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प्रश्न
Find the equations of the straight lines passing through (2, −1) and making an angle of 45° with the line 6x + 5y − 8 = 0.
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उत्तर
We know that the equations of two lines passing through a point
\[\left( x_1 , y_1 \right)\] and making an angle \[\alpha\] with the given line y = mx + c are
\[y - y_1 = \frac{m \pm \tan\alpha}{1 \mp m\tan\alpha}\left( x - x_1 \right)\]
Here,
Equation of the given line is,
\[6x + 5y - 8 = 0\]
\[ \Rightarrow 5y = - 6x + 8\]
\[ \Rightarrow y = - \frac{6}{5}x + \frac{8}{5}\]
\[\text { Comparing this equation with } y = mx + c\]
we get,
\[m = - \frac{6}{5}\]
\[x_1 = 2, y_1 = - 1, \alpha = {45}^\circ , m = - \frac{6}{5}\]
So, the equations of the required lines are
\[y + 1 = \frac{- \frac{6}{5} + \tan {45}^\circ}{1 + \frac{6}{5}\tan {45}^\circ}\left( x - 2 \right) \text { and }y + 1 = \frac{- \frac{6}{5} - \tan {45}^\circ}{1 - \frac{6}{5}\tan {45}^\circ}\left( x - 2 \right)\]
\[ \Rightarrow y + 1 = \frac{- \frac{6}{5} + 1}{1 + \frac{6}{5}}\left( x - 2 \right) \text { and } y + 1 = \frac{- \frac{6}{5} - 1}{1 - \frac{6}{5}}\left( x - 2 \right)\]
\[ \Rightarrow y + 1 = \frac{- 1}{11}\left( x - 2 \right) \text { and } y + 1 = \frac{- 11}{- 1}\left( x - 2 \right)\]
\[ \Rightarrow x + 11y + 9 = 0\text { and } 11x - y - 23 = 0\]
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