1 Answer

MakkyNZ · Answer 1 · 2023-11-28T06:12:36+0000

Given the equations of the lines:

$\begin{gathered} 2y+x=1 \\ x+3y=6 \end{gathered}$

the given equations written in standard form, we will rewrite in in the slope-intercept form

So,

$\begin{gathered} y=-(1)/(2)x+(1)/(2) \\ y=-(1)/(3)x+(6)/(3) \end{gathered}$

So, the slopes of the lines are { -1/2, -1/3 }

The acute angle between the lines of slopes m1 and m2 is given by the formula:

$\text{tan}\theta=|\frac{m_{1_{}}-m_2}{1+m_1m_2}|$

Substitute with slopes of the lines

So,

$\tan \theta=|(-(1)/(2)-(-(1)/(3)))/(1+(-(1)/(2))(-(1)/(3)))|=|(-(1)/(6))/(1+(1)/(6))|=(1)/(7)$

so, the angle will be:

$\theta=\tan ^(-1)((1)/(7))=8.13\degree$

So, the answer will be the acute angle = 8.13°

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