A moving line intersects the lines x+y=0 and | vedclass

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(B) Let the mid-point of $AB$ be $(h, k)$.Let $A = (\alpha, -\alpha)$ and $B = (\beta, \beta)$.Then,the mid-point $(h, k) = \left(\frac{\alpha+\beta}{

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$\left(x^{2}-y^{2}\right)^{2}=C^{2}$

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(B) Let the mid-point of $AB$ be $(h, k)$.Let $A = (\alpha, -\alpha)$ and $B = (\beta, \beta)$.Then,the mid-point $(h, k) = \left(\frac{\alpha+\beta}{2}, \frac{\beta-\alpha}{2}ight)$.So,$\alpha+\beta = 2h$ and $\beta-\alpha = 2k$.The area of $	riangle AOB = \frac{1}{2} 	imes |OA| 	imes |OB| = \frac{1}{2} \sqrt{\alpha^{2} + (-\alpha)^{2}} \sqrt{\beta^{2} + \beta^{2}} = \frac{1}{2} \sqrt{2\alpha^{2}} \sqrt{2\beta^{2}} = |\alpha\beta| = C$.Thus,$\alpha^{2}\beta^{2} = C^{2}$.We know that $(\beta+\alpha)^{2} - (\beta-\alpha)^{2} = 4\alpha\beta$.So,$4\alpha\beta = (2h)^{2} - (2k)^{2} = 4(h^{2}-k^{2})$,which implies $\alpha\beta = h^{2}-k^{2}$.Substituting this into $\alpha^{2}\beta^{2} = C^{2}$,we get $(h^{2}-k^{2})^{2} = C^{2}$.Replacing $(h, k)$ with $(x, y)$,the locus is $(x^{2}-y^{2})^{2} = C^{2}$.

$A$ moving line intersects the lines $x+y=0$ and $x-y=0$ at the points $A$ and $B$ respectively,such that the area of the triangle with vertices $(0,0)$,$A$,and $B$ has a constant area $C$. The locus of the mid-point of $AB$ is given by the equation:

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