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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. |
Solve the following differential equations.dy+(y^2+1)dx=0 |
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Answer» SOLUTION :`DY+(y^2+1)dx=0` `rArrdy/(1+y^2)+dx=0` `RARR intdy/(1+y^2)+intdx=C` `rArr TAN^(-1)y+x=C` |
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| 2. |
The point of intersection of two tangents to hyperbola x^(2)/a^(2)-y^(2)/b^(2)=1 the product of whose slopes is c^2?, lies on the curve |
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Answer» `y^(2)-B^(2)=C^(2) (X^(2)+a^(2))` |
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| 3. |
The solution of (dy)/(dx) = (1+y^(2))(1+x^(2))^(-1) is |
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Answer» `y - X = C(1+xy)` |
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| 4. |
Using elementary row transformations , find the inverse of [{:(2,-3),(-1,2):}] |
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Answer» |
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| 6. |
Find the order and degree (if defined) of the following differential equations. ((ds)/(dt))^4 + 3s (d^2s)/(dt^2) = 0 |
| Answer» Solution :The HIGHEST order DERIVATE in the differential equation is `(d^2s)/(dt^2)`. its order is 2 and its DEGREE is 1 . `therefore` The order of the dimential equation = 2 and its degree = 1. | |
| 7. |
Find the projection of the point (7,-5,3) on x-axis, |
| Answer» SOLUTION :(7,0,0), | |
| 8. |
The value of the sin 1^(@) + sin2^(@) + … + sin359^(@) is equal to |
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Answer» a.0 |
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| 9. |
If (2, 1) is limiting point of coaxial system of which x^(2) + y^(2) - 6x - 4y - 3 = 0 is a member, then the other limiting point is |
| Answer» ANSWER :A | |
| 10. |
Calculate the variance and standard deviation of the following continuous frequency distribution . (##VIK_MAT_IIA_QB_C08_SLV_010_Q01.png" width="80%"> |
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| 12. |
IF y=e^(tan^(-1)x) then prove that : (1-x^(2))(d^2y)/(dx^2)+(2x-1)(dy)/(dx)=0. |
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| 13. |
If 2a + 3b - 5c = 0, then ratio in which c divides AB is |
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Answer» 3 : 2 INTERNALLY `implies (2a+3b)/(5)=c` `implies (2a+3b)/(2+3)=c` `implies (a+(3)/(2)b)/(1+(3)/(2))=c"...(i)"` Let c divides AB in the ratio `LAMBDA : 1`. Then, `c=(a+lambdab)/(1+lambda)"... (ii)"` On comparing Eqs. (i) and (ii), we get `lambda = (3)/(2)` So, required ratio is 3 : 2 internally. 
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| 14. |
If AP, BQ and CR are the altitudes of acute triangleABC and 9AP+4BQ+7CR=0 Q. angleABC is equal to |
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Answer» `cos^(-1)(2)/(SQRT(7))` |
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| 15. |
Let triangleABC be a given triangle. If |vec(BA)-tvec(BC)|ge|vec(AC)| for any t in R,then triangleABC is |
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Answer» Equilateral Discrimiant of the quadratic equation `le0` `rArr 4(vec(BA).vec(BC))^(2)-4|vec(BC)|^(2)|vec(BA)|^(2)+4|vec(BC)|^(2)|vec(AC)|^(2)le0` USING `(vec(BA).vec(BC))^(2)-|vec(BC)|^(2)|vec(BA)|^(2)` `=-|vec(BA) xx vec(BC)|^(2)` `rArr =-|vec(CA) xx vec(BC)|^(2)` But `|vec(AC) xx vec(BC)|=|vec(AC)||vec(BC)|SINC` `rArr sin^(2) Cge1` `rArr sinC=+1 rArr angleC=pi//2` |
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| 16. |
There are two cars of which one holds not more than 5 and the other not more than 4. The number of ways can a party of 8 people go for excursion in the two cars is |
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Answer» 8400 |
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| 17. |
For what value of x the tangent of the curve y=x^(3)-3x^(2)+x-2 is parallel to the line y=x |
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Answer» |
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| 18. |
Consider the function f(x)=(x^(3)-x)|x^(2)-6x+5|, AA x in R, then f(x) is |
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Answer» DISCONTINUOUS at X = 1 |
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| 19. |
If sin^(-1)(x)-cos^(-1)(x)=pi/6,then x is equal to |
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Answer» `1/2` |
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| 21. |
The position vectors of the points A, B, C and D are 3hat(i)-2hat(j)-hat(k),2hat(i)-3hat(j)+2hat(k),5hat(i)-hat(j)+2hat(k)and4hat(i)-hat(j)+lamdahat(k) respectively. If the points A, B, C and D lie on a plane, the value of lamda is |
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Answer» 0 |
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| 22. |
Corner points of fealible region of inequalities gives |
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Answer» an optiomal SOLUTION of L.P.P. |
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| 23. |
If thetworootsof 4x^3 + 20 x^2 -23x + 6=0are equalthen findallthe roots . |
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| 24. |
The set of values that beta can assume so that the pont (0,beta) should lie on or inside the triangle having sides 3x+y+2=0,2x-3y+5=0 and x+4y-14=0 is |
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Answer» `[(5)/(3),(7)/(2)]` |
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| 25. |
Write down the set of letters forming that word Demonstration? |
| Answer» SOLUTION :{a,d,E,I,m,N,o,R,s,t} | |
| 26. |
All points lying inside the triangle formed by the points (1, 3), (5,0) and (-1, 2) satisfy |
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Answer» `3x+2y GE 0` |
