A portfolio with a 25% standard deviation generated a return of 15% last year when T-bills were paying 4.5%. This portfolio had a Sharpe ratio of. (15-4.5)/25= 0.42. The Bill Series 5 Episode 4 The Mugging And The Gypsies. Download this app from Microsoft Store for Windows 10, Windows 8.1, Windows 10 Team (Surface Hub). See screenshots, read the latest customer reviews, and compare ratings for Bill Dashboard.
CS/CS/SB 412: License Plates
GENERAL BILL by Appropriations ; Infrastructure and Security ; Bean ; (CO-INTRODUCERS) Harrell ; Broxson
License Plates; Providing an exception to a design requirement for dealer license plates and for fleet license plates; allowing the Department of Highway Safety and Motor Vehicles to authorize dealer and fleet specialty license plates; providing additional procedures and requirements for discontinuing issuance of a specialty license plate; providing for a special license plate to be issued to a recipient of the Bronze Star, etc.
Last Action: 3/11/2020 Senate - Laid on Table, companion bill(s) passed, see CS/HB 387 (Ch. 2020-176), HB 1135 (Ch. 2020-181) -SJ 709
Bill Text:Web Page | PDF
- Infrastructure and Security (IS)
- Appropriations (AP)
Bill History
| Date | Chamber | Action |
|---|---|---|
| 10/1/2019 | Senate | • Filed |
| 10/15/2019 | Senate | • Referred to Infrastructure and Security; Appropriations; Rules -SJ 32 |
| 1/14/2020 | Senate | • Introduced -SJ 32 |
| 1/29/2020 | Senate | • On Committee agenda-- Infrastructure and Security, 02/03/20, 4:00 pm, 110 Senate Building |
| 2/3/2020 | Senate | • CS by Infrastructure and Security; YEAS 8 NAYS 0 -SJ 239 |
| 2/5/2020 | Senate | • Pending reference review under Rule 4.7(2) - (Committee Substitute) |
| 2/6/2020 | Senate | • Now in Appropriations • CS by Infrastructure and Security read 1st time -SJ 243 |
| 2/27/2020 | Senate | • On Committee agenda-- Appropriations, 03/03/20, 1:00 pm, 412 Knott Building |
| 3/3/2020 | Senate | • CS/CS by Appropriations; YEAS 20 NAYS 0 -SJ 461 |
| 3/5/2020 | Senate | • Pending reference review under Rule 4.7(2) - (Committee Substitute) • Original reference(s) removed: Rules -SJ 412 • Placed on Calendar, on 2nd reading • Placed on Special Order Calendar, 03/06/20 -SJ 519 • CS/CS by Appropriations read 1st time -SJ 463 |
| 3/6/2020 | Senate | • Retained on Special Order Calendar -SJ 518 |
| 3/9/2020 | Senate | • Retained on Special Order Calendar -SJ 550 |
| 3/10/2020 | Senate | • Retained on Special Order Calendar -SJ 653 |
| 3/11/2020 | Senate | • Read 2nd time -SJ 709 • Substituted HB 1135 -SJ 709 • Laid on Table, companion bill(s) passed, see CS/HB 387 (Ch. 2020-176), HB 1135 (Ch. 2020-181) -SJ 709 |
Identical bill
Companion bills that are identical word-for-word, not including titles. However, Resolutions and Concurrent Resolutions are considered identical if the only difference is the word 'House' or 'Senate.'
Similar bill
Companion bills that are substantially similar in text or have substantial portions of text that are largely the same.
Compare bill
Bills that have selected provisions that are similar in text.
Linked bill
A bill that is contingent upon passage of another bill within the same chamber, e.g., a trust fund bill, a bill providing a public record exemption, or an implementing bill.
The page numbers, when listed, for citations are constantly under review. The journals or printed bills of the respective chambers should be consulted as the official documents of the Legislature.
The links for the page numbers are formatted to open the bill text PDF directly to the page containing the citation. However, if your browser is set to open PDFs in a new window, as is often the case with 64-bit browsers, the bill text will open to the first page.
Log 5 is a formula invented by Bill James[1] to estimate the probability that team A will win a game, based on the true winning percentage of Team A and Team B.
It is equivalent to the Bradley–Terry_model used for paired comparisons, the Elo rating system used in chess, and the Rasch model used in the analysis of categorical data.[2]
Let pi{displaystyle p_{i}} be the fraction of games won by team i{displaystyle i} and also let qi=1−pi{displaystyle q_{i}=1-p_{i}} be the fraction of games lost by team i{displaystyle i}.
The Log5 estimate for the probability of A defeating B is pA,B=pA−pA×pBpA+pB−2×pA×pB{displaystyle p_{A,B}={frac {p_{A}-p_{A}times p_{B}}{p_{A}+p_{B}-2times p_{A}times p_{B}}}}.
A few notable properties exist:
- If pA=1{displaystyle p_{A}=1}, Log5 will always give A a 100% chance of victory.
- If pA=0{displaystyle p_{A}=0}, Log5 will always give A a 0% chance of victory.
- If pA=pB{displaystyle p_{A}=p_{B}}, Log5 will always return a 50% chance of victory for either team.
- If pA=1/2{displaystyle p_{A}=1/2}, Log5 will give A a 1−pB{displaystyle 1-p_{B}} probability of victory.
