43030 + Interview Questions in Mathematics

1.	What is NOR gate?
Answer» What is NOR gate?

Discussion

2.	If the integral of the function sin(lnx)x=f(x), then find the value of f(1)(take constant of integration equal to zero)___
Answer» If the integral of the function $\frac{s i n (l n x)}{x} = f (x)$ , then find the value of f(1) (take constant of integration equal to zero) ___

Discussion

3.	If f(x)={ax,x<2ax2−bx+3,x≥2 is differentiable for all real values of x, then
Answer» If $f (x) = {\begin{matrix} a x, & x < 2 a x^{2} - b x + 3, & x \geq 2 \end{matrix}$ is differentiable for all real values of $x,$ then

Discussion

4.	The lateral edge of a regular hexagonal pyramid is 1 cm. If the volume is maximum, then its height is
Answer» The lateral edge of a regular hexagonal pyramid is 1 cm. If the volume is maximum, then its height is

Discussion

5.	Let A, B, C be three events such that P(A∩B∩C)=0, P(Exactly one of A and B occurs) = x, P (exactly one of B and C occurs) = y, P(Exactly one of A and C occurs) = z. Then P(A∪B∪C) = ____________.
Answer» Let A, B, C be three events such that $P (A \cap B \cap C) = 0,$ P(Exactly one of A and B occurs) = x, P (exactly one of B and C occurs) = y, P(Exactly one of A and C occurs) = z. Then $P (A \cup B \cup C)$ = ____________.

Discussion

6.	If ∫dx3+4cos2x= a tan−1(√37tan x)+C,then a is .
Answer» $If \int \frac{dx}{3 + 4 {cos}^{2} x} = a {tan}^{- 1} (\sqrt{\frac{3}{7}} tan x) + C, then a is$ .

Discussion

7.	Read the following information carefully to answer the questions that follow. The questions are based on following coding formats: + – North * – South – East # – West $– Either 4 or m ?– Either 5 or 12 m Conditions given are as: I. P+?Q II. P+#R III. RQ IV. R#$S V. T?S VI. U#$T VII. V+$U VIII. V#R Q. If Z*$S and V$Z, what is the maximum area of the quadrilateral formed by joining points Z, V, T V
Answer» Read the following information carefully to answer the questions that follow. The questions are based on following coding formats: + – North * – South – East # – West $$$ – Either 4 or m ?– Either 5 or 12 m Conditions given are as: I. P+?Q II. P+#R III. RQ IV. R# $$$ S V. T?S VI. U# $$$ T VII. V+ $$$ U VIII. V#R Q. If Z* $$$ S and V $$$ Z, what is the maximum area of the quadrilateral formed by joining points Z, V, T V

Discussion

8.	Let E be an event which is neither a certainty nor an impossibility. If probability is such that P(E)=1+λ+λ2 and P(E′)=(1+λ)2 in terms of an unknown λ, then the number of possible values of λ is
Answer» Let $E$ be an event which is neither a certainty nor an impossibility. If probability is such that $P (E) = 1 + λ + λ^{2}$ and $P (E^{'}) = (1 + λ)^{2}$ in terms of an unknown $λ,$ then the number of possible values of $λ$ is

Discussion

9.	A point is on the x -axis. What are its y -coordinates and z -coordinates?
Answer» A point is on the x -axis. What are its y -coordinates and z -coordinates?

Discussion

10.	12. a ar +ar2 +...+ ar-1 a(r"
Answer» 12. a ar +ar2 +...+ ar-1 a(r"

Discussion

11.	xr-x .01OT
Answer» xr-x .01OT

Discussion

12.	If x.a=0,x×b=c×b then x =
Answer» If $x . a = 0, x \times b = c \times b$ then x =

Discussion

13.	If a is any vector then (a×^i)2+(a×^j)2+(a×^k)2 =
Answer» If a is any vector then $(a \times^i)^{2} + (a \times^j)^{2} + (a \times^k)^{2}$ =

