Question

If $\alpha ,\beta$ are the roots of the quadratic equation $a{x}^2+bx+c=0,$ $\gamma ,\delta$ are the roots of $p{x}^2+qx+r=0\&D_1,D_2$ be the respective discriminants of these equations. If $\alpha ,\beta ,\gamma ,\&\delta$ are in A.P. then $D_1:D_2=$
Where $\alpha ,\beta ,\gamma ,\delta ,\in R\&a,b,c,p,q,r\in R)$

• A. $a^2:p^2$
• B. $c^2:r^2$
• C. $a^2:b^2$
• D. $a^2:r^2$

Answer 1

The correct option is A

$a^2:p^2$

Given $\alpha ,\beta$ are the roots of the equation $a{x}^2+bx+c=0$
$\Rightarrow \alpha +\beta =-\frac{b}{a},\alpha \beta =\frac{c}{a}$

Now, $D_1=b^2-4ac=a^2(\frac{b^2}{a^2}-\frac{4c}{a})$

$=a^2\left(\right(\alpha +\beta {)}^2-4\alpha \beta )$

$=a^2(\alpha -\beta {)}^2$

Also, $\gamma ,\delta$ are the roots of the equation $p{x}^2+qx+r=0$

$\Rightarrow \gamma +\delta =-\frac{q}{p},\gamma \delta =\frac{r}{p}$

$D_2=q^2-4pr=p^2(\frac{q^2}{p^2}-\frac{4r}{p})$

$=p^2(\gamma +\delta {)}^2-4\gamma \delta$

$=p^2(\gamma -\delta {)}^2$

$\because \alpha ,\beta ,\gamma ,\delta$ are in A.P

$\therefore \alpha -\beta =\gamma -\delta$

$\therefore \frac{D_1}{D_2}=\frac{a^2}{p^2}$

Hence, $D_1:D_2=a^2:p^2$