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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 x > 0 , y > 0 , z > 0 , xy+yz+zx < 1 and if tan^(-1)x+tan^(-1)y + tan^(-1)z=pi,then x+y+z equals to |
| Answer» ANSWER :B | |
| 2. |
The vector equation of line passing through (2,-1,1) and parallel to the line barr=3hati-hatj+2hatk+lambda(2hati+7hatj-3hatk) is |
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Answer» `barr=2hati-hatj+hatk+lambda(3hati-hatj+2hatk)` |
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| 3. |
Find lambdaandmu if (2hati+6hatj+27hatk)xx(hati+lambdahatj+muhatk)=vec0. |
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| 4. |
Find theanglebetweentwo lineswhosedirection ratiosare "(i) 2,1,2 and4,8,1""""(ii) 5 ,-12 ,13 and -3,4,5" "(iii) 1 ,1,2 and" (sqrt(3)-1) ,(-sqrt(3)-1),4 """(iv)a,b,c and(b-c) ,(c-a),(a-b)" |
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| 5. |
lim_(x to 2)((cos alpha)^(x) + (sin alpha)^(x)-1)/(x-2)= |
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Answer» `(COS^(2) ALPHA) ln cos alpha + (SIN^(2) alpha)ln sin alpha` `lim_(x to 2) cos^(2) alpha ([cos^(x-2) alpha-1])/(x-2) + sin^(2)alpha ([sin^(x-2) alpha-1])/(x-2)` `cos^(2) alpha.ln cos alpha + sin^(2) alpha ln sin alpha` |
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| 6. |
Find the values of the following integrals (ii) int_(0)^(pi/2) sin^(4) x cos^(6) x dx |
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| 7. |
A person secures a job in a construction companyin which the probability that the workers go on strike is 0.65 and the probability that the construction job will be completed on time if there is no strike is 0.80. If the probability that the construction job will be completed on time even if there is a strike is 0.32, determine the probability that the constructed job will be completed on time. |
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| 8. |
A ray of light coming along the line (x - 1)/(1) = (y - 2)/(2) = (z - 3)/(3), strikes the plane mirror kept along the plane through points (2, 1, 1), (3, 0, 2) and(2 , -1, -2) . Then the equation of reflected ray is: |
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Answer» `(x - 3)/(1) = (y - 3)/(5) = (z - 2)/(-5)` `2x+y-z-4=0` POINT on the line `(x-1)/(1)=(y-2)/(2)=(z-3)/(3)=R` Point on the line `(x-1)/(1)=(y-2)/(2)=(z-3)/(3)=r` is (1, 2, 3) Reflection of `(1, 2, 3)` in the plane `(x_(1)-1)/(2)=(y_(1)-2)/(1)=(z_(1)-3)/(-1)=(-2(2+2-3-4))/((2)^(2)+(1)^(2)+(-1)^(2))` `(x_(1)-1)/(2)=(y_(1)-2)/(1)=(z_(1)-3)/(-1)=(6)/(6)` `x_(1)=3` `y_(1)=3"(3, 3, 2)"` `z_(1)=2` Point of INTERSECTION of line and plane `2(1+r)+1(2+2r)-(3+3r)-4=0` `r=3` Point of intersection (4, 8, 12) Equation of line of reflection `(x-3)/(4-3)=(y-3)/(8-3)=(z-2)/(12-2),(-3)/(1)=(y-3)/(5)=(z-2)/(10)` |
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| 9. |
If y=(gof)(x)then dy/dx=______. |
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Answer» (DG)/dxdx/(DF) |
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| 10. |
If y = (5x)^(3 cos 2x) find (dy)/(dx) |
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| 11. |
If If A+B+C=pi then prove that "sin"A^(2)/2+"sin"^(2)B/2-"sin"^(2)C/2=1-2"cos"A/2"cos"B/2"sin"C/ |
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| 12. |
Let f(t)=|t-1|-|t|+|t+1|, AA t in R. Find g(x) = max {f(t):x+1letlex+2}, AA x in R. Find g(x) and the area bounded by the curve y=g(x), the X-axis and the lines x=-3//2 and x=5. |
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Answer» and area = `101/4` SQ units. |
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| 13. |
Find the principle value of the followingtan^(-1)(-sqrt3) |
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Answer» SOLUTION :`TAN(-pi/3)=-tan(pi/3)=-SQRT3 `and `-pi/3 in (-pi/2,pi/2)` `THEREFORE` The principal value of `tan^(-1)(-sqrt3)=-pi/3` |
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| 14. |
