tag:blogger.com,1999:blog-5811124440838283502.post8832638668733469044..comments2024-03-02T07:28:06.384+00:00Comments on Tony's Maths Blog: Two simple maths / cricket problems inspired by Aaron FinchTonyhttp://www.blogger.com/profile/08832715837375830128noreply@blogger.comBlogger3125tag:blogger.com,1999:blog-5811124440838283502.post-115658030412229122014-02-28T13:51:55.098+00:002014-02-28T13:51:55.098+00:00Nice to see your blog it's really interesting ...Nice to see your blog it's really interesting topic. i am really excited about that game. and good answer there by first one.Alicelewishttp://www.ipracticemath.com/noreply@blogger.comtag:blogger.com,1999:blog-5811124440838283502.post-4814915367799158142013-10-26T08:32:00.689+01:002013-10-26T08:32:00.689+01:00very interesting site when i play your game then i...very interesting site when i play your game then i think more deeply about your game..... and i just realize my brain will be sharped.....Patrichttp://www.tennis-university.eu/de/tennisakademienoreply@blogger.comtag:blogger.com,1999:blog-5811124440838283502.post-57142670865335316012013-08-30T20:16:21.494+01:002013-08-30T20:16:21.494+01:00If A faces first and scores 3 off that ball, he wo...If A faces first and scores 3 off that ball, he won't face until ball 1 of the next over. Therefore the average score per over will be 3+2*5=13, so Australia will win by 1 run!<br />If B faces first, then the first over will go for 12, and A will then face ball 1 of the second over, and the above applies - a total of 259, and Australia win by 2 runs!<br />The scenario where both alternate will never happen, unless they both score odd numbers of runs.<br /><br />If C replaces A, then if C faces first, score is 220, and if C faces second, score is 221, as two fewer runs will be scored in overs where C faces compared to A facing.Anonymousnoreply@blogger.com