Discussion

14.	Suppose f(x) and g(x) are two continuous functions defined for 0≤x≤1. Given f(x)=∫10ex+t.f(t) dt and g(x)=∫10ex+t.g(t) dt+x. The value of f(1) equals
Answer» Suppose f(x) and g(x) are two continuous functions defined for $0 \leq x \leq 1$ . Given $f (x) = \int_{0}^{1} e^{x + t} . f (t) d t$ and $g (x) = \int_{0}^{1} e^{x + t} . g (t) d t + x$ . The value of f(1) equals

Discussion

15.	Suppose that for a particular economy, investment is equal to 200, government purchases are 150, net taxes (that is lump-sum taxes minus transfer) is 100 and consumption is given by C = 100 + 0.75y (i) What is the level of equilibrium income? (ii) Calculate the value of the government expenditure multiplier and the tax multiplier. (iii) If the government expenditure increases by 200, find the change in equilibrium income.
Answer» Suppose that for a particular economy, investment is equal to 200, government purchases are 150, net taxes (that is lump-sum taxes minus transfer) is 100 and consumption is given by C = 100 + 0.75y (i) What is the level of equilibrium income? (ii) Calculate the value of the government expenditure multiplier and the tax multiplier. (iii) If the government expenditure increases by 200, find the change in equilibrium income.

15.

Suppose that for a particular economy, investment is equal to 200, government purchases are 150, net taxes (that is lump-sum taxes minus transfer) is 100 and consumption is given by C = 100 + 0.75y (i) What is the level of equilibrium income? (ii) Calculate the value of the government expenditure multiplier and the tax multiplier. (iii) If the government expenditure increases by 200, find the change in equilibrium income.

Answer»

Suppose that for a particular economy, investment is equal to 200, government purchases are 150, net taxes (that is lump-sum taxes minus transfer) is 100 and consumption is given by C = 100 + 0.75y

(i) What is the level of equilibrium income?

(ii) Calculate the value of the government expenditure multiplier and the tax multiplier.

(iii) If the government expenditure increases by 200, find the change in equilibrium income.

Discussion

16.	7. x sim 'x
Answer» 7. x sim 'x

Discussion

17.	Let 2x2+y2-3xy=0 be the equation of a pair of tangents drawn from the origin O to a circle of radius 3 with centre in the first quadrant. If A is one of the points of contact, find the length of OA.
Answer» Let 2x²+y²-3xy=0 be the equation of a pair of tangents drawn from the origin O to a circle of radius 3 with centre in the first quadrant. If A is one of the points of contact, find the length of OA.

Discussion

18.	if f(x) is a polynomial function of second degree such that f(-3)=6 , f(0)=6 and f(2) =11 then the graph of the function f(x) cuts the ordinate at x=1 at the point
Answer» if f(x) is a polynomial function of second degree such that f(-3)=6 , f(0)=6 and f(2) =11 then the graph of the function f(x) cuts the ordinate at x=1 at the point

Discussion

19.	If A1,A2;G1,G2 and H1,H2 be AM's, GM's and HM's between two quantities, then the value of G1G2H1H2 is
Answer» If $A_{1}, A_{2}; G_{1}, G_{2}$ and $H_{1}, H_{2}$ be AM's, GM's and HM's between two quantities, then the value of $\frac{G_{1} G_{2}}{H_{1} H_{2}}$ is

Discussion

20.	Which one of the following is false? Read ∧ as AND , ∨ as OR, ∼ as NOT, → as one way implication and ↔ as two way implication .
Answer» Which one of the following is false? Read $\land$ as AND , $\lor$ as OR, $\sim$ as NOT, $\to$ as one way implication and $\leftrightarrow$ as two way implication .

