Ready to navigate Regency London's treacherous social waters? Our Bridgerton games capture the drama, romance, and intrigue of the ton. Whether you're matching scandals or making choices that determine your fate, these games bring the Bridgerton experience to life.
The Season
Type: Social Choice / Simulation Difficulty: Medium
Navigate a full social season in Regency London. Make choices that affect your reputation, relationships, and future prospects.
- Reputation is everything—lose too much and society closes its doors
- Different events favor different qualities; choose wisely where to appear
- Alliances matter more than individual interactions
- The Queen's favor is valuable but hard to maintain
Scandal Sheet
Type: Memory Matching Difficulty: Easy to Medium
Match society scandals with the families involved. Lady Whistledown has been busy, and you must remember who did what.
- Focus on one row or column at a time
- The harder difficulties add decoy cards—ignore the unlikely pairings
- Speed bonuses reward quick matches, but accuracy matters more
- Chain matches (multiple in a row) multiply your score
Diamond of the Season
Type: Choice-Based Narrative Difficulty: Medium
Compete to be named the season's diamond. Your choices shape your reputation and determine whether you catch the eye of society—and perhaps a certain someone.
- There's no single "right" path—different choices lead to different endings
- The Queen values wit as much as beauty
- Family loyalty has consequences, both positive and negative
- Romance isn't everything—some endings celebrate independence
Whistledown's Secrets
Type: Mystery / Deduction Difficulty: Medium to Hard
You've intercepted Lady Whistledown's notes. Piece together the clues to identify who she's writing about before the column goes to print.
- Cross-reference clues—one detail alone rarely reveals everything
- Red herrings are common—look for what's consistent
- Some secrets have multiple layers; the obvious answer isn't always correct
- Time pressure increases as the print deadline approaches