Sequence and Series1.For each positive real number , let A be
the set of all natural numbers n such thatsin n 1 sin( ) n .Let Ac be the complement of Ain the set of
all natural numbers. Then [2016](a) A A A^1213 ,^25 are all finite sets(b) 1
3A is a finite set but 1 2
2 5A A, are infinitesets(c) , 1 1 2
2 3 5A A Ac, ,c c are all finite sets(d) 1 2
3 5A A, are finite sets and 1
2A is an infiniteset
2.Let a,b,c,d be real numbers such that
^32 ^4
1nkak bk ck d n
for every natural numbers n. Then
a b c d is equal to [2013]
(a) 15 (b) 16 (c) 31 (d) 32
3.The sum of
1 1 1 (1!) (2 2 1)(2!) ... (^2 ^2 n n^2 1)
n! is [2011](a) ( 2)!n (b) n (^1) n 1! 1
(c) ( 2)! 1n (d) n n 1! 1
4.The arithmetic mean and the geometric mean
of two distinct 2-digit numbers x and y are
two integers one of which can be obtained by
reversing the digits of the other (in base 10
representation). Then x y equals [2011]
(a) 82 (b) 116 (c) 130 (d) 148
5.Suppose the sides of a triangle form a
geometric progression with common ratio r.
Then r lies in the interval [2010]
(a)
1 5
0,
2
(b)
1 5 2 5
,
2 2
(c)
1 5 1 5
,
2 2
(d)
2 5
,
2
6.Let a 0 0 and an 3 an 1 1 for n 1. Then
the remainder obtained dividing a 2010 by 11 is
[2010]
(a) 0 (b) 7 (c) 3 (d) 4
Vectors
1.Let ABC be an acute scalene triagle, and O
and H be its circumcentre and Ortho-center
respectively. Further let N be the midpoint of
OH. The value of the vector sum
NA NB
NC
is [2017]
(a) 0 (Zero vector) (b) HO
(c)1
2HO
(d)1
2OH2.Let v be a vector in the plane such thatv i v i v j 2 . Then v
lies in the
interval [2016]
(a) (0,1] (b) (1,2] (c) (2,3] (d) (3,4]Sequence and Series[2016][2013][2011]1][2011]5.[2010]6.[2010]Vectors
1.[2017]2.[2016]