Cincinnati-Indianapolis Clowns Home Runs Charts and Records
About Home Runs
Home runs allowed is the number of home runs given up by a pitcher or a team's pitchers over a defined period of time. A home run is attributed to a pitcher when the batter safely reaches home in the same play the ball was put into play and there were no fielding errors. Most commonly this is when a player hits the ball over the outfield fence in fair territory, but on some occasions a well-placed hit into the outfield can result in an inside-the-park home run. Generally, for Home Runs, lower is better. (Source)
Top Cincinnati-Indianapolis Clowns Players by Home Runs
Which Cincinnati-Indianapolis Clowns players rank highest in Home Runs? 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.
Cincinnati-Indianapolis Clowns Home Runs Per Season
Cincinnati-Indianapolis Clowns's Home Runs for each season of their history, plotted alongside yearly averages for MLB, the Negro American League, and the Negro American League.
Cincinnati-Indianapolis Clowns Home Runs Season Distribution vs. MLB and Peers
Each box summarizes Home Runs across all seasons, comparing the Cincinnati-Indianapolis Clowns to MLB as a whole, the Negro American League, and the Negro American League. The box covers the middle 50% of seasons, the center line is the median, and the whiskers extend to the min and max values.
Cincinnati-Indianapolis Clowns Cumulative Home Runs — Franchise Progression
A running total of the Cincinnati-Indianapolis Clowns's Home Runs through each season of their MLB history. Each point marks the cumulative franchise total at the end of that year.
Cincinnati-Indianapolis Clowns Home Runs — Season-by-Season Breakdown
Every season of Cincinnati-Indianapolis Clowns's history with Home Runs alongside yearly averages for MLB, the Negro American League, and the Negro American League. Career totals include sum, average, minimum, maximum, and median.