Solution :
Let \(C_1\) be the center of circle \(x^2 + y^2\) = 1 i.e. \(C_1\) = (0, 0)
And \(C_2\) be the center of circle \(x^2 + y^2 – 2x – 6y + 6\) = 0 i.e. \(C_2\) = (1, 3)
Let \(r_1\) be the radius of first circle and \(r_2\) be the radius of second circle.
Then, \(r_1\) = 1 and \(r_2\) = 2
Learn how to find center and radius of circle here.
Now, \(C_1C_2\) = \(\sqrt{9 + 1}\) = \(\sqrt{10}\) and \(r_1 + r_2\) = 3
Since, \(C_1C_2\) > \(r_1 + r_2\)
Hence, there are four common tangents.
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