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Chem 302 Math 252
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Chem 302 - Math 252. Chapter 6. Differential Equations. Differential Equations. Many problems in physical chemistry (eg. ... Many simpler problems can be solved ... – PowerPoint PPT presentation
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Title: Chem 302 Math 252
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Chem 302 - Math 252
- Chapter 6Differential Equations
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Differential Equations
- Many problems in physical chemistry (eg.
kinetics, dynamics, theoretical chemistry)
require solution to a differential equation - Many can not be solved analytically
- Deal only with first order ODE
- Higher order equations can be reduced to a system
of 1st order DE
3
Differential Equations
- Simplest form
- Can integrate analytically or numerically (using
techniques of Chapter 4)
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Differential Equations
- General case
- Many simpler problems can be solved analytically
- Many involve ex
- However, in chemistry (physics engineering)
many problems have to be solved numerically (or
approximately)
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Picard Method
- Can not integrate exactly because integrand
involves y - Approximate iteratively by using approximations
for y
- Continue to iterate until a desire level of
accuracy is obtained in y - Often gives a power series solution
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Picard Method Example
- Continue to iterate until a desire level of
accuracy is obtained in y
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Picard Method Example 2
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Euler Method
- Assume linear between 2 consecutive points
- Between initial point and 1st (calculated) point
- User selects Dx
- Need to be careful - too big or too small can
cause problems
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Euler Method Example
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Taylor Method
- Based on Taylor expansion
Euler method is Taylor method of order 1
Use chain rule
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Taylor Method Example
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Improved Euler (Heuns) Method
- Euler Method
- Use constant derivative between points i i1
- calculated at xi
- Better to use average derivative across the
interval
- yi1 is not known
Predict Correct(can repeat)
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Improved Euler Method Example
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Modified Euler Method
- Modified Euler Method
- Use derivative halfway between points i i1
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Modified Euler Method Example
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Runge-Kutta Methods
- Improved and Modified Euler Methods are special
cases - 2nd order Runge-Kutta
- 4th order Runge-Kutta
- Runge
- Kutta
- Runge-Kutta-Gill
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Runge Methods
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Kutta Methods
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Runge-Kutta-Gill Methods
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Systems of Equations
- All the previous methods can be applied to
systems of differential equations - Only illustrate the Runge method
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Systems of Equations Example 1
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Systems of Equations Example 2
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Systems of Equations Example 3
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Systems of Equations Example 4
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Systems of Equations Example 5
