Now you what mathcore means

Breakdown in 3.14

Pi was written and recorded only a few days before the completion of the Master copy, at around 10 am, with a couple of serious hangovers. Justin and I had talked about having a classical guitar intro into some sort of heavier riffage, but we weren’t quite sure what that was exactly going to be.

We remembered back to a few weeks prior, when we were throwing around an idea of using the mathematical constant Pi, and incorporating it into some sort of complex breakdown pattern where the kick drum corresponded to each number as the figure progressed. Kinda creating the ultimate mind boggler of a riff. The complexity of the intro is often overheard, because it’s hard to discern what is actually going on within the track, UNTIL NOW!!!

Here’s a breakdown of the….um, breakdown, in the intro to our album, “Pi: The Mercury God Of Infinity”

The actual tempo is 120 beats per minute (bpm). You can hear this by listening for the closed hi-hat that is panned left: it is playing constant eighth-notes.

The snare is on beat three in 4/4 time at 120 bpm.

A crash cymbal accents beat one of the first measure in 4/4. It is repeated every four measures.

Now this is where it gets tricky: the china cymbal.

It’s hard to feel the breakdown in Pi at 120 bpm, and this is mostly due to the china cymbal, which is playing a 4 over 3 (4/3) dotted-eighth note ostinato that begins on the “E” of one.


Check it out: A quarter note is equal to one beat in 4/4 time, but so are two eighth notes, or 4 sixteenth notes. It’s all about subdividing note values.

When you count a measure of 4/4 in quarter notes, it’s: 1, 2, 3, 4.

When counting in eighth notes, it’s: 1 + 2 + 3 + 4 +. (a plus sign refers to the spoken count “and” ex. “One and two and three and four and”)

When counting in sixteenths, it’s: 1 E + A 2 E + A 3 E + A 4 E + A. (Spoken: “One e and a two e and a three e and a four e and a)

So when I say the china starts on the “E” of one, I’m referring to the spoken counting value assigned to the second 16th note in a quarter note duration.

A dotted eighth note is a duration of three 16th notes, an ostinato is a persistently repeated pattern. Basically, the china plays on the bold-capitalized letters:

one E and a TWO e and A three e AND a four E and a ONE e and A etc.

Starting to get it? Cool.

At last, the reason Pi is what it is: the Double-bass pattern.

The formula of Pi for the kick drum was pretty far fetched at first, but seemed to work well once the track was finished. The numbers and rests in the formula translate to 16th notes on the kick drum, and 16th note rests. There is no kick drum beats where there are snare drums. Sooo, here it is:

With the decimal point BEFORE the number, and starting with the first number, move that many decimal points to the right and insert that many 16th note rests. Use one 16th note rest to divide the numbers you passed (when applicable). Continue on throughout the rest of the figure. No repeats.

So basically for the first step, you’d place the point (pt) before the first number, three: (pt)3.14159265

Next you jump the decimal three points to the right: 3.14(pt)159265

That’s where you insert three 16th rests, and insert one 16th note rest between the other numbers you passed: 3(16th rest)1(16th rest)4(dotted-eighth)159265

Now, your decimal lies in between the 4 and the 1. So, following the formula, you move one point to the right of the 1 and insert one 16th note rest. There are no numbers to separate with single 16th rests, so you move onto the next number, which is 5, and follow the same instructions.

That’s all there is to it! The formula extends out to 71 decimal points



4 Responses to “Now you what mathcore means”

  1. 7 October, 2008 at 9:32 am

    Cite sources! Interesting posts you have here. Might feed this.

  2. 7 October, 2008 at 5:10 pm

    Thanks! Not cranking out much stuff lately, but I’ve a post that needs finishing and another that’s a’brewin’.
    The source is the description of the YouTube video. I didn’t though it would necessary to openly point that out. But I’ll try to remember that.

  3. 12 November, 2008 at 12:36 am

    I’m doing my senior project on the history & structure of Mathcore and this is like the best thing I think I’ve ever come across.Seriously this is brilliant.I wish I could have come up with this.I don’t see how people haven’t replied more on this post.I actually feel lucky to have stumbled across this.I was reading a thread about Mathcore on Ultimate-Guitar and at one point I seen a link and I clicked it.Damn man you’ve inspire me to new height’s with this.I feel hi as shit………

  4. 4 Kim
    17 September, 2009 at 9:33 pm

    Holy crap, that’s awesome. I’ll have to wait until I leave work to listen and find out if it sounds awesome, but I love it.

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