Given that w = 3i when z = −3i, and w = 1 − 4i when z = 1 + 4i, find the values of a, b and c.
"w=1-4i={a(1+4i)+9\\over 1+4i-a}""17-a+4ai=a+4ai+9""a=4, b=9, c=-4"
"w={4z+9\\over z-4}"
(a) Show that the points for which "z" is transformed to "\\bar{z}" lie on a circle and give the centre and radius of this circle.
"x^2+y^2-4(x-iy)-4(x+iy)-9=0"
"x^2-8x+y^2-9=0"
"x^2-8x+16-16+y^2-9=0"
"(x-4)^2+y^2=25"
This the cartesian equation of the circle with center "(4, 0)" and radius "5."
(b) Show that the line through the point z = 4 and perpendicular to the real axis is invariant under T.
"z=4+iy"
Every point of the line is transformed to point of this line excepting point "z=4."
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