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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.
| 2. |
Let X ={ ({:(a , b),(c,d):}) : a, b,c, d in R} Define f: X to Rby f(A) = det (A) , AA A in x . then , f is |
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Answer» ONE - one but not ONTO |
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| 4. |
Prove that the locus of point of intersection of two perpendicular normals to the parabola y^(2) = 4ax is the parabola y^(2) = a(x-3a). |
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Answer» <P> |
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| 5. |
One balanced coin is tossed. If two head comes up then two balanced dice are tossed and sum of the numbers obtained on it is noted. If tail is obtain then one card is selected from the card numbered 1 to 9 and its number is noted. Then ....... is the probability of event that noted number from card is 7 or 8. |
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Answer» `(15)/(72)` |
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| 6. |
Prove that the function f(x)=2x^2-3x+2 is continuous at at x=1. |
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| 7. |
If A=sqrt(3) cot 20^(@) - 4 cos20^(@) and B= sin12^(@) sin48^(@) sin54^(@) be such that A + lambdaB=2, then the value of lambda^(3) +2000 is ……………. |
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| 8. |
Prove the following: [[-a^2,ab,ac],[ab,-b^2,bc],[ac,bc,-c^2]]=4a^2b^2c^2 |
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Answer» Solution :`[[-a^2,AB,ac],[ab,-b^2,bc],[ac,bc,-c^2]]` =`ABC[[-a,a,a],[b,-b,b],[c,c,-c]]` `C_2=C_2+C_3`) =`abcxx2c[[2a,a],[0,b]]` `abcxx2c(2ab-0)` =`4a^2b^2c^2` |
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| 9. |
If bar(x)=(3,1,0),bar(y)=(2,2,3),bar(z)=(-1,2,1). If bar(x)_|_(bar(y)+k bar(z)) then k = …………… |
| Answer» ANSWER :A | |
| 10. |
Choose the correct answers If f (a + b - x) = f (x), then int_(a)^(b)xf(x) dx is equal to |
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Answer» `(a+B)/2int_(a)^(b)F(b-X)DX` |
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| 11. |
Classify the following gas scalar and vector quantities : (i) Distance (ii) Displacement (iii) Force (iv) Velocity (v) Time (vi) Speed |
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| 12. |
Find the area of the region bounded by the curves y= x^(2) and y= (2)/(1+x^(2)) |
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| 14. |
A line segment AM=a moves in the XOY plane such that AM is parallel to the X-axis. If A moves along the circle x^(2)+y^(2)=a^(2), then the locus of M is |
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Answer» `X^(2)+y^(2)=4A^(2)` |
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| 15. |
If the hyperbola xy = c^(2) touches the curve x^(2) + 2y^(2) + alpha xy = c^(2), then value of alpha is /are |
| Answer» Solution :N/A | |
| 16. |
A die is thrown 3 times. Find the probability of the event of getting sum of the numbers thrown as 15 when it is known that the first throw was a five. |
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| 17. |
If the vector veca=2hati+3hatj+6hatk and vecb are collinear and |vecb|=21," then "vecb is equal to |
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Answer» `PM (2hati+3hatj+6hatk)` |
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| 18. |
If A is a square matrix such that A^(2)=A, then (I+A)^(3)-7A is equal to___ |
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Answer» A |
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| 19. |
The conic represented by 2x^(2) -12xy +23y^(2) -4x -28y -48 =0is |
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| 20. |
Four points are such that the line joining any two points is perpendicular to the line joining other two points. If three point out of these lie on a rectangular hyperbola, then the fourth point will lie on |
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Answer» the same HYPERBOLA |
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| 21. |
Write the value of inte^(logcot^2x)dx |
| Answer» SOLUTION :`INTE^(Incot^2x)dx=intcot^2xdx=int(cosec^2x-1)dx=-cotx-x+c` | |
| 22. |
int (4x^(2) +x+1)/(x^(3) -1) dx=? |
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Answer» `log (x-1) -log (x^(3) -1) +C` |
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| 23. |
The modulus argument form of 1+iTantheta when theta epsilon (pi/2,pi) is |
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Answer» `SecthetaCIstheta` |
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| 24. |
int(cos2x-cos2alpha)/(cosx-cosalpha)dx |
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Answer» SOLUTION :`I=INT(cos2x-cos2alpha)/(cosx-cosalpha)DX` =`int((2cos^2x-1)-(2cos^2alpha-1))/(cosx-cosalpha)dx` =`2int(cosx+cosalpha)dx` =`2sinx+2xcosalpha+c` |
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| 25. |
If A and B are symmetric matrices , then ABA is : |
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Answer» symmetricmatrix |
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| 26. |
A man can just push a box on 37^(@) concreate slope. When he keeps it at the point where the angle is 53^(@), he can just hold it from sliding black. If the coeffieceint of friction between the box and the concreate slope is mu find (1)/(mu). Assume that the man is applying same magnitude of force along the tangent to the curve only . |
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| 27. |
