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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. |
Assertion (A): The pair of asymtotes of x^(2)/(10)-y^(2)/4=1 and the pair of asymptotes of x^(2)/(10)-y^(2)/4=-1 coincide. Reason (R) : A hyperbola and its conjugate hyperbola posses the same pair of asymptotes. The correct answer is |
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Answer» Both A and R are true and R is the correct EXPLANATION of A |
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| 2. |
An unbiased cubical die is thrown 5 times. The probability that the maximum number appearing on the die is 4 is |
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Answer» `7//6^5` |
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| 3. |
Let A = {1,2} ,B = {1,2 ,3,4 } ,c={5,6} andd={5,6,7,8 }verifythatA xx ( B nn C ) = (A xx B ) nn (A xx C ) |
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| 4. |
Integrate the following function : int(x)/(sqrt(16x^(4)+9))dx |
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| 5. |
A question paper is divided into 3 sections A, B and C containing 3, 4 and 5 questions respectively. Find the number of ways of attempting 6 questions choosing atleast one from each section |
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| 6. |
LetS = {x in R : 5^(2 x+1) + 20 x^(2) + 29x + 6 = (11) (5^(x)) + (x) (5^(x+2))} The number of integers lying is S is ______ |
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| 7. |
Evaluate the following integrals inttan^(-1)sqrt(x)dx |
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| 8. |
Functions f,g:RtoR are defined ,respectively, by f(x)=x^2+3x+1,g(x)=2x-3,findgof. |
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| 9. |
Arrange the value of |a + b + c| in ascending order (A) If a,b,c are mutually perpendicular unit vectors (b) If a,b,c are vectors of lengths 2,3,4 respectively and if a,b,c are perpendicular to b + c, c + a , a+ b respectively. If a,b,c are vector of length 4,4,5 respectively and a,b,c are perpendicular to b + c, c + a, a + b respectively. |
| Answer» Answer :A | |
| 10. |
Solve [[x+a,b,c],[a,x+b,c],[a,b,x+c]]=0 |
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Answer» Solution :`[[X+a,B,c],[a,x+b,c],[a,b,x+c]]=0` or, `[[x+a+b+c,b,c],[x+a+b+c,x+b,c],[x+a+b+c,b,x+c]]=0` `(C_1=C_1+C_2+C_3)` or, `(x+a+b+c)[[1,b,c],[1,x+b,c],[1,b,x+c]]=0` or, `(x+a+b+c)[[1,b,c],[0,x,0],[0,-x,x]]=0` `(R_2~~R_2-R_1,R_3~~R_3-R_2)` or, (x+a+b+c)[[x,0],[-x,x]]=0` or, `(x+a+b+c)x^2=0` or, x=0,x=-(a+b+c) |
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| 11. |
Find |vec(a)| and |vec(b)|, if (vec(a)+vec(b)).(vec(a)-vec(b))=8 and |vec(a)|=8|vec(b)|. |
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| 12. |
If (5, 1) is a circumcentre and (7, 5) is the centroid of a triangle, then its orthocentre is |
| Answer» ANSWER :B | |
| 13. |
Angle made by double ordinate of length 24 of the parabola y^(2)= 12x at origin is |
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Answer» `(pi)/(6)` |
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| 14. |
Prove that : If |x| is so small that x^(3) and higher powers or x can be neglected, find approximate value of ((4-7x)^(1//2))/((3+5x)^(3)). |
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| 15. |
Using differentials, find the approximate value of each of the following upto 3 place of decimal. (ii) sqrt(49.5) |
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| 16. |
A class contains 4 boys and g girls. Every Sunday, five students with atleast 3 boys go for a pincnic. A different group is being sent every week. During the picnic, the class teacher gives each girls in the group a doll. If the total number of dolls distributed is 85, find g. |
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| 17. |
Find the equation of circle centred at (3,3) and touches the coordinate axes. |
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| 18. |
Find the distance between the following pairs of points. (-1,0) , (5,3) . |
