Answer:
[tex](x+6)^2+(y+\frac{7}{6})^2=\frac{49}{36}[/tex]
Step-by-step explanation:
So, we know that the center of the circle is at (-6, -7/6).
To find the equation of our circle that is tangent to the x-axis, we just need to find the vertical distance from our center to the x-axis.
Our center is at (-6, -7/6). The vertical distance from this to the x-axis directly above will be (-6, 0).
So, find our distance by subtracting our x-values:
[tex]d=r=0-(-7/6)[/tex]
Subtract:
[tex]d=r=7/6[/tex]
So, our distance, which is also our radius, will be 7/6.
Now, we can use the standard form for a circle, which is:
[tex](x-h)^2+(y-k)^2=r^2[/tex]
Where (h, k) is the center and r is the radius.
Substitute -6 for h, -7/6 for k, and 7/6 for r. This yields:
[tex](x+6)^2+(y+\frac{7}{6})^2=\frac{49}{36}[/tex]
We can confirm by graphing (using a calculator):
