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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. |
Let x and y be positive real numbers such thaty^(3) + y le x -x^(3) . Then match the following list -I with List- II Where [.] is greatest integer function. {:( "List - I " , " List - II"), ( "(P)" [x^(1/x) - y^(1/y)], (1) -1),("(Q)" [ x^(1/x)-1], "(2) 0"),("(R) " [3-(1-x)^(2)], "(3) " 1), ("(s) " [ x^(2) -y^(2)+1] , "(4)" 2):} |
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| 2. |
Evaluation of definite integrals by subsitiution and properties of its : If f(a+b+1-x)=f(x)AAx where a and b are fixed positive real numbers, then (1)/(a+b)int_(a)^(b)x(f(x)+f(x+1)dx= is equal to |
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Answer» `int_(a-1)^(b-1)F(X)dx` |
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| 3. |
Let vecaandvecb be two unit vectors and theta is the angle between them Thenveca+vecb isa unit vector if |
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Answer» `THETA=(PI)/(4)` |
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| 4. |
Let A and B any two events. Which one of the following statements is always true? |
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Answer» <P>`P(A'//B)=P(A//B)` |
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| 5. |
IFx^2+P_1 x+q_1 =0, x^2 +p_2 x +q_2=0 , x^2 +p_3 x+q_3=0hasa coomonrootthenp_(1) ^2 +p_(2)^2 +P_3^2+4(q_1+q_2+q_3)= |
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Answer» `2(p_1p_2+p_2p_3+p_3 p_1` |
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| 6. |
Assertion (A ) :If 1,2,3aretherootsofax^3 +bx^2 + cx ++d =0thenrootsofax^3 + 2 bx^2 + 4 cx +8d =0are2,4,6 Reason (R ): Theequationwhoserootsare ktimesthe rootsof theequationf(x)=0Isf(x//k) =0thenthe truestatmentamongthe followingis : |
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Answer» bothA and RaretrueR ISTHE correctexplanationof A |
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| 7. |
Integration by partial fraction : int(xdx)/(x^(4)+x^(2)+1)=...... |
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Answer» `(1)/(3)TAN^(-1)((2X^(2)+1)/(3))` |
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| 8. |
A surveywas conducted among a randomly chosen sample of 250 single men and 250 single women about whether they owned any dogs or cats. The table below displays a summary of the survey results. According to the table, which of the following statements is most likely to be false? |
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Answer» The porability that a woman is a cat owner is GREATER than the probability that a cat owner is a woman |
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| 9. |
int_(0)^(1)(xSin^(-1)x)/(sqrt(1-x^(2)))dx= |
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Answer» 0 |
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| 12. |
Ifx sin ^3 theta +y cos^3 theta= sin theta cos theta andx sintheta =y cos thetathen x^2+y^2is |
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Answer» `5A^(2)` |
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| 13. |
Three dice are thrown at the sametime. Find the probability of getting three two's, if it is known that the sum of the numbers on the dice was six. |
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| 14. |
The shadow of a tower of height (1 +sqrt3 ) metre standing on the ground is found to be 2 metre longer when the sun's elevation is 30^(@), then when the sun's elevation was : |
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Answer» `30^(@)`  `therefore"In triangle ABC,"` `2+BD=(1+sqrt3)COT 30^(@)` `or 2+BD=(1+sqrt3)sqrt3` `or BD=(sqrt3+3)-2=sqrt3+1` Now, in triangle ABD `tan alpha=(AB)/(BD)=(1+sqrt3)/(sqrt3+1)=1=1 tan 45^(@)` `therefore alpha=45^(@)` |
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| 15. |
If A,B are symmetric matrices of sameorder , then AB - BA is a : |
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Answer» NULL MATRIX |
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| 16. |
he flu shot for a flu seaons is created four strains of the flu virus, named Strain A,B,C and D, respectively. Medicalresearchers use the following data to determine the effectiveness of the vacine over the flu season. Table 1 shows the effectiveness of the vaccine against each of these strains individually. The graph below the table shows the prevalence of each of these strains during each month of the flu season, represented as a percentage of the overall cases of flu that month. For the strain against which the flu shot was the most effective. approximately how effective was the shot overall during the month that strain was least prevalent? |
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Answer» 0.13 |
