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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.
| 2. |
If absA = m , absB =n ,what can you say about abs(P(A) X P(B)) |
| Answer» SOLUTION :If `absA` = m , `absB` = n then `absP(A) = 2^m . absP(B) = 2^n THEREFORE absP(A) XX P(B) = 2^m xx 2^n = 2^(m+n)` | |
| 3. |
Find the number of arrangements by arranging all the letters of the word 'BANANA' |
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| 4. |
Let DeltaABC be inscribedin a circle having radius unity. The three internalbisectorsof the angles A, B and C are extended to intersect the circumcircleof DeltaABC at A_(1)B_(1) and C_(1) respectively. Then (A A_(1)"cos"(A)/(2)BB_(1)"cos"(B)/(2)+C C_(1)"cos"(C)/(2))/(sinA+sinB+sinC)= |
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| 5. |
Find a particular solution of the differential equation (x + 1)(dy)/(dx) = 2e^(-y) - 1, given that y = 0 when x = 0. |
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| 6. |
2. C_0+ 2^2 (C_1)/(2)+2^3. (C_2)/(3)+…....+2^(n+1). (C_n)/(n+1)= |
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Answer» `(1)/(n+1)` |
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| 7. |
2.C_0 + (2^2)/(2).C_1 + (2^3)/(3).C_2 + ……+(2^11)/(11).C_10 = |
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Answer» `((3^(11)+1))/(11)` |
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| 8. |
Find the range of x for which the binomial expansions of the following are valid .(7 - 4x)^(-5) |
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| 9. |
A pair of perpendicular straight lines passes through the origin and also through the point of intersection of the curvex^(2) + y^(2) = 4 and x + y = a . The set containing the value of a is |
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Answer» `{-2 , 2}` |
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| 10. |
When the voltage applied to an X-raytube increased fromV_(1)15.5 KV to V_(2) = 31 KV, the wavelength interval between the K_(alpha) line and theshort wavelength cut-off of the continuous X-ray spectrum increasesby a factor of 1.3. If the atomic number of the element of the target is 13N, where N is an integer find N (Take : hc = 1240 eV and R=1xx10^(7)//m) |
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Answer» `(1)/(lambda_(K alpha))=R(Z-1)^(2)((1)/(1^(2))-(1)/(2^(2)))` `(143)/(10)(lambda_(K alpha)-lambda_(th))=(lambda_(Kalpha)-(lambda_(th))/(2))` `(3)/(10)lambda_(K alpha)=((13)/(10)-(1)/(2))lambda_(th)` `(3)/(10)((4xx10^(-7))/(3(z_(7))^(2)))=((8)/(10))(12.4xx10^(-7))/(15.5xx10^(3))RARR(5000)/(8)=(z-1)^(2)` `625=(z-1)^(2) " " rArr z = 26` |
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| 11. |
Consider the system of equations x_1+2x_2+3x_3=1 x_2+2x_3+3x_1=2 x_3=2x_1+3x_2=3, then mathc the following columns , |
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Answer» <P>`{:(P,Q,R,S),(1,2,3,4):}` |
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| 13. |
a and b are unit vectors along OA, OB and OC bisects the angle AOB. The unit vector along OC is |
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Answer» `(a + B)/(2)` |
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| 14. |
16cos^(6)10^(@)-24cos^(4)10^(@)+9cos^(2)10^(@) is equal to |
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Answer» `1/4` `=(COS30^(@))^(2)` `=3/4` |
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| 15. |
L.P.P. is a process of finding |
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Answer» MAXIMUM VALUE of OBJECTIVE function |
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| 16. |
Let y=f(x) be satisfying differential equation e^(-x^(2))(dy)/(dx)=2xy^(2) such that f(0)=(1)/(2) Q. Which of the following statement is correct about f(x)? |
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Answer» `f(x)` is unbounded `-(1)/(y)=E^(x^(2))+C` POINT `(0.(1)/(2))` lies on the curve `implies-2=1+C` `impliesC=-3` Hence `-(1)/(y)=e^(x^(2))-3` `impliesf(x)=(1)/(3-e^(x^(2)))` Hence, `f(x)` is even which means that it cannot be objective Also, denominator of `f(x)` becomes zero which implies that it cannot be bounded. |
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| 17. |
The uranium disintegrates at a rate proportional to the amount present at any instant. If m_(1)andm_(2) gms of uranium are present at time t_(1)andt_(2) respectively, then half life of uranium is |
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Answer» `((t_(1)-t_(2))log2)/log((m_(1))/(m_(2)))` |
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| 18. |
int [ (log x - 1)/(1 + (log x)^(2)) ]^(2) dx = |
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Answer» `(LOG X)/((log x)^(2) + 1) + C ` |
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| 19. |
Transform the equation x^2+4xy+y^2-2x+2y+4=0 into the form (y'^2)/(b^2)-(x'^2)/(a^2)=1 |
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| 20. |
The maximum value of 27^(cos(2x))xx81^(sin(2x)) is ………… |
| Answer» Answer :D | |
| 21. |
You are given an unlimited supply of each of the digits 1, 2, 3, or 4. Using only these four digits, you construct n digit numbers. Such n digit numbers will be called BEAUTIFUL if it contains the digit composite number either an even number times or not at all. Number of n digit BEAUTIFUL numbers are |
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Answer» `2^(n)+1` |
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| 22. |
Let bara.barb and barc are three unit vectors such that |bara+barb+barc|=sqrt3 such that (bara times barb).(barb times barc)+(barb times barc).(barc times bara)+(barc times bara).(bara.barb)=lamda |
