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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 bara,barb,barc are non-coplaner, then show that the vectors bara -bar b , barb + barc ,bar c + baraare coplanar |
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| 2. |
A sociologist chose 300 students at random from each of two schools and asked each student how many siblings he or she has. The results are shown in the table below. There are a total of 2,400 students at Lincoln School and 3,300 students at Washington School. Based on the survey data, which of the following most accurately compares the expected total number of students with 4 siblings at the two schools? |
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Answer» The total number of STUDENTS with 4 siblings is expected to be equal at the two schools. Choices A, B, and D are incorrect and may result from either conceptual or calculation errors. For example, choice A is incorrect, EVEN though there is the same ratio of survey participants from Lincoln School and Washington School with 4 siblings, the two schools have a different total number of students, and thus, a different expected total number of students with 4 siblings. |
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| 3. |
A sociologist chose 300 students at random from each of two schools and asked each student how many siblings he or she has. The results are shown in the table below. There are a total of 2,400 students at Lincoln School and 3,300 students at Washington School. What is the median number of siblings for all the students surveyed? |
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Answer» 0 Values 1 through 260 will be 0. Values 261 through 450 will be 1. Values 451 through 540 will be 2. Values 541 through 580 will be 3. Values 581 through 600 will be 4. Therefore, both the 300th and 301st values are 1, and hence the median is 1. CHOICES A, C, and D are incorrect and may result from either a calculation error or a conceptual error. |
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| 4. |
Find the values of a, for which the quadratic expression ax^2 + (a - 2) x - 2 is negative for exactly two integral values of x. |
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| 5. |
Findint(dx )/(x^2 -a^2) . Henceevaluateint(dx)/(x^2 -16) |
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| 6. |
Let a,b and c be three distinct real roots of the cubic x ^(3) +2x ^(2)-4x-4=0. If the equation x ^(3) +qx ^(2)+rx+le =0 has roots 1/a, 1/b and 1/c, then the vlaue of (q+r+s) is equal to : |
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Answer» `3/4` |
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| 7. |
int_(2)^(3) (x dx)/(x^(2)+1) |
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Answer» SOLUTION :`"Let I "=int_(2)^(3)(x)/(x^(2)+1)dx` `underset(rArr""2x dx=DT rArr x dx=(dt)/(2))(" Let " x^(2)+1=t)` x=2 then t =5 and x=3 then t=0 `I=(1)/(2)int_(0)^(10) (1)/(t) dt=(1)/(2)[log |t|]_(5)^(10)` `=(1)/(2)[log |10log |5|]` `=(1)/(2)log|(10)/(5)|=(1)/(2)log 2` |
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| 8. |
Find the area of the region bounded byx-axis, the sine curve y=sinx, the lines x=0 and x=3pi. |
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| 9. |
Examine the continuity of the functionf(x)= {(1+x",","if " x le 2),(5-x",","if" x gt 2):} at x= 2 |
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| 10. |
Given that the events A and B are such that P(A) = (1)/(2), P(A cup B)=(3)/(5) and P(B) = p. Find p if they are (i) mutually exclusive (ii) independent. |
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| 11. |
Let overset (-) xand M.D. be the mean and the mean deviations about overset( -)xof n observations x_i , i= 2……,nIf each of the observation is increased by 5, then the new mean and mean deviations about the new mean, respectively are: |
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Answer» `overset(-) X ,M.D.` |
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| 12. |
For a positive constant a find (dy)/(dx), where y= a^(t + (1)/(t)), and x= (t + (1)/(t))^(a) |
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| 13. |
The circumcentre of the triangle passing through (1,sqrt(3)), (1, -sqrt(3)), (3, -sqrt(3)) is |
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Answer» only I is TRUE |
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| 14. |
If 9 digits (1 to 9) are arranged in the spaces of number 1263__________6, then |
