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Question
Orthocentre and centroid of a triangle are A(−3, 5) and B(3, 3) respectively. If C is the circumcentre and AC is the diameter of this circle, then find the radius of the circle
Solution
Let PQR be any triangle orthocentre, centroid and circumcentre.
An orthocentre is (−3, 5)
B centroid is (3, 3)
C orthocentre is (a, 6)
Also `"AB"/"BC" = 2/1`
B divides AC in the ratio 2 : 1
A line divides internally in the ratio point P is `(("m"x_2 + "n"x_1)/("m" + "n"), ("m"y_2 + "n"y_1)/("m" + "n"))`
m = 2
x1 = 3
y1 = 5
and
n = 1
x2 = a
y2 = b
∴ The point B `((2"a" - 3)/(2 + 1), (2"b" + 5)/(2 + 1))`
(3, 3) = `((2"a" - 3)/3, (2"b" + 5)/3)`
`(2"a" - 3)/3` = 3
2a – 3 = 9
2a = 9 + 3
2a = 12
a = `12/2` = 6
and
`(2"b" + 5)/3`
2b + 5 = 9
2b = 9 – 5
2b = 4
b = `4/2` = 2
∴ Orthocentre C is (6, 2)
Diameter AC = `sqrt((6 + 3)^2 + (2 - 5)^2`
= `sqrt(9^2 + (-3)^2`
= `sqrt(81 + 9)`
= `sqrt(90)`
= `3sqrt(10)`
Radius = `(3sqrt(10))/2`
Radius = `3/2sqrt(10)`
or
`3 xx sqrt(10/4) = 3sqrt(5/2)` units
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