Greyhound Racing Tips For Tuesday 12th November 2013

Ipswich Greyhounds Race 7 Box 8 Rose Radiant 5.10pm

I was quite frustrated when this girl stormed home to run 3rd last start over the 431 – it cost me the first 4; but her run was huge and another 20 metres and she wins. She’s a half sister to champion Dashing Corsair, and has plenty of strength on her side. Her trainer was telling me he was “unable to get a start over the 520 last week so settled for the 431”; but he’s looking forward to today’s race and expects her to go really well. Box 8 makes it a tough ask and she’s going to need plenty of luck but she does look a very promising type and worth the punt here from box 8, in a fair field.

Lismore Greyhounds Race 5 Box 1 Hanify’s Luck 8.05pm

Big chance here given to this dog. He’s been racing in fine form and has only been unlucky recently. Box 1, if he jumps and uses it; is a huge advantage and he’s right in this race here. He’s only run a moderate 24.51 here, but I’m confident he can run much much quicker based on his Albion Park times. He’s had the 17 starts here for only 2 wins, and that’s a concern; but he is a very fast dog and can’t be overlooked from the red here tonight. He won’t start favourite but he will however be there at the finish. Big chance and eachway bet.

Warragul Greyhounds Race 5 Box 2 Quigley Bale 8.08pm

This fellow gets his chance to bounce back into the winners circle here tonight. He should get a lovely trail early here behind the speedy box 1 runner Leesa Benz. She can go quick early and should cart him right into the race from the get go. He’s quite strong and enjoys an clear inside run. There is plenty of speed early so this should suit him with many of the runners looking to find the early lead. This can often lead to a scrimmage, and all to often something gets soar out the back and the back marker shoots through. As long as he’s odds of $5.00 of more, he looks a really safe eachway bet, if Leesa Benz flys out and gives him a cart.

Best of Luck

$$ Another Day Another Dollar $$