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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. |
Evaluate int x^(3) sin x dx |
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Answer» `- (x^(3) COS3X)/(3 ) + (3 x^(2)sin 3x)/(9) + (6x cos 3x)/(27) - (2)/(27)`SIN3X + C |
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| 2. |
Find the number of 4-digited numbes of the form xyzt withx,z, tlty and x ne0 |
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Answer» |
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| 3. |
The orthocentre of the triangle formed by the lines y=0, (1+t)x-ty+t(1+t)=0 and (1+u)x-uy+u(1+u)=0(t ne u) for all values of t and u lies on the line. |
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Answer» `x-y=0` |
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| 4. |
Correct rectivity order of molecular hydrogen, Nascent hydrogen and atomic hydrogen is : {:(H_(2),, to,, "Molecular hydrogen"),(H,, to,, "Atomic hydrogen"),([H],, to,, "Nascent hydrogen"):} |
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Answer» `[H]gtHgtH_(2)` |
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| 7. |
If therangeof thefunctionf(x)=- 3x -3 is{ 3,-6,-9,-18} , thenwhichof the followingelementsis notin thedomainof f ? |
| Answer» ANSWER :A | |
| 8. |
If A and B are two events such that P(A cup B)=(5)/(6), P(A cap B)=(1)/(3), then whichone of the followingis not correct ? |
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Answer» A and B are independent |
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| 9. |
If standard deviation of 1,2,3,4,….,10 is sigma then standard deviation of 11, 12, …20 is |
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Answer» `SIGMA + 10` |
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| 10. |
The common roots of the equationx^(12)-1=0,x^4+x^2+1=0 are |
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| 11. |
Evaluate the following define integrals as limit of sums : lim_(n rarroo) [(1+1/n) (1+2/n)......(1+n/n)]^(1//n) |
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| 12. |
Iff (x) =[((1-cos kx)/(x^2) : x ne 0),(8 , x=0)] iscontinuesatx=0 , thenK=…… |
| Answer» ANSWER :D | |
| 13. |
Find (dy)/(dx) if y= sec^(-1)((1)/(2x^(2)-1)), 0 lt x lt (1)/(sqrt(2)) |
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| 14. |
If {:(f(x)=x^(2)",if "0 le x le 1),(""=sqrt(x)",if " x ge 1","):} then area above X-axis, bounded by the line x = 4 and the curve y = f(x) is |
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Answer» 1 |
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| 15. |
How many 5 digit telephonenumbers can be constructedusing the digits 0 to 9, if starts with 67 and no digit appears more than once ? |
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Answer» 335 |
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| 16. |
Let X ={1,2,3,4}Determine whether f:X rarr Xdefined as given below have inverses. Find f^(-1) if it exist f={(1,3)(2,1),(3,1),(4,2)} |
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Answer» SOLUTION :F(2)=f(3) =1 `implies` f is not injective `:.` f is not invertible. |
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| 17. |
The sum of the coefficient of x^32 and x^-17 in (x^4-(1)/(x^3))^15 is |
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Answer» 1 |
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| 18. |
Match the following : {:("LIST - I","LIST - II"),("I)" int_(0)^(2)|1-x|dx=,"a) " 1),("II)" int_(0)^(2)|x-2|dx=,"b) "2),("III)" int_(0)^(2)(|x|+|x-1|)dx=,"c) "3):} |
| Answer» Answer :A | |
| 19. |
If x, y, z are in G.P. and (x + 3), (y + 3), (z + 3) are in H.P., then the value of y is - |
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| 20. |
The value of (18^(3) + 7^(3) + 3.18.7.25)/(3^(6) + 6(243)2 + 15(81)4 + 20.27.8 + 15(9).16 + 6(3)(32) + 64) is |
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Answer» 15 |
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| 21. |
