$L 1 : x - 2 y + 10 = 0$

$L 2 : x + 2 y - 6 = 0$

Ratio in which the point of intersection of line L1 and L2 divides the line segment AB of L1 is ?

$2 : 5$

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$2 : 3$

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$5 : 3$

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$1 : 1$

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Solution

The correct option is A
$2 : 5$

$Let the point of intersection of L1 and L2 be C(x,y)$

$x - 2 y + 10 = 0$ -------- (1)

$x + 2 y - 6 = 0$ ----------(2)

Solving (1) and (2) simultaneously we get

$x = - 2$

$y = 4$

$C \equiv (- 2, 4)$

$Let the ratio in which C divides AB be k: 1$

$- 2 = \frac{8 k - 6}{k + 1}$

$- 2 (k + 1) = (8 k - 6)$

$- 2 k - 8 k = 2 - 6$

$- 10 k = - 4$

$5 k = 2$

$k = \frac{2}{5}$

$The required ratio is 2 : 5$

Suggest Corrections

Similar questions

$L 1 : x - 2 y + 10 = 0$

$L 2 : x + 2 y - 6 = 0$

What is the ratio in which the point of intersection of line L1 and L2 divides the line segment AB of L1?

Consider the lines given by
$L_{1} : x + 3 y - 5 = 0$
$L_{2} : 3 x - k y - 1 = 0$
$L_{3} : 5 x + 2 y - 12 = 0$

Match the Statements/Exp[ressions in Column I with the Statements/Expressions in Column II.
$\begin{matrix} Column I & Column II L_{1}, L_{2}, L_{3} are concurrent, if & k = -9 One of L_{1}, L_{2}, L_{3} is parallel to at least one of the other two, if & k = \frac{6}{5} L_{1}, L_{2}, L_{3} form a triangle, if & k = \frac{5}{6} L_{1}, L_{2}, L_{3} do not form a triangle, if & k = 5 \end{matrix}$