Saved Bookmarks
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. |
Find the equation of the parabola whose axis is parallel to Y-axis and which passes through the points (4,5),(-2,11) and (-4,21). |
|
Answer» |
|
| 3. |
Let P represent the point (3, 6) on the parabola y^(2)=12 x. For the parabola y^(2)=12 x, if l_(1) is the length of the normal chord drawn at P and l_(2) is the length of the focal chord drawn through P, then l_(1)/l_(2)= |
| Answer» Answer :A | |
| 4. |
1,2,4,6,8,9 transformed into another series whose mean is 12. Two middle terms of the transformed series are |
|
Answer» `7,8` |
|
| 5. |
A = {(x,y) : y = 1//x,0 ne x in R} , B = {(x, y) : y = - x, x in R} then |
|
Answer» `A NN B=A` |
|
| 6. |
If length of three sides of a trapezium other than base are equal to 10 cm, then find the area of the trapezium when it is maximum. |
|
Answer» |
|
| 7. |
IFsin^(-1) x sin ^(-1) y =(2pi )/(3) thencos ^(-1)y=(pi)/(lamda ). Findthevalueoflamda |
|
Answer» |
|
| 8. |
IF12 x^2- mxy+ 3y^2- 5y^2 -2canberesolvarbleintotwo linearfactorsthenm= |
| Answer» ANSWER :D | |
| 9. |
Evaluate int(1 - x) (4 - 3x) (2x + 3)dx |
|
Answer» |
|
| 10. |
Let p: Kiran passed the examination q: Kiran is sad The symbolic from of a statement "it is not ture Kiran passed therefore she is sad" is |
| Answer» Answer :B | |
| 11. |
If the two lines, whose d.C.s l,m,n are given by the equation al+bm+cn=0 and fmn + gnl + hlm=0, are mutually perpendicular, then |
|
Answer» `f/a + G/B + h/C=0` |
|
| 12. |
Seven digits from the numbers 1, 2, 3, 4, 5, 6, 7, 8, 9 are written in random order. Find the probability that the seven digited number is divisible by 9. |
|
Answer» |
|
| 13. |
2500 single men and 2500 single women were asked about whether they owned any dogs or cats. The table below displays a summery of the results. Of the people who said they had neigher dogs nor cats, 200 were selected at random, and they were asked if they had any pets at all. 43 people said they did have pets,and the remaining 157 said that they did not. Based on both the initial data given in the table, together with the new data stated in this paragraph, which of the following is most likely to be accurate? |
|
Answer» Approximately 482 of the ORIGINAL PEOPLE SURVEYED WOULD SAY that they have no pets. |
|
| 14. |
The solution of (dy)/(dx) = ((y)/(x))^(1//3) is |
|
Answer» `X^(2//3) + y^(2//3) = C` |
|
| 16. |
Find the power of the point P with respect to the circle S = 0 when P = (5,-6), and S-= x^(2) + y^(2) + 8x + 12y + 15 |
|
Answer» |
|
| 17. |
{:(I."If" a = 2i - 3j -k. b = i + 4j - 2k"then" (a + b) xx (a - b), a. 42 i + 14 j - 21 k),(II. "If" a = 3i - j - 2k. b - 2i + 3j + k "then" (a + 2b) xx (2a - b), b. -5i + 5j + 5k),(III. "If" a = i + 2j - 3k. b = 2i + j + k "then" a xx b, c. -25i + 35j - 55 k),(IV. "If" a = 2i + 3j + 6k. b = 3i - 6j + 2k "then" a xx b, d. -20i - 6j - 22k):} |
|
Answer» a,c,d,b |
|
| 18. |
If the period of the function f(x) = sin 5x cos 3x is alpha, then cos alpha= |
|
Answer» `1` |
|
| 19. |
int_(0)^(5) [x] dx= |
|
Answer» 0 |
|
| 20. |
If1 , omega , omega^(2) are the cube roots of unity , then find the values of the following . (1 - omega) ( 1 - omega ^(2)) ( 1 - omega^(4)) ( 1 - omega^(8)) |
|
Answer» |
|
| 21. |
An urn contains 5 black 6 red and 4 white balls.Five balls are drawn at random from the urn. Find the probability that all graduates? What is the probability of at least one graduate? |
|
Answer» |
|
| 22. |
Let f (n) = sum _(r =2)^(n) (r )/(""^r C_(2) ""^(r+1) C_(2)) , a = lim _(x to oo) f (n) and x ^(2) -(2n -(1)/(2)) x +t =0 has two positive roots alpha and beta. minimum value of (4)/(alpha ) + (1)/(beta) is : |
|
Answer» 2 |
|
| 23. |
If f(x) is strictly increasing function then h(x) is non monotonic function given |
|
Answer» ` a in (0,3)` changes sign for which `DGT0 or 4a^(2)-12agt0` `a in(-oo,0)cup(3,oo)` |
|
| 24. |
If the antiderivative of (1)/(x^(2)sqrt(1+x^(2))) is -sqrt(f(x))/(x)+C then f(x) is equal to |
|
Answer» `1 + 1//x^(2)` |
|
| 25. |
An unbiased die of six faces, market with the integers 1,2,3,4,5,6, one on each face, is thrown thrice in succession. What is the total number of outcomes ? |
|
Answer» Solution :An UNBIASED DIE of six FACES, marked with the integers 1,2,3,4,5,6, one on each face is thrown thrice in succession. `:.` The total NUMBER of OUTCOMES `=6^3=216.` |
