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Question
Answer the following :
Show that the circles touch each other externally. Find their point of contact and the equation of their common tangent:
x2 + y2 – 4x + 10y +20 = 0,
x2 + y2 + 8x – 6y – 24 = 0.
Solution
Given equation of the first circle is
x2 + y2 – 4x + 10y +20 = 0
Here, g = – 2, f = 5, c = 20
Centre of the first circle is C1 = (2, – 5)
Radius of the first circle is r1 = `sqrt((-2)^2 + 5^2 - 20)`
= `sqrt(4 + 25 - 20)`
= `sqrt(9)`
= 3
Given equation of the second circle is
x2 + y2 + 8x – 6y – 24 = 0
Here, g = 4, f = – 3, c = – 24
Centre of the second circle is C2 = (–4, 3)
Radius of the second circle is
r2 = `sqrt(4^2 + (-3)^2 + 24)`
= `sqrt(16 + 9 + 24)`
= `sqrt(49)`
= 7
By distance formula,
C1C2 =`sqrt((-4 - 2)^2+ [3 - (-5)]^2`
= `sqrt(36 + 64)`
= `sqrt(100)`
= 10
r1 + r2 = 3 + 7 = 10
Since, C1C2 = r1 + r2
∴ the given circles touch each other externally.
Let P(x, y) be the point of contact.
∴ P divides C1 C2 internally in the ratio r1 : r2 i.e. 3:7
∴ By internal division,
x = `(3(-4) + 7(2))/(3 + 7) = (-12 + 14)/10 = 1/5`
and y = `(3(3) + 7(5))/(3 + 7) = (9 - 35)/10 = -13/5`
∴ Point of contact = `(1/5, -13/5)`
Equation of common tangent is
(x2 + y2 – 4x + 10y + 20) – (x2 + y2 + 8x – 6y – 24) = 0
∴ – 4x + 10y + 20 – 8x + 6y + 24 = 0
∴ – 12x + 16y + 44 = 0
∴ 3x – 4y – 11 = 0
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