Sans Normal Helis 6 is a regular weight, normal width, low contrast, upright, normal x-height font visually similar to 'Aristotelica Pro' by Zetafonts (names referenced only for comparison).
Keywords: ui text, app design, websites, branding, signage, modern, friendly, clean, approachable, neutral, everyday legibility, softened geometry, neutral branding, ui clarity, contemporary tone, rounded, soft terminals, geometric, open apertures, even color.
A rounded, geometric sans with smooth curves and softly finished terminals. Strokes maintain an even, consistent thickness across straight and curved forms, producing a steady typographic color. Counters are generous and open, with circular and oval construction visible throughout, and joins are kept simple and uncluttered. Overall proportions feel balanced and contemporary, with clear spacing and a rhythm that stays consistent from caps to lowercase and figures.
It fits well in digital UI and product design where clarity at varied sizes is important, and it also works for general-purpose web and editorial layouts that benefit from a neutral, friendly sans. The smooth, rounded details can support contemporary branding, wayfinding, and packaging where a clean but approachable voice is desired.
The font conveys a calm, friendly modernity—clean and straightforward without feeling cold. Its softened geometry and open shapes give it an approachable, everyday tone suited to contemporary interfaces and brand systems.
The design appears intended as a versatile geometric sans that prioritizes legibility and consistency while softening the overall feel through rounded terminals and gentle curves. It aims to read modern and neutral in paragraphs, while still offering a friendly character for interface and brand applications.
Round forms (like O and 0) read as near-circular, while many letters show subtly rounded corners and terminals that reduce sharpness. The lowercase maintains clear differentiation and legibility in running text, and the numerals share the same smooth, rounded construction for a cohesive set.