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.
| 2. |
Photons are incident from vacuum on a transparent material with a refractive index n for a given wavelength. Determine the momentum of the incident photon, if its wavelength in the material is equal to lambda. |
|
Answer» `nh//lambda` |
|
| 3. |
Find (dy)/(dx),x=sint,y=cos2t |
| Answer» SOLUTION :`(DY)/(DX)=-2sin2tdx/dt=costdy/dx(dy/dt)/(dy/dt)=(-2sin2t)/COST=(-4sintcost)/cost=-4sint` | |
| 4. |
lim_(n rarr oo)((1^(2) + 2^(2) ……. + n^(2))(n)^(1//n))/((n+1)(n+10)(n + 100)) = |
| Answer» Answer :B | |
| 5. |
The shortest distance of (-5,4) to the circle x^(2)+y^(2)-6x+4y-12=0 is |
|
Answer» 10 |
|
| 6. |
A die marked 1, 2, 3 in red and 4, 5, 6 in green is tossed. Let A be the event, 'the number is even,' and B be the event, 'the number is red'. Are A and B independent? |
|
Answer» |
|
| 7. |
G is the centroid of DeltaABC. If AG = BC, then measure of /_BGC is |
| Answer» Answer :C | |
| 8. |
Let A be a 3xx3 matrix such that (A-2.2I_(3))(A-3.8 I_(3))=O_(3xx3) then trace of A+ 8.36A^(-1) is ________ |
|
Answer» |
|
| 9. |
Evaluate the following integrals intx sec^(-1)x dx |
|
Answer» |
|
| 10. |
The value of k for which the circle x^(2) + y^(2) -4x + 6y +3 =0will bisect the circumferece of the circle x^(2) +y^(2) +6x -4y +k=0is |
| Answer» ANSWER :A | |
| 11. |
Let veca=(cos theta)hati-(sin theta)hatj, vecb=(sin theta)hati+(cos theta)hatj,vecc=hatk and vecr=7hati+hatj+10hatk. IF vecr=x veca+y vecb+z vecc, then the value of (x^(2)+y^(2))/(z) is equal to |
|
Answer» 3 |
|
| 13. |
y=3x-2 is a straightline touching the parabola (-3)^(2)=12(x-2) if a line drawnperpendicular to this line at p on it touches the given parabola then the point p is |
|
Answer» `(-1,-5)` |
|
| 15. |
Three cards are drawn successively without replacement from a pack of 52 well shuffled cards. What is the probability that the first two cards are kings and the third is an ace? |
|
Answer» |
|
| 16. |
Froma point P (alpha,beta) a pair of tangents PQ and PR are drawn to circle x^2+y^2-2x-2y-2=0 such that QR is chord of contact.Considering PQ and PR are adjacent sides a parallelogramPQRS is formed .Equation of chord of contact QRis x =0, S_1 and S_2be the circles circumscribing the triangle PQR and QRS. Equation of circle S_1=0 is |
|
Answer» `x^2+y^2+4x-2y-2=0` |
|
| 17. |
Froma point P (alpha,beta) a pair of tangents PQ and PR are drawn to circle x^2+y^2-2x-2y-2=0 such that QR is chord of contact.Considering PQ and PR are adjacent sides a parallelogramPQRS is formed .Equation of chord of contact QRis x =0, S_1 and S_2be the circles circumscribing the triangle PQR and QRS. Co-ordinate of point P(alpha,beta) is equal to |
|
Answer» (3,2) |
|
| 18. |
The locus of the points of intersection of perpendicular normals of the parabola y^2=4ax is |
|
Answer» `y^2-2ax+a^2=0` |
|
| 19. |
Find the antiderivative (or integral) of the following functions by the method of inspection. e^(2x) |
| Answer» SOLUTION :`int e^(2x) DX = 1/2 e^(2x) +C` | |
| 20. |
If the area of the triangle with vertices (2,-6), (5,4) and (k,4) is 35 square units, find values of kusing determinants. |
|
Answer» |
|
| 22. |
Findthe area of the region bounded by y= sinx, y = cosxand ordinatesx = 0, x = pi//2. |
|
Answer» Solution :`UNDERSET(0)OVERSET(pi/2)INT|sinx-cosx|dx` `underset(0)overset(pi//4)int(cosx-sinx)dx + underset(pi//4)overset(pi//2)int(sinx-cosx) dx = 2(sqrt(2)-1)` |
|
| 23. |
Find the number of divisors of the number 2^(10).5^(10).11^(11).13^(13)which of the form 4n+1(nge0) |
|
Answer» |
|
| 24. |
Let Let 1/x_1,1/x_2...1/x_n(x _i ne0" for "i=1,2,...n) in A.P. Such that x_1=3 and x_21=20.If n is the least positiveinteger for which x_n gt 50" then" sum_(i=1)^n(1/x_i) is equal to: |
|
Answer» `1//8` |
|
| 26. |
Find the range of x for which the following expansions are valid . (2-(3x)/(4))^(-15//4) |
