DE word problem: fluid in a tank

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Homework Statement



Consider a tank used in certain hydrodynamic experiments. After one experiment the tank contains 200 L of a dye solution with a concentration of 1 g/L. To prepare for the next experiment, the tank is to be rinsed with fresh water flowing in at a rate of 2 L / min. The well stirred solution flowing out at the same rate. Find the time that will elapse before the concentration of dye in the tank reaches 1% of its original value.

Homework Equations



This is my first differential equations word problem, so I'm trying to learn how to do them. I don't need the answer to the 1% question; just some advice on what I did wrong below.

The Attempt at a Solution



[itex] \frac{dQ}{dt} = -(\frac{2L}{min})(\frac{Q(t)}{200L}) = \frac{-1}{2} Q(t)[/itex]

Initial value: Q(0) = 1g/L

[itex] \frac{dQ}{dt} + \frac{1}{2} Q = 0[/itex]

[itex] \mu = e^{1/2*t}[/itex]

[itex] Q(t) = \frac{C}{e^{1/2*t}}[/itex]

At this point I solve for C using the initial value, and get Q(t) = 1 :( Where am I going wrong?

Thank you
 
on Phys.org
I fixed that, thanks. But regardless I end up in the same situation, with c/ e^... = 1. What else can I try?
 
When I solve for: 1= C/ e^(1/100 t)
I still get 1 as a solution... Plugging in 0 for t to satisfy the initial condition Q(0)=1g/L

Thanks
 
That simply means I plug 0 for t, and get 1=1 right? I must be confused...
 
I guess i understand...
 
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