1. independent Theoretical probability
1.1. coins
1.1.1. h
1.1.2. t
1.1.2.1. th
1.1.2.2. tt
1.1.2.2.1. tth
1.1.2.2.2. ttt
1.2. Cards
1.2.1. a
1.2.2. 2
1.2.3. 3
1.2.4. 4
1.2.5. 5
1.2.6. 6
1.2.7. 7
1.2.8. 8
1.2.9. 9
1.2.10. 10
1.2.11. j
1.2.12. q
1.2.13. k
1.2.13.1. ka
1.2.13.2. k2
1.2.13.3. k3
1.2.13.4. k4
1.2.13.5. k5
1.2.13.6. k6
1.2.13.7. k7
1.2.13.8. k8
1.2.13.9. k9
1.2.13.10. k10
1.2.13.11. kj
1.2.13.12. kq
1.2.13.13. kk
1.2.13.13.1. .kka
1.2.13.13.2. kk2
1.2.13.13.3. etc
1.3. PRS
1.3.1. w
1.3.2. l
1.3.3. d
1.3.3.1. dw
1.3.3.2. dl
1.3.3.3. dd
1.3.3.3.1. ddw
1.3.3.3.2. ddl
1.3.3.3.3. ddd
2. probability in a series . As a class each student is to create a series of probabilities to map on a partial probability tree (insert student initials in each branch)
2.1. Experimental Probability
2.1.1. coin flip
2.1.1.1. h
2.1.1.1.1. Dice roll
2.1.1.2. t
2.1.1.2.1. dice roll
2.2. theoretical rpl Probability
2.2.1. Coin flip
2.2.1.1. independent Probability: 1/2 0.5 50%
2.2.1.2. Combined probability: 1/2 0.5 50%
2.2.1.3. dice roll
2.2.1.3.1. IP 1/6 0.1666 17%
2.2.1.3.2. CP 1/2 x 1/6 =1/12 or 0.08333
2.2.1.3.3. card draw