|
Answer» |
|
| 27. |
If the lines (2x-5)/(k)= (y+2)/(-5) = (z)/(1) and (x)/(1) = (y)/(2) = (z)/(3) are perpendicular to each other, then value of k is.................... |
| Answer» ANSWER :B | |
| 28. |
If sum_(k=1)^n ɸ(k)=2_n/(n+1),then sum_(k=1)^10 1/(ɸ(k))isequal to |
|
Answer» `11/20` |
|
| 29. |
OP is a tower of height 20 m and AB is a pole of height 5 m. The angle of elevation of the top P of the tower from the top B of the pole is 45^(@). Both pole and tower stand on the same ground. The angle of elevation of the top P of the tower from the base A of the pole is |
|
Answer» `"cos"^(-1) (3)/(5)` |
|
| 30. |
Equation of circle with centre (-1,2) and passing through the centroid of triangle formed by (3,1),(2,-1) and (1,3) is |
|
Answer» `X^(2)+y^(2)-x+2y-5=0` |
|
| 31. |
If int_(0)^(x)2xf^(2)(t)dt=(int_(0)^(x)2f(x-t)dt)^(2) for f(1)=1 and f(x) is comtinuos function for xgto and {a_(n)} is a sequence such that a_(n+1)=a_(n)+sqrt(1+a_(n)^(2)) for a=0, if f(x) is an increasing function, then lim_(nto oo)(a_K)/(2^(n-1))= (where k=f(n^(sqrt2-1)))is |
|
Answer» `PI//4` |
|
| 32. |
If the rangeof a discreter dateof n observation on is zero, then |
|
Answer» allvaluesofdateare ZERO |
|
| 33. |
The sum of the coefficients in the binomial expansion of (1/x + 2x)^n is equal to 6561. The constant term in the expansionis |
|
Answer» `""^8C_4` |
|
| 34. |
Solve graphically 5x + 6y lt 12 |
Answer» SOLUTION :
|
|
| 35. |
A game consists of tossing a coin 3 times and nothing its outcome. A boy wins if all tosses give the same outcomes and losses otherwise. Find the probability that the boy losses the game. |
|
Answer» |
|
| 36. |
If from the point (alpha,alpha^2) two tangents drawn to any one branch of hyperbola x^2-4y^2=1, then : |
|
Answer» `-(1)/(2) LT ALPHA lt (1)/(2)` |
|
| 37. |
Ifx=a( theta+ sintheta)and y=a(1- costheta), prove that(dy)/(dx) = tan ""(theta//2) |
|
Answer» |
|
| 38. |
If a is a root of x^(2) - 3x-5=0 find the value of a^(4) - 2a^(3) - 7a^(2) -8a |
|
Answer» |
|
| 39. |
ax^(2)+2hxy+by^(2)+2gx+2fy+c=0 represents two parallel straight lines if |
|
Answer» `SQRT((g^(2)-AC)/(h^(2)+a^(2)))` |
|
| 40. |
The points (5, -4, 2), (4, -3, 1), (7, -6, 4) and (8, -7, 5) are the vertices of a |
| Answer» Answer :D | |
| 41. |
Three dice are rolled simultaneously . The probability that the sum of the numbers on them is 6 is |
|
Answer» `(1)/(36)` |
|
| 42. |
There are 3 bags A , B and C. Bag A contains 2 white and 3 black balls, bag B contains 4 white and 2 black balls and Bag C contains 3 white and 2 black balls. If a ball is drawn at random from a randomly chosenbag, then the probability that the ball drawn is black, is |
| Answer» ANSWER :B | |
| 43. |
IF an error of 0.01 cm is made while measuring the radius 2 cm of a circle, then the relative error in the circumference is |
| Answer» Answer :C | |
| 44. |
intcos^2xdx |
|
Answer» SOLUTION :`intcos^2xdx=int(1+cos2x)/2dx` =1/2(x+1/2 SIN2X)+C =1/2x+1/4sin2x+C |
|
| 45. |
If 0 ltx ltpiand cosx + sinx = 1/2 , thentan xis |
|
Answer» `((1- sqrt(7)))/(4)` |
|
| 46. |
Let f (x) be a polynomial of degree three such that f(0) = 1, f(1) = 2 and 0 is a critical point of f(x) such that f(x) does not have a local extremum at 0. Them int(f(x))/(x^(2)+1) dx is equal to |
|
Answer» `x-LOG(x^(2)+1)+TAN^(-1)x+C` |
|
| 47. |
If ax + by = 1, cx^2 + dy^2 = 1 have only one solution, then a^2/c + b^2/d =1 and x= a/c, y=b/d |
|
Answer» `a^2/C +b^2 /d = 1` |
|
| 48. |
A : cos 40^(@) cos 80^(@) cos 160^(@) =-1//8 R :cos theta cos (120^(@) - theta ) cos (120^(@) + theta ) =(1)/(4) cos 3 theta |
|
Answer» A is true , R is true and R is CORRECT explanation of A |
|
| 49. |
(3x^(2) + 1)/(x^(2) -6x + 8) is equal to |
|
Answer» `3 + (49)/(2(x -4))-(13)/(2(x -2))` |
|
| 50. |
Find the equation of the normal at theta=(pi)/(3) to the hyperbola 3x^(2)-4y^(2)=12. |
|
Answer» |
|