Answer to Question #329559 in Calculus for Keila

Let "u=100~cm^3\/sec,~l=75\\space cm,"

"H=20~cm,~B=30~cm,~h=10~cm,"

"x" - the current depth of the water layer.

The current volume of the water:

"V=\\frac{1}{2}bxl,"

where "b" is the base of the triangular cross-section of the water layer; this triangle is similar to the cross-section of the trough with similarity factor of "k=\\frac{x}{H}", so "b=kB=x\\frac{B}{H}".

"V=\\frac{1}{2}x\\frac{B}{H}xl=\\frac{Bl}{2H}x^2\\\\\nu=\\frac{dV}{dt}=\\frac{Bl}{H}x\\frac{dx}{dt}\\Rarr\\frac{dx}{dt}=\\frac{uH}{Blx}\\\\\n\\frac{dx}{dt}(x=h)=\\frac{uH}{Blh}=\\frac{100\\cdot20}{30\\cdot75\\cdot10}\\approx\\\\\n\\approx0.089~(cm\/sec)=0.89~(mm\/sec)"