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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. |
A variable plane passes through a fixed point (1,-2,3) and meets the co-ordinate axes in A, B and C . The locus of the point of intersection of the plane through A,B and C parallel to the co-ordinate planes is the surface....... |
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Answer» `xy- (1)/(2)yz + (1)/(3) ZN = 6` |
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| 2. |
Evaluate the following definite integrals as limit of sums : int_(1)^(4)(3x^(2)+2x+5)dx |
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| 3. |
Assertion (A) : If the roots of (b-c) x^(2) + (c-a) x+(a-b) = 0 are equal then a, b, c are in A.P. Reason (R): If in ax^(2) + bx + c = 0, sum of the coefficients is equal to zero then c = a |
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Answer» Both A, R are true and R explain Assertion |
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| 4. |
Find the probability of getting one king and one queen when two cards are drawn from pack of 52 cards. |
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| 5. |
Which point maximise the objective function P=x/4+(9y)/(20)? |
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Answer» (0,0) |
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| 6. |
If Delta is defined on P(X) (X ne phi)by , A deltaB = (A cupB) - (A cap B) , then .......... |
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Answer» identity for `DELTA` is `PHI` and INVERSE of A is A. |
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| 7. |
Consider the binary opertions **: R xx R to R and o : R xx R to R defined as a ** b = |a -b| and a o b =a, AA a, b in R. Show that ** is commutative but not associative, o is associative but not commutative. Further, show that AA a,b,c in R, a ** (b o c) = (a**b) o (a **c).[If it is so, we say that the opertion ** distributes over the opertion 0]. Does o distribute over ** ? Justify your answer. |
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| 8. |
The transformed equation with integer coeficients whoseroots are multiplied by some constant of those of x^(3) - 4x^(2) - (1)/(4) x - (1)/(9) = 0 is |
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Answer» `y^(4) - y^(3) + 3Y^(2) - 10y+ 1 = 0` |
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| 9. |
Let f(x) = sin(x/3) + cos((3x)/10) for all real x. Find the least natural number n such that f(npi + x) = f(x) for all real x. |
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| 10. |
Let f(x) denote the sum of the infinite trigonometric series f(x)=underset(n=1)overset(infty)Sigma sin (2x)/(3^(n)) sin (x)/(3^(n)) then the sum of the solution of the equation f(x)=0 lyingin the interval (0,629) is |
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Answer» 10100 `PI` |
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| 11. |
The mean deviation about the mean for the following data |
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Answer» `9.33` |
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| 12. |
Find the asymptotes of the following curves : y=1/x+4x^(2) |
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| 13. |
If cos alpha+cosbeta+cosgamma = 0 = sinalpha + sinbeta + singamma then sin^2alpha+sin^2beta+sin^2gamma= |
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Answer» 0 |
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| 14. |
If alpha, beta, gamma are roots of x^(3) = 5x + 4 = 0 then {alpha^(3) + beta^(3) + gamma^(3))^(2) is equal to |
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Answer» 12 |
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| 15. |
If log_(8)3=x*log_(2)3, then x= |
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Answer» `(1)/(3)` |
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| 16. |
A bag contains 6 white balls and 4 balck balls. A ball is drawn and is put back in the bag with 5 balls of the same colours as that of the ball drawn . A ball is drawn again at random. What is the probability that the ball drawn now is white. |
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| 17. |
If veca = hati+2hatj+hatk, vecb = 2hati- 2hatj + 2hatk and vecc = hati + 2hatj + hatk then |
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Answer» `veca` and `vecb` have the same DIRECTION |
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| 18. |
Integration of some particular functions : int(dx)/(sqrt(x^(2)-6x+9))=......+c where x in (-oo, 3) |
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Answer» `-LOG|x-3|` |
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| 19. |
If P(n): 2^(n)ltn! Then the smallest positive integer for which P(n) is true, is |
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Answer» 4 |
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| 20. |
Find the angle between the lines (5-x)/(-2)=(y+3)/(1)=(1-z)/(3) and x/3=(1-y)/(-2)=(z+5)/(-1). |
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| 22. |
On 1 sub R - {-1, 1}, int tan^(-1) ((2x)/(1-x^(2))) dx= |
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Answer» `2X tan^(-1) ((2x)/(1-x^(2))) + log (1 + x^(2)) + C` |
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| 23. |
Which of the following set are finite and which are infinite ?The set R of real number. |
| Answer» Solution :"The SET R of REAL NUMBERS" is an infinite set. | |
| 24. |
Solve system of linear equations ,using matrix method2x+ 3y + 3z=5 x-2y +z=-4 3x-y-2z=3 |
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| 25. |
