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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 the minor axis of an ellipse subtends an angle 90^(@) at each focus then the eccentricity of the ellipse is |
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| 2. |
Evaluate the following integrals. int(x^(8))/(1+x^(18))dx |
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| 3. |
If veca, vecb, cecc are non-coplanar vectors and lamda is a real number, then [lamda (veca + vecb) lamda ^(2) vecb lamda vecc]=[veca vecb + vecc vecb] for : |
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Answer» no value of `lamda` |
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| 4. |
Prove that if the function f(x) is continuous on the interval (a, b) and x_1, x_2, ..., x_n, are any values from this open interval, then we can find among them a number epsi such that f(epsi)=1/n [f(x_1)+f(x_(2)+....+f(x_n)] |
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| 5. |
The normal to the curve at P(x, y) meets the x-axis at G. If the distance of G from the origin is twice the abscissa of P, then the curve is |
| Answer» Answer :D | |
| 6. |
If overline(a), overline(b), overline(c) are three coplanar vectors, the |[overline(a), overline(b), overline(c)], [overline(a)*overline(a), overline(a)*overline(b), overline(a)*overline(c)], [overline(b)*overline(a), overline(b)*overline(b), overline(b)*overline(c)]|= |
| Answer» ANSWER :B | |
| 7. |
Let ** be a binary operation on the set Q of rational numbers as followsa**b=a+ab. Is the binary operation commutative and associative ? |
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Answer» Solution :`a**(B**C)=a**(b^2+c^2)` `=a^2+(b^2+c^2)^2` `(a+b)+c=(a^2+b^2)+c` `=a^2+b^2+(c^2)^2` `=a^2+b^2+c^4` `THEREFORE a**(b**c)ne (a**b)**c` `therefore **` is not associative |
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| 8. |
AB and CD are equal and parallel chords of a circle. KN is a diameter of the circle, and K is equidistant from A and B. Then bar(KA) + bar(KB) + bar(KC) + bar(KD) = |
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Answer» `BAR(KN)` |
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| 9. |
For events E and F if P(E) le P(F)and P(E cap F) gt 0 then ………… |
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Answer» E OCCURS `RIGHTARROW` F occurs |
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| 10. |
If f(x)={:{(x,x inQ),(0,x !inQ):}andg(x)={:{(x, !inQ),(0,x inQ):} then (f-g) will be : |
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Answer» one-one onto |
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| 11. |
If |{:(,b+c,c+a,a+b),(,c+a,a+b,b+c),(,a+b,b+c,c+a):}|ge 0, "where a ,b,c,"inR,"then"(a+b)/(c)"is" |
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| 12. |
Find dy/dx of x=2at^2 , y=at^4 |
| Answer» SOLUTION :`dy/dt=4AT^3dx/dt=4atdy/dx=(dy/dt)/(dx/dt)=(4at^3)/(4at)=t^2` | |
| 13. |
Three numbers are chosen at random (without replace ment) from the numbers 1, 2,... 20. The probability that the numbers are not consecutive are |
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Answer» `3/190` |
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| 14. |
If (1+x)(1+x+x^2)(1+x+x^2+x^3)……(1+x+x^2+……+x^(n-1)) = a_0 + a_1x + a_2x^2 +…….+a_m x^mthen a_0 +a_1 + …..+ a_m = |
| Answer» ANSWER :A | |
| 15. |
int_(log_t2)^x (dt)/sqrt(e^t-1)=pi/6impliesx= |
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Answer» `2.log_e 2` |
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| 16. |
A conical vessel whose height is 10 meters and the radius of whose base is half that of the height is being filled with a liquid at a uniform rate of 1.5m^(3)//"min". Find the rate which the level of the water in the vessel is rising when it is 3m below the top of the vessel. |
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| 18. |
If n is a positive integer then 49^n + 16n-1 is divided by |
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Answer» 64 |
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| 19. |
Evaluate the following:lim_(ntoinfty) ((sqrtn-1)/(sqrtn+1)) |
| Answer» SOLUTION :`lim_(ntoinfty) ((sqrtn-1)/(sqrtn+1))=lim_(ntoinfty)(1-1/(sqrtn))/(1+1/sqrtn)=1` | |
| 20. |
For theta in (0, (pi)/(2)) "sech"^(-1) (cos theta) is equal to |
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Answer» `log|tan ((X)/(6) + (THETA)/(2))|` |
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| 21. |
Which of the following is/are redox reaction |
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Answer» `KCl+K_(2)Cr_(2)O_(7)+con. H_(2)SO_(4)rarrCrO_(2)Cl_(2)+K_(2)SO_(4)+H_(2)O` |
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| 22. |
I : sum_(k=1)^(6)[sin((2kpi)/(7))-icos((2kpi)/(7))]=iII : sum_(r=1)^(8)[sin((2pir)/(9))+icos((2pir)/(9))]=iWhich of the above statements are true |
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Answer» A) only I |
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| 23. |
y=Ae^(x)+Be^(2x)+Ce^(3x) satisfies the differential equation |
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Answer» `y_(3) - 6y_(2) + 11 y_(1) - 6Y = 0` |
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| 24. |
Findthe values ofx,y and z so that the vectors veca=xhati+2hatj+zhatkandvecb=2hati+yhatj+hatkare equal . |
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| 25. |
For the probability density function f(x) ={(2e""^(-2x),x gt0),(0,xlt=0):} find F(2) |
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| 26. |
[(cos alpha-cos beta)+i(sin alpha-sinbeta)]^n+[(cos alpha-cos beta)-i(sin alpha-sin beta)]^n= |
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Answer» `2^(n+1).sin^n((alpha-beta)/(2))COS[(pi/2+(alpha+beta)/(2))]` |
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| 27. |
