A circle passing through (0, 0), (2, 6), (6, 2) cut the x-axis at

Subject

Mathematics

Class

JEE Class 12

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 Multiple Choice QuestionsMultiple Choice Questions

1.

Each of a and b can take values 1 or 2 with equal probability. The probability that the equation ax2 + bx + 1= 0 has real roots, is equal to

  • 12

  • 14

  • 18

  • 116


2.

Cards are drawn one-by-one without replacement from a well shuffled pack of 52 cards. Then, the probability that a face card (jack, queen or king) will appear for the first time on the third turn is equal to

  • 3002197

  • 3685

  • 1285

  • 451


3.

There are two coins, one unbiased with probaility 12 or getting heads and the other one is biased with probability 34 of getting heads. A coin is selected at random and tossed. It shows heads up. Then, the probability that the unbiased coin was selected is

  • 23

  • 35

  • 12

  • 25


4.

Lines x + y = 1 and 3y = x + 3 intersect the ellipse x2 + 9y2 = 9 at the points P,Q and R. The area of the PQR is

  • 365

  • 185

  • 95

  • 15


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5.

For the variable , the locus of the point of intersection of the lines 3tx - 2y + 6t = 0 and 3x + 2ty - 6 = 0 is

  • the ellipse x24 + y29 = 1

  • the ellipse x29 + y24 = 1

  • the hyperbola x24 - y29 = 1

  • the hyperbola x29 - y24 = 1


6.

The locus of the mid-points of the chords of an ellipse x2 + 4y2 = 4 that are drawn from the positive end of the minor axis, is

  • a circle with centre 12, 0 and radius 1

  • a parabola with focus 12, 0 and directrix x = - 1

  • an ellipse with centre 0, 12, major axis 12 and minor axis

  • a hyperbola with centre 0, 12, transverse axis 1 and conjugate axis 12


7.

A point P lies on the circle x2 + y2 = 169. If Q = (5, 12) and R = (-12, 5) then the QPR is

  • π6

  • π4

  • π3

  • π2


8.

A point moves, so that the sum of squares of its distance from the points (1, 2) and (- 2, 1) is always 6. Then, its locus is

  • the straight line y - 32 = - 3x + 12

  • a circle with centre - 12, 32 and radius 12

  • a parabola with focus (1, 2) and directrix passing through (- 2, 1)

  • an ellipse with foci (1, 2) and (- 2, 1)


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9.

A circle passing through (0, 0), (2, 6), (6, 2) cut the x-axis at the point P  (0, 0). Then, the lenght of OP, where O is the origin, is

  • 52

  • 52

  • 5

  • 10


C.

5

Let the equation of circle is
x2 + y2 + 2gx + 2fy + c = 0        ...(i)

When, circle (i) passes through the origin

Then, c = 0         ...(ii)

When, circle (i) passes through the point (2, 6)

Then, 4 + 36 + 4g + 12f + 0 = 0

                      4g + 12f + 40 = 0                                    g +3f = - 10        ...(iii)

 When, circle (i) passes through the point (6, 2)

Then, 36 + 4 + 12g + 4f + 0 = 0 [from Eq. (i)]

                       12g + 4f + 40 = 0                           3g +f + 10 = 0            ...(iv)

On solving Eqs. (iii) and (iv), we get

g = - 52 and f = - 52

 Equation of circle becomes,

x2 + y2 - 5x - 5y = 0          ...(v)

Circle cut the x-axis.

So, put y = 0 in Eq. (v), we get

     x2 - 5x = 0

 x(x - 5) = 0

          x = 5

So, the circle cut the x-axis at point P(5, 0)

 The length of OP = 5

 


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10.

For the variable t, the locus of the points of intersection of lines x - 2y = t and x + 2y = 1t is

  • the straight line x = y

  • the circle with centre at the origin and radius 1

  • the ellipse with centre at the origin and one focus 25, 0

  • the hyperbola with centre at the origin and one 52, 0


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