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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. |
If x and y are positive integers, the the solution sets of the inequations xle3,yle2 and 5x+6yle21 are- |
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| 4. |
Find the value of .^(20)C_(0) xx .^(13)C_(10) - .^(20)C_(1) xx .^(12)C_(9) + .^(20)C_(2) xx .^(11)C_(8) - "……" + .^(20)C_(10). |
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Answer» Solution :`.^(20)C_(0) xx .^(13)C_(10) - .^(20)C_(1) xx .^(12)C_(9) + .^(20)C_(2)xx .^(11)C_(8) -"…." + .^(20)C_(10)` `=` Coefficient of `X^(10)` in `(.^(20)C_(0) - .^(20)C_(1)x + .^(20)C_(2)x^(2) - .^(20)C_(3)x^(3) + "…..")` `(1+.^(4)C_(1)x + .^(5)C_(2)x^(2)+.^(6)C_(3)x^(3)+".....")` `=` Coefficientof `x^(10)` in `(1-x)^(20)(1-x)^(-4)` `=` Coefficient of `x^(10)` in `(1-x)^(16)` `= .^(16)C_(10)`. |
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| 5. |
If bar(a) and bar(b) any two non-collinear vectors lying in the same plane, then prove that any vector bar(r) coplanar with them can be uniquely expressed as bar(r)=t_(1)bar(a)+t_(2)bar(b), where t_(1)andt_(2) are scalars. |
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Answer» Solution :Take any points O in the plane of `bar(a),bar(b)andbar(r)`. Represents the vectors `bar(a),bar(b)andbar(r)` by `bar(OA),bar(OB)andbar(OR)`. Take the points P on `bar(a)` and Q `bar(b)` such that OPRQ is a PARALLELOGRAM. Now `bar(OP)andbar(OA)` are collinear vectors. `:.` there exists a non - zero scalar `t_(1)` such that `bar(OP)=t_(a)*bar(OA)=t_(1)*bar(a)`. Also `bar(OQ)andbar(OB)` are collinear vectors. `:.` there exixts a non-zero scalar `t_(2)` such that `bar(OQ)=t_(2)*bar(OB)=t_(2)*bar(b)`. Now, by parallelogram law of addition of vectors, `bar(OR)=bar(OP)+bar(OQ)"":.bar(r)=t_(1)bar(a)+t_(2)bar(b)` Thus `bar(r)` expressed as linear combination `t_(1)bar(a)+t_(2)bar(b)` Uniqueness: LET, if possible, `bar(r)=t_(1)^(')bar(a)+t_(2)^(')bar(b)`, where `t_(1)^('),t_(2)^(')` are non-zero scalars. Then `t_(1)bar(a)+t_(2)bar(b)=t_(1)^(')bar(a)+t_(2)^(')bar(b)` `:.(t_(1)-t_(1)^('))bar(a)=-(t_(2)-t_(2)^('))bar(b)`. . . . (1) WE want to show that `t_(1)=t_(1)^(')andt_(2)=t_(2)^(')`. Suppose `t_(1)!=t_(1)^('),i.e.,t_(1)-t_(1)^(')!=0andt_(2)!=t_(2)^(')!=0`. Then dividing both sides of (1) by `t_(1)-t_(1)^(')`, we GET, `bar(a)=-((t_(2)-t_(2)^('))/(t_(1)-t_(1)^(')))bar(b)` This shows that the VECTOR `bar(a)` is a non-zero scalar MULTIPLE of `bar(b)`. `:.bar(a)andbar(b)` are collinear vectors. This is a contradiction, since `bar(a),bar(b)` are given to be non-collinear. `:.t_(1)=t_(1)^(')` Similarly, we can show tath `t_(2)=t_(2)^(')` This shows that `bar(r)` is uniquwly expressed as a linear combination `t_(1)bar(a)+t_(2)bar(b)`. 