If C_(r ) denotes the binomial coefficient .^(n)C_(r+) then (-1) C_(0)^(2) + 2C_(1)^(2) + 5C_(2)^(2) + ….. + (3n - 1) C_(n)^(2) is equal to |
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Answer» `(3n - 2) .^(2n)C_(N)` |
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| 28. |
Let A={1,3,5} and B = {x:x is an odd natural number less than 6}. Then, which of the following are true? I. AsubB II. BsubA III. A=B IV. "AB" |
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Answer» I and II are TRUE |
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| 29. |
If the probability of choosing an integer k out of '2m' integers 1,2,3,….2m is inversely proportional to k^(4) ( 1 le k le 2m), then the probability that chosen number is odd , is . |
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Answer» `GT 1` |
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| 30. |
Determine the unknown coordinates of theT(x,0,z) in y"-axis" |
| Answer» SOLUTION :x=0,z=0, | |
| 31. |
Let x_(1), x_(2),…,x_(n) be n observations such that sum x_(i)^(2) = 400 and sum x_(i) = 80. Then a possible value of n among the following is |
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Answer» 15 |
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| 32. |
Integration of some particular functions : int(x-2)/(x^(2)-4x+5)dx=......+c |
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Answer» `LOG|X^(2)-4x+5|` |
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| 33. |
If two concentric elipse be such that the foci of one be on the and if e and e' be their eccentricities. Prove that the angle between their axes is cos^(-1){(sqrte^(2)+e'^(2)-1)/(ee')} |
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| 34. |
If the mappings f and g are given be f = {(1,2),(3,5),(4,1)} and g = {(2,3),(5,1),(1,3)}, write fog . |
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| 35. |
Differentiate the functions given in Exercises 1 to 11 w.r.t. x. (log x)^(cos x) |
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| 36. |
IF overlinea,overlineb,overlinec are non-coplanar, then prove that the points with position vectors 2overlinea+3overlineb-overlinec,overlinea-2overlineb+3overlinec,3overlinea+4overlineb-2overlinec,overlinea-6overlineb+6overlinec are coplanar. |
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Answer» <P> |
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| 37. |
Write down and simplify Find the 4th term the end in (2a + 5b)^8 |
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| 39. |
d/dx [sqrt(3x +4)] |
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Answer» 1/`2[sqrt(3x +4)]` |
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| 40. |
Let alpha ne 1 be a real root of the equation x^(3) - ax^(2) + ax - 1 = 0, where a ne - 1 is a real number, then a root of this equation, among the following , is : |
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Answer» `alpha^2` |
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| 41. |
Let p in IR, then the differential equation of the family of curves y=(alpha +beta x)3e^(px), where alpha,beta are arbitary constants , is |
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Answer» `y^(n)+4py^(1)+p^(2)y=` |
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| 42. |
The solution of(dy)/(dx) + (x (1+y^(3)))/(y^(2) (1 + x^(2))) = 0 is |
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Answer» `(1 + X^(2))^(3) (1 + y^(3))^(2) = C` |
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| 43. |
Prove that : |veca + vecb|le|veca|+|vecb|. |
Answer» Solution : Let ABC be the triangle where `vec(AB) = VECA. vec(BC) = vecb` Then `vec(AC) = veca=vecb` Now `|veca| = AB, |vecb| = BC` and `|veca+vecb| = AC` In the triangle ABC, `AC Now AC = AB+BC when A,B,C LIE on a straight line A,B,C are collinear. Hence `|veca+vecb| = |veca|+|vecb|` When `veca` and `vecb` are like collinear vectors or ZERO vectors. |
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| 44. |
Prove that A nn(B uu C) =(A nn B) uu (A nn C) |
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Answer» SOLUTION :Let `X in A NN (B uu C) ` |
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| 45. |
S and T are the foci of an ellipse and B is one end of the minor axis. IF STB is an equilateral traingle , then find the eccentricity of the ellipse. |
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| 46. |
If |{:(-1,7,0),(2,1,-3),(3,4,1):}|=A" then"|{:(13,-11,5),(-7,-1,25),(-21,-3,15):}| is |
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Answer» `A^2` |
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| 47. |
Let n in N which one of the following is true? |
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Answer» `47^(n) + 16n-1` is divisible by 4 |
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| 48. |
Find the area of a parallelogram whose adjacent sides are given by the vectors vec(a)=3hati+5hatj-2hatk and vec(b)=2hati+hatj+3hatk. |
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Answer» `(1)/(2)SQRT(507)` |
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| 49. |
A company producing soft drinks has a contract which requires a minimum of 80 units of chemical A and 60 units of chemical B to go in each bottle of the drink. The chemicals are available in a prepared mix from two different suppliers.Suppleer X has a mix of 4 units of A and 2 units of B that costs Rs.10, and the supplier Y has a mix of 1 unit of A and 1 unit of B that costs Rs4. How many mixes from X and Y should the company purchase to honour the contract requirement and yet minimize the cost ? |
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Answer» `xge0,yge0,4x+yge80and2x+3yge60.` |
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