Discussion

21.	What is wavy curve method
Answer» What is wavy curve method

Discussion

22.	a,b,c are real numbers in the polynomial p(z)=2z^4+az^3+bz^2+cz+5. If two roots of the equation p(z)=0 are 2 and i, then the value of a is
Answer» a,b,c are real numbers in the polynomial p(z)=2z^4+az^3+bz^2+cz+5. If two roots of the equation p(z)=0 are 2 and i, then the value of a is

Discussion

23.	limx→0(3x2+27x2+2)1/x2 is equal to:
Answer» $lim x \to 0 {(\frac{3 x^{2} + 2}{7 x^{2} + 2})}^{1 / x^{2}}$ is equal to:

Discussion

24.	If →A = 3^i + ^j + 2^k and →B = 2^i + 2^j + 4^k then find the value of \|→A×→B\|.
Answer» If $\to A$ = $3^i +^j + 2^k$ and $\to B$ = $2^i + 2^j + 4^k$ then find the value of $\| \to A \times \to B \|$ .

Discussion

25.	Tangent and normal are drawn at P(16,16) on the parabola y2=16x, which intersect the axis of the parabola at A and B, respectively. If C is the centre of the circle through the points P,A and B and ∠CPB=θ, then a value of tanθ is
Answer» Tangent and normal are drawn at $P (16, 16)$ on the parabola $y^{2} = 16 x$ , which intersect the axis of the parabola at $A$ and $B$ , respectively. If $C$ is the centre of the circle through the points $P, A$ and $B$ and $∠ C P B = θ$ , then a value of $tan θ$ is

Discussion

26.	A box contains 90 discs which are numbered from 1 to 90. If one disc is drawn at random from the box, find the probability that it bears (i) a two digit number (ii) a perfect square number (iii) a number divisible by 5.
Answer» A box contains 90 discs which are numbered from 1 to 90. If one disc is drawn at random from the box, find the probability that it bears (i) a two digit number (ii) a perfect square number (iii) a number divisible by 5.

Discussion

27.	A manufacturer considers that men and women workers are equally efficient and so he pays them at the same rate. He has 30 and 17 units of workers (male and female) and capital respectively, which he uses to produce two types of goods A and B. To produce one unit of A, 2 workers and 3 units of capital are required while 3 workers and 1 unit of capital is required to produce one unit of B. If A and B are priced at ₹100 and ₹120 per unit respectively, how should he use his resources to maximise the total revenue? Form the above as an LPP and solve graphically. Do you agree with this view of the manufacturer that men and women workers are equally efficient and so should be paid at the same rate?
Answer» A manufacturer considers that men and women workers are equally efficient and so he pays them at the same rate. He has 30 and 17 units of workers (male and female) and capital respectively, which he uses to produce two types of goods A and B. To produce one unit of A, 2 workers and 3 units of capital are required while 3 workers and 1 unit of capital is required to produce one unit of B. If A and B are priced at ₹100 and ₹120 per unit respectively, how should he use his resources to maximise the total revenue? Form the above as an LPP and solve graphically. Do you agree with this view of the manufacturer that men and women workers are equally efficient and so should be paid at the same rate?

Discussion

28.	Does a line have both direction ratios and direction cosines??
Answer» Does a line have both direction ratios and direction cosines??

Discussion

29.	[-2, ifxs-116. f(x)-2x, if -i
Answer» [-2, ifxs-116. f(x)-2x, if -i

Discussion

30.	If (11+2i+31−i)(3−2i1+3i) is reducible to a+ib, then values of a and b are
Answer» If $(\frac{1}{1 + 2 i} + \frac{3}{1 - i}) (\frac{3 - 2 i}{1 + 3 i})$ is reducible to $a + i b$ , then values of $a$ and $b$ are

Discussion

31.	Question 1(ii)Check whether the following are quadratic equations:(ii)x2−2x=(−2)(3−x)
Answer» Question 1(ii) Check whether the following are quadratic equations: $(i i) x^{2} - 2 x = (- 2) (3 - x)$

