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Question
Show that the points (3, −2), (1, 0), (−1, −2) and (1, −4) are concyclic
Solution
Let the equation of the circle passing through
the points (3, – 2), (1, 0) and (– 1, – 2) be
x2 + y2 + 2gx + 2fy + c = 0 …(i)
For point (3, – 2),
Substituting x = 3 and y = – 2 in (i), we get
9 + 4 + 6g – 4f + c = 0
∴ 6g – 4f + c = –13 …(ii)
For point (1, 0),
Substituting x = 1 and y = 0 in (i), we get
1 + 0 + 2g + 0 + c = 0
∴ 2g + c = – 1 …(iii)
For point (–1, –2),
Substituting x = – 1 and y = – 2, we get
1 + 4 – 2g – 4f + c = 0
∴ 2g + 4f – c = 5 …(iv)
Adding (ii) and (iv), we get
8g = – 8
∴ g = – 1
Substituting g = – 1 in (iii), we get
– 2 + c = – 1
∴ c = 1
Substituting g = – 1 and c = 1 in (iv), we get
– 2 + 4f – 1 = 5
∴ 4f = 8
∴ f = 2
Substituting g = – 1, f = 2 and c = 1 in (i), we get
x2 + y2 – 2x + 4y + 1 = 0 …(v)
If (1, – 4) satisfies equation (v), the four points are concyclic.
Substituting x = 1, y = – 4 in L.H.S of (v), we get
L.H.S. = (1)2 + (– 4)2 – 2(1) + 4(– 4) + 1
= 1 + 16 – 2 – 16 + 1
= 0
= R.H.S.
∴ Point (1, – 4) satisfies equation (v).
∴ The given points are concyclic.
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