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Answer» the maximum VALUE of `LAMDA` is 2 |
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| 23. |
Let f: (-oo,oo) to (-oo,oo) be such that f(.) is continuous at 0 and let f((x+y)/2) = (f(x)+f(y))/2 for x , y in (-oo,oo) Statement-1: f(.) is continuous at every point on (-oo,oo) Statement-2: f(x+h)+f(0)=2 f(x)+f(2h) for x , h in (-oo, oo). |
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| 24. |
Let S_(n)=sum_(k=1)^(n)(-1)^(k-1).K^(2) for n gt=1. Given that S_(2n)=-n(2n+1) For n=1,2,3,cdotsthen S_(n)= |
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Answer» -3003 |
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| 26. |
Find the number of ways to arrange 5 boys and 5 girl in a row such that all the girls must sit together |
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| 27. |
The value of tan (1^(@)) + tan (89^(@)) is _______ |
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Answer» `(1)/(SIN (2^(@)))` |
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| 28. |
(d)/(dx)[x^(sinx)+(sinx)^(x)]= |
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Answer» `X^(SINX)[(sinx)/(x)+COSX"LOG"x]+(sinx)^(x)[xtanx+"log"(sinx)]` |
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| 29. |
A line L makes intercept a and b on the coordinate axes. The axes are rotated through an angle theta in the positive direction, keeping the origin fixed. If the line L makes intercept p and q on the new coordinate axes, then 1/a^(2)+1/b^(2) = |
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Answer» <P>`1/(p^(2)q^(2))` |
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| 30. |
If the roots of the quadratic equation 3x^(2)+2x+a^(2)-a=0 in x are of opposite signs, then a lies in the interval |
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Answer» `(-OO,-2)` |
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| 31. |
The set of values of x in R satisfying the inequality x^(2)-4x-21 le 0 is |
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Answer» (3, 7] |
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| 33. |
Find the particular solution of the differential equation (dy)/(dx) + y cot x = 2x + x^(2) cot x( x ne 0) given that y = 0when x = (pi)/(2). |
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| 34. |
Findthe areaof the regionboundedby thecurvesy= 5- x^2 , X - axisand thelinesx=2and x=3. |
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| 35. |
If x > 0 , write the first negative term in the expansion of (1 + 2x)^(23//2) |
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| 36. |
Let f(x)=int_(0)^(x)(cost)/(t)dt,(x gt0), then for x = (2n+1) (pi)/(2)f(x) has |
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Answer» maxima when n = 0, 2,4, 6, .. |
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| 37. |
Integrate the following intsin(x/2)dx |
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Answer» Solution :`intsintheta 2 d THETA` `2(-COSTHETA)+C`=-2COS(x/2)+C` |
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| 38. |
(i) Let z_1 (i=1,2,3,3) represent the vertices a square all of which lie on the sides of the triangle with vertices (0,0), (2,1), (3,0) . Give that z_1 and z_2 are purify real, find z_3 and z_4. (ii) Find the roots common to the equations x^6 - x^3 + x^2 -1=0, x^4 =1. |
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Answer» `1,-1` |
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| 39. |
Complete set of values of g(x) is |
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Answer» `(-INFTY,-1]CUP[3,infty)` |
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| 40. |
a xx {b xx (C xx a) + (p xx q)} = |
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Answer» (a.q) P - (a.p) q + (B.a) `(a xx C) - (b xx c)` |
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| 41. |
The value of c in the Langrange's mean value theorem for f(x)=root()(x-2) in the interval [2,6] is |
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Answer» `9/12` |
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| 42. |
Show that the function defined by f(x)= cos(x^(2)) is a continuous function. |
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| 43. |
If ain R^(+) and f:R rarrR is defined by f(x)=(a^(2x))/(a^(2x)+a) , then Sigma_(r=1)^(10)f((1)/(11))= |
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Answer» 11 |
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| 44. |
Integrate the following functions : int(sin(sqrtx))/(sqrtx)dx |
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| 45. |
Prove the following: 2tan^(-1)x=cos^(-1)((1-x^(2))/(1+x^(2))),xge0 |
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| 46. |
ABC is an isosceles right anlged triangle with AB = BC = 1 . If P is any point on AC, then min (max {(area APQ) , (area PQBR) , area PRC )}} is |
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Answer» `2/9` |
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| 47. |
If three distinct positive numbers a,b,c are in A.P. Such that abc=4,then value of b is always |
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Answer» GREATER than`(2)^(2//3)` |
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| 48. |
Minimise Z = 3x + 2y subject to the constraints : x+y ge 8"…(1)" 3x+5y le 15"…(2)" x ge 0, y ge 0"…(3)" |
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| 49. |
If a line makes alpha,beta,gamma,delta angles with four diagonals of a cube, then cos2alpha+cos2beta+cos2gamma+cos2delta= |
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Answer» `-(2)/(3)` |
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