In a betting game in an exihibition two dice P and Q are being used. Dice P has four red faces and two white faces whereas dice Q has two red and four white faces. A fair coin is tossed once. If it shows head the game continues by throwing dice P .if it tail dice Q is thrown. If first n throws of the die all turn up red, then the proabability that P is being used is |
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Answer» `(1)/(2)` |
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| 16. |
The solution of the cosec^(2x)(dy)/(dx) - (1)/(y) = 0 is |
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Answer» `2Y^(2) = 2X - sin 2x + C` |
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| 17. |
A rectangle ABCD is inscribed in a circle with a diameter lying along the line 3y=x+10. If A=(-6,7), B=(4,7) then the area of the rectangle is |
| Answer» Answer :A | |
| 19. |
Four cards are accidentally dropped from a pack of playing cards. What is the probability that they are one from each suit. |
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| 20. |
If y=int((2x-1)/(x^(2)+1)) and f'(x)=sinx^(2), then (dy)/(dx) is : |
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Answer» `COSX^(2)F'(x)` |
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| 21. |
Find the vector and the cartesian equations of the line that passes through the points (3, - 2, – 5), (3, -2, 6). |
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| 22. |
If y =tan^(-1)(sinsqrt(x))+ "cosec"^(-1)(e^(2x+1)), " then " (dy)/(dx)= |
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| 23. |
If theinequation (sqrt(6+x-x^2 ))/( x+10)lesqrt((8-2x -x^2))/( 2x +9) then |
| Answer» Answer :B | |
| 24. |
int (1)/((2x +1)sqrt(x^(2) -x-))dx = |
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Answer» `- (1)/(sqrt(5)) tan^(-1) ((4X + 7)/(6x + 3)) +c` |
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| 25. |
Prove that the following. [[1,1,1],[b+c,c+a,c+a],[b^2+c^2,c^2+a^2,a^2+b^2]]=(b-c)(c-a)(a-b) |
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Answer» SOLUTION :`[[1,1,1],[b+c,c+a,c+a],[b^2+c^2,c^2+a^2,a^2+b^2]]` `[[1,0,0],[b+c,a-b,b-c],[b^2+c^2,a^2-b^2,b^2-c^2]]` (REPLACING `C_2` and `C_3` by `C_3-C_1` and `C_3-C_2` RESPECTIVELY.) =`1XX[[a-b,b-c],[a^2-b^2,b^2-c^2]]` (a-b)(b-c)`[[1,1],[a+b,b+c]]` (a-b)(b-c)(b+c-a-b) (a-b)(b-c)(c-a)=R.H.S. |
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| 26. |
In a box there are 100 electric bulbs out of which 10 are defective. 5 bulbs are selected from it then ………..is the probability that bulb is defective. |
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Answer» `10^(-1)` |
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| 27. |
If the plane passing through (1,1,1),(1,-1,1) and (-1,3,-5) is also passing through (2,k,4) then , k = .......... |
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Answer» does not get |
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| 28. |
Ifthe points(1,1, lambda) and (-3,0,1) are equidistant from the plane,3x + 4y-12z + 13 = 0, then lambda satisfiesthe equation |
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Answer» 0 |
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| 29. |
Circle touching both the axes and radius 5 is |
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Answer» `X^(2)+y^(2)-10x-10y+25=0` |
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| 30. |
Find the coordinates of the point of intersection of tangent at the points where x+ 4y - 14 =0meets the circlex^(2) + y^(2) - 2x+ 3y -5=0 |
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| 31. |
Events A and B are such that P(A) =(1)/(2), P(B) =(7)/(12) and "P(not A or not B)"=(1)/(4). State whether A and B are independent ? |
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| 32. |
Integrate the following functions with respect to x. (cosecx)/(cosecx-cotx) |
