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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. |
underset(x to pi//2)lim (sqrt(1+cos^(3)x)-sqrt(1-cos^(3)x))/((pi//2-x)^(3)))= |
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Answer» 0 |
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| 2. |
[a b c] [a' b' c'] = |
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Answer» 0 |
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| 3. |
Find the maximum and minimum values, if any, of thefunctions given by g(x) = – | x + 1| + 3 |
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| 4. |
2 sin^(2)x + sin^(2)2x=2,pi lt x lt pi then x equals |
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Answer» `SQRT(10+2sqrt(5))/(4)` |
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| 5. |
int_(-2)^2 |x cos pi x|dx is equal to : |
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Answer» `8/pi` |
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| 6. |
Let a=hat(i)+hat(j)+hat(k), b=hat(i)-hat(j)+hat(k) and c=hat(i)-hat(j)-hat(k) be three vectors. A vector v in the plane of a and b whose projection on c is 1/sqrt(3), is given by |
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Answer» `3 hat(i)+hat(J)-3hat(K)` `rArr (v.c)/(sqrt(1+1+1)) = 1/(sqrt(3))` `rArr (v.c)/(sqrt(3)) = 1/(sqrt(3)) rArr v.c = 1` `rArr v.(hati-hatj -hatk) = 1 "….."(i)` we get from option (b) `v=3 hati-hatj+3hatk` ` v.c (3HATI -hatj+3hatk)` `=3+1-3=1` which satisfies Eq. 9i) `v=3hati-hatj+3hatk` |
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| 7. |
Find the value of a so that the four points with position vectors -hatj+hatk,2hati-hatj-hatk,hati+lambdahatj+hatk and 3hatj+3hatk are co-plannar. |
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| 8. |
Let f(x) and phi(x) are two continuous function on R satisfying phi(x)=int_(a)^(x)f(t)dt, a!=0 and another continuous function g(x) satisfying g(x+alpha)+g(x)=0AA x epsilonR, alpha gt0, and int_(b)^(2k)g(t)dt is independent of b If m,n are even integers and p,q epsilon R, then int_(p+n alpha)^(q+n alpha)g(t)dt is equal to |
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Answer» <P>`int_(p)^(q)g(X)dx` `=-m/2 int_(0)^(2 alpha) g(x)dx+int_(p)^(q)g(x)dx+n/2 int_(0)^(2alpha) g(x)dx` `=int_(p)^(q)g(x)dx+((n-m)/2)int_(0)^(2alpha) g(x)dx` |
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| 9. |
Consider the function defined implicity by the equation y^(2)-2ye^(sin^(-1)x)+x^(2)-1+[x]+e^(2sin ^(-1)x)=0("where [x] denotes the greatest integer function"). Line x=0 divides the region mentioned above in two parts. The ratio of area of left-hand side of line to that of right-hand side of line is |
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Answer» `1+PI:pi` |
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| 10. |
Consider the function defined implicity by the equation y^(2)-2ye^(sin^(-1)x)+x^(2)-1+[x]+e^(2sin ^(-1)x)=0("where [x] denotes the greatest integer function"). The area of the region bounded by the curve and the line x=-1 is |
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Answer» `PI+1` sq. units `(y-e^(sin^(-1)X))^(2)=2-x^(2)` `y=e^(sin-1x)pmsqrt(2-x^(2))` `A=overset(0)underset(-1)int(e^(sin^(-1)x)+sqrt(2-x^(2)))-(e^(sin^(-1)x)-sqrt(2-x^(2)))dx` `=2overset(0)underset(-1)intsqrt(2-x^(2))dx` `=2((1)/(2)xsqrt(2-x^(2)) :|_(-1)^(0)+(2)/(2)sin^(-1)""(x)/(sqrt(2)):|_(-1)^(0))` `=[1+2(0-(-(pi)/(54)))]` `=(pi)/(2)+1` sq. units. `"For "0lexlt1,y=sin^(-1)xpmsqrt(1-x^(2))` `A=2overset(1)underset(0)intsqrt(1-x^(2))dx` `=2[(x)/(2)sqrt(1-x^(2)):|_(0)^(1)+(1)/(2)sin^(-1)""(x)/(1):|_(0)^(1)]` `=0+sin^(-1)(1)=(pi)/(2)` sq. units. `"Total area "=((pi)/(2)+1)+(pi)/(2)=pi+1.` |
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| 12. |
Let f:[0,1]to R be a continuous function then the maximum value ofint_(0)^(1)f(x).x^(2)dx-in_(0)^(1)x.(f(x))^(2)dx for all such function(s) is: |
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| 13. |
For any two event A, B show that P(A^(C)) P(B) - P(A^(C) nn B) = P(A nn B) - P(A) P(B) |
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Answer» <P> |
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| 14. |
Using the combinedmethod find the valus of the root of theequatin x^(3) - x - 1 = 0 On the interval [1,2] with an accuracy up to 0.005 . |
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| 15. |
For what values of 'k' the expression (4 - k)x^2 + 2(k + 2)x + 8k +1 will be a perfect square ? |
