Using the TEXT function in Excel is another simple way to calculate the time difference between two dates: Calculate the number of hours between two dates: TEXT = (B2-A2, "h") Return the hours and minutes between the following two times: TEXT = (B2-A2, "h:mm") Between two times, return the hours, minutes, and seconds: TEXT = (B2-A2, "h:mm:ss")
![Calculate time in Excel: time difference, add, subtract and sum times - Ablebits.com](denied:data:image/png;base64,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)