Here you will learn what is the equation of pair of tangents to a circle from an external point with example.
Letโs begin โ
Equation of Pair of Tangents to a Circle
Let the equation of circle S = \(x^2\) + \(y^2\) โ \(a^2\) and P(\(x_1,y_1\)) is any point outside the circle. From the point we can draw two real and distinct tangent and combine equation of pair of tangents is โ
(\(x^2\) + \(y^2\) โ \(a^2\))(\({x_1}^2\) + \({y_1}^2\) โ \(a^2\)) = \(({xx_1 + yy_1 โ a^2})^2\)
orย \(SS_1 = T^2\)
where \(S_1\) = \({x_1}^2\) + \({y_1}^2\) โ \(a^2\)
and \(T^2\) = \(({xx_1 + yy_1 โ a^2})^2\)
Also Read : Length of Tangent to a Circle Formula From an External Point
Example : Find the equation to the pair of tangents drawn from (4, 10) to the circle \(x^2 + y^2\) = 4.
Solution : Given that, S = \(x^2 + y^2\) = 4 and Point P is (4, 10).
Then, by using above formula,
\(S_1\) = \(4^2 + 10^2 โ 4\) = 112
\(T^2\) = \((4x + 10y โ 4)^2\) =ย \((4x + 10y)^2\) + 16 โ 8(4x + 10y)
= \(16x^2\) + \(100y^2\) + 80xy + 16 โ 32x โ 80y
= \(16x^2\) + \(100y^2\) โ 32x โ 80y + 80xy + 16
Hence, the combined equation of pair of tangents is
\(x^2 + y^2 โ 4\)(112) = \(16x^2\) + \(100y^2\) โ 32x โ 80y + 80xy + 16
\(96x^2\) + \(12y^2\) โ 32x โ 80y + 80xy โ 464 = 0
