TIFR PHD CS & SS 2017

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Question 1

A suitcase weighs one kilogram plus half of its weight. How much does the suitcase weigh?

A	1.333... kilograms
B	1.5 kilograms
C	1.666... kilograms
D	2 kilograms
E	cannot be determined from the given data

AptitudeNumerical

Question 2

A	(a, b)≤ ǁbǁ
B	(a, b)≤ ǁaǁ
C	(a, b) = ǁaǁǁbǁ
D	(a, b)≥ ǁbǁ
E	(a, b)≥ ǁaǁ

Engineering-MathematicsVectors

Question 3

On planet TIFR, the acceleration of an object due to gravity is half that on planet earth. An object on planet earth dropped from a height h takes time t to reach the ground. On planet TIFR, how much time would an object dropped from height h take to reach the ground?

A	t/√2
B	√2t
C	2t
D	h/t
E	h/2t

AptitudeNumerical

Question 4

Which of the following functions asymptotically grows the fastest as n goes to inﬁnity?

A	(log log n)!
B	(log log n)^{log n}
C	(log log n)^{log log log n}
D	(log n)^{log log n}
E	2^{√(log log n)}

AlgorithmsAsymptotic-Complexity

Question 5

How many distinct ways are there to split 50 identical coins among three people so that each person gets at least 5 coins?

A	3³⁵
B	3⁵⁰ − 2⁵⁰
C	(35 2)
D	(50 15)*3³⁵
E	(37 2)

Engineering-MathematicsCombinatorics

Question 6

How many distinct words can be formed by permuting the letters of the word ABRACADABRA ?

A	11! / (5! 2! 2!)
B	11! / (5! 4!)
C	11! 5! 2! 2!
D	11!
E	11! 5! 4!

Engineering-MathematicsCombinatorics

Question 7

Consider the sequence S0, S1, S2,... deﬁned as follows: S0 = 0, S1 = 1, and Sn = 2S_n−1 + S_n−2 for n ≥ 2. Which of the following statements is FALSE?

A	for every n ≥ 1, S_2n is even
B	for every n ≥ 1, S_2n+1 is odd
C	for every n ≥ 1, S_3n is a multiple of 3
D	for every n ≥ 1, S_4n is a multiple of 6
E	none of the above

AlgorithmsRecurrences

Question 8

In a tutorial on geometrical constructions, the teacher asks a student to construct a right-angled triangle ABC where the hypotenuse BC is 8 inches and the length of the perpendicular dropped from A onto the hypotenuse is h inches, and oﬀers various choices for the value of h. For which value of h can such a triangle NOT exist?

A	3.90 inches
B	2√2 inches
C	2√3 inches
D	4.1 inches
E	none of the above

AptitudeNumerical

Question 9

A	3α
B	α²
C	6α(1 − α)
D	3α^{2^{(1 − α)}}
E	6α(1 − α)+ α²

Engineering-MathematicsProbability-and-statistics

Question 10

For a set A, deﬁne (A) to be the set of all subsets of A. For example, if A = { 1, 2 }, then P(A) = {Φ,{1, 2},{1},{2}}. Let f : A -->P(A) be a function and A is not empty. Which of the following must be TRUE?

A	f cannot be one-to-one (injective)
B	f cannot be onto (surjective)
C	f is both one-to-one and onto (bijective)
D	there is no such f possible
E	if such a function f exists, then A is inﬁnite

Engineering-MathematicsRelations-and-Functions

Question 11

Let fog denote function composition such that (fog)(x) = f (g(x)). Let f :A --> B such that for all g : B --> A and h : B-->A we have fog = foh ==> g=h. Which of the following must be TRUE?

A	f is onto (surjective)
B	f is one-to-one (injective)
C	f is both one-to-one and onto (bijective)
D	the range of f is ﬁnite
E	the domain of f is ﬁnite

Engineering-MathematicsRelations-and-Functions

There are 11 questions to complete.

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