Azranur Guzey (Tiktoker) Biography, Age, Wiki, Family, Height Wright, Ethnicity, Networth, Boyfriend & More
Azranur Guzey has emerged as a prominent Turkish influencer, captivating a global audience with her captivating short videos featured on popular platforms such as Instagram and TikTok. She was born in Ankara, Turkey. Her meteoric rise to fame is a testament to her compelling content and undeniable charisma, making her a standout figure in the world of social media influencers.
Originating from Ankara, Turkey, Azranur Guzey first stepped into the realm of social media in 2015, establishing her presence on platforms like Instagram and TikTok. Swiftly, her innovative videos began to resonate with audiences, propelling her to immense popularity and amassing millions of devoted fans who were captivated by her unique and creative content.
|Other Name||Azranur Güzey|
|Family||Father: Not Available|
Mother: Not Available
Siblings: Not Available
Husband: Not Available
|Height||5 Feet 6 Inches (1.67 m)|
|Weight||55 Kg (125 lbs)|
Azranur Guzey’s physical attributes have undeniably played a pivotal role in her widespread appeal. Standing at a height of 5 Feet 6 Inches (1.67 meters) and weighing approximately 125 lbs (55 kg), she possesses a gracefully slender stature. Her body measurements of 34D-28-35, combined with her captivating black eyes and blonde hair, accentuate her curves and contribute to her enduring charm that transcends time.
At present, Azranur Guzey boasts an impressive estimated net worth of 300K USD.
During her leisure moments, Azranur Guzey finds joy in dancing and indulging in music. Her affinity for fashion is reflected in her choice of clothing brands, favouring names like Calvin Klein and Levi Strauss & Co. She holds a special attachment to her smartphone, digital camera, laptop, and smartwatch, recognizing their importance in her life. Moreover, she maintains an interest in staying abreast of the latest trends and emerging technologies, showcasing her penchant for staying informed and ahead of the curve.