MATHEMATICS
Time: Two Hours
(8.30 AM – 10.30 AM) 
Max.Marks: 60

NOTE:
 Attempt all questions.
 Rough work must be enclosed with answer book.
 While answering, refer to a question by its serial number as well as
section heading. (eg.Q2/Sec.A)
 There is no negative marking.
 Answer each of Sections A, B, C at one place.
 Elegant solutions will be rewarded.
 Use of calculators, slide rule, graph paper and logarithmic,
trigonometric and statistical tables is not permitted.
Note: All answers to questions in SectionA,
SectionB and SectionC must be supported by mathematical
arguments. In each of these sections order of the questions must be
maintained.
SECTIONA
This section has Six Questions. Each question is
provided with five alternative answers. Only one of them is the correct
answer. Indicate the correct answer by A, B, C, D, E.(6x2=12 MARKS)
1. Let A= {1, 2, 3, …., 2008}, B = {1, 2, 3, …..,
1004}. [ ]
A) There can be infinitely many functions from A to B
B) There can not be an onto function from A to B
C) There can be at least one oneone function from A to B
D) There can be infinitely many onto functions from A to B
E) None of these
2. The number of equiangular octagons fixing 6
consecutive sides is [ ]
A) Infinitely many
B) exactly 8
C) at most 8
D) 0
E) None of these
3. All the numbers between 1947 and 2008 are
written, including 1947 and 2008. From the list, all the multiples of
3 and 5 are struck off. The sum of the remaining numbers is [ ]
A) 41517 
B) 73137 
C) 73138 
D) 65247 
E) 65248 
4. A square ABCD is inscribed in a quarter circle
where B is on the circumference of the circle and D is the center of
the circle. The length of diagonal AC of the square, if the circle’s
radius is 5, is [ ]
A) 5/4 
B) 5/2 
C) 5 
D) 5 
E)The length cannot be determined. 
5. 50 x 50 x 50 x … (where there are a hundred
50s) is how many times 100 x100 x 100 x … (where there are fifty
100s)? [ ]
A) 25 x 25 x 25 x …(where there are fifty 25s)
B) 4 x 4 x 4 x … (where there are fifty 4s)
C) 2 x 2 x 2 x … (where there are fifty 2s)
D) 1 time
E) None of these
6. a, b are positive integers. A is the set of all
divisors of ‘a’ except for ‘a’. B is the set of all divisors
of ‘b’. If A = B then which of the following is a wrong
statement? [ ]
A) ab
B) a is a multiple of b
C) b is a not a multiple of a
D) a/b is a prime number
E) none of these
SECTIONB
This section has Six Questions. In each
question a blank is left. Fill in the blank. 
(6x2=12 MARKS)

1. The domain of the real function f(x) =
is __________
2. The number of points P strictly lying inside an
equilateral triangle ABC such that the sum of the perpendicular
distances from P to the three sides of the triangle is minimum
is________
3. Positive integers a, b are such that both are
relatively prime and less than or equal to 2008, a^{2} + b^{2}
is a perfect square and that b has the same digits as a in the reverse
order. The number of such ordered pairs (a, b) is _________
4. Let ABCD be a square. E, F, G, H be the mid points
of its sides , ,
,
respectively. Let P, Q, R, S be the points of intersection of the line
segments , ,
,
inside the square. The ratio of the areasPQRS
: ABCD is _________
5. The number of elements in the set {(a, b, c) : a,
b, c are three consecutive integers in some order, a + b + c = abc} is
__________
6. The sum of all positive integers
for which the quotient and remainder are equal if the number is divided
by 2008 is __________
SECTIONC
(6x2=12 MARKS)
1. Is y a real function of x in the equation y+2008
= x^{2} + 2?
2. The people living on Street ‘S’ of YCity all
decide to buy new house numbers so they line up at the only Hardware
store in order of their addresses: 1, 2, 3, ... If the store has 100 of
each digit, what is the first address that won't be able to buy the
digits for its house number?
3. Let ABCD be a quadrilateral such that AB is
perpendicular to BC, AD is perpendicular to BD and AB=BC, BD = a, AD =
c, CD = x. Find x in terms of a and c.
4. For what pair wise different
positive integers is the value of
an integer?
5. Side AB of rectangle ABCD
is 2 units long and side AD is 3 units. E is a point on
the line AC such that C is the mid point of the line segment AE. What is
the length of line segment BE?
6. How many number of integers are there between 2008
and 2,00,82,008 including 2008 and 2,00,82,008 such that the sum of the
digits in the square is 42?
SECTIOND
(6x4=24 MARKS)
1. Let S = {1, 2, 3, …., 2008}. Find the number of
elements in the set {(A, B) : AUB = S}
2. A square is drawn in side a triangle with sides 3, 4
and 5 such that one corner of the square touches the side 3 of the
triangle, another corner touches the side 4 of the triangle, and the base
of the square rests on the longest side of the triangle. What is the side
of the square?
3. State and prove the test of divisibility of a
positive integer ‘a’ by 11.
4. A square cake 6" x 6" and 3" tall was
cut into four pieces of equal volume as shown in the figure. Determine how
far in from the side of the cake the cuts should be made? (i.e., x = ?)
5. Solve the following simultaneous equations for a
and b:
,
6. f and g are two real variable real valued functions
defined by
f(x) =
, g(x) = . Find gof.