Discussion

32.	∫cos2x-cos2θcosx-cosθdx is equal to(a) 2sinx+xcosθ+C(b) 2sinx-xcosθ+C(c) 2sinx+2xcosθ+C(d) 2sinx-2xcosθ+C
Answer» $\int \frac{\cos 2 x - \cos 2 θ}{\cos x - \cos θ} d x$ is equal to (a) $2 (\sin x + x \cos θ) + C$ (b) $2 (\sin x - x \cos θ) + C$ (c) $2 (\sin x + 2 x \cos θ) + C$ (d) $2 (\sin x - 2 x \cos θ) + C$

Discussion

33.	An angle between the plane, x+y+z=5 and the line of intersection of the planes, 3x+4y+z−1=0 and 5x+8y+2z+14=0, is :
Answer» An angle between the plane, $x + y + z = 5$ and the line of intersection of the planes, $3 x + 4 y + z - 1 = 0$ and $5 x + 8 y + 2 z + 14 = 0$ , is :

Discussion

34.	In some cases we use the formula R_T=R_0(1+α(△ T)) In some other cases we use the formula R_T=R_0(1+α T) for two different temperatures of which one is unknown, and find their ratio to find the unknown temperature. In which places, these formulae should be used appropriately
Answer» In some cases we use the formula R_T=R_0(1+α(△ T)) In some other cases we use the formula R_T=R_0(1+α T) for two different temperatures of which one is unknown, and find their ratio to find the unknown temperature. In which places, these formulae should be used appropriately

Discussion

35.	Which of the following binary operation is not commutative?
Answer» Which of the following binary operation is not commutative?

Discussion

36.	If the HCF of 210 and 55 is expressible in the form to 210×5 + 55 y then find y
Answer» If the HCF of 210 and 55 is expressible in the form to 210×5 + 55 y then find y

Discussion

37.	if f(x)=ax^2+bx+c, g(x)= -ax^2 +bx+ c where ac not equal to zero then prove that f(x).g(x)=0 has at least two real root.
Answer» if f(x)=ax^2+bx+c, g(x)= -ax^2 +bx+ c where ac not equal to zero then prove that f(x).g(x)=0 has at least two real root.

Discussion

38.	If sin−1x=y, then which one of the following is correct? a) 0≤y≤π b) −π2≤y≤π2 c) 0<y<π d) −π2<y<π2
Answer» If $s i n^{- 1} x = y$ , then which one of the following is correct? a) $0 \leq y \leq π$ b) $- \frac{π}{2} \leq y \leq \frac{π}{2}$ c) $0 < y < π$ d) $- \frac{π}{2} < y < \frac{π}{2}$

38.

If sin−1x=y, then which one of the following is correct? a) 0≤y≤π b) −π2≤y≤π2 c) 0<y<π d) −π2<y<π2

Answer»

If $s i n^{- 1} x = y$ , then which one of the following is correct?

a) $0 \leq y \leq π$
b) $- \frac{π}{2} \leq y \leq \frac{π}{2}$
c) $0 < y < π$
d) $- \frac{π}{2} < y < \frac{π}{2}$

Discussion

39.	Twelve balls are distributed among three boxes. The probability that the first box will contain three balls, is
Answer» Twelve balls are distributed among three boxes. The probability that the first box will contain three balls, is

Discussion

40.	In the given figure, a square dart board is shown. The length of a side of the larger square is 1.5 times the length of a side of the smaller square. If a dart is thrown and lands on the larger square. What is the probability that it will land in the interior of the smaller square?Figure
Answer» In the given figure, a square dart board is shown. The length of a side of the larger square is 1.5 times the length of a side of the smaller square. If a dart is thrown and lands on the larger square. What is the probability that it will land in the interior of the smaller square? Figure

Discussion

41.	Find the equation of the hyperbola satisfying the give conditions: Foci, passing through (2, 3)
Answer» Find the equation of the hyperbola satisfying the give conditions: Foci, passing through (2, 3)

Discussion

42.	The equation of the bisector of the acute angle between 4x+3y−6=0 and 5x+12y+9=0 is
Answer» The equation of the bisector of the acute angle between $4 x + 3 y - 6 = 0$ and $5 x + 12 y + 9 = 0$ is

