43030 + Interview Questions in Mathematics

1.	Find the value of k, if area of triangle is 4 sq unit and vertices are (−2,0),(0,4),(0,k)
Answer» Find the value of k, if area of triangle is 4 sq unit and vertices are $(- 2, 0), (0, 4), (0, k)$

Discussion

2.	General value of x satisfying the equation tan^2x+sec2x=1 is
Answer» General value of x satisfying the equation tan^2x+sec2x=1 is

Discussion

3.	What is the equation of the line if the line have slope 13 and passing through the point (2,3)?
Answer» What is the equation of the line if the line have slope $\frac{1}{3}$ and passing through the point (2,3)?

Discussion

4.	If 23x 322x=8116 then x=?(a) 1(b) 2(c) 3(d) 4
Answer» If ${(\frac{2}{3})}^{x} {(\frac{3}{2})}^{2 x} = \frac{81}{16} then x = ?$ (a) 1 (b) 2 (c) 3 (d) 4

Discussion

5.	The condition that the straight line lx+my=n may be a normal to the hyperbola b2x2−a2y2=a2b2 is given by
Answer» The condition that the straight line $l x + m y = n$ may be a normal to the hyperbola $b^{2} x^{2} - a^{2} y^{2} = a^{2} b^{2}$ is given by

Discussion

6.	A logical function of four variables is given by Y(A,B,C,D)=¯¯¯¯B+A¯¯¯¯C+¯¯¯¯AC¯¯¯¯¯D. The number of minterms in the K-map representation of the function is________. 11
Answer» A logical function of four variables is given by $Y (A, B, C, D) = ¯ ¯¯ ¯ B + A ¯ ¯¯ ¯ C + ¯ ¯¯ ¯ A C ¯ ¯¯¯ ¯ D$ . The number of minterms in the K-map representation of the function is________. 11

Discussion

7.	If l,m and n are number of points of discontinuity, non-differentiability and local extrema of function f(x)=max[√1−x2,{x}] in x∈[−1,1] respectively then l+m+n is equal to[where {⋅} denotes fractional part function]
Answer» If $l, m$ and $n$ are number of points of discontinuity, non-differentiability and local extrema of function $f (x) = max [\sqrt{1 - x^{2}}, {x}]$ in $x \in [- 1, 1]$ respectively then $l + m + n$ is equal to [where ${\cdot}$ denotes fractional part function]

Discussion

8.	If 3<p<7 and −9<q<−4, then what is the range of p - q?
Answer» If $3 < p < 7$ and $- 9 < q < - 4$ , then what is the range of p - q?

Discussion

9.	The weight of coffee in 70 jars is shown in the following table : Weight (in grams):200−201201−202202−203203−204204−205205−206Frequency:1327181011 Determine the variance and standard deviation of the above distribution.
Answer» The weight of coffee in 70 jars is shown in the following table : $\begin{matrix} Weight (in grams) : & 200 - 201 & 201 - 202 & 202 - 203 & 203 - 204 & 204 - 205 & 205 - 206 Frequency : & 13 & 27 & 18 & 10 & 1 & 1 \end{matrix}$ Determine the variance and standard deviation of the above distribution.

9.

The weight of coffee in 70 jars is shown in the following table : Weight (in grams):200−201201−202202−203203−204204−205205−206Frequency:1327181011 Determine the variance and standard deviation of the above distribution.

Answer»

The weight of coffee in 70 jars is shown in the following table :

$\begin{matrix} Weight (in grams) : & 200 - 201 & 201 - 202 & 202 - 203 & 203 - 204 & 204 - 205 & 205 - 206 Frequency : & 13 & 27 & 18 & 10 & 1 & 1 \end{matrix}$

Determine the variance and standard deviation of the above distribution.

