4.3 Separable equations  (Page 5/8)

[T] For the preceding problem, find how much salt is in the tank $1$ hour after the process begins.

Torricelli’s law states that for a water tank with a hole in the bottom that has a cross-section of $A$ and with a height of water $h$ above the bottom of the tank, the rate of change of volume of water flowing from the tank is proportional to the square root of the height of water, according to $\frac{dV}{dt}=\text{−}A\sqrt{2gh},$ where $g$ is the acceleration due to gravity. Note that $\frac{dV}{dt}=A\frac{dh}{dt}.$ Solve the resulting initial-value problem for the height of the water, assuming a tank with a hole of radius $2$ ft. The initial height of water is $100$ ft.

For the preceding problem, determine how long it takes the tank to drain.

The liquid base of an ice cream has an initial temperature of $200\text{°}\text{F}$ before it is placed in a freezer with a constant temperature of $0\text{°}\text{F}\text{.}$ After $1$ hour, the temperature of the ice-cream base has decreased to $140\text{°}\text{F}\text{.}$ Formulate and solve the initial-value problem to determine the temperature of the ice cream.

[T] The liquid base of an ice cream has an initial temperature of $210\text{°}\text{F}$ before it is placed in a freezer with a constant temperature of $20\text{°}\text{F}\text{.}$ After $2$ hours, the temperature of the ice-cream base has decreased to $170\text{°}\text{F}\text{.}$ At what time will the ice cream be ready to eat? (Assume $30\text{°}\text{F}$ is the optimal eating temperature.)

[T] You are organizing an ice cream social. The outside temperature is $80\text{°}\text{F}$ and the ice cream is at $10\text{°}\text{F}\text{.}$ After $10$ minutes, the ice cream temperature has risen by $10\text{°}\text{F}\text{.}$ How much longer can you wait before the ice cream melts at $40\text{°}\text{F?}$

You have a cup of coffee at temperature $70\text{°}\text{C}$ and the ambient temperature in the room is $20\text{°}\text{C}\text{.}$ Assuming a cooling rate $k\text{of}0.125,$ write and solve the differential equation to describe the temperature of the coffee with respect to time.

[T] You have a cup of coffee at temperature $70\text{°}\text{C}$ that you put outside, where the ambient temperature is $0\text{°}\text{C}\text{.}$ After $5$ minutes, how much colder is the coffee?

You have a cup of coffee at temperature $70\text{°}\text{C}$ and you immediately pour in $1$ part milk to $5$ parts coffee. The milk is initially at temperature $1\text{°}\text{C}\text{.}$ Write and solve the differential equation that governs the temperature of this coffee.

You have a cup of coffee at temperature $70\text{°}\text{C},$ which you let cool $10$ minutes before you pour in the same amount of milk at $1\text{°}\text{C}$ as in the preceding problem. How does the temperature compare to the previous cup after $10$ minutes?

Solve the generic problem $y\prime =ay+b$ with initial condition $y(0)=c.$

Prove the basic continual compounded interest equation. Assuming an initial deposit of $P_0$ and an interest rate of $r,$ set up and solve an equation for continually compounded interest.

Assume an initial nutrient amount of $I$ kilograms in a tank with $L$ liters. Assume a concentration of $c$ kg/L being pumped in at a rate of $r$ L/min. The tank is well mixed and is drained at a rate of $r$ L/min. Find the equation describing the amount of nutrient in the tank.

Leaves accumulate on the forest floor at a rate of $2$ g/cm ² /yr and also decompose at a rate of $90\text{\%}$ per year. Write a differential equation governing the number of grams of leaf litter per square centimeter of forest floor, assuming at time $0$ there is no leaf litter on the ground. Does this amount approach a steady value? What is that value?

Leaves accumulate on the forest floor at a rate of $4$ g/cm ² /yr. These leaves decompose at a rate of $10\text{\%}$ per year. Write a differential equation governing the number of grams of leaf litter per square centimeter of forest floor. Does this amount approach a steady value? What is that value?