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| 16. |
A small firm manufacturers Golden chains and rings. The total number of chains and rings that it can manufacture in a day is at the most 24. The ring takes 30 minutes. The maximum time available per day is 16 hours. If the profit on the ring be Rs. 300 and one chain be Rs. 190. How many of rings and chains be produced to maximizethe profit ? |
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| 17. |
Direction ratios of line given by line(x-1)/3=(2y+6)/12=(1-z)/-7 are : |
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Answer» lt3,12,-7gt |
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| 18. |
Which of the followingmolecule has dipolemonet |
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Answer» `C_(6)H_(4)(OH)_(2)` (PARA) |
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| 19. |
If (0,0) is one limiting point of a coaxal system of circles whose common radical aixs is the line x + y = 1 then the other limiting point is |
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Answer» (1,1) |
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| 20. |
Nine balanced coins tossed together once. Find probability of getting at least 6 heads. |
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Answer» |
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| 21. |
The series 1 + 1/2 + 1/3 +…..+ 1/n can be expressed by the definite integral |
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Answer» `int_(0) ^((pi)/(2)) tan ((theta)/(2)) (1- COS ^(n) theta) d theta` |
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| 22. |
Observe the following statements Assertion (A) : int((x^(2) -1)/(x^(2)) ) e^((x^(2) +1)/(x)) " dx " = e^((x^(2)+1)/(x)) + e Reason (R) : int f^(1) (x) e^(f(x)) dx = f (x) + c Which of the following is true ? |
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Answer» Both A and R are TRUE and R is not the CORRECT REASON for A . |
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| 24. |
Evaluate (i) int_(0)^(pi/3) (cos x)/(3+ 4 sin x)dx |
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Answer» |
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| 25. |
Assume X, Y, Z, W and P are matrices of order2xx n, 3xxk, 2xxp, n xx 3 and p xx k, respectively. If n = p, then the order of the matrix 7X-5Z is: |
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Answer» `pxx2` |
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| 26. |
The points P (a, b+c), Q (b, c +a) and R(c, a+b) are such that PQ = QR if |
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Answer» a, B, C are in A.P. |
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| 27. |
Integrate the following functions x tan^-1x |
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Answer» SOLUTION :`int x tan^-1x DX` =`tan^-1x xx x^2/2 - int 1/(1+x^2) x^2/2 dx` =`x^2/2 tan^-1 x- 1/2 int (1+x^2-1)/(1+x^2) dx` `x^2/2 tan^-1 x-1/2 int (1-1/(1+x^2)) dx` =`x^2/2 tan^-1 x- 1/2(x-tan^-1 x)+C` =`x^2/2 tan^-1 -x/2 +1/2 tan^-1 x+c` |
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| 28. |
In the game of chess, the Knight can make any of the moves displayed in the diagram. If a Knight is the only piece on the board, what is the greatest number of spaces from which not all 8 moves are possible? |
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Answer» 8 |
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| 29. |
If x^(y) = e^(x - y) prove that (dy)/(dx) = (log_(e)x)/((1 + log_(e)x)^(2)). |
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| 30. |
x, y, z in R such that x^(2)+y^(2)+z^(2)=1 and alpha=x^(2)+2y^(2)+3z^(2) |
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Answer» MINIMUM VALUE of `ALPHA` is 2 |
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| 31. |
If A and B are independent events,show that A and B^c are independent |
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Answer» <P> Solution :`P(ACAPB^c)`=P(A-B)=P(A)-P`(AcapB)` =P(A)-P(A)P(B) =P(A)[1-P(B)] |
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| 33. |
""^(n) C_(r+1)+2""^(n)C_(r) +""^(n)C_(r-1)= |
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Answer» `""^((n+1))C_(R + 1)` |
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| 34. |
Find (1)/(2)(A+A')and(1)/(2)(A-A), when A=[{:(0,a,b),(-a,0,c),(-b,-c,0):}] |
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| 35. |
