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प्रश्न
In what ratio is the line joining A(0, 3) and B(4, –1) divided by the x-axis? Write the co-ordinates of the point where AB intersects the x-axis.
उत्तर
Let the ratio be m1 : m2 when the x-axis intersects the line AB at P.
∴ Let co-ordinate of P(x, 0)
`x = (m_1x_2 + m_2x_1)/(m_1 + m_2), y = (m_1y_2 + m_2y_1)/(m_1 + m_2)`
`x = (m_1 xx 4 + m_2 xx 0)/(m_1 + m_2), y = (m_1(-1) + m_2 xx 3)/(m_1 + m_2)`
`x = (4m_1)/(m_1 + m_2), y = (-m_1 + 3m_2)/(m_1 + m_2)`
∵ P lies on x-axis,
∴ y = 0
∴ `(-m_1 + 3m_2)/(m_1 + m_2) = 0`
`=>` – m1 + 3m2 = 0
`=>` m1 = 3m2
`=> m_1/m_2 = 3/1`
`=>` m1 : m2 = 3 : 1
Now, `x = (4 xx 3)/(3 + 1)`
= `12/4`
= 3
∴ Required co-ordinates of P will be (3, 0)
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