Flawless 1999. It may also be conveniently rewritten using the odds ratio[2] as pA,BqA,B=pAqA×qBpB.{displaystyle {frac {p_{A,B}}{q_{A,B}}}={frac {p_{A}}{q_{A}}}times {frac {q_{B}}{p_{B}}}.}
Here as before qA,B=1−pA,B{displaystyle q_{A,B}=1-p_{A,B}}.
Bill History
| Date | Chamber | Action |
|---|---|---|
| 10/1/2019 | Senate | • Filed |
| 10/15/2019 | Senate | • Referred to Infrastructure and Security; Appropriations; Rules -SJ 32 |
| 1/14/2020 | Senate | • Introduced -SJ 32 |
| 1/29/2020 | Senate | • On Committee agenda-- Infrastructure and Security, 02/03/20, 4:00 pm, 110 Senate Building |
| 2/3/2020 | Senate | • CS by Infrastructure and Security; YEAS 8 NAYS 0 -SJ 239 |
| 2/5/2020 | Senate | • Pending reference review under Rule 4.7(2) - (Committee Substitute) |
| 2/6/2020 | Senate | • Now in Appropriations • CS by Infrastructure and Security read 1st time -SJ 243 |
| 2/27/2020 | Senate | • On Committee agenda-- Appropriations, 03/03/20, 1:00 pm, 412 Knott Building |
| 3/3/2020 | Senate | • CS/CS by Appropriations; YEAS 20 NAYS 0 -SJ 461 |
| 3/5/2020 | Senate | • Pending reference review under Rule 4.7(2) - (Committee Substitute) • Original reference(s) removed: Rules -SJ 412 • Placed on Calendar, on 2nd reading • Placed on Special Order Calendar, 03/06/20 -SJ 519 • CS/CS by Appropriations read 1st time -SJ 463 |
| 3/6/2020 | Senate | • Retained on Special Order Calendar -SJ 518 |
| 3/9/2020 | Senate | • Retained on Special Order Calendar -SJ 550 |
| 3/10/2020 | Senate | • Retained on Special Order Calendar -SJ 653 |
| 3/11/2020 | Senate | • Read 2nd time -SJ 709 • Substituted HB 1135 -SJ 709 • Laid on Table, companion bill(s) passed, see CS/HB 387 (Ch. 2020-176), HB 1135 (Ch. 2020-181) -SJ 709 |
Identical bill
Companion bills that are identical word-for-word, not including titles. However, Resolutions and Concurrent Resolutions are considered identical if the only difference is the word 'House' or 'Senate.'
Similar bill
Companion bills that are substantially similar in text or have substantial portions of text that are largely the same.
Compare bill
Bills that have selected provisions that are similar in text.
Linked bill
A bill that is contingent upon passage of another bill within the same chamber, e.g., a trust fund bill, a bill providing a public record exemption, or an implementing bill.
The page numbers, when listed, for citations are constantly under review. The journals or printed bills of the respective chambers should be consulted as the official documents of the Legislature.
The links for the page numbers are formatted to open the bill text PDF directly to the page containing the citation. However, if your browser is set to open PDFs in a new window, as is often the case with 64-bit browsers, the bill text will open to the first page.
Log 5 is a formula invented by Bill James[1] to estimate the probability that team A will win a game, based on the true winning percentage of Team A and Team B.
It is equivalent to the Bradley–Terry_model used for paired comparisons, the Elo rating system used in chess, and the Rasch model used in the analysis of categorical data.[2]
Let pi{displaystyle p_{i}} be the fraction of games won by team i{displaystyle i} and also let qi=1−pi{displaystyle q_{i}=1-p_{i}} be the fraction of games lost by team i{displaystyle i}.
The Log5 estimate for the probability of A defeating B is pA,B=pA−pA×pBpA+pB−2×pA×pB{displaystyle p_{A,B}={frac {p_{A}-p_{A}times p_{B}}{p_{A}+p_{B}-2times p_{A}times p_{B}}}}.
A few notable properties exist:
- If pA=1{displaystyle p_{A}=1}, Log5 will always give A a 100% chance of victory.
- If pA=0{displaystyle p_{A}=0}, Log5 will always give A a 0% chance of victory.
- If pA=pB{displaystyle p_{A}=p_{B}}, Log5 will always return a 50% chance of victory for either team.
- If pA=1/2{displaystyle p_{A}=1/2}, Log5 will give A a 1−pB{displaystyle 1-p_{B}} probability of victory.
Flawless 1999. It may also be conveniently rewritten using the odds ratio[2] as pA,BqA,B=pAqA×qBpB.{displaystyle {frac {p_{A,B}}{q_{A,B}}}={frac {p_{A}}{q_{A}}}times {frac {q_{B}}{p_{B}}}.}
Here as before qA,B=1−pA,B{displaystyle q_{A,B}=1-p_{A,B}}.
References[edit]
- ^'Chancesis: The Origins of Log5'. Archived from the original on April 12, 2012. Retrieved 2013-03-07.
- ^ ab'Baseball, Chess, Psychology and Pychometrics: Everyone Uses the Same Damn Rating System'. Retrieved 2013-12-29.
Bill 2519
