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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. |
Which of thhe following is equivalent to |
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Answer» `12x^2-10x-7` |
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| 2. |
Differentiate the following w.r.t. x: cos (log x+ e^(x)), x gt 0 |
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| 3. |
Show that each of the relation R in set A = { x in Z : 0 le x le 12}, given by (i) R = {(a,b) : |a-b| is a multiple of 4} (ii) R = {(a,b) : a=b} is an equivalence relation. Find the set of all elements related to 1 in each case. |
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| 4. |
Fill in the gaps with correct answer . If theta lies in the third quadrant and tan theta = 2 then the value of sin theta is _____ |
| Answer» SOLUTION :`(-2)/(SQRT5)` | |
| 5. |
(1)/(3)+(1)/(2.3^(2))+(1)/(3.3^(3))+(1)/(4.3^(4))+….oo= |
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Answer» `log_(e )2-log_(e )3` |
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| 6. |
In the following cases, find the coordinates of the foot of the perpendicular drawn from the origin :(a) 2x + 3y + 4z - 12 = 0(b) 3y + 4z - 6 = 0 (c) x + y + z = 1 (d) 5y + 8 = 0 |
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Answer» (b)`=(0,(18)/(25),(24)/(25))` (C)`=(1/3,1/3,1/3)` (d) `=(0,-8/5,0)` |
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| 7. |
Statement-1:int_(0)^(1)(cos x)/(1+x^(2))dxgt(pi)/(4)cos1 Statement-2: If f(x) and g(x) are continuous on [a,b], then int_(a)^(b) f(x) g(x)dx=f(c )int_(a)^(b)g(x) for some c in (a,b). |
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Answer» Statement-1 is TRUE, Statement-2 is True,Statement-2 is a correct EXPLANATION for Statement-1. Using statement-2, these exists `c in(0,1)` such that `underset(0)overset(1)int (COSX)/(1+x^(2))dx=cos c underset(0)overset(1)int (1)/(1+x^(2))dx=(PI)/(4)cos c` Clearly, `cos c gt cos 1` for all `c in (0,1)` `rArr (pi)/(4)cos c gt (pi)/(4)cops 1` `rArr underset(0)overset(1)int(cos x)/(1+x^(2))dx gt (pi)/(4)cos 1` So, statement-1 is true. Also, statement-2 is a correct explanation for statement-1. |
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| 8. |
If int(dx)/((x-sqrt(x^(2)-1))^(2))=Ax^(3)+Bx^(2)+Cx+D(x^(2)-1)^(3//2)+E, then |
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Answer» `A=(2)/(3), B=0, C=-1` |
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| 9. |
If alpha, beta , gamma are the roots of x^(3) + qx + q = 0 then the equation whose roots beta gamma + (1)/(alpha), gamma alpha + (1)/(beta) , alpha beta + (1)/(gamma ) is |
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Answer» `x^(3) - q^(2) - x^(2) - 2qr^(2) x - r^(4) = 0 ` |
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| 10. |
Calculate the work performed in launching a rocket of weight P from the ground vertically upwards to a height h. |
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| 11. |
Integrate the following function : int(xdx)/(x^(4)+x^(2)+1) |
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| 12. |
If the equation of the circle which cuts orthogonally the circlex^(2) +y^(2) - 4x + 2y - 7 = 0 and having centre at (2,3) isx^(2) + y^(2) = 2ax + 2by + c = 0then the assending order of a, b, cis |
| Answer» Answer :A::C | |
| 13. |
x= t^(2) + 3t- 8,y= 2t^(2) -2t- 4. If at point (2, -1), lamda = (dy)/(dx) then the value of lamda= …….. |
| Answer» Answer :B | |
| 14. |
f: R rarr R , f(x) = (x-1) (x-2)(x-3)then f is ........ |
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Answer» ONE - one but not ONTO. |
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| 15. |
Compute the""^7C_3+""^6C_4+""6C_3 |
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Answer» Solution :`""^7C_3+""^6C_4+""^6C_3=""^7C_3+""^6C_4+""^6C_(4-1)` ` =""^7C_3+""^(6+1)C_4 = ""^7C_3+""^7C_4` `( :'""^nC_r+""^nC_(r-1)=""^(n+1)C_r)` ` = ""^7C_4+""^7C_(4-1)=""^(7+1)C_4` `= ""^8C_4=(8!)/(4!(8-4)!)=(8*7*6*5)/(4*3*2*1)=70` |
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| 16. |
When 2^(1505) is divided by 9, the remainder is |
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Answer» 8 |
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| 17. |
Match the functions of List-I with their nature in List-II and choose the correct option {:(,"List I",,"List II"),((A),f : R rarr R" defined by",(I),"Injection but"),(,f(x)=cos (112x-37),,"not surjection"),((B),f : A rarr B" defined by "f(x)=x|x|,(II),"Surjection but"),(,"when "A=[-2, 2] and B=[-4, 4],,"not injection"),((C),f : R rarr R" defined by",(III),"Bijection"),(,f(x)=(x-2)(x-3)(x-5),,),((D),f : N rarr N" defined by "f(n)=n+1,(IV),"Neither"),(,,,"Injection nor"),(,,,"surjection"),(,,(V),"Composite"),(,,,"function"):} Then, the correct match is |
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Answer» `{:("A","B","C","D"),(I,II,III,IV):}` |
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| 18. |
If f(x+2)=2x^2 -3x+5, then find f(2) |
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| 19. |
Using elementary transformations, find the inverseof the matrices [(2,3),(5,7)] |
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| 20. |
Let f(X) = {{:([x]",",-2 le x lt 0),(|x|",",0 le x le 2):} (where [.] denotes the greatest integer function) g(x) = sec x, x in R - (2n + 1)pi//2. Match the following statements in Column I with their values in Column II in the interval (-(3pi)/(2),(3pi)/(2)). {:(,"Column I",,"Column II"),((A),"Lemit of fog exist at",(p),-1),((B),"Limit of gof doesn't exist at",(q),pi),((C),"Points of discontinuity of fog is/are",(r),(5pi)/(6)),((C),"Points of differentiability of fog is/are",(s),-pi):} |
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Answer» <P> |
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| 21. |
If two cards are drawn from pack of 52 cards at random. Find the probability of getting both club cards. |
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| 22. |