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Answer» SOLUTION :DISTANCE between the points (-1,0) and (5,3) is `sqrt(3+2)^2+(4-1)^2 ` =`sqrt(36+9)`=`sqrt45`=`3SQRT5` |
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| 19. |
Perkyowl Designs operates its factory in two shifts. There are 65 workers in Shifts I and have mean wages of rupes 525 per day whereas there are 35 workers in the Shifts II. If the combined wagesof entire set of 100 workers is rupes 542, 50 then average wages (in rupes)of the workers in Shifts II, is ________________ |
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| 20. |
The mean of a set observations is bar(x). If each observation if divided by alpha (!= 0) and it is increased by 10, then the mean of the new set is |
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Answer» `(BAR(X))/(ALPHA)` |
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| 21. |
If the greatest value of y=(x)/(logx) on [e,e^(3)] is u them (e^(3))/(u) is equal to - |
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| 22. |
From the point A (0,3) on the circle x^(2)+ 4x+(y-3)^(2) = 0 a chord AB is drawn and extended to a point M such that AM = 2 AB. Find the equation of the locus of M. |
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| 23. |
Find the second order derivative of the following functions xcosx |
| Answer» SOLUTION :`y=xcosx,dy/dx=-xsinx+cosx(d^2y)/(dx^2)=-[xcosx+sinx]-sinx=-xcosx-2sinx` | |
| 24. |
For a point (C,0) three normals are drawn to the parabola y^(2) = x. Then |
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Answer» `C LT (1)/(2)` |
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| 25. |
""^(2n)P_(n) is equal to |
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Answer» `(N+1)!(""^(2N)C_(n))` |
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| 26. |
Evaluation of definite integrals by subsitiution and properties of its : int_(0)^(2pi)cos^(99)xdx=............ |
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Answer» 1 |
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| 27. |
Match the following {:(,"List-I",,"List-II",),((1),"The equation of family of curves for which",(a),y+e^(-x) = " c, y " - e^(x) = c,),(,"length of the normal = The radius vector.",,,),((2),"Solution of the differential equation " ((dy)/(dx))^(2) - (dy)/(dx)(e^(x)+e^(-x))+1=0 " is",(b),y = x cot (x+c),),((3),"The solution of " (xdy)/((x^(2)+y^(2))) = ((y)/(x^(2)+y^(2))-1)dx " is",(c),y^(2)+- x^(2) = k^(2),),(,,(d),e^(y)=e^(x)-1,):} |
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Answer» 1-a, 2-b, 3-d |
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| 29. |
The order, degree of the differential equation x = 1 + ((dy)/(dx)) + (1)/(2!)((dy)/(dx))^(2) + (1)/(3!)((dy)/(dx))^(3) +… is |
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Answer» 3,1 |
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| 30. |
Definite integration as the limit of a sum : lim_(ntooo)sum_(K=1)^(n)(K)/(n^(2)+K^(2))=...... |
| Answer» Answer :A | |
| 31. |
In the group G = {1,3,7,9) under multiplication modulo 10, the inverse of 3 is... |
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Answer» 1 |
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| 32. |
Find the number of ways of dividing 80 persons into 3 groups containing 35, 25, 20 persons. |
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| 33. |
The straight lines 3x + 4y - 5 = 0 and 4x -3y = 15 intersect at the point P. On these lines the points Q and R are chosen so that PQ = PR. The slopes of the lines QR passing through (1, 2) are |
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Answer» -7, `(1)/(7)` |
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| 34. |
If the equations x^(2)+ax+bc=0 and x^(2)+bx+ca=0 have a common root and if a, b and c are non-zero distinct real numbers, then their other roots satisfy the equation |
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Answer» `X^(2)+x+abc=0` |
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| 35. |
Evaluate the following integrals: int_-1^1 (x+1) dx |