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Answer» PROBABILITY THA the NUMBER is divisible by 9 is 1 |
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| 15. |
The value of (sum_(i=0)^(100).^(k)C_(1).^(m-k)C_(100-i)((k-i)/(m-100)))/(.^(m)C_(100)), whre m-kgt100,kgt100 is |
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Answer» `K/m` |
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| 16. |
Show that the derivatives of Sin^(-1)sqrt((x-beta)/(alpha-beta))"Tan"^(-1)sqrt((x-beta)/(alpha-x)) are equal . |
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| 17. |
Givne lines are (x-1)/(l) = (y + 1)/(m) = z/n and (x+1)/(m) = (y-3)/(n) = (z-1)/(l) where l gt m gt n l,m, n are roots of the equation x^3 + x^2 -4 x = 4 then the angle between them is ........ |
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Answer» `pi/2` |
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| 18. |
Find the sum of barx and bary for the two regression lines: 40x-18y-214=0 and 8x-10y +66=0. |
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| 19. |
Finda unitvectorperpendicularto eachof thevectors ( veca + vecb)and (veca- vecb)whereveca = hati + hatj + hatk,vecb = hati+2 hatj+ 3hatk |
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| 21. |
The point on the ellipse x^(2)+2y^(2)=6which is nearest to the line x-y=7 is |
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Answer» `((sqrt6)/(sqrt5),(SQRT3)/(sqrt5))` Normal at P is perpendicular to `x-y=7` `therefore""1=-(sqrt6 cos theta)/(2sqrt3 sin theta), tan theta=(1)/(SQRT2), theta" line in "4^("th") " QUADRANT, "sin theta=-(1)/(sqrt3), cos theta=(sqrt2)/(sqrt3)` `P(2, -1)` |
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| 22. |
Integration by partial fraction : int (x^(2))/((x sinx+cosx)^(2))dx=....+c |
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Answer» `(sinx+X COSX)/(x sinx+cosx)` |
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| 23. |
Show that the function f: R_(**)to R _(**) defined by f (x) = 1/x is one-one and onto, where R _(**) is the set of all non-zero numbes. Is the result true, if the domain R _(**) is replaced by N with co-domain being same as R_(**) ? |
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| 24. |
Differentiate w.r.t x : sin(x^(3)) |
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Answer» Solution :` y= SIN x^(3)` ` (DY)/(DX)= cos x^(3)d/(dx) (x^(3))` ` = cos x^(3) (3X^(2))` ` 3x^(2) cos x^(3)` |
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| 25. |
Let g(x)=a_(0)+a_(1)x+a_(2)x^(2)+a_(3)x^(3) " and " f(x)=sqrt(g(x)), f(x) has its non-zero local minimum and maximum values at -3 and 3, respectively. If a_(3) in the domain of the function h(x)=sin^(-1)((1+x^(2))/(2x)). f(10) is defined for |
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Answer» `a_(0) gt 830` |
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| 26. |
If y = cos^(-1) ((1)/( sqrt(1+t^(2)))), x = sin^(-1) (sqrt((t^(2))/(1 + t^(2)))), "find " (dy)/(dx) |
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| 27. |
If A is square matrix such that A^(2)=A, then (I+A)^(3)-7A is equal to …….. |
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Answer» A |
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| 28. |
If 5 coins are tossed find the probability that no two or more consecutive heads occur. |
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| 29. |
If alpha, beta, gamma are roots of 2x^(3) + 3x^(2) - 6x + 3 =0, then the value of (1)/(alpha^(4)) + (1)/(beta^(4)) + (1)/(gamma^(4))= |
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Answer» `11//7` |
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| 30. |
If S_(n)={(1)/(1+sqrt(n))+(1)/(2+sqrt(2n))+(1)/(3+sqrt(3n))+....+(1)/(n+sqrt(n^(2)))} then {:(" "Lt),(n rarr oo):} S_(n)= |
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Answer» 2 LOG 2 |
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| 31. |
A coin is loaded such that P(H)=3P(T). It is tossed 3 times. Let X be the random variable which indicates the number of heads which occur. Find the mean of X, variance of X. |
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| 32. |
Let E_(1)equiv a x^(2)+ bx + c,E_(2)equiv bx^(2) + cx + a,E_(3) equiv cx^(2) + bx + a and (a^(2))/(bc)+ (b^(2))/(ca)+(c^(2))/(ab)=3. If thesequadratic expressions have a common zero, then the quadratic expression having zeros that are common to E_(3)and different from the zeros of E_(1) is |
