Definition: Let \(\bf z=(a,b)\in \reals \times \reals \) be an ordered pair. \(\bf z\) is said to be \(\bf complex number\) if and only if it satisfies the following conditions.
Definition: Let \(\bf z=(a,b)\in \reals \times \reals \) be an ordered pair. \(\bf z\) is said to be \(\bf complex number\) if and only if it satisfies the following conditions.
Definition: Let \(\bf z=(a,b)\in \reals \times \reals \) be an ordered pair. \(\bf z\) is said to be \(\bf complex number\) if and only if it satisfies the following conditions.
Definition: Let \(\bf z=(a,b)\in \reals \times \reals \) be an ordered pair. \(\bf z\) is said to be \(\bf complex number\) if and only if it satisfies the following conditions.
Definition: Let \(\bf z=(a,b)\in \reals \times \reals \) be an ordered pair. \(\bf z\) is said to be \(\bf complex number\) if and only if it satisfies the following conditions.
Definition: Let \(\bf z=(a,b)\in \reals \times \reals \) be an ordered pair. \(\bf z\) is said to be \(\bf complex number\) if and only if it satisfies the following conditions.
Definition: Let \(\bf z=(a,b)\in \reals \times \reals \) be an ordered pair. \(\bf z\) is said to be \(\bf complex number\) if and only if it satisfies the following conditions.
Definition: Let \(\bf z=(a,b)\in \reals \times \reals \) be an ordered pair. \(\bf z\) is said to be \(\bf complex number\) if and only if it satisfies the following conditions.
Definition: Let \(\bf z=(a,b)\in \reals \times \reals \) be an ordered pair. \(\bf z\) is said to be \(\bf complex number\) if and only if it satisfies the following conditions.
Definition: Let \(\bf z=(a,b)\in \reals \times \reals \) be an ordered pair. \(\bf z\) is said to be \(\bf complex number\) if and only if it satisfies the following conditions.
Complex Numbers #
Definition: Let \(\bf z=(a,b)\in \reals \times \reals \) be an ordered pair. \(\bf z\) is said to be \(\bf complex number\) if and only if it satisfies the following conditions.
