tag:blogger.com,1999:blog-7239577512598038009.post1388694917447656525..comments2024-02-27T01:17:39.925-08:00Comments on The Nine and Thirty Kingdoms: Reaction Rolls with ... Four Dice?Talysmanhttp://www.blogger.com/profile/02162328521343832412noreply@blogger.comBlogger1125tag:blogger.com,1999:blog-7239577512598038009.post-7668578842347321692019-03-21T11:27:12.139-07:002019-03-21T11:27:12.139-07:00Very interesting. I've checked the probabiliti...Very interesting. I've checked the probabilities of this:<br /><br />Probability distribution:<br /><br />Value *** % = ******** % ≥ <br />0 ******* 0.077 ****** 100.000<br />1 ******* 0.309 ****** 99.923 <br />2 ******* 0.772 ****** 99.614 <br />3 ******* 1.543 ****** 98.843 <br />4 ******* 2.701 ****** 97.299 <br />5 ******* 4.321 ****** 94.599 <br />6 ******* 6.173 ****** 90.278 <br />7 ******* 8.025 ****** 84.105 <br />8 ******* 9.645 ****** 76.080 <br />9 ******* 10.802 ****** 66.435 <br />10 ****** 11.265 ****** 55.633 <br />11 ****** 10.802 ****** 44.367 <br />12 ****** 9.645 ****** 33.565 <br />13 ****** 8.025 ****** 23.920 <br />14 ****** 6.173 ****** 15.895 <br />15 ****** 4.321 ****** 9.722 <br />16 ****** 2.701 ****** 5.401 <br />17 ****** 1.543 ****** 2.701 <br />18 ****** 0.772 ****** 1.157 <br />19 ****** 0.309 ****** 0.386 <br />20 ****** 0.077 ****** 0.077 <br /><br />Average value = 10.0<br />Spread = 3.42<br />Mean deviation = 2.74<br />Marcelo Paschoalinhttps://www.blogger.com/profile/05869301766211022548noreply@blogger.com