General Aptitude (GA) Set-2

Q. 1 – Q. 5 carry one mark each.

1. “ The dress _________ her so well that they all immediately _________ her on her appearance.”

The words that best fill the blanks in the above sentence are

(A) complemented, complemented

(B) complimented, complemented

(D) complemented, complimented

Answer: (D)

2. “ The judge’s standing in the legal community, though shaken by false allegations of wrongdoing, remained _________.”

The word that best fills the blank in the above sentence is

(A) undiminished

(B) damaged

(D) uncertain

Answer: (A)

3. Find the missing group of letters in the following series: BC, FGH, LMNO, _____

(A) UVWXY

(B) TUVWX

(D) RSTUV

Answer: (B)

4. The perimeters of a circle, a square and an equilateral triangle are equal. Which one of the following statements is true?

(A) The circle has the largest area.

(B) The square has the largest area.

(D) All the three shapes have the same area.

Answer: (A)

5. The value of the expression is _________.

(A) -1

(B) 0

(D) 3

Answer: (C)

Q. 6 – Q. 10 carry two marks each.

6. Forty students watched films A, B and C over a week. Each student watched either only one film or all three. Thirteen students watched film A, sixteen students watched film B and nineteen students watched film C. How many students watched all three films?

(A) 0

(B) 2

(D) 8

Answer: (C)

7. A wire would enclose an area of 1936 m², if it is bent into a square. The wire is cut into two pieces. The longer piece is thrice as long as the shorter piece. The long and the short pieces are bent into a square and a circle, respectively. Which of the following choices is closest to the sum of the areas enclosed by the two pieces in square meters?

(A) 1096

(B) 1111

(D) 2486

Answer: (C)

8. A contract is to be completed in 52 days and 125 identical robots were employed, each operational for 7 hours a day. After 39 days, five-seventh of the work was completed. How many additional robots would be required to complete the work on time, if each robot is now operational for 8 hours a day?

(A) 50

(B) 89

(D) 175

Answer: (Marks to All)

9. A house has a number which needs to be identified. The following three statements are given that can help in identifying the house number.

i. If the house number is a multiple of 3, then it is a number from 50 to 59.

ii. If the house number is NOT a multiple of 4, then it is a number from 60 to 69.

iii. If the house number is NOT a multiple of 6, then it is a number from 70 to 79.

What is the house number?

(A) 54

(B) 65

(D) 76

Answer: (D)

10. An unbiased coin is tossed six times in a row and four different such trials are conducted. One trial implies six tosses of the coin. If H stands for head and T stands for tail, the following are the observations from the four trials:

(1) HTHTHT (2) TTHHHT (3) HTTHHT (4) HHHT__ __.

Which statement describing the last two coin tosses of the fourth trial has the highest probability of being correct?

(A) Two T will occur.

(B) One H and one T will occur.

(D) One H will be followed by one T.

Answer: (B)

Mathematics

Q.1–Q.25 carry one mark each

1. The principal value of (–1)^(–2i/π) is

(A) e²

(B) e²ⁱ

(D) e^–2

Answer: (A)

2. Let f : ℂ → ℂbe an entire function with f(0) = 1, f(1) = 2 and f′ (0) = 0. If there exists M > 0 such that |f″ (z)| ≤ M for all z ∈ ℂ, then f(2) =

(A) 2

(B) 5

(D) 5 + 2i

Answer: (B)

3. In the Laurent series expansion of valid for |z – 1| > 1, the coefficient of is

(A) –2

(B) –1

(D) 1

Answer: (C)

4. Let X and Y be metric spaces, and let f : X → Y be a continuous map. For any subset S of X, which one of the following statements is true?

(A) If S is open, then f(S) is open

(B) If S is connected, then f(S) is connected

(D) If S is bounded, then f(S) is bounded

Answer: (B)

5. The general solution of the differential equation is given by (with an arbitrary positive constant k)

Answer: (C)

6. Let p_n(x) be the polynomial solution of the differential equation

with p_n(1) = 1 for n = 1, 2, 3, …….. If

then α_n is

(A) 2n

(B) 2n + 1

(D) 2n + 3

Answer: (D)

7. In the permutation group S_6,the number of elements of order 8 is

(A) 0

(B) 1

(D) 4

Answer: (A)

8. Let R be a commutative ring with 1 (unity) which is not a field. Let I ⊂ R be a proper ideal such that every element of R not in I is invertible in R: Then the number of maximal deals of R is

(A) 1

(B) 2

(D) infinite

Answer: (A)

9. Let f : ℝ → ℝ be a twice continuously differentiable function. The order of convergence of the secant method for finding root of the equation f(x) = 0 is

Answer: (A)

10. The Cauchy problem uu_x + yu_y = x with u(x, 1) = 2x, when solved using its characteristic equations with an independent variable t, is found to admit of a solution in the form

Then f(s, t) =

Answer: (A)

11. An urn contains four balls, each ball having equal probability of being white or black. Three black balls are added to the urn. The probability that five balls in the urn are black is

(A) 2=7

(B) 3=8

(D) 5=7

Answer: (B)

12. For a linear programming problem, which one of the following statements is FALSE?

(A) If a constraint is an equality, then the corresponding dual variable is unrestricted in sign

(B) Both primal and its dual can be infeasible

(D) Even if both primal and dual are feasible, the optimal values of the primal and the dual can differ

Answer: (D)

13. Let , where a, b, c, f are real numbers and f ≠ 0: The geometric multiplicity of the largest eigenvalue of A equals _______.

