SolSuite Solitaire 2018 v18.8 + Graphics Pack
SolSuite Solitaire 2018 is a high-quality collection of 690 solitaire games. All of the world’s best-known solitaire games are here, including Spider solitaire, Klondike, FreeCell, Pyramid, Golf, Yukon, Monte Carlo, Canfield, Gaps, Forty Thieves, Four Seasons, Napoleon, Diplomat, La Belle Lucie, Flower Garden, Rouge et Noir. We’ve also invented dozens of solitaires with your fun in mind, such as King of Scotland, Foxtrot, Mayflower and many others!
SolSuite, a uniquely exciting gaming experience: hundreds of games to choose from, a dazzling selection of card faces & backs, large card sets for ease of viewing, ribbon interface for enhanced gameplay, skins to customize your playing area and fast, courteous support. SolSuite: it’s addictively fun!
Enter Hi-Scores and manage your Statistics. Play to reach the Hi-Score for every layout and manage games won, with 3D Graphics. You can also publish your “Overall Score” and your “Single Game Score” on the Internet and compare it with all SolSuite players around the world.
Create an unlimited number of Players so that you can challenge your friends to beat one another’s Hi-Scores, Games won, Score Statistics.
SolSuite 2018 features a lot of options such as: “Show a legal move” command; Game Demo; “Pile size after pointer” command, also shows how many redeals remain; Series Manager; a vertical ScrollBar; games Fast Search; unlimited levels of the undo/redo; ability to save, load and restart games; high-quality on-line help; select a game number; select your favorite games; define card speed; associate sound effects and much more!
SolSuite 2018 – The Most Complete Solitaire Collection:
- 684 world’s best solitaire games!
- More than 80 awesome card sets!
- More than 300 beautiful card backs!
- More than 100 backgrounds!
- Large Card Sets easier to see!
- Lot of advanced features, options and statistics!
New Solitaire Games:
Albatross (This solitaire is included in the Two-Deck solitaires type group)
Five Brothers (This solitaire is included in the Mathematical solitaires type group)