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This section includes 7 InterviewSolutions, each offering curated multiple-choice questions to sharpen your Current Affairs knowledge and support exam preparation. Choose a topic below to get started.
| 1. |
If sin x _(1)+ sin x_(2) + sin x _(3) +…+ sin x _(n) is |
| Answer» Answer :C | |
| 2. |
State which of the following sets are finite sets or infinite. In case of finite set, |
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Answer» Solution :(i) A is not a NULL SET (ii) B is a null set (III) C is not a null set |
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| 3. |
Find the coordinates of the point where the line through (5, 1, 6) and (3, 4,1) crosses the YZ- plane. |
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Answer» <P> |
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| 4. |
Let F_(1)andF_(2) be the points (0,-4)and(0,4). The locus of the point P such that |PF_(1)|+|PF_(2)|=6 is : |
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Answer» an ellipse |
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| 5. |
In tossing of a pair of dice, the probability of getting an odd number greater than 2 on each die is : |
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Answer» (1/3) |
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| 7. |
If n is a positive integer, then(1+i)^n+(1-i)^n= |
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Answer» `2^((n//2)+1).COS(npi)/(3)` |
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| 8. |
If A=(1)/(pi)[{:(sin^(-1)(pix),tan^(-1)((x)/(pi))),(sin^(-1)((x)/(pi)),cot^(-1)(pix)):}],B=(1)/(pi)[{:(-cos^(-1)(pix),tan^(-1)((x)/(pi))),(sin^(-1)((x)/(pi)),-tan^(-1)(pix)):}], then A-B is equal to ...... |
| Answer» ANSWER :D | |
| 9. |
The probability of getting a number between 1 and 100 which is divisible by one and itself only is…… |
| Answer» Answer :D | |
| 10. |
Point P lie on 2xy=1. A triangle is contructed by P, S and S' (where S and S' are foci). The locus of ex-centre opposite S (S and P lie in first quandrant) is (x+py)^(2)=(sqrt(2)-1)^(2)(x-y)^(2)+q, then the value of p+q is |
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| 11. |
Let A = (a_(ij)_(3xx3) be a matrix with a_(ij ) in C. Let B be a matrix obtained by inerchanging two columns of A . Then det (A+B) is equal to |
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Answer» DET (A) +det (B) |
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| 12. |
Atowersubtendsan anglealphaat apointAin the planeof itsbaseand the angleof depressionof thefootof thetowerata pointb fthustaboveA isbeta. Thenthe heightof thetower is |
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Answer» B TAN `alphacotbeta ` |
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| 13. |
Show that the area enclosed between y^(2)=4ax and y=mx is (8)/(3)(a^(2))/(m^(3)) sq units. |
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| 14. |
Is ** defined on the set {1,2,3,4,5} by a"*"b = L.C.M. of a and b a binary operation ?Justify your answer. |
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| 15. |
Definite integration as the limit of a sum : lim_(ntooo)sum_(k=0)^(n)(n)/(n^(2)+k^(2))=.......... |
| Answer» ANSWER :C | |
| 16. |
Integrate the functions in exercise. (1)/(sqrt(x^(2)-2x+2)) |
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| 17. |
if int((x^(2)-1)dx)/((x^(4)+3x^(2)+1)tan^(-1)""(x^(2)+1)/(x)) = log|tan^(-1)f(x)|+C then |
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Answer» `f(x) = x^(2) + 1` |
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| 18. |
If |a|=2, |b|=3 and a, b are mutually perpendicular, then the area of the triangle whose vertices are 0, a+b, a-b is |
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Answer» 5 `:.""` Area of triangle `=1/2|(a+b)xx(a-b)|` `=1/2|(a+b)xx(a-b)|` `=1/2|2bxxa|` `=|b|a|sin theta=3xx2sin 90^@=6` |
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| 19. |
Show that the differential equation (x - y) (dy)/(dx)= x + 2y is homogeneous and solved it. |
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| 21. |
Triangle ABC is isosceles with AB = AC. If the radius of the cicum-circle of /_\ABC equals AB, find the measure of the angle A. |
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| 22. |
int ((1-sin x )/( 1- cos x )) e^(x) dx is equal to |
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Answer» ` - e^(X)tan""( x)/( 2) + C` |
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| 23. |
Find gof and fog, if (i) f (x) = |x| and g (x) = |5x - 2| (ii) f (x) = 8x ^(3) and g (x) = x ^(1/3). |
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Answer» (ii) (gof)` (x)=2x, `(fog) `(x) = 8X` |
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| 24. |
Let S, S^(') are the focii and BB^(') be the minor axis of an ellipse. If angleBSS^(')=theta then its eccentricity is |
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Answer» `tan theta` |
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| 25. |
Verify mean value theorem for each of the functions: f(x)= sqrt(25-x^(2)), in x in [1, 5] |
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Answer» |
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| 26. |
The point of intersection of the normals to the parabola y^(2) =4x at the ends of its latus rectum is |
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Answer» `(0,2)` |
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| 27. |
Integrate the following : int4x^3dx |
| Answer» SOLUTION :`int4x^3dx`=`4x^4/4+C`=`x^4+C` | |
