Given A(4,-3), B(8,5). Find the coordinates of the point that divides segment AB in the ratio 3ः1.
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47
Given,
Co-ordinates of the Point A (x₁, y₁) = (4,-3)
Co-ordinates of the Point B (x₂, y₂) = (8,5)
Ration of division ( m₁:m₂) = 3 : 1
Now, Using the Section Formula,
P(x,y) = [(m₁x₂ + m₂x₁)/(m₁ + m₂) , (m₁y₂ + m₂y₁)/(m₁ + m₂)]
= [(3 × 8 + 1 × 4)/(3 + 1) , (3 × 5 + 1 × -3)/(3 + 1)]
= [28/4 , 12/4]
= (7,3)
Hence, the co-ordinates of the Point P is (7,3).
Hope it helps.
Co-ordinates of the Point A (x₁, y₁) = (4,-3)
Co-ordinates of the Point B (x₂, y₂) = (8,5)
Ration of division ( m₁:m₂) = 3 : 1
Now, Using the Section Formula,
P(x,y) = [(m₁x₂ + m₂x₁)/(m₁ + m₂) , (m₁y₂ + m₂y₁)/(m₁ + m₂)]
= [(3 × 8 + 1 × 4)/(3 + 1) , (3 × 5 + 1 × -3)/(3 + 1)]
= [28/4 , 12/4]
= (7,3)
Hence, the co-ordinates of the Point P is (7,3).
Hope it helps.
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3
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