Discussion

10.	How many ways can 5girls and 3boys be seated in a row so that no two boys are together
Answer» How many ways can 5girls and 3boys be seated in a row so that no two boys are together

Discussion

11.	If a function f:{1,2,3,4}→{1,2,3,4,5,6,7,8,9} is defined, then the function f can be
Answer» If a function $f : {1, 2, 3, 4} \to {1, 2, 3, 4, 5, 6, 7, 8, 9}$ is defined, then the function $f$ can be

Discussion

12.	Choose the correct answer in Question Distance between the two planes 2x + 3y + 4z = 4 and 4x + 6y+ 8z =12 is (a) 2 units (b) 4 units (c) 8 units (d) 2√29units
Answer» Choose the correct answer in Question Distance between the two planes 2x + 3y + 4z = 4 and 4x + 6y+ 8z =12 is (a) 2 units (b) 4 units (c) 8 units (d) $\frac{2}{\sqrt{29}} u n i t s$

Discussion

13.	The number of ways in which 8 red roses and 5 white roses of different sizes can be made out to form a garland so that no two white roses come together is
Answer» The number of ways in which 8 red roses and 5 white roses of different sizes can be made out to form a garland so that no two white roses come together is

Discussion

14.	A circle with centre (a,b) passes through the origin. The equation of the tangent to the circle at the origin is
Answer» A circle with centre $(a, b)$ passes through the origin. The equation of the tangent to the circle at the origin is

Discussion

15.	Let A=[aij] be a 4×4 matrix. If aij={2, when i=j0, when i≠j, then the value of {det(adj(adjA))7} is (where {.} represents the fractional part function)
Answer» Let $A = [a_{i j}]$ be a $4 \times 4$ matrix. If $a_{i j} = {\begin{matrix} 2, when i = j 0, when i \neq j \end{matrix}$ , then the value of ${\frac{det(adj(adjA))}{7}}$ is (where ${.}$ represents the fractional part function)

Discussion

16.	If 11+sin θ+11-sin θ=k sec2 θ, then the value of k is _________.
Answer» If $\frac{1}{1 + \sin θ} + \frac{1}{1 - \sin θ} = k \sec^{2} θ$ , then the value of k is _________.

Discussion

17.	Mark the correct alternative in each of the following:If y=sinx+9cosx, then dydx at x = 0 is(a) cos 9 (b) sin 9 (c) 0 (d) 1
Answer» Mark the correct alternative in each of the following: If $y = \frac{\sin (x + 9)}{\cos x}$ , then $\frac{d y}{d x}$ at x = 0 is (a) cos 9 (b) sin 9 (c) 0 (d) 1

Discussion

18.	I alternately toss a fair coin and throw a fair die, until I, either toss a head or throw the face two. If I toss the coin first, then the probability that I throw the face two before I toss a head, is
Answer» I alternately toss a fair coin and throw a fair die, until I, either toss a head or throw the face two. If I toss the coin first, then the probability that I throw the face two before I toss a head, is

Discussion

19.	If ax2+bx+c=0,a,b,c ϵ R , has no real root, then
Answer» If a $x^{2} + b x + c = 0, a, b, c ϵ R$ , has no real root, then

Discussion

20.	95.Vector a is perpendicular to b vector.Component of ( a vector - b vector ) along ( a vector+ b vector) will be ?
Answer» 95.Vector a is perpendicular to b vector.Component of ( a vector - b vector ) along ( a vector+ b vector) will be ?

Discussion

21.	The vectors a→ and b→ are non-collinear. If vectors (x-2)a→+b→ and (2x+1)a→-b→ are collinear, then x = _________________.
Answer» The vectors $\vec{a} and \vec{b}$ are non-collinear. If vectors $(x - 2) \vec{a} + \vec{b} and (2 x + 1) \vec{a} - \vec{b}$ are collinear, then x = _________________.

