Aquawhite
Retiring
I think I may have seen numerous question like this before but I need help with this one:
Sand is falling from a funnel forms a conical pile such that the height of the pile is one and a half times the radius.
a) Show that the volume of the pile is given by V = (pi.r^2)/2 [I can do this, you can prove if you want to ^_^]
b) If the sand is falling at the rate of pi/10 m^3 per minute, find the rate at which the height is increasing when the pile of sand is 3m high.
Thanks in advance.
Edit: If it's also possible, this too:
A water trough is 200cm long and has a cross-section of a right-angled isosceles triangle. Show that when the depth of the water is x cm, the volume of water in the tank is 200x^2cm^3. Water is poured at a constant rate of 5 litres per minute. Find the rate at which the water level is rising when the depth is 30cm.
Sand is falling from a funnel forms a conical pile such that the height of the pile is one and a half times the radius.
a) Show that the volume of the pile is given by V = (pi.r^2)/2 [I can do this, you can prove if you want to ^_^]
b) If the sand is falling at the rate of pi/10 m^3 per minute, find the rate at which the height is increasing when the pile of sand is 3m high.
Thanks in advance.
Edit: If it's also possible, this too:
A water trough is 200cm long and has a cross-section of a right-angled isosceles triangle. Show that when the depth of the water is x cm, the volume of water in the tank is 200x^2cm^3. Water is poured at a constant rate of 5 litres per minute. Find the rate at which the water level is rising when the depth is 30cm.
Last edited:
(answer this one