CME12, 2012.07.04. – Rzeszów, Poland Gergely Wintsche Generalization through problem solving Gergely Wintsche Mathematics Teaching and Didactic Center Faculty of Science Eötvös Loránd University, Budapest Part III.-IV. Probability through statistics
CME12, 2012.07.04. – Rzeszów, Poland Gergely Wintsche Generalization through problem solving Gergely Wintsche Mathematics Teaching and Didactic Center.
Dec 17, 2015
Welcome message from author
This document is posted to help you gain knowledge. Please leave a comment to let me know what you think about it! Share it to your friends and learn new things together.
Transcript
- Slide 1
- CME12, 2012.07.04. Rzeszw, Poland Gergely Wintsche Generalization through problem solving Gergely Wintsche Mathematics Teaching and Didactic Center Faculty of Science Etvs Lornd University, Budapest
- Slide 2
- Gergely Wintsche Outline 1. Back to the future 2. Experiments 3. Head runs 4. Ordering the probabilities Part III / 2 Probability, experiments, statistic
- Slide 3
- Gergely WintschePart III / 3 Probability, experiments, statistic Back to the future Tomatoes
- Slide 4
- Gergely WintschePart III / 4 Probability, experiments, statistic Inheritance Tomatoes
- Slide 5
- Gergely WintschePart III / 5 Probability, experiments, statistic Experiments Die
- Slide 6
- Gergely WintschePart III / 6 Probability, experiments, statistic Experiments Die
- Slide 7
- Gergely WintschePart III / 7 Probability, experiments, statistic Head runs Head or Tails Click here to play movie
- Slide 8
- Gergely WintschePart III / 8 Probability, experiments, statistic Head runs Exactly k long head run 0123 n long series 111 2121 31421
- Slide 9
- Gergely WintschePart III / 9 Probability, experiments, statistic Head runs Exactly k long head run 0123456 n long series 111 2121 31421 417521 511211521 61202312521
- Slide 10
- Gergely WintschePart III / 10 Probability, experiments, statistic Head runs Head run Exactly k long head run 0123456 n long series 01 112 2134 31578 418131516 511324293132 61214456616364
- Slide 11
- Gergely WintschePart III / 11 Probability, experiments, statistic Head runs
- Slide 12
- Gergely WintschePart III / 12 Probability, experiments, statistic Head runs Exactly k long head run 0123456 n long series 01 112 2134 31578 418131516 511324293132 61214456616364
- Slide 13
- Gergely WintschePart III / 13 Probability, experiments, statistic Head runs n012345678 A n (3)1248152956108208
- Slide 14
- Gergely WintschePart III / 14 Probability, experiments, statistic Head runs Heads or tails THTTTHTTHH DDSSDDSDS
- Slide 15
- Gergely WintschePart III / 15 Probability, experiments, statistic Head runs Head or tails / average
- Slide 16
- Gergely WintschePart III / 16 Probability, experiments, statistic Head runs Which dice is better
- Slide 17
- Gergely WintschePart III / 17 Probability, experiments, statistic Head runs Which series are better
- Slide 18
- Gergely WintschePart III / 18 Probability, experiments, statistic Head runs Which series are better START HT HT 1/2
- Slide 19
- Gergely WintschePart III / 19 Probability, experiments, statistic Head runs Which series are better
- Slide 20
- Gergely WintschePart III / 20 Probability, experiments, statistic Head runs Which series are better START HT H T HH HTT HHT P1P1 P2P2 P3P3 P4P4 P i denotes that Andrew is here and win.
- Slide 21
- Gergely WintschePart III / 21 Probability, experiments, statistic Head runs Which series are better
- Slide 22
- Gergely WintschePart III / 22 Probability, experiments, statistic Head runs Which series are better START 7 12 29/36 1/36 6/36 29/36 12 7 1/36 6/36
Related Documents
