I see that you have obtained access to this page. For this, I congratulate you. However, beware, for you may be confused by the sheer complexity of this new mathematics branch.
🟥 + 🟩 = 🟨, 🟦 + 🟨 = 🟩. These are the first two basic principles. They will be used to find two more basic principles.
Since 🟥 + 🟩 = 🟨, 🟦 + 🟥 + 🟩 = 🟩. Subtracting green from both sides, we obtain the following equation. 🟦 + 🟥 = 0. Because when red is added to blue, purple is obtained, we shall obtain the following equation. 🟪 = 0.
These are the four most basic principles. I suggest you take a break, for the next ones perplex me to no end.
Are you done with your break? IF you are not, scroll back up, or your break will be ruined.
Now we will introduce a new color, also known as 🟧. With this introduction comes another basic principle, 🟥 + 🟨 = 🟧. This is one of the big things that makes this branch complicated. As we can find from an earlier basic principle, 🟥 = - 🟦, and vice versa. Therefore, 🟨 - 🟦 = 🟧, while 🟨 + 🟦 = 🟩. Therefore, when adding the equations together, we can find that 🟨 = (🟩 + 🟧)/2. When subtracting the first from the second, we find that 🟦 = (🟩 - 🟧)/2. Since 🟥 = - 🟦, 🟥 = (🟧 - 🟩)/2. It can also be found that 🟩 = 2(🟨) - 🟧. Similarly, it can be found that 🟧 = 2(🟨) - 🟩. Two more equations that can be found using the other equation from before[🟦 = (🟩 - 🟧)/2] are 🟩 = 2(🟦) + 🟧 and 🟧 = 2(🟦) + 🟩. Substituting this into the first equation describing the value of 🟩, we obtain 🟩 = 🟨 - 🟦. However, 🟩 is also equal to 🟨 + 🟦. This means that 🟦 must be equal to 0. This means that 🟥 = 0. Therefore, 🟩 = 🟨. Since 🟧 = 🟥 + 🟨 and 🟥 = 0, 🟧 = 🟨. Since 🟩 = 🟨, 🟩 = 🟧. As you can see, color mathematics has become a LOT more complicated today. Two primary colors were revealed to be equal to 0. This means that they are also equal to 🟪. Now I will be going to sleep. Take a break.