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| 7. |
If cos y= x cos (a + y), with cos a ne +- 1, prove that (dy)/(dx) = (cos^(2) (a + y))/(sin a) |
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| 9. |
2[(1)/(2x+1)+(1)/(3*(2x+1)^(3))+(1)/(5*(2x+1)^(5))+…..oo]= |
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Answer» `log_(e )X` |
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| 11. |
Find the rate of change of the area of a circle per second with respect to its radius r when r = 5 cm. |
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| 12. |
If from a variable point P representingthe complex number z_(1) on the curve |z|=4, two tangentsare drawn to thecurve |z|=2, meeting it at points Q(z_(2)) and R(z_(3)), then which of the following statement(s) is(are) correct? |
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Answer» Triangle , PQR is isosceles.  `:.` From above figure , `cos ( anglePOR)=(OR)/(OP)(2)/(4)=(1)/(2)` `rArr angle POR=(pi)/(3)=anglePOQ rArr angle OPR= angle OPQ=30^(@)` `rArr angleQPR=60^(@) " ".....(1)` ALSO, in `DeltaPQR, PQ=PR "" .....(2)` `:.` From (1) and (2) , we get `DeltaPQR` is equilateral `rArr` (A) is INCORRECT. Also, PQOR are CONCYCLIC and `angleOQP and angleORP = 90^(@)`. So, circumcentre of `DeltaPQR` passes through O(0,0) and OP is diameter of it. So, circumcentre of `DeltaPQR` = mid POINT of OP `=((0+4 cos theta)/(2),(0+4 sin theta)/(2))=(2cos theta, 2 sin theta)` =centroid of `DeltaPQR` [As, `DeltaPQR` is equilateral.] `:.` The locus of centroid of `DeltaPQR` is |z|=2 `rArr` (B) isincorrect. Also, circumradius of `DeltaPQR=(OP)/(2)=(4)/(2)=2rArr` (C) is correct. As, `r=(R)/(2)=(2)/(2)=1` (As, `DeltaPQR` is equilateral.) `rArr` radius of circle inscribed in `DeltaPQR` is 1. `rArr` (D) is correct.] |
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| 13. |
Solution of the differential equation (dy)/(dx)=(y(x-y ln y))/(x(xlnx-y)) is |
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Answer» `("X LN x + y ln y")/(xy)=C` |
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| 15. |
The number of ways that 5 blue balls of different sizes and 5 red balls of different sizes can be arranged in a row so that no two balls of the same colour come together is : |
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Answer» <P>`5! 5!` |
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| 16. |
Let ABCD be a rhombus such that angle ABC =2pi //3. Let S be a circle inscribed in te rhombus ABCD. If ength of a side of the rhombus is 1, then PA ^(2) +PB ^(2) + PC ^(2) + PD ^(2) is equal to. |
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| 17. |
Prove that the lines x = py + q, z = ry + s and x = p'y + q', z = r'y + s' are perpendicular if pp' + rr' + 1 = 0. |
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| 18. |
If (m_(i),1/(m_(i))),m_(i)gt0,i=1,2,3,4 are four distinct points on a circle, show that m_(1)m_(2)m_(3)m_(4)=1. |
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| 19. |
If alpha and beta are the roots of x^(2)-2x+4=0, then the value of alpha^(6)+beta^(6) is |
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Answer» 32 |
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| 20. |
If linear function f(x) and g(x) satisfy int[(3x-1) cos x + (1-2x)sinx]dx = f(x) cos + g(x) sin x + C, then |
| Answer» Answer :C | |
| 21. |
On a toss of two dice, A throws a total of 5. Then the probability that he will throw another 5 before he throws 7 is |
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Answer» `(2)/(45)` |
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| 22. |
If f : N to R is defined by f(1) = -1 and f(n+1)=3f(n)+2 for n gt 1, then f is |
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Answer» one - one |
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| 23. |
Prove that (tan^(-1)(1)/(e ))^(2)+(2e)/(sqrt(e^(2)+1) |
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Answer» Solution :we have to PROVE `TAN^(-1)(1)/(C )sqrt(e^(2)+1)lt(tan^(-1)e)^(2)+(32)/(e^(2)+1)` or `tan^(-1)(1)/(e )^(2)+(2)/sqrt(1)(e )^(2)+1lt(tan^(-1)e)^(2)+(2)/sqrt(e^(2)+1)` Now f(X) =`(2tan^(-1)x)/(1+x^(2))-(2x)/(x^(2)+1)` It is difficult to study the sign of f(x) so we let g(x) =`tn^(-1)x-(x)/sqrt(x^(2)+1)` g(x) is andincreasing function for `xgt 0,g(x)gtg(0)` `g(x)gt0` `f(x)gt0` f(x) is increasing function Since `(1)/(e )lte`, we have `f(1/e)ltf(x)` |
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| 24. |
The mid-point of the chord x+2y +4 =0on the hyperbola3x^(2) -4y^(2) =12is |
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Answer» `(1,2) ` |
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| 25. |
The statement, 'r is sufficient for s', is also expressed as. |
| Answer» Answer :D | |
| 26. |
C_0+3. C_1+5. C_2 +…...(2n+1).C_n= |
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Answer» `(4n-10) 2^N + n+ 6` |
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| 27. |
Choose the correct answer int(10x^(9)+10^(x)log_(e)10dx)/(x^(10)+10^(x)) equals |
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Answer» `10^(x)-x^(10)+C` |
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| 28. |
PN is the ordinate of any point P on the hyperbolax^(2)//a^(2) -y^(2)//b^(2) =1. If Q divides AP in the retioa^(2) ,b^(2)then NQ is |
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Answer» <P>PERPENDICULAR to A'P |
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| 29. |
LetF(x)=(1+sin(pi/(2k))(1+sin(k-1)pi/(2k))(1+sin(2k+1)pi/(2k))(1+sin(3k-1)pi/(2k)). The value ofF(1)+F(2)+F(3) is equal to |
| Answer» Answer :D | |
| 30. |
