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. |
Select the correct answer:Degree of (d^2y/(dx^2))^2+sin(dy/(dx))+x=0 |
| Answer» Answer :D | |
| 2. |
Findpositive real numbers 'a' and 'b' such thatf(x) =ax-bx^(3) has four extrema on [-1,1] at each of which|f(x)|=1 |
|
Answer» |
|
| 4. |
If the roots of the equation sqrt((x)/(1-x))+sqrt((1-x)/(x))=(5)/(2) are p and q(q gt q) and the roots of the equation (p+q)x^(4)-pqx^(2)+(p)/(q)=0 are alpha,beta,gamma,delta, then (sum alpha)^(2)-sum alpha beta+alpha beta gamma delta= |
|
Answer» 0 |
|
| 5. |
int(x^(3m)+x^(2m)+x^(m))(2x^(2m)+3x^(n)+6)^(1//m)dx(xgt0)(m in N) |
|
Answer» |
|
| 6. |
Find the total number of times the digit '2' appears in the set of integers {1,2, ….2016}. For example, the digit '2' appears twice in the integer 229. |
|
Answer» |
|
| 7. |
Integrate the following functions: sin^-1(cosx) |
|
Answer» Solution :`sin^-1(cosx)` =`sin^-1 sin(pi/2-x) = pi/2-x` THEREFORE` INT sin^-1 (cosx) DX,` ` = pi/2x-x^2/2+c` |
|
| 8. |
The middle term in the expansion of (x + 1/x)^(2n) is |
|
Answer» `""^(2N)C_n` |
|
| 9. |
A is one of 5 horses that entered the race and for it to be rided by one of the two jokeys P & Q and odds in favour of P rides it is 2 to 1. If P rides, A, all the horses are likely to win. If Q rides A, A' s chance of winning is tripled. The odds in favour of A's winning is |
| Answer» ANSWER :C | |
| 10. |
Can a sum difference, product or quotient of irrational numbers be a rational number? |
|
Answer» |
|
| 11. |
Write down and simplify 6^("th") term in ((2x)/(3)+(3y)/(2))^(9) |
|
Answer» |
|
| 12. |
If x= a t^(2), y= 2 a t" then " (dy)/(dx) = …., where t ne 0 |
|
Answer» `(1)/(t)` |
|
| 13. |
If (2 le r le n) , then ""^(n)C_(r)+2""^(n)C_(r+1)+""^(n)C_(r+2) is equal to |
|
Answer» `2.""^(N)C_(R+2)` |
|
| 14. |
If P(A) = 3/5P(B) = 1/5. Find P(A cap B) if A an B are independent events. |
|
Answer» |
|
| 15. |
Find the vector equation of the plane passing through the intersection of the palnes vecr.(2hati+2hatj-hat3k) = 7, vecr.(2hati+5hatj+3hatk) = 9 and through the point (2, 1, 3) |
|
Answer» |
|
| 16. |
If int e^(sqrt(x)) " dx = K.e"^(sqrt(x))f(x ) + c then K f(x) = |
|
Answer» 2, `SQRT(X)- `1 |
|
| 17. |
A particle is acted upon by constant forces 4hati+hatj-3hatk and 3hati+hatj-hatk which displace it from a point hati+2hatj+3hatk to the point 5hati+4hatj+hatk. The work done in standard units by the forces is given by |
|
Answer» 40 units `F = 7hati +2hatj- 4hatk` The PARTICLEIS displacedfrom `A(hati + 2hatj + 3hatk) - (hati + 2hatj + 3hatk) = 4hati +2hatj- 2HATK` `:.` Work DONE`= F . AB=(7hati + 2hatj - 4hatk ). (4hati + 2hatj - 2hatk)` `= 28 + 4+ 8 = 40` units |
|
| 18. |
Find the order and degree (it defined) of the differential equation((d^(2)y)/(dx^(2)) )^(3) + ((dy)/(dx))^(2) + sin ((dy)/(dx))+ 1 = 0 . |
|
Answer» |
|
| 20. |
The value of x, where the function : f(x) = (tan x log (x-2))/(x^(2) - 4x + 3) is discontinuous, is given by : |
|
Answer» `(- oo, 2)` |
|
| 21. |
Find the following integrals int(ax^(2)+bx+c)dx |
|
Answer» |
|
| 22. |
Express the -3+ipoints geometrically in the Argand plane. |
| Answer» SOLUTION :`-3+i=(-3,1)` | |
| 23. |
