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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. |
The position vectors of the vertices A,B,C of DeltaABC are hati-hatj-3hatk,2hati+hatj-2hatk and -5hati+2hatj-6hatk respectively. The length of the bisector AD of the angle /_BAC where D is on the line segment BC is |
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Answer» `15/2` `VEC(AB)=hati+2hatj+hatk, vec(AC)-6hati+3hatj-3hatk` `implies|vec(AB)|=sqrt(6)` and `|vec(AC)|=3sqrt(6)` Clearly, point D divides BC in the ratio `AB:AC` i.e. `1:3`. `:.` Position vector ofDis `((-5hati+2hatj-6hatk)+3(2hati+hatj-2hatk))/(1+3)` `implies` Position vector of D is `=1/4(hati+5hatj-12hatk)` `:.vec(AD)=1/4(hati+5hatj-12hatk)-(hati-hatj-3hatk)` `vec(AD)=3/4(-hati+3hatj)` `implies|vec(AD)|=3/4sqrt(10)` |
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| 3. |
A diet is to contain at least 80 units of vitamin A and 100 units of minerals. Two foods F_(1) and F_(2) are available. Food F_(1) costs Rs. 4 per unit food and F_(2) costs Rs. 6 per unit. One unit of food F_(1) contains 3units of vitamin A and 4 units of minerals. One unit of food F_(2) contains 6 units of vitamin A and 3 units of minerals. Formulate this as a linear programming problem. Find the minimum cost for diet that consists of mixture of these two foods and also meets the minimal nutritional requirements. |
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| 4. |
Let [x] denotes the greatest integer function. Draw a rough sketch of the portions of the curves x^(2)=4[sqrt(x)]y and y^(2)=4[sqrty]x that lie within the square {(x,y)|1lexle4, 1 leyle4}. Find the area of the part of the square that is enclosed by the two curves and the line x+y=3. |
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| 5. |
For each of the functions find the f _(x), f _(y), and show that f _(xy) = f _(yx). f (x,y) = (3x)/( y + sin x) |
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| 8. |
If the bisector of the angles between the lines in the two pairs 3x^(2)-4xy+5y^(2)=0 and 5x^(2)+4xy+3y^(2)-0 are same then the angle made by the first pair with the second is |
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Answer» `30^(@)` |
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| 9. |
Thereare two values of 'a' which makes the value of determinant |(1,-2,5),(2,a,-1),(0,4,2a)| = 86, find the sum of these values of 'a'. |
| Answer» Answer :B | |
| 10. |
Evaluate int sqrt(1 - x - x^(2))dx |
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| 11. |
If x^(2) + 9y^(2)= 1, then minimum and maximum value of 3x^(2) - 27y^(2) + 24xy respectively |
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Answer» `0, 5` `Z = 3cos^(2)theta - 27(1)/(9) sin^(2)theta + 8 sinthetacostheta` `= 3 COS2THETA+ 4sin2theta rArr -5 le Z le 5` |
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| 12. |
A general linearprogramming problemis to maximize or minimizea function f= px +qy, p^(2)+q^(2) ne 0 subject ot (i) x ge 0, y ge 0,(ii) a_(1)x+b_(1)ygec_(1),(iii)a_(2)x+b_(2)ylec_(2) etcthen f and (i) (ii) , (iii) etc are defined as |
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Answer» objectivefunction |
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| 13. |
The position vectors of the points (1, -1) and (-2, m) are vec(a) and vec(b) respectively. If vec(a) and vec(b) are collinear then find the value of m. |
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| 14. |
Examine the continuity of the following function at given point : f(x)=(log x-log 8)/(x-8)", for "x ne 8 "8,for "x=8 "at,"x=8 |
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Answer» SOLUTION :Given `f(8)=8"…(i)"` `UNDERSET(xrarr8)(lim)f(x)=underset(xrarr8)(lim)(logx-LOG8)/(x-8)` Putting `x=8+h,` then `x-8=h` and as `xrarr8, hrarr0.` `therefore""underset(xrarr8)(lim)f(x)=underset(hrarr0)(lim)(log(8+h)-log8)/(h)` `=underset(hrarr0)(lim)(log((8+h)/(8)))/(h)` `=underset(hrarr0)(lim)(log(1+(h)/(8)))/((h)/(8))xx(1)/(8)` `=(1)/(8)XX1(because underset(xrarr0)(lim)(log(1+x))/(x)=1)"...(ii)"` From equation (i) and (ii), `underset(xrarr8)(lim)f(x) ne f(8)` `therefore"f is discontinuous at x = 8."` |
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| 15. |
If z=x+ iy is a complex number such that z^(1//3)=a +ib, thent he value of (1)/(a^2 +b^2)((x)/(a)+(y)/(b))= |
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Answer» -1 |
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| 16. |
I: If z_1and z_2 are two nonzero complex numbers such that |z_1+z_2|=|z_1|+|z_2| " then " agz_(1)-argz_(2)" is " pi//2 II : If z_1 and z_2 are two complex numbers such that |z_1z_2|=1 and arg z_1 - arg z_2=pi//2" then " bar(z)_1 barz_2=-i |
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Answer» only I is TRUE |