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| 17. |
If y ^(2) = a ^(2) cos ^(2) x + b b^(2) sin ^(2) x then y + y _(2)= |
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Answer» `a ^(2) B ^(2) ` |
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| 18. |
Find the value of the following cot^(-1) (tan (-6)) |
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| 19. |
If (1 + isqrt2)^(x) = 3^(x) , then its only integral solution is |
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Answer» 2 |
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| 20. |
Given p=3hat(i)+2hat(j)+4hat(k), a=hat(i)+hat(j), b=hat(j)+hat(k), c=hat(i)+hat(k) and p=x a +y b +z c, then x, y and z are respectively |
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Answer» `3/2, 1/2, 5/2` `rArr""3hati+2hatj+4hatk=x(hati+hatj)+y(hatj+hatk)+z(hati+hatk)` `rArr""3hati+2hatj+4hatk=(x+z)hati+(x+y)hatj+(y+z)hatk` `x+z=3"...(i)"` `x+y=2"...(II)"` `x+z=4"...(iii)"` Now, subtracting EQ. (ii) from Eq. (i), we get `z-y=1"...(IV)"` From EQS. (iii) and (iv), we gt `z=5/2, y=3/2` From Eq. (ii) we get `x=1/2` HENCE, `x=1/2, y=3/2, z=5/2` |
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| 21. |
For a point P in the plane let d_(1)(P)and d_(2) be the distance of the point P from the lines x-y=0 R consisting of all points P lying in the first quadrant of the plane and satisfying 2 ge d_(1)(P)+d_(2)(P)ge 4, is |
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| 22. |
The tangent at the point P (x_(1),y_(1)) to the parabola y^(2)=4ax meets the parabola y^(2)=4a(x+b) at Q and R then the midpoint of QR is |
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Answer» (2,4) |
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| 23. |
A brick manufacturer has two depots A and B with stocks of 30000 and 20000 bricksrespectively. He receives orders from three builders P, Q and R for 15000, 20000 and 15000 bricks respectively. The cost of transporting 1000 bricks to the builders from the depots (in rupees) are given below: How should the manufacturer fulfil the order so as to keep the cost of transportation minimum? What is the minimum cost? |
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| 24. |
cos 2x- 3 cos x + 1=(1)/((cot 2 x - cot x)sin (x-pi)) holds , if |
| Answer» Answer :A | |
| 25. |
What can you say about the set, A,B,ifA Delta B =phi |
| Answer» SOLUTION :`A DELTA B = PHI IMPLIES A=B` | |
| 26. |
Form, a cosmetic shop containing perfumes and does, a pair is selected at random. The probability that the selected pair will consist of one perfume and one deo is 16/31. Find the maximum number of perfumes and does the shop can contain ? |
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| 27. |
The P(u,v,q) is a point whose distance from the line x=y=z is twice its distance from the plane x+y+z=1 and uv+vw+wu=0 then u^(2)+v^(2)+w^(2)-4(u+v+w) is equal to |
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Answer» `-2` |
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| 28. |
The variance of the following frequency distribution is {:("Class Interval",0-4,4-8,8-12,12-16,16-20),("Frequency",2,4,6,3,1):} |
| Answer» Answer :A | |
| 29. |
Choose the correct answer from the bracket The line y=x+1 is a tangent to the curve y^2=4x at the point. |
| Answer» ANSWER :A | |
| 30. |
For a loaded die, the probabilities of outcomes are given as under : P(1) = P(2) = 0.2, P(3) = P(5) = P(6) = 0.1 and P(4) = 0.3. The die is thrown two times. Let A and B be the events, 'same number each time', and 'a total score is 10 or more', respectively. Determine whether or not A and B are independent. |
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| 31. |
Let 0 lt A_(i) pi for i = 1,2,"……"n. Use mathematical induction to prove that sin A_(1) + sin A_(2)+ "….." + sin A_(n) le n sin ((A_(1) + A_(2) + "……" + A_(n))/(n))where n ge 1 is a natural number. [You may use the fact thatp sin x + (1-p) sin y le sin [px+(1-p)y], where 0 le p le 1 and 0 le x , y le pi. |
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Answer» Solution :For `n = 1`,the inequality becomes `sinA_(1)lesin A_(1)`,which is clearlytrue. Let us assume that the inequility holds for `n = K` where k is some positive integer. Then `sinA_(1) + sinA_(2) + "……"+sinA_(n) le k SIN ((A_(1) + A_(2) +"....." + A_(k))/(k))"......"(1)` Adding `sin A_(k+1)` on bothsides, we GET `sin A_(1) + sin A_(2) + "......" +sin A_(k) +suin A_(k+1) le k sin((A_(1) + A_(2) +"......."+A_(k))/(k)) + sin A_(k+1)` Now, `k sin ((A_(1) + A_(2) + "......." + A_(k))/(k))+ sin A_(k+1)` `= (k+1)[(k)/(k+1)sin alpha+(1)/(k+1) sin A_(k+1)]`, where `alpha = (A_(1) + A_(2) + "......" + A_(g))/(k)` ` le (k + 1 )sin{(1+(1)/(k+1)) alpha + (1)/(k+1) A_(k+1)}` {Using `p sin x+ (1-p) sinyle sin[px + (1-p)y]}` `= (k+1)sin((A_(1)+A_(2)+"......."A_(k+1))/(k+1))` Thus, the inequality hold for `n= k +1`. Hence, by the PRINCIPLE of mathematicalinduction, the inequality holds for all `n in N`. |