Discussion

22.	Prave that:(1) sin2θcosθ+cosθ=secθ(2) cos2θ1+tan2θ=1(3) 1-sinθ1+sinθ=secθ-tanθ(4) secθ-cosθcotθ+tanθ=tanθ secθ(5) cotθ+tanθ=cosecθ secθ(6) 1secθ-tanθ=secθ+tanθ(7) sec4θ-cos4θ=1-2cos2θ(8) secθ+tanθ=cosθ1-sinθ(9) If tanθ+1tanθ=2, then show that tan2θ+1tan2θ=2(10) tanA1+tan2A2+cotA1+cot2A2=sin A cos A(11) sec4A1-sin4A-2tan2A=1(12) tanθsecθ-1=tanθ+secθ+1tanθ+secθ-1
Answer» Prave that: (1) $\frac{\sin^{2} θ}{cosθ} + cosθ = secθ$ (2) $\cos^{2} θ (1 + \tan^{2} θ) = 1$ (3) $\sqrt{\frac{1 - sinθ}{1 + sinθ}} = secθ - tanθ$ (4) $(secθ - cosθ) (cotθ + tanθ) = tanθ secθ$ (5) $cotθ + tanθ = cosecθ secθ$ (6) $\frac{1}{secθ - tanθ} = secθ + tanθ$ (7) $\sec^{4} θ - \cos^{4} θ = 1 - 2 \cos^{2} θ$ (8) $secθ + tanθ = \frac{\cos θ}{1 - sinθ}$ (9) If $t anθ + \frac{1}{tanθ} = 2$ , then show that $\tan^{2} θ + \frac{1}{\tan^{2} θ} = 2$ (10) $\frac{tanA}{{(1 + \tan^{2} A)}^{2}} + \frac{cotA}{{(1 + \cot^{2} A)}^{2}} = \sin A \cos A$ (11) $\sec^{4} A (1 - \sin^{4} A) - 2 \tan^{2} A = 1$ (12) $\frac{tanθ}{secθ - 1} = \frac{tanθ + secθ + 1}{tanθ + secθ - 1}$

Discussion

23.	What is Meter Bridge?
Answer» What is Meter Bridge?

Discussion

24.	The derivative of sin−1(2x1+x2) with respect to tan−1(2x1−x2) is
Answer» The derivative of $s i n^{- 1} (\frac{2 x}{1 + x^{2}})$ with respect to $t a n^{- 1} (\frac{2 x}{1 - x^{2}})$ is

Discussion

25.	The residue of the function f(z)=1(z+2)2(z−2)2 at z = 2 is ________ . -0.03125
Answer» The residue of the function $f (z) = \frac{1}{(z + 2)^{2} (z - 2)^{2}}$ at z = 2 is ________ . -0.03125

Discussion

26.	Write the following intervals in set-builder form: (i) (–3, 0) (ii) [6, 12] (iii) (6, 12] (iv) [–23, 5)
Answer» Write the following intervals in set-builder form: (i) (–3, 0) (ii) [6, 12] (iii) (6, 12] (iv) [–23, 5)

Discussion

27.	If −4≤4x+4≤8, then maximum value of x is
Answer» If $- 4 \leq 4 x + 4 \leq 8$ , then maximum value of $x$ is

Discussion

28.	Integrate the rational functions. ∫x(x+1)(x+2)dx.
Answer» Integrate the rational functions. $\int \frac{x}{(x + 1) (x + 2)} d x .$

Discussion

29.	If cos−135+cos−11213=cos−1k, then the value of k is
Answer» If ${cos}^{- 1} \frac{3}{5} + {cos}^{- 1} \frac{12}{13} = {cos}^{- 1} k,$ then the value of $k$ is

Discussion

30.	The order and degree of the differential equation [4+(dydx)2]2/3=d2ydx2 are
Answer» The order and degree of the differential equation ${[4 + {(\frac{d y}{d x})}^{2}]}^{2 / 3} = \frac{d^{2} y}{d x^{2}}$ are

Discussion

31.	The number of integral value(s) of a for which loge(x2+5x)=loge(x+a+3) has exactly one solution is
Answer» The number of integral value(s) of $a$ for which ${log}_{e} (x^{2} + 5 x) = {log}_{e} (x + a + 3)$ has exactly one solution is

Discussion

32.

