"יורד לים" by Peter Roth was released on June 1, 2005. With this song being about 5 minutes long, at 4:41, "יורד לים" by Peter Roth is fairly a long song compared to the average song length. This song does not have an "Explicit" tag, making it safe for all ages. There is only one song in פיטר רוט, so we believe that "יורד לים" is a single. Based on our statistics, יורד לים's popularity is not that popular right now. Although the overall vibe is very danceable, it does project more negative sounds.
The tempo marking of יורד לים by Peter Roth is Allegro (fast, quick, and bright), since this song has a tempo of 132 BPM. With that information, we can conclude that the song has a fast tempo. This song can go great with walking. The time signature for this track is 4/4.
This song has a musical key of B Major. This also means that this song has a camelot key of 1B. So, the perfect camelot match for 1B would be either 1B or 2A. While, 2B can give you a low energy boost. For moderate energy boost, you would use 10B and a high energy boost can either be 3B or 8B. Though, if you want a low energy drop, you should looking for songs with either a camelot key of 1A or 12B will give you a low energy drop, 4B would be a moderate one, and 11B or 6B would be a high energy drop. Lastly, 10A allows you to change the mood.
Track | Artist | Key | Energy | Camelot | BPM | ||
---|---|---|---|---|---|---|---|
זמנים קטנים | Teapacks | C Minor | 4 | 5A | 128 BPM | ||
אף אחת | Miri Mesika | C Minor | 4 | 5A | 98 BPM | ||
סוף העונה | Rona Kenan | A♭ Minor | 5 | 1A | 160 BPM | ||
ימי ראשית הקיץ | Josie Katz | D Major | 4 | 10B | 132 BPM | ||
בספסל מול האגם | Mashina | G Major | 4 | 9B | 133 BPM | ||
אגו-טריפ | Alma Zohar | E♭ Major | 9 | 5B | 135 BPM | ||
תנו לי לשתות | Knesiyat Hasechel | A Minor | 6 | 8A | 162 BPM | ||
אל תשאלי אם אני אוהב | David Broza, Nimrod Lev | C Major | 4 | 8B | 162 BPM | ||
עומרי, שומע? | Yali Sobol | C Major | 4 | 8B | 81 BPM | ||
גבר רומנטי | Teapacks | E♭ Major | 6 | 5B | 79 BPM |
Section: 0.5555434226989746
End: 0.5604348182678223