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| 27. |
If underset (nrarroo)" lim " underset(r=1) overset(n) (sum) (4r^(3))/(r^(4+n^(4)))= p, then e^(4)= |
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Answer» 4 |
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| 28. |
Prove that the radical axis of the circles x^2+y^2+2gx +2fy+c=0 and x^2+y^2+2g'x + 2f'y+c'=0 is the diameter of the later circle (or the former bisects the circumference of the later ) if 2g'(g-g')+2f'(f-f')=c-c' |
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| 29. |
यदि A={1,2,3,4} तो AxA में अवयवों की संख्या है |
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Answer» 4 |
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| 31. |
Let A ={a,a_(2),…….a_(n)}be a set containing a elements. The number of symmetric relations that can be denned on A is |
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Answer» `2^(N(n-1)//2)` |
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| 32. |
Examine the consistency of the system of equations 5x-y+4z =5 2x+ 3y + 5z =2 5x-2y + 6z =-1 |
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| 34. |
A flagpolestandson abuildingand anobserver on alevelgroundis 300feetfromthe baseof thebuiling. Theangleofelevationof thebottionof theflagpoleis30^@and theheightof theflagpoleis 50feetifthetais theangleof elevationof htetop of the flagpole , thentan thetaisequalto |
| Answer» Answer :A | |
| 35. |
Let f(x)={{:(x|x|",", x le -1),([x+1]+[1-x]",",-1ltxlt1),(-x|x|",",x ge 1):} where [.] denotes the greatest integer function, then the value of int_(-2)^(2)f(x)dx, is equal to |
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Answer» `-8//3` |
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| 36. |
If the system of linear equations x+4y-3z=2 2x+7y-4z=alpha -x-5y+5z=beta has infinitely many solutions then the ordered pair (alpha, beta) cannot take value |
| Answer» ANSWER :D | |
| 37. |
The area of the quadrilateral formed by the tangents from the point (4,5) to the circle x^(2)+y^(2)-4x-2y-11=0 with a pair of the radii joining the points of contact of these tangents is |
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Answer» |
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| 38. |
(23)^(-1//2)~~.... |
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Answer» `5.0008` |
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| 39. |
If A any square matrix then |
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Answer» `A+A ` is SKEW symmetric |
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| 41. |
If a circle cuts a parabola in four points then the sum of ordinates of four points is |
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Answer» 1 |
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| 42. |
Forthe functionf : (0,1) to R, ,f(x)= [ 2^(n)x] + { 2^(m)x}, (n ,m N, ngt m), , thenumberof points ofdiscontinuityof the functioncan bebe( where[.] {}representgreatestintegerfunctionandfractinoalpartof xrespectively ) |
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Answer» 24 |
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| 43. |
The mean of the data set comprisingof 16 observations is 16. If one of the observation valued 16 is deteted and three new observa- tions valued3,4 and 5 are added to the data, then the mean of the resultant data, is : |
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Answer» `16.8` |
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| 44. |
If |a|=3 and -1 le k le 2, then |k a|lies in the interval |
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Answer» Solution :The smalest value of |k | will exist at NUMERICALLY SMALLEST value of k, i.e, at k =0, which gives `|ka|=|k||a|=0xx3=0` The numerically greaterst value of k is 2 at which `|k a|=6` |
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| 45. |
If bara+barb+barc=bar0 then prove that bara xx barb= barb xx barc= barc xx bara. |
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Answer» |
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| 46. |
Which of the following is/are a contradiction ? |
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Answer» `(p^^q)^^~(PVVQ)` |
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| 47. |
If there are only two linear functions f and g which map [1,2] on [4,6] and in a DeltaABC, c =f (1)+g (1) and a is the maximum valur of r^(2), where r is the distance of a variable point on the curve x^(2)+y^(2)-xy=10 from the origin, then sin A: sin C is |
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Answer» `1:2` |
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| 48. |
A man has 6 friends. In how many ways can he invite two or more to a dinner party ? |
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Answer» Solution :A MAN has 6 friends. He can INVITE 2 or more of his friends to a dinner party. `:.` He can invite 2,3,4,5 or 6 of his friends in ` ""^6C_2+ ""^6C_3+ ""^6C_4+ ""^6C_5 = ""^6C_6 =2^6- ""^6C_0- ""^6C_1` `=64-7=57"ways."` |
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| 49. |
bar(a)xx[bar(a)xx(bar(a)xx bar(b))] = ……………. |
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Answer» `(VEC(a)XX vec(a))*(vec(B)xx vec(a))` |
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| 50. |
Match the following Column I- with Column-II |
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Answer» `:' f(x)` is DIVISIBLE by `x^(2)+1impliesb-1=0impliesc=a` (B) `(A+B)(A-B)=(A-B)(A+B)impliesAB=BA, A^(T)=A,B^(T)=-B` `(AB)^(T)-(-1)^(k-1)ABimpliesk` is an odd number (C) `10^(100)-43=999…..9957` Sum of digits `=98(9)+5+7=894` (D) `x=7costheta-sintheta, y=7sintheta+costheta, z=10` `(x^(2)+y^(2))/z=5` |
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