Calculate the meandeviation about median age for the age distribution of 100 personsgiven below: Age Number 16-20 5 21-25 6 26-30 12 31-35 14 36-40 26 41-45 12 46-50 16 51-55 9

Answer»

Calculate the mean
deviation about median age for the age distribution of 100 persons
given below:

Age	Number
16-20	5
21-25	6
26-30	12
31-35	14
36-40	26
41-45	12
46-50	16
51-55	9

Discussion

33.	An ellipse is drawn by taking a diameter of the circle (x−1)2+y2=1 as its semi-minor axis and a diameterof the circle x2+(y−2)2=4 as its semi-major axis. If the centre of the ellipse is at the origin and its axes are thecoordinate axes, then the equation of the ellipse is
Answer» An ellipse is drawn by taking a diameter of the circle $(x - 1)^{2} + y^{2} = 1$ as its semi-minor axis and a diameter of the circle $x^{2} + (y - 2)^{2} = 4$ as its semi-major axis. If the centre of the ellipse is at the origin and its axes are the coordinate axes, then the equation of the ellipse is

Discussion

34.	How many 3-digit even numbers can be made using the digits 1, 2, 3, 4, 6, 7, if no digit is repeated?
Answer» How many 3-digit even numbers can be made using the digits 1, 2, 3, 4, 6, 7, if no digit is repeated?

Discussion

35.	Algebraic sum of the intercepts made by the plane x + 3y - 4z + 6 = 0 on the axes is
Answer» Algebraic sum of the intercepts made by the plane x + 3y - 4z + 6 = 0 on the axes is

Discussion

36.	The slope of the normal to the curve y3 − xy − 8 = 0 at the point (0, 2) is equal to _________________.
Answer» The slope of the normal to the curve y³ − xy − 8 = 0 at the point (0, 2) is equal to _________________.

Discussion

37.	the solution set of x^2+2≤3x≤2x^2-5 is
Answer» the solution set of x^2+2≤3x≤2x^2-5 is

Discussion

38.	The number of integers n for which n2−4n+46 is a perfect square, is
Answer» The number of integers $n$ for which $n^{2} - 4 n + 46$ is a perfect square, is

Discussion

39.	If the radius of a spherical balloon increases by 0.1% then its volume increases approximately by
Answer» If the radius of a spherical balloon increases by $0.1 %$ then its volume increases approximately by

Discussion

40.	Number of positive value(s) of x satisfying the equation \|\|x+9\|−15\|=10 is
Answer» Number of positive value(s) of $x$ satisfying the equation $\| \| x + 9 \| - 15 \| = 10$ is

Discussion

41.	Column IColumn IIa. If x,y∈R, satisfying the equation (x−4)24+y29=1 p. −23 then the difference between the largest and smallest value of the expression x24+y29 is b. If PQ is focal chord of ellipse x225+y216=1 which passes q. 10through S≡(3,0) and PS=2, then length of chord PQ isc. If the normal at the point P(θ) to the ellipsex214+y25=1 intersect it again at the point Q(2θ), then the value of cosθ is r. 34√7d. The length of common tangent to x2+y2=16 and s. 89x2+25y2=225 is
Answer» $\begin{matrix} C o l u m n I & C o l u m n I I a. If x, y \in R, satisfying the equation \frac{(x - 4)^{2}}{4} + \frac{y^{2}}{9} = 1 & p. - \frac{2}{3} then the difference between the largest and smallest value of the expression \frac{x^{2}}{4} + \frac{y^{2}}{9} is b. If P Q is focal chord of ellipse \frac{x^{2}}{25} + \frac{y^{2}}{16} = 1 which passes & q. 10 through S \equiv (3, 0) and P S = 2, then length of chord P Q is c. If the normal at the point P (θ) to the ellipse \frac{x^{2}}{14} + \frac{y^{2}}{5} = 1 intersect it again at the point Q (2 θ), then the value of cos θ is & r. \frac{3}{4} \sqrt{7} d. The length of common tangent to x^{2} + y^{2} = 16 and & s. 8 9 x^{2} + 25 y^{2} = 225 is \end{matrix}$

Discussion

42.	The graph of y=\|x3+1\| is
Answer» The graph of $y = \| x^{3} + 1 \|$ is

Discussion

43.	In how many ways n married couples can be arranged around a table so that men and women are alternate and each woman is not adjacent to her husband?
Answer» In how many ways $n$ married couples can be arranged around a table so that men and women are alternate and each woman is not adjacent to her husband?

