Self Studies

Conic Sections ...

TIME LEFT -
  • Question 1
    1 / -0

    The latus rectum of the parabola $$\displaystyle x = at^2 + bt + c, y = a't^2 + b't + c'$$ is

  • Question 2
    1 / -0

    The centre of a circle is $$C(2,-5)$$ and the circle passes through the point $$A(3,2)$$. The equation of the circle is

  • Question 3
    1 / -0

    If the parabola $${y}^{2}=4ax$$ passes through the point $$P(3,2)$$, then the length of its latus rectum is

  • Question 4
    1 / -0

    The equation $$\displaystyle ax^2 + 4xy + y^2 + ax + 3y + 2 = 0$$ represents a parabola if a is

  • Question 5
    1 / -0

    The foci of the ellipse $$25\left ( x + 1 \right )^2 + 9\left ( y + 2 \right )^2 = 225$$, are at

  • Question 6
    1 / -0

    The latus rectum of the hyperbola $$9x^{2} - 16y^{2} - 18x - 32y - 151 = 0$$ is 

  • Question 7
    1 / -0

    If the equation of the ellipse is $$3x^{2}+ 2 y^{2}+6x-8y+5=0, $$ then which of the following is/ are true?

  • Question 8
    1 / -0

    Consider the parabola whose focus is at (0,0) and tangent at vertex is $$ x-y+1=0 $$

    The length of latus rectum is

  • Question 9
    1 / -0

    The length of the latus rectum of the parabola whose focus is $$\left (\frac{u^{2}} {2g} \sin 2\alpha, -\frac{u^{2}} {2g} \cos 2 \alpha  \right )$$ and directrix is $$y = \frac{u^{2}} {2g}$$ is 

  • Question 10
    1 / -0

    Directions For Questions

    A curve is represented by C = $$21 x^{2}- 6xy+ 29y^{2}+ 6x- 58y- 151=0$$

    ...view full instructions

    The lengths of axes 

Submit Test
Self Studies
User
Question Analysis
  • Answered - 0

  • Unanswered - 10

  • 1
  • 2
  • 3
  • 4
  • 5
  • 6
  • 7
  • 8
  • 9
  • 10
Submit Test
Self Studies Get latest Exam Updates
& Study Material Alerts!
No, Thanks
Self Studies
Click on Allow to receive notifications
Allow Notification
Self Studies
Self Studies Self Studies
To enable notifications follow this 2 steps:
  • First Click on Secure Icon Self Studies
  • Second click on the toggle icon
Allow Notification
Get latest Exam Updates & FREE Study Material Alerts!
Self Studies ×
Open Now