Question

A circle has a center that falls on the line `y = 7/9x +7` and passes through `( 4 ,5 )` and `(8 ,1 )`. What is the equation of the circle?

Answer 1

The equation of the circle is `(x-45)^2+(y-42)^2=3050`

Explanation:

The mid point of `(4,5)` and `(8,1)` is `(6,3)`

The slope of the line through `(4,5)` and `(8,1)` is

`m_1=(1-5)/(8-4)=-4/4=-1`

The slope of the line perpendicular to the line through `(4,5)` and `(8,1)` is

`m_2=1`

The equation of the line through `(6,3)` with a slope of `1` is

`y-3=1(x-6)`

`y=x-6+3=x-3`

The center of the circle lies on the intersection of lines

`y=7/9x+7`

and

`y=x-3`

Therefore,

`7/9x+7=x-3`

`x(1-7/9)=7+3=10`

`2/9x=10`

`x=10*9/2=45`

and

`y=45-3=42`

So,

The center of the circle is `C=(45,42)`

The radius is

`r=sqrt((45-4)^2+(42-5)^2)`

`=sqrt(41^2+37^2)=sqrt3050`

`r^2=3050`

The equation of the circle is

`(x-45)^2+(y-42)^2=3050`

graph{((x-4)^2+(y-5)^2-1/16)((x-8)^2+(y-1)^2-1/16)(y-x+3)(y-7/9x-7)(x+y-9)=0 [-8.75, 21.25, -4.1, 10.9]}

graph{((x-45)^2+(y-42)^2-3050)(y-x+3)(y-7/9x-7)=0 [-90, 150, -20, 100]}