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| 17. |
Find the number of palindromes with 6 digits that can be formed using the digits (i) 0,2,4,6,8 (ii) 1,3,5,7,9 |
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| 19. |
A manufacturer has three machine operators A, B and C. The first operator A produces. 1% defective items, whereas the other two operators B and C produce 5% and 7% defective items respectively. A is on the job for 50% of the time, B is on the job for 30% of the time and C is on the job for 20% of the time. A defective item is produced. What is the probability that it was produced by A? |
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| 20. |
The sum of 10 item is 12 and sum of their squares is 18, then find the standard deviation ? |
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| 21. |
Let A is a matrix of order 100xx 50 andB is matrix of order50xx 75 and AB =C if matrix D is obtained by eliminating n columns and n+25rows of C and |D| ne 0,then n can be |
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Answer» 80 |
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| 22. |
If a, b and n are positive find the value of 1+(na)/(a+b)+(n(n+1))/(2!) ((a)/(a+b))^(2)+… |
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| 23. |
A random variable X has the following probability distribution: Determine (i) K (ii) P(X lt 3) (iii) P(X gt 6) (iv) P(0 lt X lt 3) |
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| 24. |
The minimum value of |alpha bomega+comega^2| , where a, b and c are all not equal integer and omega( ne 1) is a cube root of unity , is |
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Answer» `sqrt(3)` `rArrz^2 = |alpha + b omega+ comega^2|=(a^2 + b^2 +c^2-ab-bc -ca)or z^2=1/2{(a-b)^2+(b-c)^2+(c-b)^2}` since a,b,care all intergers but not all simulataneously EQUAL `RARR ` If a=bthen `a ne c and be ne c ` Because DIFFERENCE of intergerse = interger ` rArr(b-c)^2 le 1 ` and we have taken `a= b rArr (a -b)^2 =0` From EQ.(i)`z^2ge 1/2 (0+1+1)` `rArr z^2ge 1` Hence minimum value of |Z| is 1 |
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| 25. |
If (veca + vecb).(veca-vecb) = 0 show that |veca| = |vecb|. |
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Answer» SOLUTION :`(veca+vecb).(veca-vecb) = 0` `implies veca.(veca-vecb)+vecb(veca-vecb) = 0` [because DOT product is distributed over VECTOR addition.] `implies veca.veca-veca.vecb+vecb.veca-vecb.vecb = 0` `implies veca.veca-vecb.vecb = 0 [because vecavecb = vecb.veca = 0]` `implies |veca|^2 = |vecb|^2 implies |veca| = |vecb|` (Proved) |
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| 26. |
If OA is equally inclined to OX,OY and OZ and if A is sqrt(3) unit from the origin , then A is |
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Answer» `(3,3,3)` |
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| 27. |
The minimum value of |z_(1)-z_(2)| as z_(1) and z_(2) vary over the curves |sqrt(3)(1-2z)+2i|=2sqrt(7) and |sqrt(3)(-1-z)-2i|=|sqrt(3)(9-z)+18i| respectively is |
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Answer» `(7sqrt(7))/(2sqrt(3))` `|sqrt(3)(1-2z)+2i|=2sqrt(7)` `|sqrt(3)(1-2z)+2i|=2sqrt(7)` `rArr |-2sqrt(3z)+(sqrt(3)+2i)|=2sqrt(7)` `rArr |Z-(1/2+1/sqrt(3)i)|=sqrt(7/3)` Clearly, it represents a CIRCLE haivng center at `(1//2,1//sqrt(3))` and radius `r_(1)=sqrt(7/3)`. it is given that `z_(1)` LIES on (i)  The equation of another curve is `|sqrt(3)(-1-z)-2i|=|sqrt(3)(9-z)+18i|` or `|-1-z-2/sqrt(3)i|=|9-z+6sqrt(3)i|` or `,|z+1+2/sqrt(3)i|=|z-9-6sqrt(3)i|` or `,|z-(-1-2/sqrt(3)i)|=|z-(9+6sqrt(3)i)|` This, represents perpendicular bisector of the line segement joining point `A(-1,-2/sqrt(3))` and `B(9,6sqrt(3))`. The coordinates of the mid-point C of AB are `(4,8//sqrt(3))`. Clearly, A,B and the center of the circle are collinear. |
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| 28. |
If pth, qth, rth terms of an A.P are a,b,c then a(q - r ) + b(r - p ) + c(p - q) = |
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Answer» 0 |
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| 29. |
Heinrich must buy at least 100 shares of stock for his portfolio. The shares he buys will be from stock X. Which costs $22 pershare and Stock Y. Which costs $35 per share. His budget for buying stock is no more than $4,500. He must buy at least 20 shares of Stock X and 15 shares of Y. WHich of the following represents the situation described if a is the number of shares of Stock X purchased and b is the number of shares of stock Y purchased? |
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Answer» `22a+35b le4,500` |
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| 30. |
