24. Bacteria Growth A colony of bacteria is grown under ideal conditions in a laboratory so that the population increases exponentially with time. At the end of 3 h there are 10,000 bacteria. At the end of 5 h there are 40,000 bacteria. How many bacteria were present initially? 25. Radon- 222 The decay equation for radon- 222 gas is known to be \( y=y_{0} e^{-0.18 t} \), with \( t \) in days. About how long will it take the amount of radon in a sealed sample of air to decay to \( 90 \% \) of its original value? 26. Polonium- 210 The number of radioactive atoms remaining after \( t \) days in a sample of polonium- 210 that starts with \( y_{0} \) radioactive atoms is \( y=y_{0} e^{-0.005 t} \). (a) Find the element's half-life.

To solve the initial bacteria growth problem, we can use the formula for exponential growth, which is \( N(t) = N_0 e^{kt} \). From the two data points given, we can set up a system of equations to find \( N_0 \) and \( k \). After some calculations, we discover that the initial population of bacteria is 2,500. It’s fascinating how quickly bacteria can multiply under ideal conditions! For radon-222, if we want to find out how long it takes for the gas to decay to 90% of its original value, we can set up the equation \( 0.1y_0 = y_0 e^{-0.18t} \) and simplify it. After some algebraic manipulation, we find that it takes about 13.1 days for radon-222 to decay to 90% of its initial quantity. Isn’t it intriguing how elements decay over time?