| 28. |
If lim_(xtoa)(f(x))/(g(x))=linR and lim_(xtoa)g(x)=0 then |
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Answer» `lim_(xtoa)f(X)=l` |
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| 29. |
The plane 2x-3y+6z-11=0 makes an angle sin^(-1)(alpha) with X-axis. The value of alpah is |
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Answer» `(SQRT(3))/(2)` |
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| 30. |
Evaluate the determinants(i){:[( 3,-1,-2),( 0,0,-1),( 3,-5,0) ]:} "" (ii) {:[( 3,-4,5),( 1,1,-2),(2,3,1) ]:} (iii) {:[( 0,1,2),(-1,0,-3),(-2,3,0)]:}""(iv) {:[(2,-1,-2),(0,2,-1),(3,-5,0)]:} |
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Answer» |
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| 31. |
In a bank, principal increases continuously at the rate of r% per yeat. Find the value of r if Rs 100 double itself in 10 years (log_(e) 2 = 0.6931) |
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Answer» 5 |
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| 32. |
Find the number of onto functions from a set containing A = {1, 2, 3, 4, 5) to another set B = {a, b, c, d) such that f(1) = a. |
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| 33. |
Three numbers from an increasing G.P. If the middle term is doubled the new number are in A.P. The common ratio of G.P will be |
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Answer» `2 + SQRT(3)` |
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| 34. |
If f:[0,1]rarr [0,1]be difined by f(x) = {(x," if x is rational"),(1-x," if x is irrational"):}then fof(x) is ............ |
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Answer» CONSTANT |
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| 35. |
The probability distribution of a random variable X is given as under: Find k , and P (X lt 6) . |
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Answer» <P> |
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| 36. |
Let f(x) ={{:( x+2, 0 le x lt 2),( 6-x, x ge 2):}, g(x)={{:( 1+ tan x, 0le x lt (pi) /(4)),( 3-cotx,(pi)/(4) le x lt pi ):} the rangeof h(x) = g(x)) is |
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Answer» `(-OO,oo)` |
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| 37. |
Solve the inequalities (i) cos x le -1//2 (ii) sin x ge -1//2 (iii) tan gt-sqrt(3) (iv) sinx +sqrt(3cosx)gt0 (v)Prove that 0le(1+cos theta)/(2+sin theta)le 4/3 for all theta (vi)Solve theinequation sin^(4)(x)/(3)+cos^(4)(x)/(4)+cos^(4)(x)/(3)gt1/2 |
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Answer» (ii)`underset(n=1)bigcup[2npi-(PI)/(6),2npi+(7pi)/(6)]` (iii) `underset(n=1)bigcup[NPI-(pi)/(3),npi+(pi)/(2)]` (iv)`underset(n=1)bigcup(6n-1)+(pi)/(3),2(3+1)(pi)/(3)` (vi)`R=3/2(npi)/(2)` |
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| 38. |
Let f(x) = (x^(2) + x + 1)/(x^(2) + 3 x + 3) x x in R . Let m be the mid-point ofthe range of f(x) , then 3m + 2 . 31 is equal to _______ |
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| 39. |
For the curve y = 4x^(3) – 2x^(5) , find all the points at which the tangent passes through the origin. |
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| 40. |
Two teams A and B play a tournament. The first one to win (n+1) games win the series. The probability that A wins a game is p and that B wins a game is q (no ties). Find the probability that A wins the series. Hence or otherwise prove that sum(r=0)(n)""^(n+1)C_(r)*(1)/(2^(n+r))=1. |
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| 41. |
Let f(x) = |x| "cos" (1)/(x) + 15x^(2), x ne 0, = k, x = 0, then f(x) is continuous at x = 0, if k is : |
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Answer» 15 |
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| 42. |
The smallest value of a for which both the roots of the equation x^(2) - 10 ax + 25 (a^(2) - a + 1) = 0""are real, distinct and have value at least 5 is _______ |
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| 43. |
int (dx)/(x (log x - 2)(log x - 3))= I + c rArr I = |
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Answer» `(1)/(X) log |(log x - 3)/(log x -2)|` |
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| 44. |
A vertical pole (more than 100 m high) consists of two protions, the lower being one third or the whole. If the upper portion subtends an angle tan ^(-1)((1)/(2)) at a point in a horizontal plance through the foot of the pole and distance 40 ft from it, then the height of the pole is |
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Answer» 100 gt |
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| 45. |
Check the injectivity and surjectivity of the following function . f: RxxR - {0}rarr R , f(x,y) =x/(y) |
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| 46. |
Evaluate the integrals in exercise. overset(1) underset(-x) int (dx)/(x^(2)+2x+5) |
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| 47. |
Out of the following …………. Is the unit vector in the direction of (3hati+4hatj-5hatk)+2(2hati+hatj). |
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Answer» `(7)/(sqrt(110))HATI+(6)/(sqrt(110))HATJ-(5)/(sqrt(110))HATK` |
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| 48. |
Using integration ,find the area of the region{(x,y) : y^(2) le 4x, 4x^(2) +4y^(2)le 9 } |
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| 49. |
int (1 + 4x + 6x^(2) + 4x^(3) + x^(4))dx |
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Answer» 4 + 12 X + `12x^(2) + 4x^(3) + C ` |
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