Find the probability of getting Two dice are rolled. What is the probability that none of the dice shows the number 2 ? |
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| 31. |
Find the volume of the solid generated by revolving, about the x-axis, the infinite branch of the curve y=2((1)/(x)-(1)/(x^(2)))"for"xge1. |
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| 32. |
Let n and k be positive integers such that n gt (k(k+1))/2. The number of solutions (x_(1),x_(2), . ..x_(k)),x_(1) ge 1, x_(2) ge 2,, . . .x_(k) ge k for all integers satisfying x_(1)+x_(2)+ . . .+x_(k)=n is: |
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| 33. |
The range of x for which the expansionof (1-3/x)^(-3//4) is valid is |
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Answer» `|x| LT 1` |
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| 34. |
9^7 + 7^9is divisible by |
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Answer» 6 |
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| 35. |
int_(0)^(pi//2)(tan^(7)x)/(cot^(7)x + tan^(7)x)dx is equal to |
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Answer» 1.`(PI)/(2)` |
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| 36. |
y=x(x-3)^(2) decreases for the values of x given by ………….. |
| Answer» Answer :A | |
| 37. |
If the plane 2x+4y+z+2=0 and x-2y+kz+5=0 are perpendicular to each other what is the value of k ? |
| Answer» SOLUTION :EQUATION of x-axis is `x/1=y/0=z/0` | |
| 38. |
If the function f(x) = x^(3)+2px^(2)+27x+16is stricly increasing for all x in R then the range of p is |
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Answer» `(-OO,(-9)/(2))cup((9)/(2),oo)` |
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| 39. |
If the roots of the equation (a)/(x-a)+(b)/(x-b)=1 are equal in magnitude and opposite in sign, then |
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Answer» `a=b` |
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| 40. |
Find a particular solution of the differential equation (dy)/(dx)+ycotx=4xcosecx(xne0). Given that y=0 when x=(pi)/(2). |
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| 41. |
Two dice are thrown together and the total score is noted. The events E, F and G are 'a total of 4', 'a total of 9 or more', and 'a total is divisible by 5', respectively. Calculate P(E), P(F) and P(G) and decide which pairs of events, if any, are independent. |
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| 42. |
An urn contains 5 red and 5 black balls. A ball is drawn at random, its colour is noted and is returned to the urn. Moreover, 2 additional balls of the colour drawn are put in the urn and then a ball is drawn at random. What is the probability that the second ball is red? |
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| 43. |
Assume that the chances of a patient having a heart attack is 40%. It is also assumed that a meditation and yoga course reduce the risk of heart attack by 30% and prescription of certain drug reduces its chances by 25%. At a time a patient can choose any one of the two options with equal probabilities. It is given that after going through one of the two options the patient selected at random suffers a heart attack. Find the probability that the patient followed a course of meditation and yoga? |
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| 44. |
If the coefficients ""^nC_4, ""^nC_5, ""^nC_6 of (1 +x)^n are in A.P. then n is equal to |
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Answer» 12 |
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| 46. |
underset(x to pi//2)lim (sqrt(1-sin x))/((pi//2-x)sqrt(1+sin x))= |
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Answer» `1//2` |
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| 47. |
Let f : (-1,1) toIRbeadifferentiablefunction withf(0)=- 1and f'(0)=1IFg(x)={f(2f(x)+2)}^2 ,theng'(0) = |
| Answer» ANSWER :D | |
| 48. |
Prove that the function f given byf(x) = log sin x" is increasing on ")0,pi/2) and decreasing on (pi/2,pi). |
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Answer» Solution :f(X) = log (sin x) ` rArrf'(x) = (COS x)/(sin x) = cos x` (a)f(x) is increasing. ` rArrf,(x) GT 0` ` rArrcot x gt 0` `RARRX in (0,pi/2)` `:.F(x)" is increasing in "(0,pi/2)`. (b)f(x) is decreasing. `rArrf'(x) lt 0` ` rArrcotx lt 0` ` rArrx in (pi/2, pi)` ` :. f(x)" is decreasing in "(pi/2, pi)`. |
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| 49. |
Evalute the following integrals int (x + 4)/(6x - 7 - x^(2)) dx |
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| 50. |
If vecaandvecb are two collinear vectors , then which of the following are incorrect : |
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Answer» `vecb=lambdaveca`,for some SCALAR `lambda` |
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