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Slope Form of Tangent: Hyperbola

If the value'...

Question

If the value's of $m$ for which the line $y = m x + 2 \sqrt{5}$ touches the hyperbola $16 x^{2} - 9 y^{2} = 144$ are roots of the equation $x^{2} - (a + b) x - 4 = 0$ , then the value of $a + b =$

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Solution

$∵ y = m x + 2 \sqrt{5}$ is tangent to hyperbola
$\frac{x^{2}}{9} - \frac{y^{2}}{16} = 1$
$∴ (2 \sqrt{5})^{2} = a^{2} m^{2} - b^{2}$
$\Rightarrow 9 m^{2} - 16 = 20$
$9 m^{2} = 36 \Rightarrow m_{1}, m_{2} = \pm 2$
As we know that $m_{1}, m_{2}$ are the roots of
$x^{2} - (a + b) x - 4 = 0 ∴ m_{1} + m_{2} = a + b \Rightarrow a + b = 0$

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Similar questions

m

y = m x + 2 \sqrt{5}

16 x^{2} - 9 y^{2} = 144

x^{2} - (a + b) x - 4 = 0

a + b =

y = m x + 2 \sqrt{5}

16 x^{2} - 9 y^{2} = 144

x^{2} - (a + b) x - 4 = 0

a + b

The value (s) of λ for which the line y=2x+λ

16 x^{2} - 9 y^{2} = 144

y = m x + 2

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m =

16 x^{2} - 9 y^{2} = - 144

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