The equation of the line is: y-yo = m (x-xo) Where, m = (y2-y1) / (x2-x1) Substituting values: m = (8-4) / (6-2) m = (4) / (4) m = 1 Then, the equation is: y-4 = 1 * (x-2) Rewriting: y = x-2 + 4 y = x + 2 The midpoint is: k = ((x1 + x2) / 2, (y1 + y2) / 2) k = ((2 + 6) / 2, (4 + 8) / 2) k = ((8) / 2, (12) / 2) k = (4, 6) Then, the equation of the perpendicular line that passes through k is: y = -x + b Looking for b we have: 6 = -4 + b b = 6 + 4 b = 10 Substituting: y = -x + 10 Answer: An equation of a line perpendicular to jl and passing through k is: y = -x + 10