14. Consider the subspaces

of ℝ³ . Then the dimension of W₁ +W₂ equals ______.

Answer: (1 to 1)

15. Let V be the real vector space of all polynomials of degree less than or equal to 2 with real coefficients. Let T : V → V be the linear transformation given by

T(p) = 2p + p′

where p′ is the derivative of p. Then the number of nonzero entries in the Jordan canonical form of a matrix of T equals __________.

Answer: (5 to 5)

16. Let I = [2, 3), J be the set of all rational numbers in the interval [4, 6], K be the Cantor (ternary) set, and let L = {7 + x : x ∈ K}. Then the Lebesgue measure of the set I ∪ J ∪ L equals _____.

Answer: (1 to 1)

17. Let u(x, y, z) = x² – 2y + 4y² for (x, y, z) ∈ ℝ³. Then the directional derivative of u in the direction at the point (5, 1, 0) is _______.

Answer: (6 to 6)

18. If the Laplace transform of y(t) is given by then y(0) + y′(0) = ________.

Answer: (1 to 1)

19. The number of regular singular points of the differential equation

in the interval is equal to ________.

Answer: (2 to 2)

20. Let F be a field with 7⁶ elements and let K be a subfield of F with 49 elements. Then the dimension of F as a vector space over K is _________.

Answer: (3 to 3)

21. Let C([0, 1]) be the real vector space of all continuous real valued functions on [0, 1], and let T be the linear operator on C([0, 1]) given by

Then the dimension of the range space of T equals____________.

Answer: (2 to 2)

22. Let a ∈ (–1, 1) be such that the quadrature rule

is exact for all polynomials of degree less than or equal to 3: Then 3a² = ______.

Answer: (1 to 1)

23. Let X and Y have joint probability density function given by

If f_Y denotes the marginal probability density function of Y , then f_Y (1=2) =_______.

Answer: (1 to 1)

24. Let the cumulative distribution function of the random variable X be given by

Then ℙ (X = 1/2) = _______.

Answer: (0.25 to 0.25)

25. Let {X_j} be a sequence of independent Bernoulli random variables with ℙ (X_j = 1) = 1/4 and let Then Y_n converges, in probability to ________.

Answer: (0.25 to 0.25)

Q.26-Q.55 carry two marks each

26. Let Γ be the circle given by z = 4e^iθ, where θ varies from 0 to 2π Then

(A) 2πi(e² – 1)

(B) πi(1 – e²)

(D) 2πi(1 – e²)

Answer: (C)

27. The image of the half plane Re(z) + Im(z) > 0 under the map is given by

(A) Re(w) > 0

(B) Im (w) > 0

(D) |w| < 1

Answer: (D)

28. Let D ⊂ ℝ² denote the closed disc with center at the origin and radius 2. Then

(A) π(1 – e^–4)

(B)

(D)

Answer: (A)

29. Consider the polynomial p(X) = X⁴ + 4 in the ring ℚ[X} of polynomials in the variable X with coefficients in the field ℚ of rational numbers. Then

(A) the set of zeros of p(X) in C forms a group under multiplication

(B) p(X) is reducible in the ring ℚ[X]

(D) the splitting field of p(X) has degree 4 over ℚ

Answer: (B)

30. Which one of the following statements is true?

(A) Every group of order 12 has a non-trivial proper normal subgroup

(B) Some group of order 12 does not have a non-trivial proper normal subgroup

(D) Every group of order 12 has an element of order 12

Answer: (A)

31. For an odd prime p, consider the ring Then the element 2 in is

(A) a unit

(B) a square

(D) irreducible

Answer: (D)

32. Consider the following two statements:

P : The matrix has infinitely many LU factorizations, where L is lower triangular with each diagonal entry 1 and U is upper triangular

Q : The matrix has no LU factorization, where L is lower triangular with each diagonal entry 1 and U is upper triangular.

Then which one of the following options is correct?

(A) P is TRUE and Q is FALSE

(B) Both P and Q are TRUE

(D) Both P and Q are FALSE

Answer: (B)

33. If the characteristic curves of the partial differential equation μ(x, y) =c₁ and v(x, y) = c₂, where c₁ and c₂ are constants, then

Answer: (A)

34. Let f : X → Y be a continuous map from a Hausdorff topological space X to a metric space Y . Consider the following two statements:

P: f is a closed map and the inverse image f^–1 (y) = {x ∈ X : f(x) = y} is compact for each y ∈ Y.

Q: For every compact subset K ⊂ Y, the inverse image f^–1 (K) is a compact subset of X:

Which one of the following is true?

