The difference between the Beal equation and the Fermat equation is the different exponents of the variables and the method of solving it. As we will show, for the proof of the Beal equation to be complete, Fermat's theorem will be must hold. There are only 10 known solutions and all of them appear with exponent 2. This very fact is proved here using a uniform method. Therefore, Beal's conjecture is true under the above conditions because it accepts that there is no solution if the condition that all exponent values are greater than 2 occurs, the truth of which is proved in Theorem 6, based on the results of Theorem 5. The primary purpose for solving the equation is to see what happens for solving the equation ax + by = cz i.e. for Pythagorean triples of degree 1. This is the generator of the theorems and programs that follow.