Evaluate int(2x - 5)/(3x^(2) + 4x + 5) dx. |
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| 28. |
A vertical pole PO stands at the centre of a square ABCD. If AC subtends an angle 90° at the top P of the pole, then the angle subtended by a side of the square at Pis: |
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Answer» `30^(@)` |
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| 29. |
If vec(a) and vec(b) are two vectors such that |vec(a)| = |vec(b)| = sqrt(2) and vec(a).vec(b) = -1, then find the angle between them. |
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| 30. |
For each of the differential equations given inExercises 1 to 12, find the generalsolution : 1.(dy)/(dx) + 2y = sin x |
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| 31. |
Evaluate intsqrt(e^(x)-4)dx |
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| 32. |
Solve the following : [[2,2,x],[-1,x,4],[1,1,1]]=0 |
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Answer» SOLUTION :`[[2,2,x],[-1,x,4],[1,1,1]]`=0 or, `[[0,2+2x,x+8],[0,x+1,5],[1,1,1]]`=0 (REPLACING `R_1` and `R_2` by `R_1+2R_2` and `R_2+R_3`) or, `1XX[[2+2x,x+8],[x+1,5]]`=0 or, `10+10x-x^2-8x-x-8=0` or, `x^2-2x+x-2=0` or, (x-2)(x+1)=0 `therefore` x=2,x=-1 |
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| 33. |
Let M and m respectively denote the maximum and the minimum values of [f(theta)^2],where f(theta)=sqrt(a^2+cos^2theta+b^2sin^2theta)+sqrt(a^2 sin^2 theta+b^2 cos^2 theta). Then M-m= |
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Answer» `a^2+B^2` |
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| 34. |
A group of 10 items has mean 6. If the mean of 4 of these items is 7.5, then the mean of the remaining items is : |
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Answer» 6.5 |
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| 35. |
BaCO_(3)(s)+AcOHunderset(Delta)overset(Na_(2)C_(2)O_(4)"Solution")rarr? Comment on the product of this reaction. |
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Answer» `BaCO_(3)` remains UNAFFECTED. |
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| 36. |
Which of the following is incorrect regarding n^(th) roots of unity ? |
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Answer» There are `n` distinct roots |
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| 37. |
Sand is pouring from a pipe at the rate of 12cm^(3)//sec. The falling sand forms a cone on the ground in such a way that the height of the cone is always one-sixth of the radius of the base. How fast is the height of the sand cone increasing when the height is 4 cm? |
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| 38. |
If the position vectors of the vertices A, B and C of DeltaABC are respectively vec(0),-20hat(i)+15hat(j)and36hat(i)+15hat(j), then find the position vector of the incentre of the triangle. |
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Answer» `HAT(i)+8hat(J)` |
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| 39. |
The substitution required to change equation (dy)/(dx) = (2x+3y+5)/(4x+6y+9) into variable separable is |
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Answer» `4X - 6y=z` |
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| 40. |
Show that the equations of common tangents to the circle x^(2)+y^(2)=2a^(2) and the parabola y^(2)=8ax "are" y=+-(x+2a). |
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| 42. |
For a random variable X given that P(X = k) = 2^(-k) find the mean and variance of X. |
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| 43. |
If a and b are positive integers, and x = 2 cdot 3 cdot 7 cdot a and y = 2 cdot 2 cdot 8 cdot b, and the values of both x and y lie between 120 and 130 (not including the two), then a - b = |
| Answer» ANSWER :B | |
| 44. |
Express the following as trigonometric ratios of some acute angles.tan 235^@ |
| Answer» SOLUTION :`TAN 235^@ = tan (180^@ + 45^@) = tan 45^@` | |
| 45. |
The solution of y-x((dy)/(dx)) = a(y^(2) + (dy)/(dx)) is |
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Answer» `(x+a)(y+a) = CY` |
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| 46. |
Photo electric effect supports the quantum nature of light because: |
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Answer» there is a minimum frequency of light below which no photoelectrons are emitted. |
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| 47. |
Statement: If sin A =sin B, cos A=cos B then A=2n pi +B Statement :II If A+B+C=90^(@) then sin 2A+sin 2B+sin 2C=sin A sin B sin C Which of the above statement is correct? |
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Answer» only I |
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| 48. |
Let a = coefficient of x^(20) in (1+x+2x^(2)+3x^(3)+…+20x^(20))^(2)," then "(1)/(137) a= |
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| 49. |
If z = i(1+sqrt(3)),"then"z^(4)+2z^(3)+4z^(2) + 5 is equal to |
| Answer» ANSWER :A | |
| 50. |
There are 10 examination papers for a course. i. Find out in how many ways these examination papers can be arranged. ii. Find out in how many ways these papers can be arranged so that two papers must be consecutive. iii. Find out in how many was these papers can be arranged so that two particular papers should not be consecutive. |
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Answer» <P> II. `9!xx2!` iii. `8xx9!` |
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