If overline(a), overline(b), overline(c) are non-coplanar vectors and the points with position vectors 3overline(a)+4overline(b)-2overline(c), overline(a)+lambdaoverline(b)+3overline(c),overline(a)-6overline(b)+6overline(c) and 2overline(a)+3overline(b)-overline(c)are coplanar, the lambda= |
| Answer» ANSWER :A | |
| 24. |
If vec(a)=hati+2hatj+hatk and vec(b)=hati-2hatj-3hatk then (vec(a)+vec(b)*(vec(a)-vec(b)) = ……….. |
| Answer» Answer :B | |
| 25. |
Consider the curves C_1 : y^2 and C_2: x^2 +y^2-6x+1=0 Assertion(A) The common tangents to the curves C_1 and C_2 areothogonal. Reason ( R ) x-y+1=0 and x+y+1=0 are the common tangents to the curves C_1 and C_2 The correct answer is |
|
Answer» (A) is true, (R ) is true and (R ) is the CORRECT EXPLANATION of (A) |
|
| 26. |
Find the real values of theta , such that (3 + 2i sin theta)/(1 - 2i sin theta) is purely Real |
|
Answer» |
|
| 27. |
A person who has been taken Maths or Computer can apply for M.Sc computer science |
| Answer» Solution :Here we MEAN that the students who have been taken both MATHS and COMPUTER science can apply for M.Sc somputer science , as well as the students who have taken only one of these subject . So , in this case , we are USING inclusive "OR" | |
| 29. |
The value ofx + y + zis 15 if a, x, y, z, b are in A.P. while the value of(1)/(x) + (1)/(y) + (1)/(z) + (1)/(z) is (5)/(3)if a, x, y, z, b are in H.P. the value of a and b are |
|
Answer» 9,1 |
|
| 30. |
(A) : The mod amplitude form of (1 + 7i)/((2- i)^(2)) is sqrt2 c is (3pi)/(4) (R) : The mod-amplitude form z = a+ ib is rcis thetawhere r = |z| , theta is amplitude of z |
|
Answer» A is true , R is true and R correct explanation of A |
|
| 31. |
Find the transpose of each of each of the following matrics: [[-1,5,6],[sqrt3,5,6], [2,3,-1]] |
| Answer» SOLUTION :`[[-1,sqrt3,2], [5,5,3], [6,6,-1]]` | |
| 32. |
Choose the correct answer. Smaller area enclosed by the circle x^2+y^2 =4 and the line x+y=2 is: |
|
Answer» `2(PI-2)` |
|
| 33. |
Find the sum 1 xx 2 xx .^(n)C_(1) + 2 xx 3xx .^(n)C_(2) + "….." + 2 xx (n+1) xx .^(n)C_(n). |
|
Answer» Solution :METHODI : `1 xx 2 xx .^(n)C_(1)+ 2 xx 3 xx .^(n)C_(2) + "...." + n xx (n+1) xx .^(n)C_(n)` `= underset(r=1)OVERSET(n)sumr(r+1)..^(n)C_(r)` `= underset(r=1)overset(n)sum(r+1)[n..^(n-1)C_(r-1)]` `= n underset(r=1)overset(n)sum((r-1)+2).^(n-1)C_(r-1)` `= nxxunderset(r=1)overset(n)sum[(r-1)..^(n-1)C_(r-1)+2..^(n-1)C_(r-1)]` `= nxx n(n-1)underset(r=2)overset(n)sum.^(n-2)C_(r-2)+(2n)underset(r=1)overset(n)sum.^(n-1)C_(r-1)` `=n xx (n-1) xx 2^(n-2) + 2nxx 2^(n-1)` ` = n(n+3)xx2^(n-2)` Method II : We have `(1+x)^(n) = .^(n)C_(0) + .^(n)C_(1)x + .^(n)C_(2)x^(2) + "....." + .^(n)C_(n)x^(n)` Differentiatingw.r.t.x we get `n(1+x)^(n-1) = .^(n)C_(1) + 2 xx .^(n)C_(2)x + 3 xx .^(n)C_(3)x^(2)"....." + nxx .^(n)C_(n) xx x^(n-1)` Multipyingwith `x^(2)`,we have `n(1+x)^(n-1) x^(2) = .^(n)C_(1) x^(2) + 2 xx .^(n)C_(2)x^(3) + 3xx .^(n)C_(3)x^(4)"...."+n xx .^(n)C_(n)x^(n+1)` Differentiating w.r.t. ,we get `m(n-1)(1+x)^(n-2)x^(2) +2x xx n(1+x)^(n-1)` `= 2.^(n)C_(1)x + 2 xx 3xx .^(n)C_(2)x^(2) + 3 xx 4 xx .^(n)C_(3)x^(3) + "...." + n(n+1) xx .^(n)C_(n)x^(n)` Now putting ` x = 1`, we get `1 xx 2 xx .^(n)C_(1) + 2 xx 3 xx .^(n)C_(2) + "...." + n xx (n+1) xx .^(n)C_(n)` `= n (n+3) xx 2^(n-2)` |
|
| 34. |
