I'm going to give you the benefit of the doubt and assume that you're not trolling but are frustrated. In which case I must also assume that you haven't really spent the time to understand the argument at tauday.com. It is not that the ratio of the circumference to the diameter (called π) will change, but that the ratio of the circumference to the radius (now called τ) is more useful.

Which shouldn't come as too much of a surprise because the radius is the smallest amount of information that determines what a circle is, as well as the basis for how we define radians.

Your assumptions are invalid.

The radius is not the smallest amount of information which determines a circle. The radius and origin can determine a circle. So can the diameter and origin, or the circumference and origin, or the area and origin. Don't forget your geometry.

I said smallest amount of information. The diameter, circumference, and area are all functions of the radius.

Sure, you can write any in terms of any of the others, but the radius is the smallest: both in terms of absolute value as well as dimensionality.

Why does smallest in terms of absolute value matter? In any event, I can define the circle via the center and r/2 or center and r/4, etc... I don't see any value in caring about the absolute value.

As for dimensionality, how are you using the word? No matter what, we need 3 numbers to define a circle in R^2. Two numbers define its position and one number defines it size. I don't see what you're getting at. If you mean that because radius is a measure of length (one dimension) and area is a measure of area (two dimensions) then I have two questions: 1) Why does that matter? Its still just a single number. 2) Even if it does matter, why is radius more fundamental than diameter.