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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. |
Consider the circle C_(1):x ^(2) +y ^(2) -6x - 8y + 15=0, C_(2) : x ^(2) + y ^(2) - 6x - 8y + 20 =0 Now from any point P on C_(1), pair of tangents PA and PB are drawn onC_(2). Then locus of the orthocenter of triangle PAB is |
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Answer» `X ^(2) +y ^(2) - 6x - 8y + 20 =0` |
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| 2. |
On [1,e] the gratest value of x^2log_ex, is |
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Answer» `e^2` |
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| 3. |
A set contains (2n+1) elements. If the number of subsets of this set which contain atmost n elements is 4096, then n is |
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Answer» 15 |
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| 4. |
If 3 coins are tossed simultaneously and the number of heads turned up is denoted by the variable X, then find mean and variance of X. |
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| 5. |
Let A={(x,y):x gt 0,y gt0,x^(2)+y^(2)=1} and let B={(x,y):x gt 0,y gt0,x^(6)+y^(6)=1} then A nn B |
| Answer» ANSWER :D | |
| 6. |
vec(AB)=3bari-barj+bark and vec(CD)= -3bari+2barj+4bark are two vectors. The position vectors of the points A and C are 6bari + 7barj + 4bark and -9bari + 2bark respectively. Find the position vector of a point P on the line AB and a point Q on the line CD such that vec(PQ) is perpendicular to vec(AB) and vec(CD) both. |
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| 8. |
Two persons A and B are throwing an unbiased six faced dice alternatively, with the condition that the person who throws 3 first wins the game. If A starts the game, then probabilities of A and B to win the same are, respectively |
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Answer» `(6)/(11),(5)/(11)` |
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| 9. |
Let t_(1)=(sin^(-1)x)^(sin^(-1)x), t_(2)=(sin^(-1)x)^(cos^(-1)x), t_(3)=(cos^(-1)x)^(sin^(-1)x) and t_(4)=(cos^(-1)x)^(cos^(-1)x) Match the column I with column II and mark the correct option from the given codes. |
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Answer» `{:(I,II,III,IV),(p,q,s,r):}` |
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| 10. |
Which of the ............. |
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| 11. |
Determine if A sub B or A cancel sub B where A={x:x "is an integer "},B={3x:x "is an integer"} |
| Answer» SOLUTION :`A cancelsub B` | |
| 12. |
Consider the system of equations sin x cos 2y=(a^(2)-1)^(2)+1, cos x sin 2y = a+1 The number of values of a for which the system has a solution is |
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Answer» 1 `sin X COS 2Y=(a^(@)-1)^(2)+1`, and `cos x sin 2y=a+1` ...(i) Since the L.H.S. of both the equations does not exceed 1, the given system may have solutions only for a's such that `(a^(2)-1)^(2)+1 le 1 and -1 le a +1 le 1` ...(II) `(a^(2)-1)^(2)+1 le 1` or `(a^(2)-1)^(2) le 0` or `(a^(2)-1)^(2)=0` or `a=1` For `a=1`, equation `cos x sin 2y=a+1` does not hold. Thus, `a=-1` only and we get `sin x cos 2y=1` `cos x sin 2y =0` ...(iii) `sin x cos 2y =1` `rArr sin x=1, cos 2y =1` or `sin x=-1, cos 2y=-1` for which `cos x sin 2y=0`. |
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| 13. |
Which of the .............. |
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| 15. |
Show "tan"^(-1)1/2+"tan"^(-1)2/11+"tan"^(-1)4/3=pi/2. |
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| 16. |
If p and q are chosen at random from the set {1,2,3,4,5,6,7,8,9,10} with replacement. Find the probability that the roots of x^(2)+px+q=0 are imaginary. |
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| 17. |
Number of circles touching all the lines x+4h+1=0, 2x+3y+3=0 and x-6y+3=0 is |
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Answer» 0 |
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| 18. |
Evaluate the following define integrals as limit of sums : lim_(n rarroo) sum_(i=1)^(n) 1/n ((n-i)/(n+i)) |
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| 19. |
Letf :R to R be anyfunctionandg(x) =(1) /( f (x) ) thenwhichof thefollowingis / arenot true? |
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Answer» G is onto of F is onto |
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| 20. |
If 2 + i and sqrt5 - 2i are the roots of the equation (x^(2) +ax+ b)(x^(2) +cx+ d) = 0, where a, b, c, dare real constants, then product of all roots of the equation is |