Discussion

44.	FindX and Y,if (i) and(ii) and
Answer» Find X and Y, if (i) and (ii) and

44.

FindX and Y,if (i) and(ii) and

Answer»

Find
X and Y,
if

(i) and

(ii) and

Discussion

45.	Consider the family of lines (x−y−6)+λ(2x+y+3)=0 and (x+2y−4)+μ(3x−2y−4)=0. If the lines of these two families are at right angle to each other, then the locus of their point of intersection is
Answer» Consider the family of lines $(x - y - 6) + λ (2 x + y + 3) = 0$ and $(x + 2 y - 4) + μ (3 x - 2 y - 4) = 0.$ If the lines of these two families are at right angle to each other, then the locus of their point of intersection is

Discussion

46.	The time taken to travel 20 mi is 2 h, which can be represented as ordered pair (2,20). The time taken for every extra 1 mi is 10 min. Find the expression for the time taken with resepect to distance travelled.
Answer» The time taken to travel 20 mi is 2 h, which can be represented as ordered pair (2,20). The time taken for every extra 1 mi is 10 min. Find the expression for the time taken with resepect to distance travelled.

Discussion

47.	let f(x)=1/root x+\|x\| then the domain of f is
Answer» let f(x)=1/root x+\|x\| then the domain of f is

Discussion

48.	Let and be two unit vectors andθis the angle between them. Then isa unit vector if(A) (B) (C) (D)
Answer» Let and be two unit vectors andθ is the angle between them. Then is a unit vector if (A) (B) (C) (D)

48.

Let and be two unit vectors andθis the angle between them. Then isa unit vector if(A) (B) (C) (D)

Answer»

Let

and

be two unit vectors andθ
is the angle between them. Then
is
a unit vector if

(A)
(B)

(C)

(D)

Discussion

49.	Differentiate the following w.r.t Xsin3x
Answer» Differentiate the following w.r.t X sin3x

Discussion

50.	In △ABC, R,r,r1,r2,r3 denote the circumradius, inradius, the exradii opposite to the vertices A,B,C respectively. Given that r1:r2:r3=1:2:3. The value of R:r is
Answer» In $△ A B C, R, r, r_{1}, r_{2}, r_{3}$ denote the circumradius, inradius, the exradii opposite to the vertices $A, B, C$ respectively. Given that $r_{1} : r_{2} : r_{3} = 1 : 2 : 3$ . The value of $R : r$ is

Discussion

Explore topic-wise InterviewSolutions in Current Affairs.

Find the value of k, if area of triangle is 4 sq unit and vertices are (−2,0),(0,4),(0,k)

General value of x satisfying the equation tan^2x+sec2x=1 is

What is the equation of the line if the line have slope 13 and passing through the point (2,3)?

If 23x 322x=8116 then x=?(a) 1(b) 2(c) 3(d) 4

The condition that the straight line lx+my=n may be a normal to the hyperbola b2x2−a2y2=a2b2 is given by

A logical function of four variables is given by Y(A,B,C,D)=¯¯¯¯B+A¯¯¯¯C+¯¯¯¯AC¯¯¯¯¯D. The number of minterms in the K-map representation of the function is________. 11

If l,m and n are number of points of discontinuity, non-differentiability and local extrema of function f(x)=max[√1−x2,{x}] in x∈[−1,1] respectively then l+m+n is equal to[where {⋅} denotes fractional part function]

If 3&lt;p&lt;7 and −9&lt;q&lt;−4, then what is the range of p - q?

The weight of coffee in 70 jars is shown in the following table : Weight (in grams):200−201201−202202−203203−204204−205205−206Frequency:1327181011 Determine the variance and standard deviation of the above distribution.

