Question

A pair of straight lines through $A(2,7)$ is drawn to intersect the line $x+y=5$ at $C$ and $D.$ If angle between the pair of straight lines is $\frac{\pi }{2},$ then the locus of incentre of $△ACD$ is

• A. $2xy-6x+4y=28$
• B. $xy-6x+4y=29$
• C. $x^2+y^2-6x+4y=29$
• D. $xy-6x+4y=28$

Answer 1

The correct option is A $2xy-6x+4y=28$


Let inradius be $r=ON=OM$
Since $\angle OAN=\frac{\pi }{4},$
$\Rightarrow AN=ON$
$\therefore OA=\sqrt{2}r$
Let incentre be $O(h,k)$
$r=\frac{OA}{\sqrt{2}}=OM$
$\Rightarrow \frac{\sqrt{{(k-7)}^2+{(h-2)}^2}}{\sqrt{2}}=\left|\frac{k+h-5}{\sqrt{2}}\right|\Rightarrow \sqrt{{(k-7)}^2+{(h-2)}^2}=|k+h-5|\Rightarrow {(k-7)}^2+{(h-2)}^2={|k+h-5|}^2\Rightarrow -14k+49-4h+4=25+2kh-10h-10k\Rightarrow 2kh+4k-6h-28=0$

Hence, locus is $2xy-6x+4y=28$