"Summer" by Joe Hisaishi was released on May 26, 1999. Summer is about six minutes long, preciously at 6:24, making this song fairly long compared to other songs. There is only one song in 菊次郎の夏 (オリジナル・サウンドトラック), so we believe that "Summer" is a single. Summer is average in popularity right now. In our opinion, the overall tone is not very danceable and projects negative sounds, such as being sad, depressed, or angry.
The tempo marking of Summer by Joe Hisaishi is Andante (at a walking pace), since this song has a tempo of 83 BPM. With that information, we can conclude that the song has a slow tempo. The time signature for this track is 4/4.
This song is in the music key of A Major. This also means that this song has a camelot key of 11B. So, the perfect camelot match for 11B would be either 11B or 12A. While, 12B can give you a low energy boost. For moderate energy boost, you would use 8B and a high energy boost can either be 1B or 6B. Though, if you want a low energy drop, you should looking for songs with either a camelot key of 11A or 10B will give you a low energy drop, 2B would be a moderate one, and 9B or 4B would be a high energy drop. Lastly, 8A allows you to change the mood.
Track | Artist | Key | Energy | Camelot | BPM | ||
---|---|---|---|---|---|---|---|
Take Me Home, Country Roads - Violin Version | Yuji Nomi | F Major | 2 | 7B | 173 BPM | ||
きのう何食べた?~バラードver~ | Kaori Sawada | F Major | 1 | 7B | 139 BPM | ||
Ashitaka and San | Joe Hisaishi | D♭ Major | 1 | 3B | 74 BPM | ||
Prelude No. 2, Op. 7 "Saxophone Quartet" | Hikaru Shirosu | D♭ Major | 2 | 3B | 135 BPM | ||
Scene IV, Kyoto | Umitaro Abe | E Major | 2 | 12B | 104 BPM | ||
Forever Love - Classical Version | Yoshiki | B♭ Major | 4 | 6B | 95 BPM | ||
やさしさに包まれたなら | Yumi Arai | F♯ Major | 7 | 2B | 106 BPM | ||
Kiss and Cry | Ken Arai | D Minor | 5 | 7A | 160 BPM | ||
Kaze Ni Naru - Instrumental | Saori Mouri | C Major | 2 | 8B | 123 BPM | ||
I'm Forrest... Forrest Gump | Alan Silvestri | F Major | 0 | 7B | 104 BPM |
Section: 0.5458509922027588
End: 0.5490586757659912