Discussion

43.	Solve the equation 3x²-5x+2=0 by the method of completing the square
Answer» Solve the equation 3x²-5x+2=0 by the method of completing the square

Discussion

44.	Value of limn→∞S1Sn+S2Sn−1+...+SnS1S21+S22+...+S2n is
Answer» Value of $lim n \to \infty \frac{S_{1} S_{n} + S_{2} S_{n - 1} + . . . + S_{n} S_{1}}{S_{1}^{2} + S_{2}^{2} + . . . + S_{n}^{2}}$ is

Discussion

45.	o.cosec-1(-
Answer» o.cosec-1(-

Discussion

46.	445n2 +56
Answer» 445n2 +56

Discussion

47.	Prove that: cot 2212∘=√2+1
Answer» Prove that: $c o t 22 {\frac{1}{2}}^{\circ} = \sqrt{2} + 1$

47.

Prove that: cot 2212∘=√2+1

Answer»

Prove that:

$c o t 22 {\frac{1}{2}}^{\circ} = \sqrt{2} + 1$

Discussion

48.	cot^2 A( sec A-1) / (1+sin A) - sec^2 A(1- sin A) / (1+ sec A)
Answer» cot^2 A( sec A-1) / (1+sin A) - sec^2 A(1- sin A) / (1+ sec A)

Discussion

49.	The median of a set of 9 distinct observations is 20.5. If each of the largest 4 observations of the set is increased by 2, then the median of the new set
Answer» The median of a set of 9 distinct observations is 20.5. If each of the largest 4 observations of the set is increased by 2, then the median of the new set

Discussion

50.	Let B be the centre of the circle x2+y2−2x+4y+1=0. Let the tangents at two points P and Q on the circle intersect at the point A(3,1). Then 8⋅(area△APQarea△BPQ) is equal to
Answer» Let $B$ be the centre of the circle $x^{2} + y^{2} - 2 x + 4 y + 1 = 0$ . Let the tangents at two points $P$ and $Q$ on the circle intersect at the point $A (3, 1) .$ Then $8 \cdot (\frac{area △ A P Q}{area △ B P Q})$ is equal to

Discussion

Explore topic-wise InterviewSolutions in Current Affairs.

What is NOR gate?

If the integral of the function sin(lnx)x=f(x), then find the value of f(1)(take constant of integration equal to zero)___

If f(x)={ax,x&lt;2ax2−bx+3,x≥2 is differentiable for all real values of x, then

The lateral edge of a regular hexagonal pyramid is 1 cm. If the volume is maximum, then its height is

Let A, B, C be three events such that P(A∩B∩C)=0, P(Exactly one of A and B occurs) = x, P (exactly one of B and C occurs) = y, P(Exactly one of A and C occurs) = z. Then P(A∪B∪C) = ____________.

If ∫dx3+4cos2x= a tan−1(√37tan x)+C,then a is .

Let E be an event which is neither a certainty nor an impossibility. If probability is such that P(E)=1+λ+λ2 and P(E′)=(1+λ)2 in terms of an unknown λ, then the number of possible values of λ is

A point is on the x -axis. What are its y -coordinates and z -coordinates?

12. a ar +ar2 +...+ ar-1 a(r"

xr-x .01OT

If x.a=0,x×b=c×b then x =

If a is any vector then (a×^i)2+(a×^j)2+(a×^k)2 =

Suppose f(x) and g(x) are two continuous functions defined for 0≤x≤1. Given f(x)=∫10ex+t.f(t) dt and g(x)=∫10ex+t.g(t) dt+x. The value of f(1) equals

7. x sim 'x

Let 2x2+y2-3xy=0 be the equation of a pair of tangents drawn from the origin O to a circle of radius 3 with centre in the first quadrant. If A is one of the points of contact, find the length of OA.

if f(x) is a polynomial function of second degree such that f(-3)=6 , f(0)=6 and f(2) =11 then the graph of the function f(x) cuts the ordinate at x=1 at the point

If A1,A2;G1,G2 and H1,H2 be AM's, GM's and HM's between two quantities, then the value of G1G2H1H2 is

Which one of the following is false? Read ∧ as AND , ∨ as OR, ∼ as NOT, → as one way implication and ↔ as two way implication .