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| 33. |
If I_(m,n) - int (x^(m) (logx)^(n)dx then I_(m,n) - (x^(m+1))/((m + 1)) (logx)^(n) = |
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Answer» `(N)/(m + 1) .I_(m,n-1) ` |
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| 34. |
Relation " parallel" in the set of all straight lines in a plane is : |
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Answer» only REFLEXIVE |
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| 35. |
If there are m students in a class, then find the probability that (i) all the students have different birthdays in a non leap year (ii) All the students have same birthday in a non leap year |
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Answer» <P> |
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| 37. |
If int _(0) ^(pi) ((x )/( 1 + sin x ))^(2) dx = lamda then show that int _(0) ^(x) ( 2x ^(2) cos ^(2) (x//2))/( (1+ sin x )^(2))dx = lamda + 2pi-pi^(2). |
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| 38. |
Let A, B and C be three sub-sets of a universal set U. if A DeltaC = B DeltaC,then |
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Answer» A=B |
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| 39. |
Number of ways in which three distinct numbers can be selected between 1 and 20 both inclusive, whose sum is even is______. |
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Answer» `""^(10)C_(3)+""^(10)C_(2)XX""^(10)C_(1)` `(10xx9xx8)/(6)+(10xx9)/(2)xx10` `120+450+570` |
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| 40. |
If n is a positive integer, then 2.4^(2n+1)+3^(3n+1) is divisible by : |
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Answer» 2 |
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| 42. |
For the equation |x^(2)|+|x|-6=0,the roots are |
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Answer» ONE and only one REAL number |
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| 43. |
Through a point a plane is drawn at right angles to OP, to meet the axes in A, B, C. If OP = r, the centroid of the triangle ABC is : |
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Answer» `((f)/(3r), (g)/(3r), (h)/(3r))` |
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| 44. |
Find the 6th term in the expansion of (x^2+a^4/y^2)^10. |
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Answer» Solution :6TH term i.e. (5+1)TH term in the expansion of `(x^2+a^4/y^2)^10` is `"^10C_5(x^2)^10-5(a^4/y^2)^5` `= 10!/5!5!x^10(a^20/y^10) ` ` = 10.9.8.7.6/5.4.3.2.1(x^10a^20)/y^10= 252x^10a^20/y^10` |
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| 45. |
Find the values of p so that the lines(1-x)/(3)=(7y-14)/(2p)=(z-3)/(2) and (7-7x)/(3p)=(y-5)/(1)=(6-z)/(5) are at right angles. |
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Answer» <P> |
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| 46. |
Evaluation of definite integrals by subsitiution and properties of its : int_(0)^(pi/2)(x-[sinx])dx=.......... |
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Answer» `(PI^(2))/(8)` |
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| 47. |
{:("Column-I","Column-II"),("(A) If for some real x, then equation", "(P) "2),(""x+(1)/(x)=2cos theta" holds",),("then " cos theta" is equal to","(Q) "1),("(B) If "sin theta"cosec"theta=2",", "(Q) "1),("then "sin^(2008)theta+"cosec"^(2008)theta" is equal to", "(R) "0),("(C) Maximum value of "sin^(4)theta+cos^(4)theta" is",),("(D) Least value of "2 sin^(2)theta+3cos^(2)theta" is","(S) "-1):} |
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| 48. |
Fill in the blanks in each of the following, using the answers given against each of them : The distance between the lines 3x - 1 = 0 and x + 3 = 0 is _____ units. |
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Answer» 4 |
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