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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. |
Ifalpha, beta , gammain[0,pi] andifalpha , beta, gammaarein A.Pthen( sinalpha- singamma)/( cos gamma-cosalpha) is equalto |
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Answer» `sin BETA ` |
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| 2. |
Statement-1: Each point on the line 7x-y=0 is equidistant from the lines 4x+3y-1=0" and "3x-4y+1=0 Statement-2: The locus of point which is equidistant from 2 given lines L_(1)-=a_(1)x+b_(1)y+c_(1)=0 and L_(2)-=a_(2)x+b_(2)y+c_(2)=0 need not always be the angle bisector of 2 given lines. |
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Answer» Statement-1 is true, statement-2 is true and statement-2 is correct explanation for statement-1 . The 2 angle BISECTORS are : `x+7y-2 =0` `7x-y = 0` Statement-2 is correct as the lines can be PARALLEL ALSO. |
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| 3. |
What is the least value of 25 "cosec"^(2)x+36sec^(2)x? |
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Answer» 1 |
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| 4. |
int_(-1)^(1) (sqrt(1+x+x^2)-sqrt(1-x+x^2))/(sqrt(1+x+x^2)+sqrt(1-x+x^2)) dx= |
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Answer» `(3pi)/(2)` |
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| 5. |
If m is mean of distribution, then sum(x_(i) - m) is equal to |
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Answer» MEAN deviation |
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| 6. |
If a matrix has 24 elements, what are the possible orders it can have? What, if it has 13 elements? |
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Answer» |
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| 8. |
Point P lie on hypertola 2xy=1. Atriangle is constucted by P, S and S' (where S and S' are focl). Find the locus of excentre opposite S (S and P lie in first quadrant). |
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| 9. |
A book of 500 pages has 50 misprints. Find the probability that three are not less than 3 misprints on a given page. |
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| 11. |
arg z=0 if and only if z is a |
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Answer» PURELY IMAGINARY number |
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| 12. |
The equation of the circles which touch the x-axis at the origin and the line 4x-3y+24=0 |
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Answer» `X^(2)+y^(2)+6y=0, x^(2)+y^(2)-24y=0` |
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| 13. |
If ""^(2)C_(r)=495, find the possible values of (r ). |
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| 14. |
Match the following lists: |
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Answer» a. P(SUCCESS) = 1/2, P(failure)=1/2 Suppose 'n' bombs are to dropped. Let E be the event that the bridge is destroyed. Then, P(E) = 1 - P(0or 1 success) `=1-(((1)/(2))^(n)+""^(n)C_(1)1/2((1)/(2))^(n-1))` `=1-1/10ge(n+1)/(2^(n))or (2^(n))/(10(n+1))ge1` b. The bag contains 2 red 3 white and 5 black balls. Hence `P(S)=1//5,P(F)=4//5,LetE` be the event of getting a red ball. `P(E) =P(S or FSorFFS or ...]ge1/2` The value of n consistent is 4. c. Let there be x red socks and y blue socks and `x gt y.` Then `(""^(x)C_(2)+""^(y)C_(2))/(""^(x+y)C_(2))=1/2` `or (x(x-1)+y(y-1))/((x-y)(x+y-1))=1/2` Multiplying both sides by `2(x+y)(x+y-1)` and EXPANDING, we get `2x^(2)-2x+2y^(2)-2y=x^(2)+2xy+y^(2)-x-y` REARRANGING, we have `x^(2)-2xy+y^(2)=x+y` or `(x-y)^(2) =x+y` or ` |x-y|=x+y` `Now, x+y le17` `x-y lesqrt17` As x- y must be an integer, so `x-y=4` `therefore x+y=16` Adding both together and dividing by 2 yields `x GE 10.` d. Let the number of green socks be `x gt 0.` Let E: be the event that two socks drawn are of the same colour. `P(E)=P(R R or BB or WW or GG)` `=(3)/(""^(6+x)C_(2))+(""^(x)C_(2))/(""^(6+x)C_(2))` `=(6)/((x+6)(x+5))+(x(x-1))/((x+6)(x+5))=1/5` `implies5(x^(x)-x+6)=x^(2)+11x+30` `or 4x^(2)-16x=0` `x=4` |
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| 15. |
Select the INCORRECT order of EN of following species : |
