A city planner is rerouting traffic in order to work on a stretch of road. The equation of the path of the old route can be described as y = two fifthsx − 4. What should the equation of the new route be if it is to be perpendicular to the old route and will go through point (Q, P)? (4 points)

y − Q = negative five halves(x − P)

y − Q = two fifths(x − P)

y − P = negative five halves(x − Q)

y − P = two fifths(x − Q)A city planner is rerouting traffic in order to work on a stretch of road. The equation of the path of the old route can be described as y = two fifthsx − 4. What should the equation of the new route be if it is to be perpendicular to the old route and will go through point (Q, P)? (4 points)

A. y − Q = negative five halves(x − P)

B. y − Q = two fifths(x − P)

C. y − P = negative five halves(x − Q)

D. y − P = two fifths(x − Q)