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Answer» `X^(2)- (a(B+c))/(bc) x+ bc` |
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| 33. |
A manufacturer of clectronic circuits has a stock of 200 resistors, 120 transistors and 150 capacitors and is required to produce two types of circuits A and B. Type A requires 20 resistors, 10 transistors and 10 capacitors. Type B requires 10 resistors, 20 transistors and 30 capacitors. If the profit on type A circuit is 50 and that on type B circuit is 60, formulate this problem as a LPP do that the manufacturer can maximise his profit. How many of circuits of Type A and of type B, should be produced by the manufacturer so as to maximise his profit? Determine the maximum profit. |
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Answer» Type -B : 3 units MAXIMUM PROFIT = रु 480 |
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| 34. |
Prove that int_(a)^(b)f(x)dx=int_(a)^(b)f(a+b-x)dx and hence evaluate int_((pi)/(6))^((pi)/(3))(1)/(1+sqrt(tanx))dx. |
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| 35. |
A bag consists of 10 balls each marked with one of the digits 0 to 9. If four balls are drawn successively with replacement from the bag, what is the probability that none is marked with the digit 0?. |
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| 36. |
Sum of last 8 coefficients in (1 + x)^16 is |
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Answer» `[2^15 - 1/2 . ""^16C_8]` |
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| 38. |
A car is parked among 'N' cars in a row, not at either end. On his return, the owner finds that exactly 'r' of the 'N' places are still occupied. What is the probability that both neighbouring places are empty ? |
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| 39. |
Evaluate the following integrals. intsinxsin2xsin3xdx |
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| 40. |
If A and B are independentevents such that P(A) = 0.3 andP(B) = 0 . 4 then P(bar(A) cup bar(B)) = |
| Answer» Answer :A | |
| 41. |
The position vectors of the points P and Q are (3,1,2) and (1,-2,-4) repectively. The equation of the plane passing through the point Q and perpendicular to bar PQ is............... |
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Answer» `bar(R). (2 HAT i + 3 hat j + 6 hat k) = 28` |
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| 42. |
Evaluate: int(dx)/(sin^4x+sin^2xcos^2x+cos^4x) |
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| 43. |
A boat is moving in direction of vector -4hati+3hatj with a speed of 10 m/s. Velocity vector of boat can be expressed as : |
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Answer» `-8hati+6hatj` `thereforehatv=(-4hati+3hatj)/(SQRT((4)^(2)+(2)^(2)))` `vecv=|vecv|vecv=10((-4)/(5)hati+(3)/(5)hatj)=-8hati+6hatjm//s` |
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| 44. |
The coefficient of x^(n) in (1+x)/(1!)+((1+x)^(2))/(2!)+((1+x)^(3))/(3!)+.... |
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Answer» only I is TRUE |
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| 45. |
If |bar(a)+bar(b)|=|bar(a)-bar(b)|, then the vectors bar(a) and bar(b) are orthogonal. |
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| 46. |
Two cards are drawn at random from the well shuffled pack of 52 cards. If the first card is not replaced before the second card is drawn, then the probability of getting two aces is ……….. |
| Answer» Answer :A | |
| 47. |
sech^(-1) ((1)/(sqrt(2))) + cosech^(-1) (-1)= |
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Answer» 0 |
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| 48. |
A window is in the form of a rectangle surmounted by a semicircular opening. The total perimeter of the window is 10 m. Find the dimensions of the window to admit maximum light through the whole opening. |
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| 49. |
If |z-1|=|z-3| then the locus of z is |
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Answer» A. STRAIGHT LINE paralled to x-axis |
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| 50. |
Consider the function f(x) = {{:( x^(2) - 1"," , -1 le x le 1) , ( lnx "," , 1 lt x le e):} Let f_(1) (x) = f (|x|) f_(2) (x) = |f(|x|)| f_(3) (x) = f (-x) Now answer the question If f_(4) (x) = log_(27) (f_(3) (x) + 2), then range of f_(4) (x) is |
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Answer» 1 |
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