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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. |
The locus of mid points of the chords of theellipse (x^(2))/(a^(2))+(y^(2))/(b^(2))=1which pass through foot of a directrix |
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| 2. |
The sum of the fourth powers of the roots of the equation x^(3)- x^(2) -2x + 2=0 is: |
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| 3. |
If I_(1),I_(2),I_(3) are the intercept on x-axis, y-axis, y=x w.r.t x^(2)+y^(2)-14x-10y+24=0 then |
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Answer» `I_(2)gtI_(3)gtI_(1)` |
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| 4. |
IFalpha , betaare therootsofx^2 +px +q=0and also ofx^(2n)+P^n x^n + q ^n=0andif( alpha )/(beta ), ( beta ) /( alpha)arethe rootsofx^n+ 1 + (x +1)^n =0thenn is |
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Answer» anoddinteger |
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| 5. |
int (dx)/(x^(2) sqrt(4 + x^(2)))= |
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Answer» `(1)/(4) sqrt(4 + X^(2)) + C ` |
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| 6. |
Principle of mathematical induction is used |
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Answer» to prove any STATEMENT |
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| 7. |
y= int_(x)^(x^(2)) sqrt(5-t^(2))dt then the value of (dy)/(dx) at x= sqrt(2) is |
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Answer» `1-sqrt(3)` |
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| 8. |
Write{1,2,3,4,5}set in the intention(or specification form). |
| Answer» SOLUTION :`{X:xin N , LE x le 5}` | |
| 9. |
The sum of the digits in the unit's place of all the 4-digit numbersformed by using the numbers 3,4,5 and 6 withoutrepetitionis |
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Answer» 432 |
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| 10. |
Find all zeros of the polynomial x^6-3x^5-5x^4+22x^3-39x^2-39x+135 , if it is known that 1 + 2i and sqrt3 are two of its zeros. |
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| 11. |
(i) int(2x-5x) (3+2x) (1-x) dx, (ii) int sqrt(x) (ax^(2) + bx + c) dx (iii) int (sqrtx - 3sqrt(x^(4)) + 7/(3sqrt(x^(2))) - 6e^(x) + 1) dx |
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| 12. |
India and Pakistan play a series of 'n' one day matches and probability than India wins a match against Pakistan is 1/2. For n = 7, probadility that India wins atleast three conseutive matches is |
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Answer» `4/2^7` |
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| 13. |
India and Pakistan play a series of 'n' one day matches and probability than India wins a match against Pakistan is 1/2. If 'n' is not fixed and series ends when any one of the team completes its 4^(th) win then probability that India wins the series is |
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Answer» `4/2^7` |
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| 14. |
India and Pakistan play a series of 'n' one day matches and probability than India wins a match against Pakistan is 1/2. If n = 7, them probability that India wins atleast three consercutive matches is |
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Answer» `17/2^6` |
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| 15. |
A set of lines x+y-2+lambda_(1)(2x+y-3)=0 represents incident rays on ellipse S=0 and 2x+3y-23+lambda_(2)=0 represents the set of refelction rays from the ellipse where lambda_(1), lambda_(2) in R. If P(3,7) is a point on the ellipse normal at which meets the major axis at N. |
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Answer» Elecentriciy of ELLIPSE is `SQRT((5)/(2sqrt(5)+1))` |
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| 16. |
There are 4 mangoes, 3 apples, 2 oranges in a bag, fruits of the same variety being identical. In how many different ways can a selection of fruits be made if atleast one of each kind is to be selected |
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| 17. |
There are 4 mangoes, 3 apples 2 oranges in bag, fruits of the same variety being identical. In how many different ways can a selection of fruits be made if atleast one fruit is to be selected. |