(A) Q implies P but P does NOT imply Q

(B) P implies Q but Q does NOT imply P

(D) neither P implies Q nor Q implies P

Answer: (C)

35. Let X denote ℝ² endowed with the usual topology. Let Y denote R endowed with the co-finite topology. If Z is the product topological space Y × Y, then

(A) the topology of X is the same as the topology of Z

(B) the topology of X is strictly coarser (weaker) than that of Z

(D) the topology of X cannot be compared with that of Z

Answer: (C)

36. Consider ℝⁿ with the usual topology for n = 1, 2, 3. Each of the following options gives topological spaces X and Y with respective induced topologies. In which option is X homeomorphic to Y ?

Answer: (A)

37. Let {X_i} be a sequence of independent Poisson() variables and let Then the limiting distribution of is the normal distribution with zero mean and variance given by

(A) 1

(B) √λ

(D) λ²

Answer: (C)

38. Let X₁, X₂, . . . , X_n be independent and identically distributed random variables with probability density function given by

Also let Then the maximum likelihood estimator of θ is

Answer: (C)

39. Consider the Linear Programming Problem (LPP):

where α is a constant. If (3, 0) is the only optimal solution, then

(A) α < –2

(B) –2 < α < 1

(D) α < 2

Answer: (D)

40. Let M₂(ℝ) be the vector space of all 2 ×2 real matrices over the field R: Define the linear transformation S : M₂(ℝ) → M₂(ℝ) by S(X) = 2X + X^T , where X^T denotes the transpose of the matrix X: Then the trace of S equals ____.

Answer: (10 to 10)

41. Consider ℝ³ with the usual inner product. If d is the distance from (1, 1, 1) to the subspace
span(1, 1, 0), (0, 1, 1)g of ℝ³then |3d² = _________.

Answer: (1 to 1)

42. Consider the matrix A = I₉ – 2u^Tu with where I9 is the 9 × 9 identity matrix and uT is the transpose of u. If λ and μ are two distinct eigenvalues of A, then |λ – μ| = _____.

Answer: (2 to 2)

43. Let f(z) = z³e^z2 for z ∈ ℂ and let Γ be the circle z = e^iθ, where θ varies from 0 to 4π. Then

Answer: (6 to 6)

44. Let S be the surface of the solid

V = {(x, y, z) : 0 ≤ x ≤ 1, 0 ≤ 2, 0 ≤ z ≤ 3}.

Let denote the unit outward normal to S and let

Then the surface integral equals ________.

Answer: (18 to 18)

45. Let A be a 3 × 3 matrix with real entries. If three solutions of the linear system of differential equations are given by

then the sum of the diagonal entries of A is equal to ______.

Answer: (2 to 2)

46. If is a solution of the differential equation xy″ + αy′ + βx³y = 0

For some real numbers α and β, then αβ = _______.

Answer: (4 to 4)

47. Let L²([0, 1]) be the Hilbert space of all real valued square integrable functions on [0, 1] with the usual inner product. Let Φ be the linear functional on L²([0, 1]) defined by

where μ denotes the Lebesgue measure on [0, 1] Then || Φ|| = ______.

Answer: (3 to 3)

48. Let U be an orthonormal set in a Hilbert space H and let x ∈ H be such that ||x|| = 2. Consider the set

Then the maximum possible number of elements in E is _______.

Answer: (64 to 64)

49. If p(x) = 2 –(x + 1) + x(x + 1) – βx(x + 1) (x – α) interpolates the points (x, y) in the table

then α + β = ______.

Answer: (3 to 3)

50. If then (a₀ + a₁)π = ______.

Answer: (2 to 2)

51. For n = 1, 2, . . ., let _____.

Answer: (1 to 1)

52. Let X₁, X2, X3, X4 be independent exponential random variables with mean 1, 1/2, 1/3, 1/4, respectively. Then Y = min(X1, X2, X3, X4) has exponential distribution with mean equal to _______.

Answer: (0.1 to 0.1)

53. Let X be the number of heads in 4 tosses of a fair coin by Person 1 and let Y be the number of heads in 4 tosses of a fair coin by Person 2. Assume that all the tosses are independent. Then the value of ℙ(X = Y ) correct up to three decimal places is

Answer: (0.272 to 0.274)

54. Let X₁ ad X₂ be independent geometric random variables with the same probability mas function given by ℙ(X = k) = p(1 – p)^k–1, k = 1, 2, …. . Then the value of ℙ(X₁ = 2|X₁ + X₂ = 4) correct up to three decimal places is_______.

Answer: (0.332 to 0.334)

55. A certain commodity is produced by the manufacturing plants P₁ and P₂ whose capacities are 6 and 5 units, respectively. The commodity is shipped to markets M₁, M₂, M₃ and M₄ whose requirements are 1, 2, 3 and 5 units, respectively. The transportation cost per unit from plant P_i to market M_j is as follows

Then the optimal cost of transportation is ________.

Answer: (57 to 57)

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