Answer:
(2, 8).
Step-by-step explanation:
(x - 2)^2 + (y - 6)^2 = 4
If x = 2 and y = 8 we have:
(2 - 2)^2 + (8 - 6)^2
= 0 + (2^2
= 4.
So it passes through the point (2,8).
The point through which the circle passes is:
(2,8)
The equation of the circle is given by:
[tex](x-2)^2+(y-6)^2=4[/tex]
We will check by putting each point in the equation and check which is equal to 4.
1)
(2,8)
when x=2 and y=8 we have:
[tex](2-2)^2+(8-6)^2=4\\\\i.e.\\\\0^2+2^2=4\\\\i.e.\\\\4=4[/tex]
Hence, the circle passes through the point (2,8).
2)
(5,6)
when x=5 and y=6 we have:
[tex](5-2)^2+(6-6)^2=4\\\\i.e.\\\\3^2+0^2=4\\\\i.e.\\\\9=4[/tex]
which is not true.
Hence, the circle does not pass through (5,6).
3)
(-5,6)
when x= -5 and y=6 we have:
[tex](-5-2)^2+(6-6)^2=4\\\\i.e.\\\\(-7)^2+0^2=4\\\\i.e.\\\\49=4[/tex]
which is not true.
Hence, the circle does not pass through (-5,6).
4)
(2,-8)
when x=2 and y= -8 we have:
[tex](2-2)^2+(-8-6)^2=4\\\\i.e.\\\\0^2+(-14)^2=4\\\\i.e.\\\\196=4[/tex]
Hence, the circle does not passes through the point (2,-8).
