Pythagorea Medians And Mid-Points All Levels (4.1-4.12) Solutions/Answers

Pythagorea Level 4.1 4.2 4.3 4.4 4.5 4.6 4.7 4.8 4.9 4.10 4.11 4.12 Solution/Answers

Pythagorea Medians And Mid-Points all levels solved here. Pythagorea is android/iOS app developed by Horis International Limited. Solutions hints and answers to pythagorea are available in this post scroll down to find solutions to all the levels. This game is mostly focused on geometric puzzles and construction. The work space is divided into grids to draw lines. You should know all the basic Math operations. All lines and shapes are drawn on a grid whose cells are squares. Most of the game levels can be answered using natural intuition and by some basic laws of geometry.

You have to connect points on the grid using straight lines to construct an element, you can even use intersection points to draw. Some levels are very easy some are of medium difficulty and some are very hard to solve, that’s why I am providing solutions to all the problems.

If you have forgotten basic course you did in your elementary education, this game is for you to revise all the concept using a single game or if you don’t know any of the geometry this game features “i” button from where you can learn about all the shapes and geometry and then play this game to enhance your geometry skill and do not miss your chance to familiarize children with mathematics. Pythagorea is an excellent way to make friends with geometry and benefit from spending time together.

Download link for Android devices:

Download link for iOS devices:

If you are here for levels other than ‘Medians And Mid-Points’ Go to directory of all other levels at :

Pythagorea Medians And Mid-Points all Levels (click on required Level for solution):

Thanks for visiting, If you have any doubts regarding pythagorea, You can comment below.


2 thoughts on “Pythagorea Medians And Mid-Points All Levels (4.1-4.12) Solutions/Answers

  • December 31, 2017 at 8:37 pm

    I do not understand the solution to Pythagorea 4.12
    Whilst I see that it works, I would like to know how it works so that I may deduce a similar solution for myself

    • January 1, 2018 at 1:14 am

      “The centroid is exactly two-thirds the way along each median.” (from ) Being the centroid on a node and one vertex two columns away on the left, the midpoint has to be one column away on the right.


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