-and $b$ is a vector of constant, each of size $N$. There are two types of solution methods to solve this linear system.
-The first type of methods is called \textbf{Direct methods}, which consist of a finite number of steps depending on the
-size of the linear system to give the exact solution. If the problem size is very big, these methods are expensive or their
-solutions are impossible in some cases. The second type is called \textbf{Iterative methods}, which computes
-the same block of operations several times, starting from the initial vector until reaching the acceptable
-approximation of the exact solution. However, it can be effectively applied in parallel. Moreover, iterative methods can be used to solve both linear and non-linear equations.
+and $b$ is a vector of constant, each of size $N$. There are two types of solution methods to solve this linear system: the \textbf{direct} and the \textbf{iterative methods}.
+A direct method executes a finite number of steps, depending on the
+size of the linear system and gives the exact solution of the system. If the problem is very big, this method is expensive or its
+solution is impossible in some cases. On the other hand, methods with iterations execute the same block of instructions many times. The number of iterations can be predefined or the application iterates until a criterion is satisfied. Iterative methods are methods with iterations that start from an initial guess and
+improve successively the solution until reaching an acceptable approximation of the exact solution.
+These methods are well adapted for large systems and can be easily parallelized.