Answer: The slope of line c is given by
[tex]m_c=1.[/tex]
Step-by-step explanation: Given that line b is perpendicular to line a and line c is perpendicular to line a.
We are to find the slope of line c.
From the graph, we see that (2, 3) and (-3, -2) are two points on the line b.
We know that
the slope of a line passing through the points (p, q) and (r, s) is given by
[tex]m=\dfrac{s-q}{r-p}.[/tex]
Therefore, the slope of line b will be
[tex]m_b=\dfrac{-2-3}{-3-2}=\dfrac{5}{5}=1.[/tex]
Since lines a and b are perpendicular, and the product of the slopes of two perpendicular lines is -1, so we must have
[tex]m_b\times m_a=-1\\\\\Rightarrow 1\times m_a=-1\\\\\Rightarrow m_a=-1.[/tex]
Again, lines c and a are perpendicular, so
[tex]m_a\times m_c=-1\\\\\Rightarrow -1\times m_c=-1\\\\\Rightarrow m_c=1.[/tex]
Therefore, the slope of line c is given by
[tex]m_c=1.[/tex]
