The equation of the line which bisects the ob | vedclass

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(B) The equations of the angle bisectors are given by $\frac{x - 2y + 4}{\sqrt{1^2 + (-2)^2}} = \pm \frac{4x - 3y + 2}{\sqrt{4^2 + (-3)^2}}$.This simp

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$(4 + \sqrt{5})x - (3 + 2\sqrt{5})y + (2 + 4\sqrt{5}) = 0$

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(B) The equations of the angle bisectors are given by $\frac{x - 2y + 4}{\sqrt{1^2 + (-2)^2}} = \pm \frac{4x - 3y + 2}{\sqrt{4^2 + (-3)^2}}$.This simplifies to $\frac{x - 2y + 4}{\sqrt{5}} = \pm \frac{4x - 3y + 2}{5}$,or $\sqrt{5}(x - 2y + 4) = \pm (4x - 3y + 2)$.Case $1$ (Positive sign): $\sqrt{5}x - 2\sqrt{5}y + 4\sqrt{5} = 4x - 3y + 2$,which rearranges to $(4 - \sqrt{5})x - (3 - 2\sqrt{5})y + (2 - 4\sqrt{5}) = 0$.Case $2$ (Negative sign): $\sqrt{5}x - 2\sqrt{5}y + 4\sqrt{5} = -4x + 3y - 2$,which rearranges to $(4 + \sqrt{5})x - (3 + 2\sqrt{5})y + (2 + 4\sqrt{5}) = 0$.To identify the obtuse bisector,check the sign of $a_1a_2 + b_1b_2$. Here $a_1a_2 + b_1b_2 = (1)(4) + (-2)(-3) = 4 + 6 = 10 > 0$. Since the sign is positive,the bisector corresponding to the negative sign in the formula $\frac{L_1}{\sqrt{a_1^2+b_1^2}} = -\frac{L_2}{\sqrt{a_2^2+b_2^2}}$ is the obtuse bisector.Thus,the equation is $(4 + \sqrt{5})x - (3 + 2\sqrt{5})y + (2 + 4\sqrt{5}) = 0$.

The equation of the line which bisects the obtuse angle between the lines $x - 2y + 4 = 0$ and $4x - 3y + 2 = 0$ is:

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