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Answer» 40 |
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| 21. |
Find the principal value of cos^(-1)(-(1)/(2))+2sin^(-1)(-(1)/(2)) |
| Answer» Answer :A | |
| 22. |
Examine the consistency of the following system of equation x+y+z=1 2x +3y+2z =2 ax +ay +2az =4 |
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Answer» SOLUTION :Here A=[[1,1,1],[2,3,2],[a,a,2a]] `THEREFORE |A|=1 |[3,2],[a,2a]|-1|[2,2],[a,2a]|+1|[2,3],[a,a]| `=(6a -2a)-(4a-2a)+(2a-3a) `=4a-2a-a=a!=0` (Clearly `a!= 0` because if a=0, then the THIRD equation would not exist)`therefore`The GIVEN system is consistent |
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| 23. |
In a bolt factory, there machines A, B, C, manufature 25%,35% and 40% of the total production respectively. Of their respective outputs, 5%, 4% and 2% are defective. A bolt is drawn at random from the total product and it is found to be defective. Find the probability that it was manufactured by the machine C. |
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Answer» Solution :Let `E_1,E_2 and E_3` be the EVENTS of drawing a bolt produced by machine A, B and C RESPECTIVELY. Then, `=P(E_1)=25/100=1/4,P(E_2)=35/100=7/20,and P(E_3)=40/100=2/5`. Let E be the event of drawing a DEFECTIVE bolt. Then, `P(E//E_1)` = probability of drawing a defective bolt, given that it is produced by the machine A `=5/100=1/20`. `P(E//E_2)` = probabilityof drawing a defective bolt, given that it is produced by the machine B `=4/100=1/25`. `P(E//E-3)` =probability of drawing a defective bolt, given that it is produced by the machine C `=2/100=1/50`. Probability that the bolt drawn is manufactured by C, given that it is defective `=P(E_3//E)` `(P(E//E_3)P(E_3))/(P(E_1).P(E//E_1)+P(E_2).P(E//E_2)+P(E_3).P(E//E_3))` [by Bayes's theorem] `((1/50xx2/5))/((1/20xx1/4)+(1/25xx7/20)+(1/50xx2/5))=(1/125xx2000/69)=16/69`. Hence, the REQUIRED probability is `16/69`. |
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| 25. |
Let f(x) be a polynomial of degree 4 with f(2)=-1, f^(')(2)=0,f^('')(2)=2,f^(''')(2)=24, then the value of f^('')(1) is |
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Answer» 24 `f(x)=12(x-2)^(2)-12(x-2)+2` `f^''(1)=26` |
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| 26. |
Integrationof rationalfunctions int(dx)/((1+x)(1+x^(2))(1+x^(3))). |
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| 27. |
If A = [[1,1,0],[0,1,0],[1,0,1]] then A^(3) = |
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Answer» `[[1,3,0],[0,1,0],[3,3,1]]` |
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| 28. |
If f(x)=|x-1|+|x-2|+|x-3| when 2 lt x lt 3 is |
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Answer» `((1)/(3))^((1)/(3))` |
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| 29. |
Find the coordinates of the points on the parabola y^(2)=2x whose focal distance is (5)/(2). |
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| 30. |
For each of the differential equations given in x(dy)/(dx)+2y=x^(2)logx |
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| 31. |
Find the area of the region{ (x,y):x^(2) +y^(2) lt1lt x +y} (ii) Find the area of the region { ( x,y): x^(2)+ y^(2) lt 2ax ,y^(2) gt ax ,x gt 0, ygt 0} (iii) Using integration find the area of the region{ x,y): y^(2) lt 4x ,4x^(2) +4y^(2) lt 9}. |
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Answer» `(ii) (1)/(12) (3PI -8) ` square units ` (iii) [( 9)/( 4)cos ^(-1)""(1)/(3) +(SQRT( 2))/( 6)]` square units |
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| 32. |
If sin^(-1)x+cos^(-1)y=(2pi)/5," then "cos^(-1)x+sin^(-1)y is |
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Answer» 1)`(2pi)/5` |
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| 33. |
If |{:((1+x)^(17),(1+x)^(19),(1+x)^(23)),((1+x)^(23),(1+x)^(29),(1+x)^(34)),((1+x)^(41),(1+x)^(43),(1+x)^(47)):}|=Ax^2+Bx+C then value of A = "........." |
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| 34. |
If the marginal revenue of a commodity is given by MR=20e^(-x/10)(1-x/10) , find the demand function . |
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| 35. |
The tangent at any point P on a standard ellipse with foci as S & S' meets the tangents at the vertcies A & A' in the points V & V', then |
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Answer» `L(AV). l(A'v') =b^2` |
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| 36. |