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Answer» SOLUTION :`int_-1^1 (x+1) DX = [x^2/2+x]_-1^1` =`(1^2/2+1)-((-1)^2/2 +(-1))` `1/2 +1-(1/2-1) = 3/2 +1/2 = 2` |
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| 36. |
If f(x) = (1+ tanx) (1+ tan (pi//4 - x)) and g(x) is a function with domain R, then int_(0)^(1) x^(3) "g o"f(x) dx is |
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Answer» `1/2 g(pi//4)` |
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| 37. |
A : (1+i)^(6)+(1-i)^(6)=0 R : If n is a positive integer then (1+i)^(n)+(1-i)^(n)=2^((n//2)+1).cos""(npi)/(4) |
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Answer» Both A and R are true R is correct EXPLANATION to A |
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| 38. |
The numberof valueof x inthe interval[0,3pi] satisfyingtheequation2sin^2+ 5 sin x-3 =0 is |
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Answer» 4 |
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| 39. |
Compute P(X=k) for the binominal distribution, B(n,p) where n=9, p=1/2, k=7 |
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| 40. |
Find the total revenue function for the marginal revenue function given by M R = 20 e^(-(x)/(10))(1-(x)/(10)). |
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| 41. |
int(x)/(1-sin2x)dx= |
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Answer» `(X)/(4)(tan2x+sec2x)-(1)/(2)log|sec^2 2x+sec2xtan2x|+C` |
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| 42. |
The point of intersaction of the line (x-1)/(2)=(y-2)/(-3)=(z+3)/(4) and the plane 2x=4y-z+1=0is |
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Answer» `(-(10)/(3),3/2, - 5/3)` |
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| 43. |
Ife_(1) , e_(2)are eccentricities of the ellispex^(2)/a^(2) + y^(2)/b^(2) =1and the hyperbolax^(2)/a^(2) -y^(2)/b^(2) = 1then |
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Answer» `e_(1)^(2)- e_(2^(2) =1` |
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| 44. |
Construct Collection of all the days of a week in the form of set and describe it with the help of proposition. |
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Answer» Solution :D = {SUNDAY, Monday, Tuesday, Wednesday, Thursday, Friday, Saturday } ={x:x is a DAY of week} |
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| 45. |
Evaluate the following determinates |{:("3","-4","5"),(1,1,"-2"),(2,"3","1"):}| |
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| 46. |
If the axes are rotated through an angle of45^(@)in the anticlockwise direction then the equation of rectangular hyperbolax^(2) -y^(2) =a^(2)changes to |
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Answer» ` xy=a^(2) ` |
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| 47. |
Integrate the following functions (e^(2x) -e^(-2x))/(e^(2x) + e^(-2x) |
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Answer» Solution :Let t = `E^(2x)+e^(2x)`. Then DT = `(2e^(2x)-2e^(-2x))DX` =`2(e^(2x)-e^(-2x)) dx` `gt (e^(2x)-e^(-2x)) dx = (dt)/2` THEREFORE `INT (e^(2x)-e^(-2x))/(e^(2x)+e^(-2x)) dx = int 1/t (dt)/2 = 1/2 log|t|+c` =`1/2 log|e^(2x)+e^(-2x)|+c` |
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| 48. |
The value of prod_(k=1)^6((sin)(2pik)/(7)-(icos)(2pik)/(7)) is |
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Answer» -1 |
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| 49. |
If ABCD is a square then show that the points A, B, C and D are concyclic. |
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Answer» `THEREFORE` A, B, C, D are concyclic. |
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| 50. |
Evaluate : int_(0)^(1) (sin^(-1) sx)/(sqrt(1-x^(2)))dx |
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Answer» Solution :`"LET sin"^(-1) x=t` `rArr ""(1)/(SQRT(1-x^(2)))dx =DT` `At x=0, ""t=sin^(-1) 0=0` `At x=1 ""t=sin^(-1) 1=PI//2` `:. int_(0)^(1) (sin^(-1)x)/(sqrt(1-x^(2))) dx =int_(0)^(pi//2) t dt = [(t^(2))/(2)]_(0)^(pi//2)` `=1/2 ((pi)/(2))^(2) -0=(pi^(2))/(8).` |
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