C (musical note)

In terms of musical pitch, C or Do is the first note of the fixed-Do solfège scale.

Middle C

When the A440 pitch standard is used to tune a musical instrument, Middle C has a frequency around 261.6 Hz. Middle C is designated C₄ in scientific pitch notation because of the note's position as the fourth C key from left on a standard 88-key piano keyboard.

Another system known as scientific pitch assigns a frequency of 256 Hz but, while numerically convenient, this is not used by orchestras. Other note-octave systems, including those used by some makers of digital music keyboards, may refer to Middle C differently. In MIDI, Middle C is note number 60.

The C₄ designation is the most commonly recognized in auditory science^{[citation needed]}, and in musical studies it is often used in place of the Helmholtz designation c'.

While the expression "Middle C" is generally clear across instruments and clefs, some musicians naturally use the term to refer to the C note in the middle of their specific instrument's range. C₄ may be called "Low C" by someone playing a Western concert flute, which has a higher and narrower playing range than the piano, while C₅ (523.251 Hz) would be Middle C. This technically inaccurate practice has led some pedagogues to encourage standardizing on C₄ as the definitive Middle C in instructional materials across all instruments.^[1]

In vocal music, the term Soprano C, sometimes called "High C" or "Top C," is the C two octaves above Middle C. It is so named because it is considered the defining note of the soprano voice type. It is C₆ in scientific pitch notation (1046.502 Hz) and c''' in Helmholtz notation. The term Tenor C is sometimes used in vocal music to refer to C₅, as it is the highest required note in the standard tenor repertoire. The term Low C is sometimes used in vocal music to refer to C₂ because this is considered the divide between true basses and bass-baritones: a basso can sing this note easily while other male voices, including bass-baritones, cannot.

In organ music, the term Tenor C can refer to an organ builder's term for small C or C₃ (130.813 Hz), the note one octave below Middle C. In stoplists it usually means that a rank is not full compass, omitting the bottom octave.^[2]

For the frequency of each note on a standard piano, see piano key frequencies.

Designation by octave

Scientific designation	Helmholtz designation	Bilinear music notation	Octave name	Frequency (Hz)	Other names	Audio
C_-2	C͵͵͵͵ or ͵͵͵͵C or CCCCC	N/A	Octocontra	4.088		Audio file "C4.08.mid" not found
C_-1	C͵͵͵ or ͵͵͵C or CCCC	(-uC)	Subsubcontra	8.176		Play^ⓘ
C₀	C͵͵ or ͵͵C or CCC	(-vC)	Subcontra	16.352		Play^ⓘ
C₁	C͵ or ͵C or CC	(-wC)	Contra	32.703		Play^ⓘ
C₂	C	(-xC)	Great	65.406	Low C	Play^ⓘ
C₃	c	(-yC)	Small	130.813	Bass C, Tenor C (organ)	Play^ⓘ
C₄	c′	(zC)	One-lined	261.626	Middle C	Play^ⓘ
C₅	c′′	(yC)	Two-lined	523.251	Tenor C (vocal), Treble C	Play^ⓘ
C₆	c′′′	(xC)	Three-lined	1046.502	Soprano C (vocal), High C (vocal), Top C (vocal)	Play^ⓘ
C₇	c′′′′	(wC)	Four-lined	2093.005		Play^ⓘ
C₈	c′′′′′	(vC)	Five-lined	4186.009	Eighth octave C	Play^ⓘ
C₉	c′′′′′′	(uC)	Six-lined	8372.018		Play^ⓘ
C₁₀	c′′′′′′′	(tC)	Seven-lined	16744.036		Play^ⓘ

Graphic presentation

Middle C in four clefs

Position of Middle C on an 88-key keyboard

Scales

Common scales beginning on C

C Major: C D E F G A B C
C Natural Minor: C D E♭ F G A♭ B♭ C
C Harmonic Minor: C D E♭ F G A♭ B C
C Melodic Minor Ascending: C D E♭ F G A B C
C Melodic Minor Descending: C B♭ A♭ G F E♭ D C

Diatonic scales

C Ionian: C D E F G A B C
C Dorian: C D E♭ F G A B♭ C
C Phrygian: C D♭ E♭ F G A♭ B♭ C
C Lydian: C D E F♯ G A B C
C Mixolydian: C D E F G A B♭ C
C Aeolian: C D E♭ F G A♭ B♭ C
C Locrian: C D♭ E♭ F G♭ A♭ B♭ C

Jazz Melodic Minor

C Ascending Melodic Minor: C D E♭ F G A B C
C Dorian ♭2: C D♭ E♭ F G A B♭ C
C Lydian Augmented: C D E F♯ G♯ A B C
C Lydian Dominant: C D E F♯ G A B♭ C
C Mixolydian ♭6: C D E F G A♭ B♭ C
C Locrian ♮2: C D E♭ F G♭ A♭ B♭ C
C Altered: C D♭ E♭ F♭ G♭ A♭ B♭ C

B sharp

Twelve just perfect fifths (B♯) and seven octaves do not align as in equal temperament.

Pythagorean: 701.955 × 12 = 8423.46 = 23.46 = B♯+++
ET: 700 × 12 = 8400 = 0 = B♯ = C
1200 × 7 = 8400 = 0 = C

This difference, 23.46 cents (531441/524288), is known as the Pythagorean comma.

References

^ Large, John (February 1981). "Theory in Practice: Building a Firm Foundation". Music Educators Journal. 32: 30–35.
^ Wakin, Daniel J. (2007-09-09). "The Note That Makes Us Weep". New York Times. Retrieved 2007-12-12. {{cite news}}: Cite has empty unknown parameter: |coauthors= (help)

[Large-1] Large, John (February 1981). "Theory in Practice: Building a Firm Foundation". Music Educators Journal. 32: 30–35.

[2] Wakin, Daniel J. (2007-09-09). "The Note That Makes Us Weep". New York Times. Retrieved 2007-12-12. {{cite news}}: Cite has empty unknown parameter: |coauthors= (help)

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