aMazing Junior app for iPhone and iPad
Developer: Suave Solutions
First release : 09 Aug 2013
App size: 81.66 Mb
Amazing Junior game is for your juniors to solve very intuitive mazes with different characters and lovely graphics. They can learn to find path and control their character to achieve goal as defined as story before game starts. They can learn about different animals and species behaviors and eating habits. Game allows you to share scores on Facebook and gives you iOS Game Center integration to share your scores and rank within your friends list.
>> Mazes
Mazes are a fun activity for children which helps them learn to manipulate their fingers and develop muscle tone, strength and balance. Problem-solving with mazes requires your child to interact and concentrate in a fun way. Age isnt necessarily an advantage when it comes to problem-solving in mazes - chances are your cluey kid will beat you to the end.
>> The benefits of mazes
A maze might just look like a fun way to pass time, but theyre actually a valuable learning tool for children. Heres why:
- For children, completing mazes is a great way to boost their problem solving skills.
- Solving mazes also boosts their patience and persistence and teaches them about the rewards of work.
- Mazes can also help improve a childs cognitive thought processes.
- Solving mazes are wonderful for improving hand-eye coordination.
- Concentrating on a maze also helps with memory too
>> Maze Solving
Maze solving is the act of finding a route through the maze from the start to finish. Some maze solving methods are designed to be used inside the maze by a traveler with no prior knowledge of the maze, whereas others are designed to be used by a person or computer program that can see the whole maze at once.
The mathematician Leonhard Euler was one of the first to analyze plane mazes mathematically, and in doing so made the first significant contributions to the branch of mathematics known as topology. Mazes containing no loops are known as "standard", or "perfect" mazes, and are equivalent to a tree in graph theory.