Find the equation of line of the shortest distancebetween the lines (x - 1)/( -2) = (y + 3)/( 2) = ( z - 4)/( -1) and (x + 3)/( 6) = (y - 2)/( 2) = (z + 5)/( 3) |
|
Answer» |
|
| 35. |
The value of p and q so that the function f(x) = {{:((1|sin x|)^((p)/(sin x)),(-pi)/(6) lt x lt 0),(e^((sin 2x)/(sin 3x)), 0 lt x lt (pi)/(6)):} is continuous at x = 0, are |
|
Answer» <P>`p = (1)/(3), q = E^(2//3)` |
|
| 36. |
Find the area of the smaller region bounded by the ellipse (x^(2))/(9) + (y^(2))/(4) = 1 and the line (x)/(3) + (y)/(2) = 1 |
|
Answer» |
|
| 37. |
f(x) = e^(-1//x^2) sin(1//x) for x ne 0 and f(0) =0 . The function f(x) is |
|
Answer» DIFFERENTIABLE at x = 0 |
|
| 38. |
IfS_1 and S_2 are the foci of the hyperbola whose transverse axis length is 4 and conjugate axis length is 6,S_3 and S_4 are the foci of the conjugate hyperbola , then the area of the quadrilateral S_1, S_2 , S_3 ,S_4is |
|
Answer» 24 |
|
| 39. |
Prove that .^(n)C_(0) + (.^(n)C_(1))/(2) + (.^(n)C_(2))/(3) + "……" + (.^(n)C_(n))/(n+1) = (2^(n+1)-1)/(n+1). |
|
Answer» SOLUTION :Method I : We have `T_(R ) = (.^(n)C_(r-1))/(r ) = (.^(n+1)C_(r))/(n+1)` `:.`Requiredsum `= underset(r=1)overset(n+1)sumT_(r)` ` = underset(r=1)overset(n+1)sum(.^(n+1)CR)/(n+1)` ` = (.^(n+1)C_(1) + .^(n+1)C_(2) + "….." + .^(n+1)C_(n+1))/(n+1)` ` = ((.^(n+1)C_(0) + .^(n+1)C_(1) + .^(n+1)C_(2) + "......" + .^(n+1)C_(n+1))-1)/(n+1)` `= (2^(n+1) - 1)/(n+1)` Method II : We have `(1+X)^(n)= .^(n)C_(0) + .^(n)C_(1)x+.^(n)C_(2)x^(2)+"...."+.^(n)C_(n)x^(n)` ` :. underset(0)overset(1)INT(1+x)^(n)dx = underset(0)overset(1)int(.^(n)C_(0) + .^(n)C_(1)x+.^(n)C_(2)x^(2) + "...." + .^(n)C_(n)x^(n))dx` `rArr [((1+x)^(n+1))/(n+1)]_(0)^(1)=[.^(n)C_(0)x+(.^(n)C_(1)x^(2))/(2)+(.^(n)C_(2)x^(3))/(3) + "....."+ (.^(n)C_(n)x^(n+1))/(n+1)]_(0)^(1)` `rArr (2^(n+1))/(n+1) -1/(n+1)=.^(n)C_(0)+(.^(n)C_(1))/(2)+(.^(n)C_(2))/(3)+ "......" + (.^(n)C_(n))/(n+1)` |
|
| 40. |
Every body in a room shakes hands with every body else. The total number of hand shakes is 66. The total number of persons in the room is |
|
Answer» 11 |
|
| 41. |
The mapping f: R rarrR , g, R rarr R are defined by f(x) = 5-x^2and g(x)=3x -4, then find the value of (fog)(-1) |
| Answer» ANSWER :B | |
| 42. |
If two points are taken on the mirror axis of the ellipse (x^(2))/(25)+(y^(2))/(9)=1 at the same distance from the centre as the foci, then the sum of the sequares of the perpendicular distance from these points on any tangent to the ellipse is |
|
Answer» 25 |
|
| 43. |
Integrate the following functions w.r.t.x (e^(5logx) - e^(4logx))/(e^(3logx) - e^(2logx)) |
|
Answer» SOLUTION :`(E^(5 logx) - e^(4 logx))/(e^(3 logx) -e^(2logx)) = (x^5-x^4)/(x^3-x^2)` =`(x^2(x^3-x^2))/(x^3-x^2) = x^2` `e^(a logx) = e^(logx^a) = x^a` therefore The REQUIRED integral =`int x^2 dx = x^3/3 +C` |
|
| 44. |
a gt 1is a real numberf(x) = log_(a)x^2 , where x gt 0 If f^(-1)(x) is a inverse of f(x) andb and c are real numbers then f^(-1) (b+c) = ...... |
|
Answer» `F^(-1)(B) .f^(-1)(C)` |
|
| 46. |
T_m denotesthenumber of trianglesthat can beformedwiththe verticesof aregularpolygonof msides. If T_(m+1)- T_m=15thenm= |
|
Answer» 3 |
|
| 47. |
Find two positive numbers x and y such that x+y=60 and xy^(3) is maximum. |
|
Answer» |
|