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| 18. |
((2+3i)/(2-3i))-((2-3i)/(2+3i)) in the form of a + ib |
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Answer» `(24I)/(13)` |
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| 19. |
If ax^2+2hxy+by^2+2gx+2fy+c=0 represents two parallel lines then prove that af^2=bg^2. |
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| 20. |
Let f(x) = {((tan x - cot x)/(x-pi/4), ",", x != pi/4),(a, ",",x = pi/4):} The value of a so that f(x) is continuous at x = (pi)/4, is |
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Answer» 2 |
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| 21. |
If a_r is the coefficient x^r in the expansion of (1+x+x^2)^n then a_1 - 2a_2 + 3a_3 -…..-2na_(2n) = |
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Answer» 0 |
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| 22. |
A long cylinderical vessel is half filled with a liquid. When the vessel is rotated about its own vertical axis. The liquid rises up near the wall. If the radius of vessel is 5 cm and its rotational speed is 2 rotatins per second, then the difference in the heights between the centre and the sides, in cm. will be : |
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Answer» `2.0` |
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| 23. |
Line 4x+5y-7=0 meets the coordinate axes at A and B. Through the mid - point of AB a line is drawn perpendicular to it meeting the line 2x+y=0 at Q(alpha, beta), the value of 1//alpha-1//beta is equal to |
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| 24. |
If the curves ax^(2)+by^(2)=1 and a'x^(2)+b'y^(2)=1 are orthogonally then ………… |
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Answer» `(1)/(a)-(1)/(B)=(1)/(a')-(1)/(b')` |
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| 25. |
Using integration find the area of the region which is bounded bt x-axisthe tangent and normal to the circle x^(2)+y^(2)=4 drawn at (1,sqrt3). |
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| 26. |
Choose the correct answer int (sin^2x-cos^2x)/(sin^2x cos^2x) dxa)tanx+cotx+cb)tanx+cosecx+cc)cotx-tanx+c d) tanx+secx+c |
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Answer» tanx+cotx+c |
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| 27. |
int_(0)^(pi//2) sin^8 xcos^2 xdx is equal to |
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Answer» `pi/512` |
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| 29. |
Find thearea of theregionboundedbycirclex^2+y^2= 8xandparabolay^2 = 4x. |
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| 30. |
Evaluate : int_(0)^(pi/2)cos^(2)xdx. |
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| 31. |
The radical centre of the circle x^2 + y^2 + 4x + 7 =0, 2 x^2 + 2y^2 + 3x + 5y+ 9 =0 and x^2 + y^2 + y =0 is |
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Answer» `( -2 , -1)` |
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| 32. |
f(x) satisfies the relation f(x)-lamda int_(0)^(pi//2)sinxcostf(t)dt=sinx If f(x)=2 has the least one real root, then |
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Answer» `LAMDA EPSILON[1,4]` or `f(x)-lamda sinx int_(0)^(pi//2) cost f(t)dt=sinx` or `f(x)=Asinx=sinx` or `f(x)=(A+1)sinx` where `A=lamdaint_(0)^(pi//2) cost f(t)dt` or `A=lamda int_(0)^(pi//2) cos (A+1)sin dt` `=(lamda(A+1))/2int_(0)^(pi//2) sin 2tdt` `=(lamda(A+1))/2[(-cos 2t)/2]_(0)^(pi//2)` `=(lamda(A+1))/2` `:. A=(lamda)/(2-lamda)` `:.f(x)=((lamda)/(2-lamda)+1)sinx=(2/(2-lamda))sinx` `(2/(2-lamda))sinx=2` or `sinx=(2-lamda)` or `|2-lamda|le1` or `-1le lamda-2le 1` or `1 le lamda le 3` `int_(0)^(pi//2) f(x)dx=3` or `int_(0)^(pi//2) 2/(2-lamda) sinxdx=3` or `-[2/(2-lamda) cosx]_(0)^(pi//2) =3` or `2/(2-lamda)=3` |
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| 33. |
Out of 10 persons sitting at a round table, three persons are selected at random then the probability that no two of them are consecutive is |
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Answer» `(7)/(12)` |
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| 34. |
Let S = sum _(r=1)^(30) (""^(30+r)C_(r) (2r-1))/(""^(30)C_(r)(30+r)),K=sum_(r=0)^(30) (""^(30)C_(r))^(2) and G=sum_(r=0)^(60) (-1)^(r)(""^(60)C_(r) )^(2) The value fo (G-S)is |