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Answer» S lt Si lt O<BR>`Fe^(2+) lt Fe^(3+)` |
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| 16. |
Evaluate int_(2)^(3)1/xdx |
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Answer» |
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| 18. |
The perpendicular distance from the point (3,1,1) on the plane passing through the point (1,2,3) and containing the line r=i+j+lambda(2i+j+4k) is |
| Answer» Answer :D | |
| 19. |
Two sides of a rhombus ABCD are parallel to the lines x-y=5 and 6x-y=3. If the diagonals of the rhombus intersects at the point (2,1), find the equation of the diagonals. Further, find the possible coordinates of the vertex A if it lies on the x-axis. |
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| 20. |
Considering the implicit functionax^(2) + by^(2) + 2hxy + 2gx + 2fy + c=0, " find " (dy)/ (dx) |
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Answer» Solution :GIVEN `ax^(2) + by^(2) + 2HXY + 2gx + 2fy + c=0` Differentiating both sides w.r.t x, we get `a d/(DX)x^(2) + 2hd/(dx) (xy) +bd/(dx)y^(2) + 2g d/(dx) (x) +2F d/(dx) (y) + 0=0` ` 2ax + 2h (x(dy)/(dx) + y.1) + 2by (dy)/(dx) + 2g + 2f (dy)/(dx) =0` ` (2ax +2hy +2g) + (dy)/(dx) (2hx +2by +2f) =0` ` (dy)/(dx) = - (ax +hy+g)/(hx +by +f)` |
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| 21. |
to removethe2^(nd)termof the equationx^4 -10 x^3 +35 x^2 -50 x^2 - 50 x+ 24=0, diminishthe rootsby |
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Answer» `2/5` |
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| 22. |
underset(x to 5+)"Lt" {x-[x]}= |
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Answer» 0 |
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| 23. |
Let S = sum_(i=1)^(n) a_(j) and sum_(l=1)^(n) s/(s-a_(j)) gt (n^(2))/(n-1)assumbing not all a_(i)s are equal |
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| 24. |
An equation of a common tangent to the circle x ^(2) + y ^(2) + 14 x - 4y + 28 =0 and x ^(2) + y ^(2) - 14 x + 4y - 28 =0 is |
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Answer» `x-7=0` |
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| 26. |
Equation of the bisector of the acute angle between lines 3x+4y+5=0 and 12x -5y-7=0 is |
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Answer» 21x + 77y + 100=0 and12 x-5y -7=0 Here ` a_(1) = 3, b_(1) = 4, a_(2) =12 and b_(2) = -5 ` `a_(1)a_(2) +b_(1)b_(2) = 3xx 12 + 4 xx (-5) = 16 lt 0` For acute ANGLE bisector ` (3x + 4y+5)/(sqrt(9+16)) = ((12x-5y-7))/(sqrt(12^(2)+(-5)^(2))` ` (3x+4y+5)/5 = ((12x-5y-7))/13` ` Rightarrow 39X + 52y + 65 =- 60 x + 25 y + 35` ` Rightarrow 99 x + 27 y + 30 =0` |
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| 28. |
Let A be a squarematrix of order n. l= maximum number of different entries if A is a upper triangular matrix. m= minimum number of zeros if A is a triangular matrix. p = minimum number of zeros if A is a diagonal matrix. If l+2m=2p+1, then n= |
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Answer» 1 |
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| 29. |
Find the parametric equations of the circles x^(2) + y^(2) - 4x + 6y -12=0 |
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| 30. |
Which of the following ratios is closest to the ratio carrot sales to potato sales at Produce Stand P in the month of April? |
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Answer» `1:4` |
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| 31. |
The ordinate of any point P on the hyperbola 25x^(2)-16y^(2)=400 is produced to cut the asymptoles in the points Q and R. Find the value of QP. PR |
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| 32. |
If =intlog(x+sqrt(1+x^(2)))/(sqrt(1+x^(2)))dx=g o f (x) xConst. then |
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Answer» `F(x)=LOG(x+sqrt(x^(2)+1))` |
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| 33. |
A: length of the intercept made by the circle x^(2)+y^(2)-12+14y+11=0 on x-axis is 10. R: The length of the intercept made by the circle S=0 on y-axis is root2(f^(2)-c). |
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Answer» Both A and R are true and R is the correct EXPLANATION of A |
