Asked by rachel
water in a paper conical filter drips into a cup. let x denote the height of the water in the cup. if 10 in^3 of water are poured into the filter, find the relationship between dy/dt and dx/dt
so the paper filter is 4 inches tall
whith a radius of 2 inches. x is the height of the water in the cone.
the cup is 4 inches wide and y is the height of the water in the cup. please help! thanks(:
so the paper filter is 4 inches tall
whith a radius of 2 inches. x is the height of the water in the cone.
the cup is 4 inches wide and y is the height of the water in the cup. please help! thanks(:
Answers
Answered by
Steve
If the water in the filter is at depth x, with the surface of radius r,
x/r = 4/2 = 2
x = 2r
r = x/2
now, the volume of the water in the cup, plus that in the filter adds up to 10
cone: v = 1/3 pi r^2 x = pi/12 x^3
cup: v = pi r^2 y = 4pi y
pi/12 x^3 + 4pi y = 10
pi/4 x^2 dx/dt + 4pi dy/dt = 0
multiply by 4/pi to simplify a bit:
x^2 dx/dt + 16 dy/dt = 0
You can massage that into whatever form you need.
x/r = 4/2 = 2
x = 2r
r = x/2
now, the volume of the water in the cup, plus that in the filter adds up to 10
cone: v = 1/3 pi r^2 x = pi/12 x^3
cup: v = pi r^2 y = 4pi y
pi/12 x^3 + 4pi y = 10
pi/4 x^2 dx/dt + 4pi dy/dt = 0
multiply by 4/pi to simplify a bit:
x^2 dx/dt + 16 dy/dt = 0
You can massage that into whatever form you need.
Answered by
Anonymous
m,n,mn
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