So the Vietnamese is back with their new adventure! (for our first story, see this link) This time we're going to do it with Đinh Tiên Hoàng. He's the Vietnamese first emperor (all of his predecessors just claimed the title of king). During his time, Vietnam was divided to several regions in a period called 'the disorder of the twelve palatines'. Dinh Tien Hoang made his way from a minor general of one of those forces to the leader, and eventually conquered all other eleven to re-establish the nation of Đại Cồ Việt. Then he rebuilt the country and ordered the minting of Vietnam's very first coins.
In this game we'll face five opponents, all random chosen:
According to requests from the first adventure, this time the difficulty will be one level up - Noble. Great plains map simulates north Vietnam at that time - we have expanded to the sea, and the little lake in the south east of every great plains map is just coincident with our East sea (the sea that's internationally called South China sea nowadays). Small size is suited with six civilizations, and the speed is also the standard Normal. Of course all victory types are enabled, but only two options are checked: Raging barbarians and No tech trading. With this only the strong will be able to prevail - and who will take the advantage in this equal race? Let time answer this question...
In this game we'll face five opponents, all random chosen:
According to requests from the first adventure, this time the difficulty will be one level up - Noble. Great plains map simulates north Vietnam at that time - we have expanded to the sea, and the little lake in the south east of every great plains map is just coincident with our East sea (the sea that's internationally called South China sea nowadays). Small size is suited with six civilizations, and the speed is also the standard Normal. Of course all victory types are enabled, but only two options are checked: Raging barbarians and No tech trading. With this only the strong will be able to prevail - and who will take the advantage in this equal race? Let time answer this question...