Hiroshi Mizuhara's '七月の子守唄' came out on 1991. With this song being around four minutes long, at 3:31, the duration of this song is pretty average compared to other songs. This track is safe for children and doesn't appear to contain any foul language, since the "Explicit" tag was not present in this track. There is only one song in 初公開!熱唱!水原 弘 Vol.1, so we believe that "七月の子守唄" is a single. The popularity of 七月の子守唄 is currently unknown 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 七月の子守唄 by Hiroshi Mizuhara is Presto (very, very fast), since this song has a tempo of 183 BPM. With that information, we can conclude that the song has a fast tempo. The time signature for this track is 4/4.
This song is in the music key of A Minor. Because this track belongs in the A Minor key, the camelot key is 8A. So, the perfect camelot match for 8A would be either 8A or 7B. While, a low energy boost can consist of either 8B or 9A. For moderate energy boost, you would use 5A and a high energy boost can either be 10A or 3A. However, if you are looking for a low energy drop, finding a song with a camelot key of 7A would be a great choice. Where 11A would give you a moderate drop, and 6A or 1A would be a high energy drop. Lastly, 11B allows you to change the mood.
Track | Artist | Key | Energy | Camelot | BPM | ||
---|---|---|---|---|---|---|---|
長崎慕情 | Yuko Nagisa | B Minor | 4 | 10A | 80 BPM | ||
大阪すずめ | Miyuki Nagai | A♭ Minor | 5 | 1A | 93 BPM | ||
大阪情話 ~うちと一緒になれへんか~ | Mitsuko Nakamura | B Major | 3 | 1B | 147 BPM | ||
有楽町で逢いましょう | Frank Nagai | G Minor | 2 | 6A | 87 BPM | ||
こんど生れてくる時は | Hiroshi Mizuhara | C Major | 4 | 8B | 136 BPM | ||
トーキョー・トワイライト | チェウニ | B Minor | 5 | 10A | 105 BPM | ||
釧路の夜 | 美川憲一 | B♭ Minor | 4 | 3A | 82 BPM | ||
いとしのロンリー・ハート | Hiroshi Mizuhara | F Major | 3 | 7B | 82 BPM | ||
恋のカクテル - New Version | Hiroshi Mizuhara | C Minor | 7 | 5A | 133 BPM | ||
お久しぶりね | 小柳ルミ子 | E Minor | 7 | 9A | 130 BPM |
Section: 0.5956850051879883
End: 0.599384069442749