1 / 34

Bruce Mayer, PE Licensed Electrical & Mechanical Engineer BMayer@ChabotCollege.edu

Chabot Mathematics. §9.2 1st Order ODEs. Bruce Mayer, PE Licensed Electrical & Mechanical Engineer BMayer@ChabotCollege.edu. 9.1. Review §. Any QUESTIONS About §9.1 → Variable Separable Ordinary Differential Equations Any QUESTIONS About HomeWork §9.1 → HW-13. §9.2 Learning Goals.

kapila
Download Presentation

Bruce Mayer, PE Licensed Electrical & Mechanical Engineer BMayer@ChabotCollege.edu

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript

  1. Chabot Mathematics §9.2 1stOrder ODEs Bruce Mayer, PE Licensed Electrical & Mechanical EngineerBMayer@ChabotCollege.edu

  2. 9.1 Review § • Any QUESTIONS About • §9.1 → Variable Separable Ordinary Differential Equations • Any QUESTIONS About HomeWork • §9.1 → HW-13

  3. §9.2 Learning Goals • Solve first-order linear differential equations and • Initial Value Problems (IVP) • Boundary Value Problems (BVP) • Explore compartmentalanalysis with applicationsto finance, drug administration, and dilution models.

  4. FirstOrder, Linear ODE • The General form of a First Order, Linear Ordinary Differential Equation • Solve the General Equation with Integrating Factor • Let • Then the ODESolution

  5. Quick Example • Find Solution to ODE: • The IntegratingFactor → • Thus theSolution

  6. Example  Solve • Find the Particular Solution for ODE: • Subject to Initial Value: • SOLUTION: • Note that this Eqn is NOT Variable Separable, so ReWrite in General Form

  7. Example  Solve • Then the IntegratingFactor: • Now Let • Then • Using u and du in integrating Factor • Now t2+1 is always positive so:

  8. Example  Solve • Using this Integrating Factor find: • Using u and du from before

  9. Example  Solve • Then the General Solution by Back SubStitution • ReCall the Initial Condition (IC) • Using IC in Solution

  10. Example  Solve • Finally the Full General Solution

  11. I(x) → How Does it Work? • Multiplication of Both Sides of the ODE by I(x) changes ODE appearance • For Solution This must be of the form

  12. I(x) → How Does it Work? • So that by the PRODUCT Rule • ReCall the I(x) multiplied ODE L.H.S. • Thus by Correspondence need

  13. I(x) → How Does it Work? • Then by Substitution • Then the I(x) multiplied ODE • Which is VARIABLE SEPARABLE

  14. I(x) → How Does it Work? • Or • Then Let: • Using u in the Variable Separated ODE • BackSubbing for u • Let −C1 = +C Q.E.D.

  15. No Need for Memorization • Do Need toMemorize • Only need to find a good I(x) to multiply the ODE so that by the PRODUCT Rule the L.H.S.: • Then can Separate the Variables and Integrate

  16. Key to Integrating Factor • Need • Then • Assumes, withOUT loss of generality, that the Constant of Integration is Zero • So Finally the Integrating-Factor Formula

  17. Key to Integrating Factor • For Solution Need: • Next Integrate this ODE • Then • Assumes, withOUT loss of generality, that the Constant of Integration is Zero • So Finally the Integrating-Factor Formula

  18. Example  Dilution over Time • A 60-gallon barrel containing 20 gallons of simple syrup at 1:1 sugar-to-water ratio is being stirred and filled with pure sugar at a rate of 1 gallon per minute. Unfortunately, a crack in the bottom of the barrel is leaking solution at a rate of 4 oz per minute. • After how long will there be 40 gallons of Pure Sugar in the barrel?

  19. Example  Dilution over Time • SOLUTION: • First to set up an equation to model the quantity of sugar in the barrel over time, • Next solve this eqn and find the time at which the desired quantity occurs. • A general Mass Balance for a “Control Volume” • Storage Rate =InFlow − OutFlow Storage InFlow OutFlow

  20. Example  Dilution over Time • The Pure Sugar Mass Balance Statement • The Model above accounts for modeling the change in pure-sugar quantity, the inflow is 1 Gallon per Minute (1 gpm) or 128 oz per minute.

  21. Example  Dilution over Time • The outflow is of the mixed solution, so it leaks at a rate of 4 oz/min, with total quantity of sugar Q(t) and total quantity of solution equal to: • So the concentration of OutFlowing Syrup:

  22. Example  Dilution over Time • Now we express the differential equation for the rate of change in sugar quantity: • This ODE is first-order and linear, so it can solved using the general strategy.

  23. Example  Dilution over Time • Calculate the Integrating Factor for the ODE • Then the form of the solution

  24. Example  Dilution over Time • Use the IC to find the Constant Value • Initially there is a 1:1 ratio of water to sugar, so exactly half of the 20 gallons, or 10 gallons (1280 oz), is sugar. Use this Data-Point to find the value of C:

  25. Example  Dilution over Time • Finally, find the time at which there are 40 gallons of sugar in the barrel, which happens when y = 40*128 = 5120 oz.

  26. Example  Dilution over Time • This a transcendental (NonAlgebraic) eqn for which there is NO exact solution • Solve using the MuPAD Computer Algebra System (CAS): • In other words, after about 32.6 minutes of pouring and mixing, there will be 20 gallons of pure sugar in the barrel.

  27. MuPAD Calculation • tsoln := 124*t - 5100 + 1327.14/(5+31*t)^(1/31) • numeric::solve(tsoln)

  28. WhiteBoard Work • Problems From §9.2 • P51Glacier IceRemovalRate

  29. All Done for Today Linear1st OrderODEs

  30. Chabot Mathematics Appendix Do On Wht/BlkBorad Bruce Mayer, PE Licensed Electrical & Mechanical EngineerBMayer@ChabotCollege.edu –

More Related