Can all maths be represented in geometry?
I am pretty sure some problems in maths don't have any reasonnable interpretation in geometric terms.
If I had to give examples : delicate questions of regularity in analysis, existence and uniqueness of solutions to some PDEs, and really abstract algebra (no point into getting into details in you're in your first year).
That said I think that a lot of "basic" ideas and problems can be thought of in geometric terms (it's something of a miracle for some more delicate problems). This is a nice thing since as Dimitar said most people tend to have geometric intuition.
Examples of such things : the evolution of any system over time may be seen as a path in some configuration space (it's a deep idea leading to a branch of math called dynamical systems). For the "miracles" I mentionned, some abstract problems in ring theory are deeply linked to zeros of polynomials, which are geometrical objects. The resolution of the famous Fermat conjecture about the integer solutions of $x^n + y^n = z^n$ also involves geometrical tools.
So to summarize my points :
- there are lots of deep and sometimes unexpected connections to geometry
- however it does not work for everything
- pro : it usually gives an intuitive point of view
- con : it might be harder to work properly with that approach (Dimitar mentionned the algebrization of geometry : the reason for that is that it is much easier to work with equations than with geometrical objects, but you don't always see where you're going). This is why mathematicians love it when they have multiple point of views on the same mathematical object.
can you map all of mathematics to geometry and solve all problems using geometry and geometric reasoning? Secondly, is that worthwhile? Thirdly, why not?
I will answer your questions from last to first :
Thirdly, why not?
Because of the answer to the next one :
Secondly, is that worthwhile?
No it is not, not all questions have a simple geometric interpretation, by geometric I mean a simple line + circle + angle to be easily seen as the answer e.g. transcendentality of $\pi, e $ etc.
can you map all of mathematics to geometry and solve all problems using geometry and geometric reasoning?
No, look up constructability of trisecting an angle, doubling/halving a cube, squaring a circle etc. Basically Galois theory. Where geometry can not answer geometric problems how can it answer all the mathematical problems?
This question reminds me of a professor I had in the university (My major was Applied Mathematics) 3 years ago.
He explained that most of the mathematicians community's work in the last 200 years went into algebrazing everything they could get their hands on. That means that everything is explained by equations. The pinnacle of this process is the construction of the computer - a machine that operates with algebra exclusively, and does that well and fast.
However our brain (and animals brain as well) doesn't work in this way. It works with 'geometric' abstracts, shapes, sets, etc. For example our brain could much easier understand graphical representations of data rather than its numerical representation.
According to my professor the geometrization of mathematics is a process, currently ongoing, that would give us an understanding of how our own brain actually works and would one day pinnacle in the creation of a true A.I.
@Nguyễn Duy Khánh Sorry I could not comment answers yet :(
Well, traditional geometry does not go above 3D and is mostly in 2D. It works with axioms and theorems that are not numerical but analytical. If you extend geometry to higher dimensions including infinity you could have a set of axioms and theorems that are applicable to wider set of problems.
How that is possible (or not), I couldn't imagine.