A window is in the form of a rectangle, together with a semi-circle on its top side as diameter. If the perimeter of the window is 80 inches, determine the dimensions of the rectangle, so that a maximum amount of light may be admitted. |
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| 24. |
int (sin " x")/(cos 3x.cos 2x) dx = |
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Answer» `(1)/(3) " LOG cos 3X" + (1)/(2) "log cos " 2X + c ` |
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| 25. |
Find the equation of the circum circle of the triangle formed by the lines x+ y + 1 =0 , 3x + y -5 =0 , 2x + y -5=0 |
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| 26. |
Let f(x)=min{sin^(-1)x,cos^(-1) x, (pi)/6},x in [0,1]. If area bounded by y=f(x) and X-axis, between the lines x=0 and x=1 is (a-X)/(b(sqrt(3)+1)). Then , (a-b) is".......". |
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| 27. |
The rate of change of volume of a cylinder w.r.t. radius whose radius is equal to its height is ………. |
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Answer» 4 (area of BASE) |
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| 28. |
Find the number of injections from a set A containing 4 elements into a set B containing 6 elements. |
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| 29. |
Find the maximum and minimum values of x + sin 2x on [0, 2pi]. |
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| 30. |
Evalute the following integrals intcos ecx log (cos ecx - cot x ) dx |
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| 31. |
Using determinants show that points A (a, b+ c) , B (b,c+ a) and C ( c, a+ b) are collinear. |
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| 32. |
Find the unit vectors perpendicular to the vectors. hati, hatk |
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Answer» SOLUTION :If hatn is the UNIT VECTOR PERPENDICULAR to the VECTORS `veca` and `vecb` then `hatn` = `+- (vecaxxvecb)/|vecaxxvecb|` `hatn` = `(+-(hatixxhatk))/(|hatixxhatk|)` = `(+-hatj)/|-hatj|` = `+-hatj` |
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| 33. |
int e^(x//2) sin ((pi)/(4)+ (pi)/(2) )dx = |
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Answer» `sqrt(2) e(X//2) SIN""(x)/(2) +c` |
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| 34. |
The normal to the curve x^(2) = 4y passing (1,2) is |
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Answer» X + y = 3 |
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| 35. |
A particle is moving along x-axis. Velocity of particle changes as v=sqrtx with x-coordinate .Choose the INCORRECT option. |
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Answer» ACCELERATION of PARTICLE is VARIABLE |
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| 36. |
Matching : |
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Answer» In a `triangleABC" if " cos A+ cos B+ cos C= (5)/(3)` then `(6r)/(R )` (P) 5 |
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| 37. |
The total number of injective mapping from a set with m elements to a set with n elements for, m gt n, is |
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Answer» `(m!)/(N!(m-n)!)` |
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| 39. |
A coin is tossed a given number of times. IF the probability of getting 7 heads is equal to that of 8 heads. Find the probability of getting 2 heads. |
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| 40. |
An equilateral triangle is inscribed in the parabola y^(2)=16ax with one of its vertices at the origin. Then, the centroid of that triangle is |
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Answer» `(8a, 0)` |
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| 41. |
Differentiate the functions with respect to x in Exerecises 1 to 8. (sin (ax+b))/(cos (cx+d)) |
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| 42. |
There are 3 black and 4 white balls in one bag. 4 black and 3 white balls in the second bag. A die is rolled and the first bag is selected if it is 1 or 3 and the second bag for the rest. Find the probability of drawing a black ball from the bag thus selected. |
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| 43. |
1,alpha_1,alpha_2,alpha_3…..alpha_(n-1) are the n^(th) roots of unity and n is an even natural number ,then(1+alpha_1)(1+alpha_2)(1+alpha_3)….(1+alpha_(n-1))= |
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Answer» 1 |
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| 44. |
If the angular bisectors of the coordinates axes cut the parabola y^(2) =4axat the points O, A, B then the area ofDelta OABis (O is the origin) |
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Answer» `3a^(2) ` |
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| 45. |
If A+B+C=90^(@) then cos^(2)A+cos^(2)B+cos^(2)C= |
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Answer» `1-COS A cos B cos C` |
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| 46. |
The vector bar(a)=(x,y,z) makes an obtuse angle with y- axis. bar(b)=(y,-2z,3x) and bar( c )=(2z,3x,-y). The vector bar(a) makes equal angle with bar(b) and bar( c ).bar(a) is perpendicular to bar(d)=(1,-1,2). If |bar(a)|=2sqrt(3) then bar(a) = ........... |
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Answer» (1, 2, 3) |
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| 47. |
Choose the correct answer. For all real values of x , the minimum value of (1-x+x^2)/(1+x+x^2) isa)0b)1 c)3d)1/3 |
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Answer» 0 |
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| 48. |
Evalute the following integrals int (1)/((x + 2) sqrt(x + 1)) " dx on"(- 1, infty) |
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| 49. |
The solution set of the inequation sqrt(x^(2)+6x+5)gt (8-x) is |
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Answer» `(8,oo)` |
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