Miyazawa Serial Numbers Now
Miyazawa Flutes, founded in 1969 by Masashi Miyazawa , is known for its meticulous record-keeping. However, they do not publish a public "serial number lookup" chart like some other manufacturers. Instead, they maintain a private database and encourage owners to contact them directly for official verification of an instrument's history. Locating the Serial Number
- Early Miyazawa flutes (1973-1985) have serial numbers starting with the letter "A" or "B," followed by a 4-digit number.
- Mid-series flutes (1985-1995) have serial numbers beginning with "C" or "D," followed by a 5-digit number.
- Later models (1995-present) feature serial numbers starting with a specific letter code, indicating the flute's model, followed by a 6-digit number.
These prefixed serial numbers run on separate ledgers and are far rarer. For example, "G-452" might be a 1990 gold riser, while the main production line was at SN 45,000. Miyazawa Serial Numbers
Why Serial Numbers Matter for Miyazawa Flutes
Before diving into the specific charts, it is critical to understand why the serial number is more than just a stamped set of digits. For a Miyazawa flute, the serial number determines: Miyazawa Flutes, founded in 1969 by Masashi Miyazawa
- Email the distributor: In the US, contact Miyazawa USA (North Bridge). In Europe, contact Miyazawa Europe (Germany). They can sometimes verify range years.
- Check the headjoint signature: Authentic Miyazawa headjoints have a stamped cut (e.g., "M-12" or "MZ-9") that should match the era of the serial number.
- Consult a technician: A skilled flute repair person has likely seen thousands of Miyazawas and can date the mechanism style (e.g., pin placement, spring material) within a 2-year window.
Model Identification: In many cases, the serial number is accompanied by a model prefix like MS-70, MS-95, or PCM. Why You Need This Information Miyazawa PB202E Flute - Dawkes Music These prefixed serial numbers run on separate ledgers
- Producing efficient encoding/decoding schemes for combinatorial objects.
- Establishing exact counting formulas and recurrence relations.
- Revealing combinatorial bijections that link different classes of structures.
- Applying enumerative results to algorithms, random generation, or algebraic combinatorics.
