This paper is concerned with the existence, types and the cardinality of the integral solutions for
diophantine equation
4 4 3
x y z + = where x , y and z are integers. The aim of this paper was to
develop methods to be used in finding all solutions to this equation. Results of the study show the
existence of infinitely many solutions to this type of diophantine equation in the ring of integers
for both cases, x y = and x y ¹ . For the case when x y = , the form of solutions is given by
3 3 4
( , , ) (4 , 4 ,8 ) x y z n n n = , while for the case when x y ¹ , the form of solutions is given by
3 1 3 1 4 1
( , , ) ( , , )
k k k
x y z un vn n
- - -
= . The main result obtained is a formulation of a generalized method to find
all the solutions for both types of diophantine equations.
This paper investigates and determines the solutions for the Diophantine equation x2 + 4.7b = y2r, where
x, y, b are all positive intergers and r > 1. By substituting the values of r and b respectively, generators of
x and yr can be determined and classified into different categories. Then, by using geometric progression
method, a general formula for each category can be obtained. The necessary conditions to obtain the
integral solutions of x and y are also investigated.