Check the validity of "The sum of an irrational number and a rational number is irrational " by contradiction method. |
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Answer» Solution :Let the given STATEMENT is false. i.e. the SUM of an irrational NUMBER and a rational number is rational. implies An irrational number + a rational number = a rational number Which is absurd. `:.` We arrive at a contradiction. This is due to our false assumption THUS, the given statement is TRUE. |
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| 37. |
Asserton (A) : The solution of (dy)/(dx) = (x+y)/(x) is e^(y//x) = cx Reason (R) : To solve (dy)/(dx) = (f(x,y))/(g(x,y)), where f(x,y) and g(x,y) are homogeneous function of same degree in x and y, put x =vy. Then the Statement among the following is |
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Answer» Both (A) and (R) are TRUE and R is correct EXPLANATION of A |
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| 38. |
Match the statements/expressions in List I statements/expression in List II |
Answer»  Given `2(a^(2) -B^(2)) = c^(2)` `RARR 2 (sin^(2) X - sin^(2)Y) = sin^(2)Z` `rArr 2 sin (X + Y) sin (X - Y) = sin^(2) Z` `rArr 2 sin (pi - Z) sin (X -Y) = sin^(2) Z` `rArr sin (X- Y) = (sin Z)/(2)`...(i) `:. lamda = (sin (X -Y))/(sin Z) = (1)/(2)` Now `cos (n pi lamda) = 0` `rArr cos ((n pi)/(2)) = 0` `:. n = 1, 3, 5`  `1 + cos 2X - 2 cos 2Y = 2 sin X sin Y` `2 cos^(2) X - 2 cos 2Y = 2 sin X sin Y` `1- sin^(2) X - 1 + 2 sin^(2) Y = sin X sin Y` `sin^(2) X + sin X sin Y = 2 sin^(2) Y` `sin X (sin X + sin Y) = 2 sin^(2) Y` `rArr a(a +b) = 2B^(2)` `rArr a^(2) + ab - 2b^(2) = 0` `rArr ((a)/(b))^(2) + (a)/(b) - 2 = 0` `rArr (a)/(b) = -2, 1` `rArr (a)/(b) = 1` Note : Solutions of the REMAINING parts are given in their respecitive chapters. |
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| 39. |
If OA=a, OB=b, OC=c arethe co-terminus edges of regular parallelopiped, then the shortest distance between the diagonal and the side OB not meeting the diagonal is |
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Answer» `(bc)/SQRT(b^(2) + c^(2))` |
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| 40. |
If OA=a, OB=b, OC=c are the co-terminus edges of regular parallelopiped, then the shortest distance between the diagonal and the side OA not meeting the diagonal is |
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Answer» `(bc)/sqrt(B^(2) +c^(2))` |
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| 41. |
If a circle C_(1),x^(2)+y^(2)=16 intersects another circle C_(2) of radius 5 in such a manner that the common chord is maximum length and has slope 3/4, then show the centres of C_(2) are (9/5,(-12)/5),((-9)/5,12/5) |
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| 42. |
Let f(x) = lt x gt^("*"), where lt x gt^("*") is the distance from x to the integer nearest to x, then lim_(x rarr 2) f(x) is : |
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Answer» 0 |
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| 44. |
If the planes vecr.(hati+2hatj-3hatk)=7 and vecr.(lambdahati+2hatj-7hatk)=26 are perpendicular to| each other then find the value of lambda. |
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| 45. |
Verify Rolle's theorem of the function log(x^2+2)-log 3 on (-1,1) |
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| 46. |
Find the angle between the lines whose direction ratios are a, b, c and b-C, c-a, a-b. |
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Answer» `therefore` HENCE,both the lines are PERPENDICULAR. |
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| 47. |
If the extremities of a focal chord are (5pi)/(12) and (pi)/(12)then e = |
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Answer» `(1)/SQRT(2)` |
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| 48. |
If x ge 0, y ge 0, 2x+2y le 10, x+2y le 10, then the greatest value of F=x+y is |
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Answer» 5 |
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| 49. |
Which of the following is equivalent to 10+2(x-7)? |
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Answer» `-14x+10` |
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| 50. |
Every one out of 15 telephone calls between 2.00 p.m and 4.00 p.m. in a week is busy. Find the probability that out of 6 randomly chosen telephone numbers, (i) exactly two are busy (ii) atleast three of them are busy. |
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