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[[MA_598R_pweigel_Summer_2009_Lecture_7]]
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[[Category:MA598RSummer2009pweigel]]
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[[Category:MA598]]
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[[Category:math]]
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[[Category:problem solving]]
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[[Category:real analysis]]
  
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=The Ninja Solutions=
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(for [[MA_598R_pweigel_Summer_2009_Lecture_7|Assignment 7]])
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----
 
[[MA598R 7.1]]
 
[[MA598R 7.1]]
  
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[[MA598R 7.3]]
 
[[MA598R 7.3]]
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[[MA598R 7.6]]
  
 
[[MA598R 7.7]]
 
[[MA598R 7.7]]
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[[MA598R 7.14]]
 
[[MA598R 7.14]]
  
[https://kiwi.ecn.purdue.edu/rhea/images/3/35/3666_001.pdf MA598R 7. 5,6,9,12,13,4a‎]
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[[Media:3666_001.pdf| MA598R 7. 5,6,9,12,13,4a‎]]
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----
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'''Judgment Day'''
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1. Good.  Points: 1/1
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2. Good.  Points: 2/2
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3. Good.  Points: 3/3
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4. a) Good. POINTS: 3.5/4
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5.  Good.  POINTS: 4.5/5
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6. Excellent. POINTS: 5.5/6
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7.  Good.  POINTS: 6.5/7
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8.  Excellent.  POINTS: 7.5/8
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9.  Good.  POINTS: 8.5/9
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10.  Good.  POINTS: 9.5/10
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11.  You need some explanation why all the sines disappear.  Also, you have to show that <math>\phi(\xi)</math> is differentiable!  You won't get away with passing limits inside integrals on the qual. 
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POINTS: 9.5/11
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12.  Awesome.  POINTS: 10.5/12
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13. a) You definitely need that <math>\hat{f}</math> is continuous for any of this to make sense.  On the qual, they will be testing your knowledge of the definition of the L-infinity norm. 
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  b) As noted, more work is needed.
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POINTS: 10.5/13
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14) Good.  POINTS:11.5/14
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TOTAL POINTS: 11.5/14
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----
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[[MA_598R_pweigel_Summer_2009_Lecture_7|Back to Assignment 7]]
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[[MA598R_%28WeigelSummer2009%29|Back to MA598R Summer 2009]]

Latest revision as of 04:58, 11 June 2013


The Ninja Solutions

(for Assignment 7)


MA598R 7.1

MA598R 7.2

MA598R 7.3

MA598R 7.6

MA598R 7.7

MA598R 7.8

MA598R 7.10

MA598R 7.11

MA598R 7.14

MA598R 7. 5,6,9,12,13,4a‎



Judgment Day

1. Good. Points: 1/1

2. Good. Points: 2/2

3. Good. Points: 3/3

4. a) Good. POINTS: 3.5/4

5. Good. POINTS: 4.5/5

6. Excellent. POINTS: 5.5/6

7. Good. POINTS: 6.5/7

8. Excellent. POINTS: 7.5/8

9. Good. POINTS: 8.5/9

10. Good. POINTS: 9.5/10

11. You need some explanation why all the sines disappear. Also, you have to show that $ \phi(\xi) $ is differentiable! You won't get away with passing limits inside integrals on the qual. POINTS: 9.5/11

12. Awesome. POINTS: 10.5/12

13. a) You definitely need that $ \hat{f} $ is continuous for any of this to make sense. On the qual, they will be testing your knowledge of the definition of the L-infinity norm.

  b) As noted, more work is needed.

POINTS: 10.5/13

14) Good. POINTS:11.5/14

TOTAL POINTS: 11.5/14


Back to Assignment 7

Back to MA598R Summer 2009

Alumni Liaison

has a message for current ECE438 students.

Sean Hu, ECE PhD 2009