Columbus Blue Birds Home Runs Allowed Per 9 Innings Charts and Records
About Home Runs Allowed Per 9 Innings
Home runs allowed per nine innings is a metric that shows on average how many home runs a pitcher or team's pitchers will give up over a nine-inning period. It's calculated by dividing home runs by innings pitched and then multiplying the result by nine. Generally, for Home Runs Allowed Per 9 Innings, lower is better. (Source)
Top Columbus Blue Birds Players by Home Runs Allowed Per 9 Innings
Which Columbus Blue Birds players rank highest in Home Runs Allowed Per 9 Innings? Below are the top ten by single season and by career totals with the team, requiring at least 50 innings pitched for a season record, or 100 innings pitched for a career record with the team.
Columbus Blue Birds Home Runs Allowed Per 9 Innings Per Season
Columbus Blue Birds's Home Runs Allowed Per 9 Innings for each season of their history, plotted alongside yearly averages for MLB, the Negro National League II, and the Negro National League II.
Columbus Blue Birds Home Runs Allowed Per 9 Innings Season Distribution vs. MLB and Peers
Each box summarizes Home Runs Allowed Per 9 Innings across all seasons, comparing the Columbus Blue Birds to MLB as a whole, the Negro National League II, and the Negro National League II. The box covers the middle 50% of seasons, the center line is the median, and the whiskers extend to the min and max values.
Columbus Blue Birds Home Runs Allowed Per 9 Innings Year-Over-Year Change
A waterfall chart showing how the Columbus Blue Birds's Home Runs Allowed Per 9 Innings shifted season over season. Each bar represents the change from the previous year, making it easy to spot peak and decline phases.
Columbus Blue Birds Home Runs Allowed Per 9 Innings — Season-by-Season Breakdown
Every season of Columbus Blue Birds's history with Home Runs Allowed Per 9 Innings alongside yearly averages for MLB, the Negro National League II, and the Negro National League II. Career totals include sum, average, minimum, maximum, and median.