Answer to Question #299256 in Civil and Environmental Engineering for Ann

Let |DF|=h – man height, |BC|=H – light height, V=3 miles/hour – walking rate, |AF|=S – shadow size.

|DE|=V"\\times" t – horizontal distance from light on time t.

Triangles ADF and DBE are similar.

So "\\frac{S}{h}"="\\frac{|DE|}{H-h}" /(H-h) 

"\\frac{S}{h}"="\\frac{(V\\times t)}{(H-h)}"   

S= "\\frac{(V\\times t\\times h)}{(H-h)}"

From last expression or differentiating this expression by t shadow size rate Sh = "\\frac{(V\\times H)}{(H-h)}"

="\\frac{(3\\times6)}{(15-6)}" = 2 miles/hour.   

The rate of the end of the man's shadow is the velocity of point A

Sa = "\\frac{(V\\times H)}{(H-h)}" +V = "\\frac{(V\\times H)}{(H-h)}" = "\\frac{(3\\times5)}{(15-5)}" (15-6) = 5 miles/hour.

Answer

The rate of the end of the man's shadow Sa = 5 miles/hour.