Cosmic Hair Studios Inc entered the industry of Beauty Salons in 1972 and has grown to employ 1 to 4 people, generating an annual revenue of $100.000 to $499.999. The NAICS classifies this business under the code 8121120, which describes it as a Beauty Salons. For further clarification, the SIC classifies this business under the code 7231 and described it as a Beauty Salons. The business provides service to the B2C market.
To acquire more information, please contact Carol Christopher, Owner by calling (215) 698-0498 during business hours. You can also write to the business’ Single Location at 13037 Bustleton Avenue, Philadelphia, Pennsylvania PA 19116. You can also visit the company’s website at . View this business’ social media profiles on Twitter or on Facebbok .
Company: | Cosmic Hair Studios Inc |
Representative: | Carol Christopher, Owner |
Place of Business: | 13037 Bustleton Avenue, Philadelphia, PA 19116 |
Contact Number: | (215) 698-0498 |
Type of Service: | Beauty Salons |
SIC Number: | 7231 |
NAICS Number: | 8121120 |
Locality: | Single Location |
Market Type: | B2C (Business to Consumer) |
Began: | 1972 |
Income/Year: | $100.000 to $499.999 |
Laborers: | 1 to 4 |
Share This Company: |
Cosmic Hair Studios Inc is a company operating from Philadelphia, Pennsylvania providing professional Beauty Salons and relevant B2C variables. It was founded in 1972 and registered with the SIC code 7231 as Beauty Salons, and with the NAICS code 8121120 as Beauty Salons.
With a current employee count of 1 to 4, Cosmic Hair Studios Inc has gone to report making $100.000 to $499.999 per annum on its journey towards growth. This company invites you to contact its representative Carol Christopher, Owner at (215) 698-0498 for related queries, or to locate its Single Location using the coordinates 40.12462,-75.01487.
The Single Location can also be found at the street address 13037 Bustleton Avenue in Philadelphia, Pennsylvania 19116 and can be engaged online through the company website at , the company Twitter , and Facebook page .