If a variable line of slope 4 intersects the hyperbolaxy =1 at two points. Then the locus of the point which divides the line segment between these points in the ratio 1 : 2 is |
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Answer» `16X^(2) +10 xy + y^(2) -2=0` |
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| 22. |
IfA= cos^(2) 76^(@) + cos^2 16^(@) - cos 76^(@) cos 16^(@) , B= cos^(2)( 45^(@) - alpha ) + cos^(2)(15^(@) + alpha ) - cos^(2)(15^(@)- alpha ) , C= ( cos ( 45^(@)+ A) cos (45^(@) - A))/( sin (120^(@) + A)-sin(120^(@) - A)) then the ascending order is |
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Answer» C,A,B |
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| 23. |
Let a and b be real numbers such that sina + sinb =1/sqrt(2), cosa + cosb =sqrt(3)/2, then |
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Answer» `COS(a-b)=1` |
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| 25. |
Resolve (3x^(2)+5)/((x^(2)+2)^(2)(x^(2)+1)) into partial fractions |
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| 26. |
(dy)/(dx) - (y)/(x) + cosec ((y)/(x)) = 0, y = 0 when x = 1. |
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| 27. |
If bar(a),bar( c ) and bar(d) are not coplanar vectors and bar(d).(bar(a)xx(bar(b)xx(bar( c )xx bar(d))))=K[bar(a),bar( c ),bar(d)] then K = …. |
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Answer» `BAR(B)*bar(d)` |
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| 28. |
If 25^(log_5cos x)=a and e^(ln(-sinx))=b then the correct option is (where , a,b in R) :- |
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Answer» `a^2+b^2=1` |
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| 29. |
If intsqrt(2+tan^(2)x)dx-ln tanx+sqrt(2+tan^(2)x)+f(x)+c, then f(x)= |
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Answer» `SIN^(-1)((SINX)/(SQRT2))` |
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| 30. |
A is a set containing n_(1) elements and B is another set containing n_(2) elements, The number of non -decreasing functions from A rightarrow B is |
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Answer» `(n_(1)+n_(2-1))C_(n_(1))` |
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| 31. |
The number of ways in which 6 things canbe divided Statement-I: into 2 equal groups is 10. Statement-II: among 2 persons equally is 20. Which of the above statements is true. |
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Answer» only I is TRUE |
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| 32. |
Obtain the equation of straight lines : Passing through (-1,2) and making intercept 2 on the y-axis. |
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Answer» Solution :LET the equation of the line be y = mx + C or, y = mx + 2 As the line passes through (-1,2) we have 2 = m = 2 or m = 0 `THEREFORE` Equation of the lineis y = 2. |
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| 33. |
If veca=hati+hatj+hatk,vecb=2hati-hatj+3hatkandvecc=hati-2hatj+hatk,find a unit vector parallel to the vector 2veca-vecb+3vecc. |
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| 34. |
If x =alpha, y=beta, z = gamma is a solution of the system of equations x+y+z=4 2x-y+3z=9 |
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| 35. |
If a^3+b^3+c^3=3abc, where a,b,c are positive integers then the value of (a^2+2b^2+3c^2)/((a+b+c)^2) is :- |
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Answer» 3 |
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| 36. |
Find derivatives of the following functions.tan^(-1)(cossqrtx) |
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Answer» SOLUTION :`y=tan^(-1)(cossqrtx)` `dy/dx=1/(1+cos^2sqrtx).d/dx(cossqrtx)` `1/(1+cos^2sqrtx).d/dx(cossqrtx)` 1/(1+cos^2sqrtx).(-sinsqrtx).d/dx(SQRTX)` `=-sinsqrtx/(1+cos^2sqrtx).1/(2sqrtx)` |
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| 37. |
Integrate the following intcosec^2(x/2)dx |
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Answer» Solution :`intcosec^2(x/3)dx` `put(x/3)= theta` then dx=`3D theta` `intcosec^2theta CDOT 3theta` `-3COT theta+C=-3cot(x/3)+C` |