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Answer» Solution :`because S = sum _(R=1)^(30) (""^(30+r)C_(r) (2r-1))/(""^(30)C_(r)(30+r))=sum_(r=0)^(30) (""^(30+r)C_(r))/(""^(30)C_(r))(1-(30-r+1)/(30+r))` `=sum_(r=0)^(30)[ (""^(30+r)C_(r))/(""^(30)C_(r)) -(""^(30+r)C_(r))/(""^(30)C_(r))cdot ((30-r+1))/((30+r))]` `=sum_(r=0)^(30)[ (""^(30+r)C_(r))/(""^(30)C_(r)) -""^((30+r)/(r)cdot ^(29+r)C_(r-1))/(""^(30)C_(r))cdot ((30-r+1))/(30+r)]` `=sum_(r=0)^(30)[ (""^(30+r)C_(r))/(""^(30)C_(r)) -( ""^(29+r)C_(r-1))/(""^(30)C_(r-1)) ][because (""^(n)C_(r))/(""^(n)C_(r-1))=(n-r+1)/r]` For n = 30 `((31-r)/rcdot ""^(30)C_(r)=""^(30)C_(r-1))` `=(""^(30+30)C_(30))/ (""^(30)C_(30)) - (""^(29-1)C_(0))/(""^(30)C_(0))= ""^(60)C_(30)-1` `K = sum _(r=1) ^(30) (""^(30)C_(r))^(2) = ""^(60)C_(30) and G = sum_(r=0)^(60) (-1)^(r) (""^(60)C_(r))^(2)` `(""^(60)C_(0))^(2) - (""^(60)C_(1))^(2)+(""^(60)C_(2))^(2)-...+(""^(60)C_(60))=""^(60)C_(30)` [`because n=60` is even ] `G-S = "" ^(60)C_(1) - ("" ^(60)C_(30)-1) =1` |
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| 35. |
Find the mean deviation from the median for the following data (##VIK_MAT_IIA_QB_C08_SLV_004_Q01.png" width="80%"> |
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| 36. |
Show that for a ge 1, f(x)=sqrt(3)sin x - cos x - 2ax + b is decreasing in R. |
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| 37. |
The point on the curve y = x ^(2) + 4x + 3 which is nearest from the line y = 3x + 2 is |
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Answer» `((1)/(2), (5)/(4))` |
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| 38. |
How many of the following orders are correct ? (a) H – F lt H – Cl lt H – Br lt H – I (Bond length) (b) H – F lt H – Cl lt H – Br lt H – I (Acidic strength) (c) H – F lt H – Br lt H – Cl lt H – F (Bond strength) (d) H – F gt H – Cl gt H – Br gt H – I (thermodynamic stability) (e) H – F lt H – Cl lt H – Br lt H – I (reducing power) (f) H – F gt H – I gt H – Br gt H – Cl (Melting Point) (g) H – F gt H – I gt H – Br gt H – Cl (Boiling point) |
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Answer» `HI GT HF gt HBR gt HCI` |
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| 39. |
A regular polygon of 10 sides is constructed No. of ways 3 vertices be selected so that no two vertices are consecutive is |
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Answer» 40 |
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| 40. |
If ""^(18)C_(15)+2(""^(18)C_(16))"+"^(17)C_(16)+1=""^(n)C_(3) then n is |
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Answer» 19 |
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| 42. |
A curve passes through the poit (5,3) and at any point (x,y) on it the product of its slope and the ordinate is equal to abscissa of the curve is |
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Answer» parabola |
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| 43. |
Expand(i) (x/3+3y/2)^(5) ,(ii)(x^(2)+2/x)^(4) using pascle's triangle. |
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| 45. |
Let F: R to Rbe definedbyf(x)={:{ (alpha + (sin[x])/x , " if "x gt 0), ( 2, " if " x =0), ( beta + [ (sin x-x)/x^(3)] ,"if " x lt 0):} where, [x]denotes the integral part of x. If f continuousat x =0,thenbeta = alphais equal to |
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Answer» `-1` |
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| 46. |
Let T_(n) denote the number of triangles which can be formed by using the vertices of a regular polygon of n sides. If T_(n + 1) - T_(n) = 36, then n is equal to |
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Answer» 4 |
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| 47. |
If a point (1,4) lies inside the circle x^(2) +y^(2)- 6x -10 y +p=0and the circle does not touch or intersect the coordinate axes , then the set of all possible values of p is the interval. |
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Answer» `(0,25) ` |
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| 48. |
Find the shortest distance of the point (0, c) from the curve y=x^(2), where 0lecle5. |
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| 49. |
Discuss the continuity of the cosine, cosecant, secant and cotangent functions: f(x)= sec x =(1)/(cos x), x in R- {(2n+1) (pi)/(2), n in I} |
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