Mankind formalized computation and developed two system for it in 1936 with the seminal papers of Alonzo Church on $\lambda$-calculus and Alan Turing (who today, June 23rd 2012, would turn 100 years old if not for despicable circumstances leading to his early passing) on what became known as Turing-machines. Both mathematicians were solving the Entscheidungsproblem.
Although Church's paper was published slightly earlier, Turing was unaware of it when he developed his ideas, and Turing's approach proved to be more useful for the design of real-world machines. This was because he showed how to design a Universal Turing Machine that could be programmed to run any computation. This universal machine, with a concrete architecture based on the work of John von Neumann is the basic idea behind the machine on which you are reading my answer.
As you noted, computable is defined as "computable on a Turing machine" and all other reasonable models of computation have proven to be equivalent in their power. The belief that all reasonable models of computation are equivalent in what decision problems they can solve is known as the Church-Turing thesis. In its original form, it is almost completely believed by the learned community. In fact it is not completely clear what it would mean to prove/disprove the Church-Turing thesis; in a lot of ways it becomes an empirical question.
However, there is still the extended Church-Turing thesis which asks the slightly more subtle question of: what can be computed efficiently?. Many classical models, such as $\lambda$-calculus, Turing Machines, tag-based systems, cellular automata, etc are equivalent under the extended thesis as well. However, the recent development of quantum computing casts doubt on the extended thesis. Although most people who work on quantum computers (including me) believe they are more efficient that classical ones, the matter is subject to scholarly debate. Note that in terms of the coarse notion of what is computable (as opposed to efficiently computable) quantum computing is still equivalent to Turing's model.