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| 38. |
If the domain of the function f (x) =[log _(10) ((5x - x ^(2))/( 4 )) ]^(1//2) is a le x le b, then a,b is |
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| 39. |
Let y =f (x) be a twice differentiable, non- negative function defined on [a.b]. The area int _(a) ^(b) f(x) dx, b gt a bounded by y = f(x), the x-axis and the ordinates at x = a and x = b can be approximated as int _(a ) ^(b) f (x) dx ~~((b-a))/( 2) {f(a) + f (b)}. Since int _(a)^(b) f (x) dx = int _(a) ^(c ) f (x) dx + int _(c ) ^(b) f (x) dx, x hatI (a,b) , abetter approximation to int _(a) ^(b) f(x) dx can be written as int _(a) ^(b)f (x) dx "@" ((c-a))/(2) {f(a)+f(c )}_ ((b-c))/(2) {f(c )+ f (b)} ""^(@)F(c ), If c = (b-a)/(2), then this gives: int _(a) ^(b )f (x) dx "@" (b-a)/(4) {f(a) + 2f (a) + 2f (c )+ f(b) },.......(1) If f ''(x) lt 0, x in (a,b), then at the point C(c, f (c))on y = f (x)for which F(c ) is a maximum, f '(c )is given by |
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Answer» `F'(c ) (f (B) -f (a))/(b-a)` |
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| 40. |
The numberof fiveletterwordscan beformedusing3 consonentsand 2vowelsfromthe lettersof thewordMIXTUREis |
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| 41. |
Let y =f (x) be a twice differentiable, non- negative function defined on [a.b]. The area int _(a) ^(b) f(x) dx, b gt a bounded by y = f(x), the x-axis and the ordinates at x = a and x = b can be approximated as int _(a ) ^(b) f (x) dx ~~((b-a))/( 2) {f(a) + f (b)}. Since int _(a)^(b) f (x) dx = int _(a) ^(c ) f (x) dx + int _(c ) ^(b) f (x) dx, x hatI (a,b) , abetter approximation to int _(a) ^(b) f(x) dx can be written as int _(a) ^(b)f (x) dx "@" ((c-a))/(2) {f(a)+f(c )}_ ((b-c))/(2) {f(c )+ f (b)} ""^(@)F(c ), If c = (b-a)/(2), then this gives: int _(a) ^(b )f (x) dx "@" (b-a)/(4) {f(a) + 2f (a) + 2f (c )+ f(b) },.......(1) If Lim _(t to a ) {(int _(0)^(t) f (x)dx -((t-a))/(2)(f(t)+ f(a)))/((t-a )^(3))}=0, for each fixed a, then f(x) is a polynomial of degree utmost |
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Answer» 4 |
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| 42. |
Find the number of ways of arranging 15 students A_(1),A_(2),………A_(15) in a row such that A_(1),A_(2) and A_(3) sit together in specified order |
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| 43. |
Let y =f (x) be a twice differentiable, non- negative function defined on [a.b]. The area int _(a) ^(b) f(x) dx, b gt a bounded by y = f(x), the x-axis and the ordinates at x = a and x = b can be approximated as int _(a ) ^(b) f (x) dx ~~((b-a))/( 2) {f(a) + f (b)}. Since int _(a)^(b) f (x) dx = int _(a) ^(c ) f (x) dx + int _(c ) ^(b) f (x) dx, x hatI (a,b) , abetter approximation to int _(a) ^(b) f(x) dx can be written as int _(a) ^(b)f (x) dx "@" ((c-a))/(2) {f(a)+f(c )}_ ((b-c))/(2) {f(c )+ f (b)} ""^(@)F(c ), If c = (b-a)/(2), then this gives: int _(a) ^(b )f (x) dx "@" (b-a)/(4) {f(a) + 2f (a) + 2f (c )+ f(b) },.......(1) The approximate value of int _(0) ^(pi//2) sin x dx using rule (1) given above is |
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Answer» `(pi)/(8 SQRT2)(1+ sqrt2)` |
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| 44. |
Find the chord of contact of (0,5) with respect to the circle x(2) + y^(2) - 5 x +4y - 2 =0 |
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| 45. |
An ellipse has its centre C(1,3) focus at S( 6, 3) and passing throughthe point P(4, 7) then The point of the lines joining each focus to the foot of the perpendicular from the other focus upon the tangent at point P is |
| Answer» Answer :D | |
| 47. |
int_(0)^(1) (ax^3 + bx)=0 for |
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Answer» Any VALUE of a and b |
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| 49. |
int_(0)^(2/3)(dx)/(4+9x^(2)) |
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