If the point P(1,3) undergoes the following t | vedclass

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(A) $1$. Reflection of $P(1,3)$ about $y=x$ gives $Q(3,1)$.$2$. Translation of $Q(3,1)$ by $3$ units along the positive $X$-axis gives $R(3+3, 1) = R(

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$\left(\frac{6 \sqrt{3}+1}{2}, \frac{\sqrt{3}-6}{2}\right)$

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(A) $1$. Reflection of $P(1,3)$ about $y=x$ gives $Q(3,1)$.$2$. Translation of $Q(3,1)$ by $3$ units along the positive $X$-axis gives $R(3+3, 1) = R(6,1)$.$3$. Rotation of $R(6,1)$ by $	heta = -\frac{\pi}{6}$ (clockwise) about the origin:$x' = x \cos(	heta) - y \sin(	heta) = 6 \cos(-\frac{\pi}{6}) - 1 \sin(-\frac{\pi}{6}) = 6(\frac{\sqrt{3}}{2}) - 1(-\frac{1}{2}) = \frac{6\sqrt{3}+1}{2}$$y' = x \sin(	heta) + y \cos(	heta) = 6 \sin(-\frac{\pi}{6}) + 1 \cos(-\frac{\pi}{6}) = 6(-\frac{1}{2}) + 1(\frac{\sqrt{3}}{2}) = \frac{\sqrt{3}-6}{2}$The final position is $\left(\frac{6 \sqrt{3}+1}{2}, \frac{\sqrt{3}-6}{2}ight)$.

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