e. when would the registration forms be out,whats the last date to apply etc)..
any idea about which forms are going to be out in near by time, i have filled cmat and nmat..... which all forms are expected to come in this month apart from cat ???
5,10,15 number coins are there in total 500. The total amount is 3180. If the 15 and 10 number coins are interchanged then the amount decreases by 300. Find the total number of 10 number coins.
M set is given..M set consist 1 to 31 even numbers and 31 to 101 odd numbers..Find the number of zeroes at the end of the product of M.
a.11
b.10
c.9
d.12
n+a and n+b is given in which n,a,b are whole numbers. a= 11 and b=56. Then How many perfect squares exist for n+a and n+b ?
a.none b.1 c.2 d.4
Geometry circle Q:- Circle of 2 cm diameter drawn. A Square inscribed in it. Side of a square is taken as a diameter and then again drawn a circle. do it till 4 times. Find the area of outer circle.
you are selecting 10 numbers randomly out of first 100 odd numbers.The sum of this 10 numbers is N.How many different values are possible for N? 900/1800/1801/901 😠
A cricket is played in a Rhombus (all sides are equal) ground and the area of this field is 2400 m. The farthest distance is 80 m. and In this ground, Ice hockey is played in a circular field. Find the area of Ice field (Circular field ).
Any one having old question papers of nmat in pdf format plz share the links....
how to find no of solutions for x+y+z=13 such that 1
How many ways a person can buy 13 fruits of three types, mangoes ,apples and oranges. He can buy a maximum of 7 of any type and minimum of 1.
The roots of the equation x4+mx3+71x2+px+q = 0 are in AP with common difference = 1. Find p+q, if m is negative.
For what values of 'p' would the equation x2 + 2(p -1 )x + p + 5 = 0 possess at least one positive root?
Options:
1.
[ -∞, -5]
2.
[-∞, -1]
3.
[1, ∞]
4.
[2, ∞]
5.
none of these.
The integers 1,2,………64 are written on a blackboard. The following operation is repeated 63 times: Any 2 numbers are chosen out of these 64 numbers and replaced with a number equal to 1 minus the sum of 2 numbers. What will be the number left over on the board after 63 operations?
Options:
1.
2017
2.
1009
3.
505
4.
253
5.
2016