Find the co-ordinates of the orthocenter of the triangle whose vertices are A(3, –2), B(7, 6), C (–1, 2) - Mathematics and Statistics

प्रश्न

Find the co-ordinates of the orthocenter of the triangle whose vertices are A(3, –2), B(7, 6), C(–1, 2).

योग

उत्तर

Let O be the orthocentre of ΔABC.

Let AD and BE be the altitudes on the sides BC and AC respectively.

Slope of side BC = `(2 - 6)/(-1 - 7) = (-4)/(-8) = 1/2`

∴ Slope of AD = – 2 ...[∵ AD ⊥ BC]

∴ Equation of line AD is

y – (– 2) = (– 2) (x – 3)

∴ y + 2 = – 2x + 6

∴ 2x + y – 4 = 0 .....(i)

Slope of side AC = `(-2 - 2)/(3 - (-1)) = (-4)/4` = – 1

∴ Slope of BE = 1 ...[∵ BE ⊥ AC]

∴ Equation of line BE is

y – 6 = 1(x – 7)

∴ y – 6 = x – 7

∴ x = y + 1 .....(ii)

Substituting x = y + 1 in (i), we get

2(y + 1) + y – 4 = 0

∴ 2y + 2 + y – 4 = 0

∴ 3y – 2 = 0

∴ y = `2/3`

Substituting y = `2/3` in (ii), we get

x = `2/3 + 1 = 5/3`

∴ Co-ordinates of orthocentre, O = `(5/3, 2/3)`

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General Form of Equation of a Line

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अध्याय 5: Straight Line - Exercise 5.4 [पृष्ठ १२२]

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बालभारती Mathematics and Statistics 1 (Arts and Science) [English] 11 Standard Maharashtra State Board

अध्याय 5 Straight Line
Exercise 5.4 | Q 8 | पृष्ठ १२२

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