Presentation is loading. Please wait.

Presentation is loading. Please wait.

Examples Lecture Three Plan Pros and cons of logistic model Checking the solution The method of integrating factors Differentiation from first principles.

Published byOscar Porter Modified over 8 years ago

Similar presentations

Presentation on theme: "Examples Lecture Three Plan Pros and cons of logistic model Checking the solution The method of integrating factors Differentiation from first principles."— Presentation transcript:

1 Examples Lecture Three Plan Pros and cons of logistic model Checking the solution The method of integrating factors Differentiation from first principles (no longer required so will not cover)

2 Advantages and disadvantages of Logistic Growth Advantages and disadvantages of Logistic Growth 1) Simple 2) Includes density dependence 3) Can solve analytically to find Y(t) 4) Can be derived from plausible biological assumptions 5) Parameters mean something 5) Reflects sigmoidal pattern often seen in nature 6) Good starting point for more complex models 1) Arguably over-symmetric about t = , Y = K/2 2) Only linear density dependence 3) Constant parameters in time 4) No population structure (eg. age, sex,…) 5) No stochasticity 6) No spatial effects 7) Continuous reproduction 8) Instantaneous responses (i.e. no delay terms) PROS CONS

3 Solution of the logistic growth equation Population size Time (arbitrary units)

4 Stochasticity: one replicate Population size Time (arbitrary units)

5 Stochasticity: many replicates Population size Time (arbitrary units)

6 Problem with instantaneous responses One nice interpretation of logistic growth is as Note that dY/dt depends on population size Y at time t Easy to concoct examples where rate of births/deaths depends on popn some time ago, i.e. Y(t-  ), where  is a delay Gestation period Delay in effect of competition

7 Integrating Factors (Formula Sheet p7)

8 Differentiation from first principles What does it mean when we say that if y = x 2 then dy/dx = 2x? Really a statement about the slope of the tangent

9 The definition of the derivative of a function y(x) is in fact Gives a recipe for calculating the slope of the tangent in terms of a limit that can be calculated using the equation y(x) Differentiation from first principles INSERT SUITABLE PICTURE!!!

10 Differentiation from first principles:  x = 2

11 Differentiation from first principles:  x = 1

12 Differentiation from first principles:  x = 0.5

13 Differentiation from first principles:  x = 0.01

Download ppt "Examples Lecture Three Plan Pros and cons of logistic model Checking the solution The method of integrating factors Differentiation from first principles."

Similar presentations

This theorem allows calculations of area using anti-derivatives. What is The Fundamental Theorem of Calculus?

This theorem allows calculations of area using anti-derivatives. What is The Fundamental Theorem of Calculus?
Equations of Tangent Lines

Equations of Tangent Lines
Copyright © 2011 Pearson Education, Inc. Slide 12.4-1 12.4 Tangent Lines and Derivatives A tangent line just touches a curve at a single point, without.

Copyright © 2011 Pearson Education, Inc. Slide Tangent Lines and Derivatives A tangent line just touches a curve at a single point, without.
Derivatives - Equation of the Tangent Line Now that we can find the slope of the tangent line of a function at a given point, we need to find the equation.

Derivatives - Equation of the Tangent Line Now that we can find the slope of the tangent line of a function at a given point, we need to find the equation.
Basic Derivatives The Math Center Tutorial Services Brought To You By:

Basic Derivatives The Math Center Tutorial Services Brought To You By:
COMPUTER MODELS IN BIOLOGY Bernie Roitberg and Greg Baker.

COMPUTER MODELS IN BIOLOGY Bernie Roitberg and Greg Baker.
IMPLICIT DIFFERENTIATION AND RELATED RATES

IMPLICIT DIFFERENTIATION AND RELATED RATES
Differential Equations (4/17/06) A differential equation is an equation which contains derivatives within it. More specifically, it is an equation which.

Differential Equations (4/17/06) A differential equation is an equation which contains derivatives within it. More specifically, it is an equation which.
Clicker Question 1 What is an equation of the tangent line to the curve f (x ) = x 2 at the point (1, 1)? A. y = 2x B. y = 2 C. y = 2x 2 D. y = 2x + 1.

Clicker Question 1 What is an equation of the tangent line to the curve f (x ) = x 2 at the point (1, 1)? A. y = 2x B. y = 2 C. y = 2x 2 D. y = 2x + 1.
ENGG2013 Unit 22 Modeling by Differential Equations Apr, 2011.

ENGG2013 Unit 22 Modeling by Differential Equations Apr, 2011.
2.5 Implicit Differentiation. Implicit and Explicit Functions Explicit FunctionImplicit Function But what if you have a function like this…. To differentiate:

2.5 Implicit Differentiation. Implicit and Explicit Functions Explicit FunctionImplicit Function But what if you have a function like this…. To differentiate:
1 6.3 Separation of Variables and the Logistic Equation Objective: Solve differential equations that can be solved by separation of variables.

1 6.3 Separation of Variables and the Logistic Equation Objective: Solve differential equations that can be solved by separation of variables.
Implicit Differentiation. Objectives Students will be able to Calculate derivative of function defined implicitly. Determine the slope of the tangent.

Implicit Differentiation. Objectives Students will be able to Calculate derivative of function defined implicitly. Determine the slope of the tangent.
1Chapter 2. 2 Example 3Chapter 2 4 EXAMPLE 5Chapter 2.

1Chapter 2. 2 Example 3Chapter 2 4 EXAMPLE 5Chapter 2.
1 The Derivative and the Tangent Line Problem Section 2.1.

1 The Derivative and the Tangent Line Problem Section 2.1.
Section 6.1: Euler’s Method. Local Linearity and Differential Equations Slope at (2,0): Tangent line at (2,0): Not a good approximation. Consider smaller.

Section 6.1: Euler’s Method. Local Linearity and Differential Equations Slope at (2,0): Tangent line at (2,0): Not a good approximation. Consider smaller.
3.9: Derivatives of Exponential and Log Functions Objective: To find and apply the derivatives of exponential and logarithmic functions.

3.9: Derivatives of Exponential and Log Functions Objective: To find and apply the derivatives of exponential and logarithmic functions.
9 Differential Equations. 9.1 Modeling with Differential Equations.

9 Differential Equations. 9.1 Modeling with Differential Equations.
Every slope is a derivative. Velocity = slope of the tangent line to a position vs. time graph Acceleration = slope of the velocity vs. time graph How.

Every slope is a derivative. Velocity = slope of the tangent line to a position vs. time graph Acceleration = slope of the velocity vs. time graph How.
Economics 2301 Lecture 15 Differential Calculus. Difference Quotient.

Economics 2301 Lecture 15 Differential Calculus. Difference Quotient.

Similar presentations

Ads by Google