If A and B are coefficients of x^(n) in the expansion of (1+x)^(2n) and (1+x)^(2n-1) respectively, then find the value of (A)/(B). |
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Answer» 1 |
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| 31. |
The value of f(0) so that f(x)=(sin x)/(x) is continuous at x=0 is |
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Answer» INCREASING in `(0,pi//2)` |
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| 32. |
If b gta, then the equation (x -a)(x - b) - 1 = 0has : |
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Answer» both roots in [a,b] |
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| 34. |
if lim_(xto(pi)/(4))((tan((pi)/(4)-x))/((pi)/(4)-x))= |
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Answer» 0 |
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| 35. |
The sequence a_(n) = sin (( pi )/( 4) + n pi ) for n = 1,2,3,"…….." is : |
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Answer» an ARITHMETIC progression |
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| 36. |
The monthly sales for the first 11 months of the year of a certain salesman were Rs. 12,000 but due to his illness during the last month the average sales for the whole year came down to Rs 11,375 . The value of the sale during the last month was |
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Answer» RS 4,500 |
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| 37. |
Sum of coefficients of x^(2r) , r = 1,2,3…. in (1+x)^n is |
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Answer» `(2N^(N-1)-1)` |
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| 38. |
Let m be a vector of magnitude sqrt(3) and perpendicular to the vectors hati+hatj and hatj-hatk let n be another vector of magnitude 2sqrt(6) and perpendicular to the vectors 2hat I -hatj and hat j+2 hatk The areain sq units of the trianglefromed with m and n side is |
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Answer» `SQRT(2)` |
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| 39. |
The solution of (e^(x) + 1) y dy + (y+ 1) dx = 0 is |
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Answer» `E^(X+y) = C(y+1)(e^(x +1))` |
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| 40. |
Equation of the hyperbola of eccentricity 3 and the distance between whose foci is 24 is |
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Answer» `X^(2)-8y^(2)=128` |
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| 41. |
If L = underset( n rarr oo)lim (1+3^(-1))(1+3^(-2))+(1+3^(-4))+(1+3^(-8))…(1+3^(-2^(n))), then |
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Answer» `L =(2)/(3)` |
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| 42. |
If with reference to the right handed system of mutually perpendicular unit vectors hati,hatj and hatk,vec(alpha)=3hati-hatj,vec(beta)=2hati+hatj-3hatk, then express vec(beta) in the form vec(beta)=vec(beta)_(1)+vec(beta)_(2), where vec(beta)_(1) is parallel to vec(alpha) and vec(beta)_(2) is perpendicular to vec(alpha). |
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Answer» |
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| 43. |
If alpha, beta are natural numbers, then int_(0)^(pi//2)cos^(alpha)x cos beta x dx equals, provided alpha=beta |
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Answer» `(PI)/(2^(ALPHA+1))` |
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| 44. |
The point of intersection of the lines (x-4)/(1)=(y+3)/(-4)=(z+1)/(4) and (x+1)/(2)=(y+1)/(3)=(z+10)/(8) is |
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Answer» (5,7,6) |
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| 45. |
If X is the number of tails in three tosses of a coin, determine the standard deviation of X. |
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| 46. |
The locus of the points of intersection of tangents to y^2 = 4ax which intercept a constant length d on the directrix is: |
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Answer» `(y^2-4ax)(x+a)^2=d^2x^2` |
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| 47. |
int sin (log x)dx= |
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Answer» X [SIN (LOG x ) + cos (log x ) ] + C |
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| 48. |
If b_(1)b_(2)=2(c_(1)+c_(2)) and b_(1), b_(2), c_(1), c_(2) are all real numbers, then at least one of the equations x^(2)+b_(1)x+c_(1)=0 and x^(2)+b_(2)x+c_(2)=0 has |
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Answer» real roots |
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| 49. |
The relative housing cost for a US city is defined to be the ratio ("average housing cost for the city")/("national average housing cost") expressed as a percent. The scatterplot above shows the relative housing cost and the population density for several large US cities in the year 2005. The line of best fit is also shown and has equation y = 0.0125x + 61. Which of the following best explains how the number 61 in the equation relates to the scatterplot? |
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Answer» In 2005, the lowest housing cost in the United States was about $61 per month. Choice A is incorrect because it interprets the values of the vertical axis as dollars and not PERCENTAGES. Choice B is incorrect because thelowest housing cost is about 61% of the national average, not 61% of the highest housing cost. Choice C is incorrect because one cannot absolutely assert that no city with a low population density had housing costs below 61% of the national average, as the MODEL shows that it is unlikely, but not impossible. |
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