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| 32. |
Let f(x) be a function defined by f(x) =(ab -a^2-2)x -underset(0)overset(x)(cos^4 t + sin^2t-2)dtIf (x) is a decreasing function for all x in Randa in R where a is independent of x, then |
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Answer» `be in (1,OO)` `f(X)=(ab-a^2-2)x-underset |
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| 33. |
If PQ is a double ordinate of the hyperbola such that OPQ is an equilateral triangle,being the centre of the hyperbola, then eccentricity e of the hyperbola satisfies |
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Answer» `E=(2)/SQRT(3)` |
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| 34. |
Determine whether a**b ="min" {a,b} "on" N operations as defined by * are binary operations on the sets specified in each case. Give reasons if it is not a binary operation. |
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Answer» SOLUTION :`a,b in N IMPLIES "min" {a,b} in N ` `:.a**b in N` ` implies **` is a BINARY OPERATION on N |
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| 35. |
i. Show that the points A(-2,3,5),B(1,2,3),C(7,0,-1) are collinear. ii. Find the ratio in which B divides line segment AC. |
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Answer» (II)`1:2` |
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| 36. |
If M is the skew symmetric matrix of order nxxn then , |
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Answer» DET (M-1) =det(M+1) |
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| 37. |
Evaluation of definite integrals by subsitiution and properties of its : int_(1)^(5)[x-3]dx=......... where [.] is maximum integer function. |
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Answer» 1 |
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| 38. |
If x(dy)/(dx) = y (log y- log x +1),then the solution of the equation is |
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Answer» `y log (X//y) = CX` |
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| 39. |
Differentiate the following w.r.t. x : sqrt((3)^(sqrt(x))),x gt 0. |
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| 40. |
If 3x+2y=15 and x +y=10, what is the value of y ? |
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Answer» `-15` `x =10-y` ` 3 (10-y)+2y=15` `30-3y+2y=15` ` -y =-15` `y =15` If you NEEDED to KNOW the value of x as well, you COULD now substitute 15 for y into either equation to FIND that `c =-5.` The correct answer is (D). |
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| 41. |
A die is loaded so that six turns up twice as often as one and three times as often as any other face. Find the probability of getting an even number on the die if the die is rolled once. |
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| 42. |
Giventhe integral int_(0)^(1) sqrt(1 - x^(2))dx. Made the substitution x = sin t . It is possible to take the number pi and pi //2 as thelimits for t ? |
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| 43. |
The value of underset(x to pi/2)limsqrt(("tan"x-"sin"("tan"^(-1)("tan" x)))/("tan" x+"cos"^2("tan" x))) is |
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Answer» -1 |
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| 44. |
Range off(x) = sin^(-1) log [x] + log ( sin^(-1)[x]), where[]denotes GIF is |
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Answer» 1 |
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| 45. |
int_(-pi//4)^(n pi - pi/4) | sin x + cos x | dx ( n in N)is : |
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Answer» 0  ` x + pi/4=t rArr dx = dt` `= sqrt2 int_0^(N pi)|sin t|dx = n sqrt2 int_0^pi sin t dt` ` = n sqrt2 (-COS t)_0^pi = n sqrt2(1-(-1))` ` = 2SQRT2 n` |
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| 46. |
Let O be the circumcentre of acute angled Delta ABC and let r _(1) ,r _(2) and r _(3) be the radil of the circles drawn on the altitudes OD, OE, and OFof triangle OBC, OCA and OAB as diameter then minimum value of (a ^(2))/(r _(1) ^(2)) + (b ^(2))/(r _(2)^(2)) + (c ^(2))/(r _(3)^(2)) is "_______" |
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| 47. |
Examine the continuity of the function f(x)= {((2x^(2)-3x-2)/(x-2)",","if " x ne 2),(5",","if " x =2):} at x= 2 |
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| 48. |
Select the correct answer :Degree of differential equationx^2(dy/DX)^2-y(d^2y/(dx^2))=0 |
| Answer» ANSWER :A | |
| 49. |
Find the angle between the vector 2hati-3hatj+hatk and hati+hatj-2hatk. |
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