How many ways can 5girls and 3boys be seated in a row so that no two boys are together

If a function f:{1,2,3,4}→{1,2,3,4,5,6,7,8,9} is defined, then the function f can be

Choose the correct answer in Question Distance between the two planes 2x + 3y + 4z = 4 and 4x + 6y+ 8z =12 is (a) 2 units (b) 4 units (c) 8 units (d) 2√29units

The number of ways in which 8 red roses and 5 white roses of different sizes can be made out to form a garland so that no two white roses come together is

A circle with centre (a,b) passes through the origin. The equation of the tangent to the circle at the origin is

Let A=[aij] be a 4×4 matrix. If aij={2, when i=j0, when i≠j, then the value of {det(adj(adjA))7} is (where {.} represents the fractional part function)

If 11+sin θ+11-sin θ=k sec2 θ, then the value of k is _________.

Mark the correct alternative in each of the following:If y=sinx+9cosx, then dydx at x = 0 is(a) cos 9 (b) sin 9 (c) 0 (d) 1

I alternately toss a fair coin and throw a fair die, until I, either toss a head or throw the face two. If I toss the coin first, then the probability that I throw the face two before I toss a head, is

If ax2+bx+c=0,a,b,c ϵ R , has no real root, then

95.Vector a is perpendicular to b vector.Component of ( a vector - b vector ) along ( a vector+ b vector) will be ?

The vectors a→ and b→ are non-collinear. If vectors (x-2)a→+b→ and (2x+1)a→-b→ are collinear, then x = _________________.

What is Meter Bridge?

The derivative of sin−1(2x1+x2) with respect to tan−1(2x1−x2) is

The residue of the function f(z)=1(z+2)2(z−2)2 at z = 2 is ________ . -0.03125

Write the following intervals in set-builder form: (i) (–3, 0) (ii) [6, 12] (iii) (6, 12] (iv) [–23, 5)

If −4≤4x+4≤8, then maximum value of x is

Integrate the rational functions. ∫x(x+1)(x+2)dx.

If cos−135+cos−11213=cos−1k, then the value of k is

The order and degree of the differential equation [4+(dydx)2]2/3=d2ydx2 are

The number of integral value(s) of a for which loge(x2+5x)=loge(x+a+3) has exactly one solution is

Calculate the meandeviation about median age for the age distribution of 100 personsgiven below: Age Number 16-20 5 21-25 6 26-30 12 31-35 14 36-40 26 41-45 12 46-50 16 51-55 9

An ellipse is drawn by taking a diameter of the circle (x−1)2+y2=1 as its semi-minor axis and a diameterof the circle x2+(y−2)2=4 as its semi-major axis. If the centre of the ellipse is at the origin and its axes are thecoordinate axes, then the equation of the ellipse is

How many 3-digit even numbers can be made using the digits 1, 2, 3, 4, 6, 7, if no digit is repeated?

Algebraic sum of the intercepts made by the plane x + 3y - 4z + 6 = 0 on the axes is

The slope of the normal to the curve y3 − xy − 8 = 0 at the point (0, 2) is equal to _________________.

the solution set of x^2+2≤3x≤2x^2-5 is

The number of integers n for which n2−4n+46 is a perfect square, is

If the radius of a spherical balloon increases by 0.1% then its volume increases approximately by

Number of positive value(s) of x satisfying the equation ||x+9|−15|=10 is

The graph of y=|x3+1| is

In how many ways n married couples can be arranged around a table so that men and women are alternate and each woman is not adjacent to her husband?

FindX and Y,if (i) and(ii) and

Consider the family of lines (x−y−6)+λ(2x+y+3)=0 and (x+2y−4)+μ(3x−2y−4)=0. If the lines of these two families are at right angle to each other, then the locus of their point of intersection is

The time taken to travel 20 mi is 2 h, which can be represented as ordered pair (2,20). The time taken for every extra 1 mi is 10 min. Find the expression for the time taken with resepect to distance travelled.

let f(x)=1/root x+|x| then the domain of f is

Let and be two unit vectors andθis the angle between them. Then isa unit vector if(A) (B) (C) (D)

Differentiate the following w.r.t Xsin3x

In △ABC, R,r,r1,r2,r3 denote the circumradius, inradius, the exradii opposite to the vertices A,B,C respectively. Given that r1:r2:r3=1:2:3. The value of R:r is

If 3<p<7 and −9<q<−4, then what is the range of p - q?