Textbook Question
Explain why or why not Determine whether the following statements are true and give an explanation or counterexample.
a. The differential equation y′+2y=t is first-order, linear, and separable.
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Ch. 9 - Differential Equations
Briggs3rd EditionCalculus: Early TranscendentalsISBN: 9780136847243
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Table of contents
- Ch. 1 - Functions210
- Ch. 2 - Limits371
- Ch. 3 - Derivatives633
- Ch. 4 - Applications of the Derivative412
- Ch. 5 - Integration328
- Ch. 6 - Applications of Integration331
- Ch. 7 - Logarithmic, Exponential Functions, and Hyperbolic Functions177
- Ch. 8 - Integration Techniques394
- Ch. 9 - Differential Equations179
- Ch. 10 - Sequences and Infinite Series339
- Ch. 11 - Power Series218
- Ch.12 - Parametric and Polar Curves215
Briggs3rd EditionCalculus: Early TranscendentalsISBN: 9780136847243Not the one you use?Change textbook
Chapter 9, Problem 9.RE.29c
Stirred tank reaction A 100-L tank is filled with pure water when an inflow pipe is opened and a sugar solution with a concentration of 20 gm/L flows into the tank at a rate of 0.5 L/min. The solution is thoroughly mixed and flows out of the tank at a rate of 0.5 L/min.
c. At what time does the mass of sugar reach 95% of its steady-state level?
Verified step by step guidance1
Define the variable \( m(t) \) as the mass of sugar (in grams) in the tank at time \( t \) minutes. Since the tank volume is constant at 100 L, the concentration in the tank at time \( t \) is \( \frac{m(t)}{100} \) gm/L.
Set up the differential equation for the mass of sugar in the tank. The rate of change of mass \( \frac{dm}{dt} \) equals the rate of sugar entering minus the rate of sugar leaving:
\[ \frac{dm}{dt} = (\text{inflow rate}) \times (\text{inflow concentration}) - (\text{outflow rate}) \times (\text{tank concentration}) \]
Substitute the given values:
\[ \frac{dm}{dt} = 0.5 \times 20 - 0.5 \times \frac{m(t)}{100} \]
Simplify the differential equation to standard linear form:
\[ \frac{dm}{dt} = 10 - \frac{m(t)}{200} \]
Solve this first-order linear differential equation with the initial condition \( m(0) = 0 \) (since the tank starts with pure water). The solution will be of the form:
\[ m(t) = \text{steady-state mass} \times \left(1 - e^{-kt}\right) \]
where \( k \) is a positive constant related to the outflow rate and volume.
Determine the steady-state mass by setting \( \frac{dm}{dt} = 0 \) and solve for \( m \). Then, find the time \( t \) when \( m(t) \) reaches 95% of this steady-state value by solving:
\[ m(t) = 0.95 \times m_{steady-state} \]
Use the expression for \( m(t) \) to isolate \( t \).
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Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
First-Order Linear Differential Equations
This problem involves modeling the change in sugar mass over time using a first-order linear differential equation. The rate of change depends on the inflow concentration and the outflow rate, leading to an equation that can be solved to find the sugar mass as a function of time.
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Classifying Differential Equations
Steady-State Concentration
The steady-state occurs when the amount of sugar in the tank no longer changes, meaning inflow and outflow rates balance. Calculating this steady-state value provides a reference point to determine when the system reaches a certain percentage of this equilibrium.
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03:38Intro to Continuity Example 1
Exponential Approach to Equilibrium
The solution to the differential equation shows that the sugar mass approaches steady-state exponentially over time. Understanding this exponential behavior allows us to calculate the time required for the mass to reach a specific fraction (e.g., 95%) of the steady-state value.
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5:46Graphs of Exponential Functions
Related Practice
Textbook Question
Logistic growth in India The population of India was 435 million in 1960 (t=0) and 487 million in 1965 (t=5). The projected population for 2050 is 1.57 billion.
b. Use the solution of the logistic equation and the 2050 projected population to determine the carrying capacity.
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Textbook Question
2–10. General solutions Use the method of your choice to find the general solution of the following differential equations.
y′(t) = √(y/t)
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Textbook Question
38–43. Equilibrium solutions A differential equation of the form y′(t)=f(y) is said to be autonomous (the function f depends only on y). The constant function y=y0 is an equilibrium solution of the equation provided f(y0)=0 (because then y'(t)=0 and the solution remains constant for all t). Note that equilibrium solutions correspond to horizontal lines in the direction field. Note also that for autonomous equations, the direction field is independent of t. Carry out the following analysis on the given equations.
a. Find the equilibrium solutions.
y′(t) = y(2 - y)
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Textbook Question
Explain why or why not Determine whether the following statements are true and give an explanation or counterexample.
d. The direction field for the differential equation y′(t)=t+y(t) is plotted in the ty-plane.
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Textbook Question
Logistic growth The population of a rabbit community is governed by the initial value problem
P′(t) = 0.2 P (1 − P/1200), P(0) = 50
d. What is the population when the growth rate is a maximum?
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