|
| 26. |
For real valued functions f and g, f(x) = 2sin (pi/x) and g(x) = sqrtx. Then fog(4) - gof (6) = .............. |
| Answer» SOLUTION :N/A | |
| 27. |
Find the domain and range of those relations in a which are functions. {(a,2),(b,3),(c,4)} |
| Answer» SOLUTION :RANGE of the FUNCTION is {2,3,4} | |
| 28. |
The sum of 100 observations and sum of their squares are 400 and 2,475 respectively . Later on three observatons 3,4 and 5 were found to be incorrect.If the incorrect observations are omitted, then variance of the remaining observations is: |
|
Answer» `8.25` |
|
| 29. |
There are 12 different books in a shelf. In how many ways we can select atleast one of them? |
|
Answer» |
|
| 30. |
int (x^(2)-1)/((x^(2)+1)(x^(2)+2)(x^(2)+3))dx= |
|
Answer» `Tan^(-1)x+(3)/(sqrt(2))Tan^(-1)((x)/(sqrt(2)))-(2)/(sqrt(3))Tan^(-1)((x)/(sqrt(3)))+C` |
|
| 31. |
If a straight line passes through the points ((-1)/(2), 1)and (1, 2), then its x-intercept is |
|
Answer» -2 |
|
| 32. |
The sum of the solutions in (0,2pi)for the equation cosx cos (pi/3-x)cos (pi/3+x)=1/4 is |
| Answer» ANSWER :C | |
| 33. |
Find the slope of the tangent to curve y=x^3-x+1 at the point whose x-coordinate is 2. |
| Answer» SOLUTION :`y=x^3-x+1(DY)/DX=3x^2-1` SLOPE of the TANGENT `=(dy)/dx]_(x=2)=3xx2^2-1=11` | |
| 34. |
Mean and variance of random variable X are 2 and 1 respectively. Then ……….. is the probability that X takes more than one value. |
|
Answer» `(11)/(16)` |
|
| 35. |
Lt_(x rarr 0) ((1+x)^(n)-nx-1)/(x^(2)) n gt 1is euqal to |
|
Answer» N |
|
| 36. |
If f(x) = x^(3) + bx^(2) + ax satisfies the conditionsof Rolle's theorem in [1, 3] with c = 2 + (1)/sqrt(3)then (a, b) is equal to |
|
Answer» `(11,6)` |
|
| 37. |
Are fand g both necessarily onto, if gof is onto? |
|
Answer» |
|
| 38. |
ABC is an isosceles triangle and B=90. If B and the midpoint P of AC are represented by 3+2i and 1-I then other vertices are |
|
Answer» 4+ I,-2-3i |
|
| 39. |
If z_(1) and z_(2) be two non zero complex numbers such that (z_(1))/(z_(2))+(z_(2))/(z_(1))=1, then the origin and the points represented by z_(1) and z_(2) |
|
Answer» LIE on a straight L!ne |
|
| 40. |
Find the sum of the infinite series 1+(1)/(3)+(1.3)/(3.6)+(1.3.5)/(3.6.9)+….. |
|
Answer» |
|
| 41. |
Three vectors vec(a),vec(b)andvec(c) are of the same length and the angle between any two of them is the same. If vec(a)=hat(i)+hat(j)andvec(b)=hat(j)+hat(k)," then "vec(c) is |
|
Answer» `-(1)/(3)(hat(i)-4hat(j)+hat(k))` |
|
| 42. |
A, B and C are three non-zero vectors, no two of them are parallel. If A + B is collinear to C and B + C is collinear to A, then A + B + C is equal to |
|
Answer» A `therefore A + B = lambda C` and `B + C = MU A` where, `lambda` and `mu` are SCALARS. `implies A+B+C=(lambda+1)C` and `A+B+C=(mu+1)A` `implies (lambda+1)C=(mu+1)A` If `lambda ne-1`, then `C=(mu+1)/(lambda+1)A` implies C and A are collinear. This is a contradiction to the given CONDITION. `therefore lambda = - 1` `therefore A + B + C = 0` |
|
| 43. |
The substitution required to change (3y-7x+7) dx + (7y-3x+3)dy = 0 into a homogeneous equation is |
|
Answer» X = X+1 y = Y |
|
| 44. |
The probability function of the binomial distribution is P(x)= ((6), (x))p^(x)q^(6-x), x= 0, 1, 2, ....., 6.If 2P(2) = 3P(3) then value of q is ………. |
| Answer» Answer :D | |
| 45. |
Let I be the purchase value of an equipment and v (t) be the value after it has been used for t years. The value V (t) depreciates at a rate given by differential equation (dV(t))/(dt)= -k(T-t), where k gt 0 is a constant and T is the total life in years of the equipment. Then the scrap value v(T) of the equipment is _______ |
|
Answer» `I-(K(T-t)^(2))/(2)` |
|
| 46. |
If g(x) = int_(0)^(x) cos 4(t) dt , then g(x+pi) equals |
|
Answer» `(G(X))/(g(PI))` |
|
| 48. |
Radius of an air bubble increases at the rate of (1)/(2) cm/sec. At what rate volume at bubble increases when radius is 1 cm. |
|
Answer» |
|
| 49. |
If A+B+C=180^(@) then cos A+cos B-cosC= |
|
Answer» `-1+4sinA//2sin B//2 SIN C//2` |
|
| 50. |
If alpha, beta ar the roots of the quadratic equation x ^(2) -(3+ 2 ^(sqrt(log _(2)3))-3 ^(sqrt(log _(3)2)))x-2 (3 ^(log _(3)2)-2^(log _(z)3))=0,then the value of alpha ^(2) + alpha betais equal to : |
|
Answer» 3 |
|