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- In this video we're gonna talk about actually coming up with an initial population given some information. So, after 20 minutes of growth, a population was measured and found to have 500 units. After 25 minutes of growth, it's 1500. So, we want to find the initial size. To do so the main thing we need is the growth factor. So, I'm gonna use the formula of the exponential Y equals A B to the T. And a slick way we can do this is we can actually act as if 20 minutes is our initial to kind of speed things along. So I can say, well, it took to go from 500 to 1500, it took five minutes. That's enough information for me to find my base. So, I'm gonna divide both sides by 500, and I get that three equals B to the fifth. Or that B equals... We raise both sides to the one fifth, so three to the one fifth. There's the base of my exponential for this model. So I know it's gonna have the form Y equals A times three to the one fifth, or as I like to write it, T over five. Now, it's the A that we need, so what we're gonna do is use some of our given information. We can either use that after 20 minutes it's 500, or 25 minutes it's 1500. It's up to us. So I'm gonna use the first piece. I know the population is 500 when T is 20. So 20 over five. So I get 500 equals A times three to the forth, which is 81. So A is approximately 500 over 81, which is about... We'll round this off since we're talking about bacteria... It's right around 6 bacterias are our initial amount. Now the other thing we're asked to find is its doubling time. Now, if you seen some of the other videos you know that we don't really need to know an initial amount to find the doubling time. We can go right from here. So, let's do that off to the side here. I want to find when my initial value of A times three to the T over five is gonna be equal to two A. Okay, I'm gonna put that three in parenthesis. So we can divide both sides by A and those cancel, and... Sorry I'm running out of room here... What I'm gonna have is that two equals three to the T over five. So now we'll log or natural log over both sides. So log of two equals log of three to the T over five, which allows us to pull that exponent out to the front. So we have log of two equals T over five log of three. Multiply both sides by five. So I get the five over there, and divide both sides by log of three, and we get T exactly is five log of two over log of three. Now a lot of times we want to give that as a number. So calculating it in our calculator we get about 3.15, and now we did this whole problem in minutes, so it's about 3.15 minutes. Now let's think about why that makes sense. Well, sorry I kind of messed up that part of the problem, but, it tripled in only five minutes. Remember it's exponential, so it grows a little slower at first, and then faster and faster over time. So, it's gonna take a little bit over half to do half the work in the beginning, but then it goes quicker and quicker. So it makes sense that we had more towards five minutes than zero minutes.