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As I mentioned earlier, I've been reteaching myself Calculus recently. At the moment, I'm trying to figure out how to solve a word problem of my own devising. It goes like this:
1 bacteria consumes 1 unit of food per minute. A colony of this bacteria doubles in size every 60 minutes. If there are 1000 units of food and you start off with 1 bacteria, how long do the bacteria have before the food runs out?
So the formula for the population would be p(t) = e^ln(2)t/60, right? And might the integral of that be 60/ln(2) * e^ln(2)t/60? And then I would take the integral from 0 to x, set that equation equal to 1000, and solve for x, yes? And would my answer be something along the lines of ~219 minutes?
1 bacteria consumes 1 unit of food per minute. A colony of this bacteria doubles in size every 60 minutes. If there are 1000 units of food and you start off with 1 bacteria, how long do the bacteria have before the food runs out?
So the formula for the population would be p(t) = e^ln(2)t/60, right? And might the integral of that be 60/ln(2) * e^ln(2)t/60? And then I would take the integral from 0 to x, set that equation equal to 1000, and solve for x, yes? And would my answer be something along the lines of ~219 minutes?
ACK!
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