If I_(1) int sin^(-1) ((2x)/(1 +x^(2)) )dx , I_(2) = int cos^(-1) ((1-x^(2))/(1 +x^(2)) )dx , I_(3) = int tan^(-1) ((2x)/(1 - x^(2)) )dx , then I_(1) + I_(2) - I_(3)= |
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Answer» `2X tan^(-1) " X- log " ( 1 + x^(2)) + C ` |
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| 36. |
A right circular cone has height 9 cm and base radius is 5 cm. It is inverted and water is poured into it. If at any instant, the level of the water riese at the surface at that instant, then vessel will be full in |
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Answer» 25 seconds |
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| 37. |
The vectors 2i - 3j + k, I - 2j + 3k, 3i + j - 2k |
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Answer» `-12` |
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| 38. |
Evalute the following integrals int sin^(4) xdx |
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Answer» |
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| 39. |
Write the order and degree of the differential equations given by : (d^2y)/dx^2+3(dy/dx)^4+y=0 |
| Answer» SOLUTION :ORDER = 2, DEGREE = 1 | |
| 40. |
A letter is known to have come from LONDONor CLIFTON . On the envelope just two consecutive letters ON are visible . What is the probability that the letter has come from (i) LONDON (ii)CLIFTON. |
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Answer» (II) ` (5)/(17)` |
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| 41. |
intxcos^2xdx |
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Answer» SOLUTION :`intxcos^2xdx=intx.(1+cos2x)/2 DX` =`1/2intxdx+1/2intx.cos2xdx` =`1/4x^2+1/2{X.(SIN2X)/2-1/4int(sin2x)/2dx}` =`1/4x^2+1/4xsin2x-1/4intsin2xdx` =`1/4x^2+1/4xsin2x+1/8cos2x+C` |
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| 42. |
Select the CORRECT order of lattice energy ? |
| Answer» | |
| 43. |
The point on the curve y^(3)+3x^(2)=12y where the tangent is vertical is ……….. |
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Answer» `(pm(4)/(sqrt(3)),-2)` |
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| 44. |
If y_(1)=max||z-omega|-|z-omega^(2)||, where |z|=2 and y_(2)=max||z-omega|-|z-omega^(2)||, where |z|=(1)/(2) and omega and omega^(2) are complex cube roots of unity, then |
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Answer» `y_(1)=SQRT(3)`, `y_(2)=sqrt(3)` `implies||Z-w|-|z-w^(2)|| le |w^(2)-w| le sqrt(3)` and equality canhold only when `|z|=2` and not when `|z|=(1)/(2)` |
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| 45. |
If a and b are randomly chosen from the set {1,2,3,4,5,6,7,8,9}, then the probability that the expression ax^(4)+bx^(3)+(a+1)x^(2)+bx+1 has positive values for all real values of x is |
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Answer» `(34)/(81)` `=(x^(2)+1)(ax^(2)+bx+1)` `:.x^(2)+1` is positive for all REAL `x` For `ax^(2)+bx+1` to be positive for all real `x` `a gt 0`, `b^(2)-4a lt 0` If `b=1`, a can take `9` value from `1` to `9` `b=2`, a can take `8` value from `2` to `9` `b=3`, a can take `7` value from `3` to `9` `b=4`, a can take `5` value from `5` to `9` `b=5`, a can take `3` value from `7` to `9` `b` cannot take the values `6,7,8,9`. `:.` Number of exhaustive cases `=9+8+7+5+3=32` For each of the `9` values of `a`, there are `9` corresponding values for `h`. `:.` Number of exhaustive cases `=9xx9=81` `:.` The required probability `=(32)/(81)` |
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| 46. |
If the points (0, 0), (3, sqrt(3)), ( x, y)form an equilateral triangle, then (x,y)= |
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Answer» `(0, 2sqrt(3)), (3,-sqrt(3))` |
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| 47. |
If A=[{:(0,"tan"(alpha)/(2)),("tan"(alpha)/(2),0):}]and I theidentity matrix of order 2, show that I+A=(I-A)[{:(cosalpha,-sinalpha),(sinalpha,cosalpha):}]. |
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| 48. |
If the points whose position vectors are 3bar(i) -2bar(j)-bar(k), 2bar(i)+3bar(j)-4bar(k), -bar(i)+bar(j)+2bar(k), 4bar(i)+5bar(j)+lambdabar(k) are coplanar, then show that lambda = -146/17. |
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| 49. |
A common tangent to the conic x^(2) = 6y and 2x^(2) -4y^(2)=9 is |
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Answer» `X-y=3//2 ` |
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| 50. |
Prove the following : 1 lt int_(0)^(pi//2)sqrt(sinx)dx lt sqrt(pi/2) |
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