Equation of perpendicular bisector is , [tex]y=\frac{3}{2} x+\frac{11}{2}[/tex]
Length of both pa and pb are [tex]\sqrt{\frac{65}{4} }[/tex] unit.
Slope of segment ab is, [tex]\frac{6-2}{-4-2} =-\frac{2}{3}[/tex]
So, slope of perpendicular bisector will be, negative of reciprocal of slope of segment ab.
Therefore, slope of perpendicular bisector is, [tex]\frac{3}{2}[/tex]
Since, perpendicular bisector passes through the mid point of segment ab.
So, coordinate of mid point of segment ab is,
[tex](\frac{2-4}{2},\frac{2+6}{2} )=(-1,4)[/tex]
Thus, perpendicular bisector of ab passing through (- 1, 4) and have slope 3/2.
So, equation of angle bisector is,
[tex]y=\frac{3}{2} x+\frac{11}{2}[/tex]
Since, the perpendicular bisector intersects the y-axis at point p
So, coordinate of point p is (0, 11/2)
By applying distance formula,
[tex]pa=\sqrt{(2-0)^{2}+(2-11/2)^{2} }\\\\ =\sqrt{4+\frac{49}{4} }\\\\ =\sqrt{\frac{65}{4} }[/tex]
[tex]pb=\sqrt{(-4-0)^{2}+(6-11/2)^{2} }\\\\ =\sqrt{16+\frac{1}{4} }\\\\ =\sqrt{\frac{65}{4} }[/tex]
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