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Conic Section

Short Answer Type

141.

Prove that for all values of m, except zero the straight line

y = mx + $\frac{a}{m}$ touches the parabola y² = 4ax.

Multiple Choice Questions

142.

If the lines 3x - 4y - 7 = 0 and 2x - 3y - 5 = 0 are two diameters of a circle of area 49 $π$ sq unit, then equation of the circle is

x² + y² + 2x - 2y - 62 = 0
x² + y² - 2x + 2y - 62 = 0
x² + y² - 2x + 2y - 47 = 0
x² + y² + 2x - 2y - 47 = 0

143.

The locus of middle point of chords of hyperbola 3x² - 2y² + 4x - 6y = 0 parallel to y = 2x is

3x - 4y = 4
3x - 4x + 4 = 0
4x - 3y = 3
3x - 4y = 2

144.

The equation of the common tangent touching the circle (x - 3)² + y² = 9 and parabola y = 4x above the x-axis is

√3y = 3x + 1
√3y = -( x + 3 )
√3y = x + 3
√3y = -( 3x + 1 )

145.
The equation of the tangents to the ellipse 4x² + 3y² = 5 which are parallel to the line y = 3x + 7 are

$y = 3 x \pm \sqrt{\frac{155}{3}}$

$y = 3 x \pm \sqrt{\frac{155}{12}}$

$y = 3 x \pm \sqrt{\frac{95}{12}}$

None of these

$y = 3 x \pm \sqrt{\frac{155}{12}}$

Given, equation of ellipse is 4x² + 3y² = 5

$or \frac{x^{2}}{\frac{5}{4}} + \frac{y^{2}}{\frac{5}{3}} = 1$

Here, $a^{2} = \frac{5}{4}, b^{2} = \frac{5}{3}$

Given, line y = 3x + 7, It's slope is 3, therefore slope of the parallel line is also 3.

Now, equations of tangent are,

$y = mx \pm \sqrt{a^{2} m^{2} \pm b^{2}} \Rightarrow y = 3 x \pm \sqrt{\frac{5}{4} {(3)}^{2} + \frac{5}{3}} \Rightarrow y = 3 x \pm \sqrt{\frac{45}{4} + \frac{5}{3}} \Rightarrow y = 3 x \pm \sqrt{\frac{155}{12}}$

146.

The radius of the circle passing through the foci of the ellipse $\frac{x^{2}}{16} + \frac{y^{2}}{9} = 1$ and having its centre (0, 3) is

4
3
$\sqrt{12}$
7/2

147.

The equation of the circle on the common chord of the circles (x - a)² + y² = a² and x² + (y + b)² = b² as diameter is

x² + y² = 2ab(bx + ay)
x² + y² = bx + ay
(a² + b²)(x² + y²) = 2ab(bx - ay)
(a² + b²)(x² + y²) = 2(bx + ay)

148.

The eccentricity of the hyperbola which passes through (3, 0) and (3 $\sqrt{2}$ , 2) is

$\sqrt{(13)}$
$\frac{\sqrt{13}}{3}$
$\sqrt{\frac{13}{4}}$
None of these

149.

The line x - 1 = 0 is the directrix of the parabola y² - kx + 8 = 0. Then, one of the value of k is

$\frac{1}{8}$
8
4
$\frac{1}{4}$

150.

The curve represented by

$x = 3 (\cos (t) + \sin (t)), y = 4 (\cos (t) - \sin (t))$ is

ellipse
parabola
hyperbola
circle