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| 34. |
Find (dy)/(dx), if y= 12(1- cos t), x= 10 (t- sin t), -(pi)/(2) lt t lt (pi)/(2) |
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Answer» |
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| 35. |
A + B+ C =0అయితే , cos^(2) A + cos^(2) B +cos^(2)C = 1+2 cos A cos B cosC అని రుజువు చేయండి. |
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Answer» 1 |
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| 36. |
A box contains 4 defective and 6 good bulbs. Two bulbs are drawn at random without replacement. Find the probability that the both the bulbs drawn are good. |
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| 37. |
A man is known to speak the truth 2 out of 3 times. If the throws a die and reports that it is six. Then the probability that it actually five. Is |
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Answer» `(3)/(8)` |
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| 38. |
Prove that "^(2n)C_0 + ^(2n)C_2 + .... + ^(2n)C_(2n) = 2^(2n-1) |
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Answer» Solution :`"^(2N)C_0 + ^(2n)C_2 + .... + ^(2n)C_(2n)` = 2^(2n-1)` We know that `(1+X)^(2n) = "^(2n)C_0 + ^(2n)C_1 x + ^(2n)C_2 x^2 + ... ^(2n)C_(2n) x^n` ... (1) Putting x = 1 we get putting x = 1 we get `("^(2n)C_0 + ^(2n)C_2 + ^(2n)C_4 + .... + ^(2n)C_(2n)) - (^(2n)C_1 + ^(2n)C_3 + ... + ^(2n)C_(2n-1))` = 0 therefore ^(2n)C_0 + ^(2n)C_2 + .... + ^(2n)C_(2n)` = `"^(2n)C_1 + ^(2n)C_3 + .... + ^(2n)C_(2n-1)` = `2^(2n)/2` = `2^(2n-1)` |
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| 40. |
The transformed equation of x^(4) + 8x^(3) + x - 5 = 0 by eliminating second term is |
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Answer» `x^4 -24x^2 +65X -55=0` |
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| 41. |
Find values of a and b if A =B whereA=[{:(a+4,3b),(8,-6):}],B=[{:(2a+2,b^(2)+2),(8,b^(2)-5b):}] Hints for solution : In given two square matrix if corresponding elements of each raw and column are equal then both matrix are said to be equal matrix. |
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| 42. |
For continuous functions f and g on R, let f(a)=4, f'(a)=6, g(a)=2, g'(a)=1 . Then the value of lim_(x to a)(sqrt(f(x)g(a))-sqrt(g(x)f(a)))/((x-a)(sqrt(f(x)g(a))+sqrt(g(x)f(a)))) |
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Answer» 0 |
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| 43. |
Integrate the following rational functions : int(x^(2))/((x^(2)+2)(x^(2)+3))dx |
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Answer» |
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| 44. |
Let G be the centroid of triangle ABC and the circumcircle of triangle AGC touches the side AB at A If BC = 6, AC = 8, then the length of side AB is equal to |
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Answer» `(1)/(2)`  `FG xx FC = FA^(2)` `RARR (1)/(3) (FC^(2)) = FA^(2)` `rArr (2a^(2) + 2b^(2) -C^(2))/(3 xx4) = (c^(2))/(4)` (Using Apollonious theorem) `rArr 2C^(2) = a^(2) + b^(2)` |
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| 45. |
Let G be the centroid of triangle ABC and the circumcircle of triangle AGC touches the side AB at A If angleGAC = (pi)/(3) and a = 3b, then sin C is equal to |
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Answer» `(3)/(4)` `(a//2)/(sin (pi//3)) = (AD)/(sin C) RARR sin C = (sqrt3)/(2a) sqrt(2B^(2) + 2c^(2) -a^(2))` `=(sqrt3)/(2a) sqrt(3B^(2)) = (3)/(2) (b)/(a) = (1)/(2)` |
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| 47. |
Let G be the centroid of triangle ABC and the circumcircle of triangle AGC touches the side AB at A If AC = 1, then the length of the median of triangle ABC through the vertex A is equal to |
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Answer» `(SQRT3)/(2)` If `b = 1 " then " AD = (sqrt3)/(2)` |
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| 48. |
Consider f as a twice differentiable function such that f(x)+f^('')(x)=-xg(x)f^(')(x)AAxge0 where,g(x)ge0AA x ge0, then (AAxge0) |
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Answer» `(f(x)^(2))+(f^(')(x)^(2))` is a non increasing FUNCTION |
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