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प्रश्न
Find equations of altitudes of the triangle whose vertices are A(2, 5), B(6, –1) and C(–4, –3).
उत्तर
A(2, 5), B(6, –1) and C(–4, –3) are the vertices of ΔABC.
∴ Let AD, BE and CF be the altitudes through the vertices A, B and C respectively of ΔABC.
Slope of BC = `(-3 - (- 1))/(-4 - 6)`
= `(-2)/(-10)`
= `1/5`
∴ Slope of AD = –5 ....[∵ AD ⊥ BC]
Since altitude AD passes through the point (2, 5) and has slope –5,
equation of the altitude AD is
y – 5 = –5(x – 2)
∴ y – 5 = –5x + 10
∴ 5x + y – 15 = 0
Now, slope of AC = `(-3 - 5)/(-4 - 2)`
= `(-8)/(-6)`
= `4/3`
∴ Slope of BE = `(-3)/4` .....[∵ BE ⊥ AC]
Since altitude BE passes through (6, – 1) and has a slope `(-3)/4`,
equation of the altitude BE is
y – (– 1) = `(-3)/4(x - 6)`
∴ 4(y + 1) = –3(x – 6)
∴ 4y + 4 = –3x + 18
∴ 3x + 4y – 14 = 0
Also, slope of AB = `(-1 - 5)/(6 - 2)`
= `(-6)/4`
= `(-3)/2`
∴ Slope of CF = `2/3` .....[∵ CF ⊥ AB]
Since altitude CF passes through (– 4, – 3) and has slope `2/3`,
equation of altitude CF is
y – (– 3) = `2/3[x - (- 4)]`
∴ 3(y + 3) = 2(x + 4)
∴ 3y + 9 = 2x + 8
∴ 2x – 3y – 1 = 0
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