# Confused about shared notes between keys

It is said that keys that are opposite on the Circle of Fifths only share one note. However, opposite keys on the Circle also share the same tritones, which would imply that they share two notes. For example,
C Major and F Sharp Major are opposite. Their circle positions seem to imply they only share one note. But, they share a tritone. In C Major, the tritone between the fourth and seventh is F and B. In F Sharp Major, the tritone between the fourth and seventh is B and E Sharp, which is the same as F. Therefore, these two Circle opposite keys actually share two notes. So, I am confused about how position on the circle indicates the number of shared notes. Each key contains seven notes. If the six O'clock position on the Circle contains five differing notes from the twelve O'clock position (two being the same), and if there is one less differing note counting back each hour , then that would imply that there are zero differing notes between G Major and C Major. But that is clearly wrong. So I must be missing something in my understanding of the Circle as it relates to shared notes between Keys.

• The tri tone is not literally in the key.
– user50691
Feb 11, 2021 at 12:41
• @ggcg - if there's an F and a B in the diatonic notes of a key - which there always is in key C, then it surely is literally in the key. It's an interval between two notes. What am I missing?
– Tim
Feb 11, 2021 at 15:12
• @Tim, maybe I misunderstood the use of "tritone". The tritone of C is F#, and that is NOT in the key. When we say that two keys share a note I interpret that to mean that the note is in both keys. Was that not the meaning of sharing?
– user50691
Feb 11, 2021 at 15:29
• @ggcgI interpret it as the tritone is between F and B (in key C), and between E# and B in key F#. The same, effectively. So, yes, shared, but thaose tritones are contained within each key. I think that's what was quoted.
– Tim
Feb 11, 2021 at 15:53

They share a note by name and another note by enharmonic equivalent.

In your example, both C and F# have the note B. C has the note F, and F# has the note E#, which enharmonically equivalent to F. Of course B to F AKA E# is a tritone.

The assertion that they only share one note discounts enharmonic equivalents. That’s all there is to that.

• Yeah, it boils down to the fact that a tritonus is both a 5th and a 4th.
– yo'
Feb 12, 2021 at 16:13
• Additionally, the key of Gb includes the notes F (which is in the C tritone) and Cb (which is enharmonically equivalent to B, the other note in the C tritone). Feb 12, 2021 at 20:00

In addition to the musical answers already given, there's a simple arithmetical answer: given 12 different tones (not counting enharmonic equivalents), since any diatonic scale uses 7 of them, any other scale must share at least two tones in common.

They might share only one note, but they share two pitches - hence the tritone shared.

And actually, those shared pitches are only true in 12tet. Played in j.i., for example, I guess even those two pitches aren't exactly the same as each other.

So, it's really, as other answers tell, down to note naming. In both keys (C and F♯), there's B, in key C there's note F, which (sort of) corresponds to key F♯'s E♯, at least enharmonically, if not exactly pitchwise.

All somewhat pedantic - but that's the way some things are...

• Good points to mention 12tet and also sharing the tritone, where would we be without a substitute dominant chord? :) Feb 11, 2021 at 10:34

@Todd_Wilcox is on the money with his explanation (+1). Here is a little theoretical expansion of that idea. Please excuse my lame sloppy drawing of the cycle of 5ths:

The way to visualize and understand this is to think of the cycle all in sharps (although you can also do it in all flats too).

In relation to the key of C:

At B, 5#’s you have 2 common tones, B, E

At F#, 6#’s you have 1 common tone and 1 enharmonic equivalent, B is common, F-E# is enharmonic equivalent

At C#, 7#’s you have 0 common tones and 2 enharmonic equivalents, F-E#, C-B# (which equals Db, 2 common tones)

At G# you still have 0 common tones and add Fx, the next enharmonic equivalent (3).

At D# you add Cx, etc.

As you continue you have more enharmonic equivalents (or common tones in flat keys), until you get to B sharp, which is 7 enharmonic equivalents, same as the key of C.

• Thanks for all your answers. It is totally clear to me now. I understand that from the 12 oclock position , the 5, 6, and 7th positions all contain two common tones including enharmonic equivalents. However, the 6th position is still considered the most extreme and clashing because its tonic is a tritone from the tonic of 12 oclock. Feb 12, 2021 at 16:12
• There’s that, also going from a F#/Gb to a C triad doesn’t lend itself to good voice leading but with Db and B it’s all parallel but at least it’s smooth! Scott’s answer had a great insight too, with only 12 notes to choose and 7 note scales at least 2 have to be common. Feb 12, 2021 at 16:37