Jarren made "Whittier Blvd." available on July 30, 2021. The duration of Whittier Blvd. is about two minutes long, specifically at 2:54. This song does not appear to have any foul language. Whittier Blvd.'s duration is considered a little bit shorter than the average duration of a typical track. The song is number 9 out of 11 in Antera by Jarren. In terms of popularity, Whittier Blvd. is currently not that popular. The overall tone is very danceable, especially with its high energy, which produces more of a euphoric, cheerful, or happy vibe.
The tempo marking of Whittier Blvd. by Jarren is Andante (at a walking pace), since this song has a tempo of 100 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 D♭ Major. This also means that this song has a camelot key of 3B. So, the perfect camelot match for 3B would be either 3B or 4A. While, 4B can give you a low energy boost. For moderate energy boost, you would use 12B and a high energy boost can either be 5B or 10B. Though, if you want a low energy drop, you should looking for songs with either a camelot key of 3A or 2B will give you a low energy drop, 6B would be a moderate one, and 1B or 8B would be a high energy drop. Lastly, 12A allows you to change the mood.
Track | Artist | Key | Energy | Camelot | BPM | ||
---|---|---|---|---|---|---|---|
Peachfuzz | The Pro-Teens | D Major | 6 | 10B | 110 BPM | ||
In the Air | Benedek, AKUA | B♭ Minor | 10 | 3A | 160 BPM | ||
Tonight, We Rise | Andres | E Minor | 4 | 9A | 120 BPM | ||
4 U | Jarren | B♭ Minor | 6 | 3A | 92 BPM | ||
Deja Vu | Jarren | B Minor | 7 | 10A | 120 BPM | ||
The Doomed Man | Sasac | D♭ Major | 4 | 3B | 154 BPM | ||
Amazone | Djosa | D♭ Major | 5 | 3B | 120 BPM | ||
Me at the Zoo | S. Fidelity, Àbáse | D♭ Major | 4 | 3B | 94 BPM | ||
Moonlite - Duality/Detroit Live Version | Ian Fink | B Minor | 5 | 10A | 128 BPM | ||
Think Back | Edmondson | A Minor | 10 | 8A | 134 BPM |
Section: 0.5837655067443848
End: 0.5929677486419678