If - be the roots of ax2-bx-c-0 and - - those of lx2-mx-n-0- then the equation whose roots are - and - is

Ax^2+bx+c=0 nbsp; α+β= ba, αβ=ca lx^2+mx+n=0 γ+δ= ml, γδ=nl The roots are αγ+βδ and αδ+βγ, then nbsp;sum and product of the roots is, S = αγ+βδ+αδ+βγ ...

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Standard XII

Mathematics

Relations between Roots and Coefficients

If α,β be the...

Question

If $α, β$ be the roots of $a x^{2} + b x + c = 0$ and $γ, δ$ those of $l x^{2} + m x + n = 0$ , then the equation whose roots are $α γ + β δ$ and $α δ + β γ$ is

a l x^{2} - m b x + \frac{c m^{2}}{l} + \frac{n b^{2}}{a} - 4 c n = 0

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a l x^{2} + m b x + \frac{c m^{2}}{l} + \frac{n b^{2}}{a} + 4 c n = 0

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a l x^{2} - m b x + \frac{c m^{2}}{l} + \frac{n b^{2}}{a} + 4 c n = 0

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a l x^{2} + m b x + \frac{c m^{2}}{l} + \frac{n b^{2}}{a} - 4 c n = 0

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Solution

The correct option is A $a l x^{2} - m b x + \frac{c m^{2}}{l} + \frac{n b^{2}}{a} - 4 c n = 0$
$a x^{2} + b x + c = 0$
$α + β = - \frac{b}{a}, α β = \frac{c}{a}$

$l x^{2} + m x + n = 0$
$γ + δ = - \frac{m}{l}, γ δ = \frac{n}{l}$

The roots are $α γ + β δ$ and $α δ + β γ$ , then sum and product of the roots is,

$S = α γ + β δ + α δ + β γ = (α + β) (γ + δ) = \frac{m b}{a l}$

$P = (α γ + β δ) (α δ + β γ) = α^{2} γ δ + α β δ^{2} + α β γ^{2} + β^{2} γ δ = γ δ (α^{2} + β^{2}) + α β (γ^{2} + δ^{2}) = \frac{n}{l} \times (\frac{b^{2} - 2 a c}{a^{2}}) + \frac{c}{a} (\frac{m^{2} - 2 l n}{l^{2}}) = \frac{1}{a l} [\frac{n b^{2}}{a} + \frac{c m^{2}}{l} - 4 c n]$

Therefore, the required equation is,
$x^{2} - S x + P = 0 ∴ a l x^{2} - m b x + \frac{c m^{2}}{l} + \frac{n b^{2}}{a} - 4 c n = 0$

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If α,β be the roots of ax2+bx+c=0 and γ,δ those of lx2+mx+n=0, then the equation whose roots are αγ+βδ and αδ+βγ is

If $α, β$ be the roots of $a x^{2} + b x + c = 0$ and $γ, δ$ those of $l x^{2} + m x + n = 0$ , then the equation whose roots are $α γ + β δ$ and $α δ + β γ$ is