What is wavy curve method

a,b,c are real numbers in the polynomial p(z)=2z^4+az^3+bz^2+cz+5. If two roots of the equation p(z)=0 are 2 and i, then the value of a is

limx→0(3x2+27x2+2)1/x2 is equal to:

If →A = 3^i + ^j + 2^k and →B = 2^i + 2^j + 4^k then find the value of |→A×→B|.

Tangent and normal are drawn at P(16,16) on the parabola y2=16x, which intersect the axis of the parabola at A and B, respectively. If C is the centre of the circle through the points P,A and B and ∠CPB=θ, then a value of tanθ is

A box contains 90 discs which are numbered from 1 to 90. If one disc is drawn at random from the box, find the probability that it bears (i) a two digit number (ii) a perfect square number (iii) a number divisible by 5.

Does a line have both direction ratios and direction cosines??

[-2, ifxs-116. f(x)-2x, if -i

If (11+2i+31−i)(3−2i1+3i) is reducible to a+ib, then values of a and b are

Question 1(ii)Check whether the following are quadratic equations:(ii)x2−2x=(−2)(3−x)

∫cos2x-cos2θcosx-cosθdx is equal to(a) 2sinx+xcosθ+C(b) 2sinx-xcosθ+C(c) 2sinx+2xcosθ+C(d) 2sinx-2xcosθ+C

An angle between the plane, x+y+z=5 and the line of intersection of the planes, 3x+4y+z−1=0 and 5x+8y+2z+14=0, is :

In some cases we use the formula R_T=R_0(1+α(△ T)) In some other cases we use the formula R_T=R_0(1+α T) for two different temperatures of which one is unknown, and find their ratio to find the unknown temperature. In which places, these formulae should be used appropriately

Which of the following binary operation is not commutative?

If the HCF of 210 and 55 is expressible in the form to 210×5 + 55 y then find y

if f(x)=ax^2+bx+c, g(x)= -ax^2 +bx+ c where ac not equal to zero then prove that f(x).g(x)=0 has at least two real root.

If sin−1x=y, then which one of the following is correct? a) 0≤y≤π b) −π2≤y≤π2 c) 0&lt;y&lt;π d) −π2&lt;y&lt;π2

Twelve balls are distributed among three boxes. The probability that the first box will contain three balls, is

In the given figure, a square dart board is shown. The length of a side of the larger square is 1.5 times the length of a side of the smaller square. If a dart is thrown and lands on the larger square. What is the probability that it will land in the interior of the smaller square?Figure

Find the equation of the hyperbola satisfying the give conditions: Foci, passing through (2, 3)

The equation of the bisector of the acute angle between 4x+3y−6=0 and 5x+12y+9=0 is

Solve the equation 3x²-5x+2=0 by the method of completing the square

Value of limn→∞S1Sn+S2Sn−1+...+SnS1S21+S22+...+S2n is

o.cosec-1(-

445n2 +56

Prove that: cot 2212∘=√2+1

cot^2 A( sec A-1) / (1+sin A) - sec^2 A(1- sin A) / (1+ sec A)

The median of a set of 9 distinct observations is 20.5. If each of the largest 4 observations of the set is increased by 2, then the median of the new set

Let B be the centre of the circle x2+y2−2x+4y+1=0. Let the tangents at two points P and Q on the circle intersect at the point A(3,1). Then 8⋅(area△APQarea△BPQ) is equal to

If f(x)={ax,x<2ax2−bx+3,x≥2 is differentiable for all real values of x, then

If sin−1x=y, then which one of the following is correct? a) 0≤y≤π b) −π2≤y≤π2 c) 0<y<π d) −π2<y<π2