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Jeopardy!. April 2008. Office hours. Friday 12-2 in Everett 5525 Monday 2-4 in Everett 5525 Or Email for appointment Final is Tuesday 12:30 here!!!. Rules. Pick a group of two to six members When ready to answer, make a noise + raise your hand

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Jeopardy l.jpg

Jeopardy!

April 2008


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Office hours

  • Friday 12-2 in Everett 5525

  • Monday 2-4 in Everett 5525

  • Or Email for appointment

  • Final is Tuesday 12:30 here!!!


Rules l.jpg
Rules

  • Pick a group of two to six members

  • When ready to answer, make a noise + raise your hand

  • When it is unclear which group was ready first, the group who has answered a question least recently gets precedence (if none of the groups has answered a question, its instructor’s choice)

  • Your answer must be in the form of a question

  • The person from your group answering the question will be chosen at random

  • If you answer correctly, you get the points

  • If you answer incorrectly, you do not lose points. Other groups can answer, but your group cannot answer that question again

  • The group which answers the question correctly chooses the next category

  • If we have time for a final question, you will bet on your ability to answer the question


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final

Existence

Uniqueness

100

200

300

400

500

Solution

Methods

100

200

300

400

500

Linear

Algebra

100

200

300

400

500

Laplace

Transform

100

200

300

400

500


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Existence/Uniqueness

return

Conditions necessary near x=a

for the existence of a unique solution for


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return

Existence/Uniqueness

Conditions necessary

near x=a

for the existence of a unique solution for


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Existence/Uniqueness

return

Conditions necessary

near t=a

for the existence of a unique solution for


Existence uniqueness8 l.jpg

return

Existence/Uniqueness

Conditions necessary near x=a

for the existence of a unique solution for


Existence uniqueness9 l.jpg

return

Existence/Uniqueness

Conditions necessary near x=a

for the existence of a unique solution for


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Solution Methods

return

A method you would use to solve

Chose your solution from the methods we have discussed:

Integrate both sides using calculus II techniques Separation of Variable Integrating Factor Characteristic equation Characteristic equation/Method of Undetermined Coefficients Characteristic equation/Variation of Parameters Transform into a system of linear equations/matrix methods Laplace Transform Power Series Methods


Solution methods11 l.jpg
Solution Methods

return

A method you would use to solve

Chose your solution from the methods we have discussed:

Integrate both sides using calculus II techniques Separation of Variable Integrating Factor Characteristic equation Characteristic equation/Method of Undetermined Coefficients Characteristic equation/Variation of Parameters Transform into a system of linear equations/matrix methods Laplace Transform Power Series Methods


Solution methods12 l.jpg
Solution Methods

return

A method you would use to solve

Chose your solution from the methods we have discussed:

Integrate both sides using calculus II techniques Separation of Variable Integrating Factor Characteristic equation Characteristic equation/Method of Undetermined Coefficients Characteristic equation/Variation of Parameters Transform into a system of linear equations/matrix methods Laplace Transform Power Series Methods


Solution methods13 l.jpg

return

Solution Methods

A method you would use to solve

Chose your solution from the methods we have discussed:

Integrate both sides using calculus II techniques Separation of Variable Integrating Factor Characteristic equation Characteristic equation/Method of Undetermined Coefficients Characteristic equation/Variation of Parameters Transform into a system of linear equations/matrix methods Laplace Transform Power Series Methods


Solution methods14 l.jpg

return

Solution Methods

A method you would use to solve

Chose your solution from the methods we have discussed:

Integrate both sides using calculus II techniques Separation of Variable Integrating Factor Characteristic equation Characteristic equation/Method of Undetermined Coefficients Characteristic equation/Variation of Parameters Transform into a system of linear equations/matrix methods Laplace Transform Power Series Methods


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return

Linear Algebra

The inverse of


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return

Linear Algebra

The eigenvalues and eigenvectors of


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return

Linear Algebra

The number of solutions to all equations below


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return

Linear Algebra

The solution(s) to both equations below


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return

Linear Algebra

A basis for the solution space of both equations below


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return

Laplace Transform

The Laplace Transform of


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return

Laplace Transform

The Inverse Laplace Transform of


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return

Laplace Transform

The Inverse Laplace Transform of


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return

Laplace Transform

Laplace transform of x if x solves


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return

Laplace Transform

Inverse Laplace transform of


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Final Question

The Laplace transform of


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