The School of Odds

Scranton/Wilkes-Barre RailRiders v Norfolk Tides

2026-07-03 23:05 — MiLB

Head to Head

7 sportsbooks (5 in analysis)

Option 1: Scranton/Wilkes-Barre RailRiders (Local)

1.8653.76%Min
1.8753.44%Mean
1.8753.48%Median
1.8952.91%Max
49.73%2.011Min
50.00%2.000Max
49.95%2.002Mean
50.00%2.000Median
50.00%2.000IQM
49.95%2.002Margin-weighted

Metrics for max odd 1.89 under the IQM model: 50.00%

EV -5.50%Edge -2.91%Kelly -6.18%Growth +0.000%

Option 2: Norfolk Tides (Visit)

1.8554.05%Min
1.8753.52%Mean
1.8753.48%Median
1.8952.91%Max
50.00%2.000Min
50.27%1.989Max
50.05%1.998Mean
50.00%2.000Median
50.00%2.000IQM
50.05%1.998Margin-weighted

Metrics for max odd 1.89 under the IQM model: 50.00%

EV -5.50%Edge -2.91%Kelly -6.18%Growth +0.000%

Sportsbook Odds (7 sportsbooks)

BookmakerScranton/Wilkes-Barre RailRiders (Local) ▼Norfolk Tides (Visit)MarginUpdated
FanDuel1.89I 52.91% NM 50.00%EV -5.50% E -2.91% K -6.18% G +0.000%1.89I 52.91% NM 50.00%EV -5.50% E -2.91% K -6.18% G +0.000%5.8%2026-07-03 13:20
theScore Bet1.87I 53.48% NM 50.00%EV -6.50% E -3.48% K -7.47% G +0.000%1.87I 53.48% NM 50.00%EV -6.50% E -3.48% K -7.47% G +0.000%7.0%2026-07-03 13:25
BetOnline.ag1.87I 53.48% NM 50.00%EV -6.50% E -3.48% K -7.47% G +0.000%1.87I 53.48% NM 50.00%EV -6.50% E -3.48% K -7.47% G +0.000%7.0%2026-07-03 13:40
Caesars1.87I 53.48% NM 50.00%EV -6.50% E -3.48% K -7.47% G +0.000%1.87I 53.48% NM 50.00%EV -6.50% E -3.48% K -7.47% G +0.000%7.0%2026-07-03 13:37
Bovada1.87I 53.48% NM 50.00%EV -6.50% E -3.48% K -7.47% G +0.000%1.87I 53.48% NM 50.00%EV -6.50% E -3.48% K -7.47% G +0.000%7.0%2026-07-03 14:12
BetRivers1.87I 53.48% NM 49.73%EV -6.50% E -3.48% K -7.47% G +0.000%1.85I 54.05% NM 50.27%EV -7.50% E -4.05% K -8.82% G +0.000%7.5%2026-07-03 17:10
1xBet1.86I 53.76% NM 50.00%EV -7.00% E -3.76% K -8.14% G +0.000%1.86I 53.76% NM 50.00%EV -7.00% E -3.76% K -8.14% G +0.000%7.5%2026-07-03 14:05
Margin = book's overround · I = implied probability · NM = no-margin (de-vigged) probability · EV = expected value · E = edge · K = Kelly fraction · G = bankroll growth.