The area enclosed by the ellipse x^2/a^2+y^2/b^2=1 is : |
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| 26. |
The Principle value ofcot ^(-1)(-sqrt3)is |
| Answer» Answer :A | |
| 27. |
Evalute the following integrals int (1)/(5 +4x - 2x^(2))dx |
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| 28. |
An unbiased dice is tossed. The random variable X is defined on the sample space with this experiment is as follows X(w)= {("1, If even number comes up"),("0, If odd number comes up"):} Find probability distribution of X. |
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| 29. |
int (cos 2 x. sin 4x)/(cos ^(4) x(1+ cos ^(2) 2x))dx = |
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Answer» `LOG [(1+ cos ^(2) X)/(1+cos 2X)]-TAN ^(2) x + c ` |
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| 30. |
Consider the following statements : (i) Mode can be computed from histogram. (ii) Median is not independent of change of scale. (iii) Variance is independence of change of origin and scale. Which of these is/are correct : |
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Answer» only (i) |
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| 31. |
Write the value of int(sec^2x)/(cosec^2x)dx. |
| Answer» SOLUTION :`INT(sec^2x)/(cosec^2x)dx=inttan^2xdx=int(sec^2x-1)dx=tanx-x+c` | |
| 32. |
s is the midpoint of bar(qr) r=-2q {:("Quantity A","Quantity B"),(5,0):} |
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| 33. |
Using elementary transformations, find the inverseof the matrices [(3,1),(5,2)] |
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| 34. |
f: R rarr R, f(x) is a differentiable function such that all its successive derivatives exist. f'(x) can be zero at discrete points only and f(x)f''(x) le 0 AA x in R If f(a)=0, then which of the following is correct |
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Answer» `f(a+h) f''(a-h) LT 0` |
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| 35. |
If a four digit number is formed by using the digits 1,2,3 and 5 with no repetition, then the probability that the number is divisible by 5 is : |
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Answer» (1/2) |
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| 36. |
The roots x_(1),x_(2), x_(3) of the equatiion x^(3) + ax + a=0, where a is a non-zero real, satisfy x_(1)^(2)/x_(2) + (x_(1)+1)/(x_(1)x_(2)x_(3)) +............ + ((x_(1)+1)(x_(2)+1)....(x_(n+1)+1))/(x_(1)x_(2)......x_(n))=0 |
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| 37. |
a : If 1/((x-2)(x^(2)+1))=A/(x-2)+(Bx+C)/(x^(2)+1) " then "A=1/5, B=-1/5, C=-2/5. R : 1/((x-a)(x^(2)+b))=1/(a^(2)+b)[1/(x-a)-(x+a)/(x^(2)+b)] |
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Answer» Both A & R are TRUE and R is CORRECT explanation of A |
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| 38. |
Integration of some particular functions : int(1)/(sqrt(2-3x-x^(2)))dx=....+c |
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Answer» `SIN^(-1)((2-3x)/(SQRT(3)))` |
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| 39. |
Evaluate lim_(n rarr oo) sum_(i=1)^(n)(1)/(n)[(n-i)/(n+1)] by using the method of finding definite integral as the limit of a sum |
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| 40. |
If n(A) = 3, then number of equivalence relations is |
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Answer» 5 |
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| 41. |
A coin is tossed 19 times random variable X denotes the numbers of heads on it Then for ……….. value of r for P(X = r)is maximum. |
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Answer» 12 |
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| 42. |
If the progression 3, 10, 17, …… and 63, 65, 67, …… are such that their n^(th) terms are equal, that n is equal to |
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Answer» 13 |
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| 43. |
A block slides down an inclined plane of angle 53^(@) with constant velocity .It is then projected up the same plane with an initial velocity of 8m//s . How far up(in m) the inclione will it move before coming to rest? |
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| 44. |
Solve the following differential equations. y^(2)dx+(x^(2)-xy+y^(2))dy=0 |
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| 45. |
Given that a,b and c are real numbers such that b^(2) =4ac and a gt 0. The maximal possible set D sub R on which the function f: D rarr R given by f(x) =log (ax^(3)+ (a+b)x^(2)+(b+c)x+c) is defined, is |
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Answer» `R-{-(B)/(2a)}` |
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| 46. |
Choose the correct opion The expression x_1(y_2-y_3)+x_2(y_3-y_1)+x_3(y-1-y_2), when written in the form of a determinant of 3rdorder ,it will be |
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| 47. |
How many positive integers appear in the list[(2006)/(1)][(2006)/2].......[(2006)/(2006)] where [x] represents the greatest integer that does not exceed x? |
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| 48. |
If1 , omega , omega^(2)are the cube roots of unity prove that (1 - omega + omega^(2))^(6) + ( 1 - omega ^(2) + omega)^(6) = 128 = (1 - omega + omega^(2))^(7) + ( 1 + omega - omega^(2))^(7) |
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| 49. |
It is known that 10% of certain articles manufactured are defective. What is the probability that in a random sample of 12 such articles, 9 are defective? |
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