mathematic

    we have three complex number Z1,Z2,Z3  =      (a₁+b₁) ,  ( c₁ ,d₁ ) , (e₁  , f₁ )     ∈  ℂ THEN law of distribution addition over multiplication                         (a₁, b₁) .[  ( c₁ ,d₁ ) + (e₁  , f₁ )]  =    (a₁, b₁).  ( c₁ ,d₁ ) +  (a₁, b₁) . (e₁  , f₁ )     L.H.S        =       (a₁, b₁) .[  ( c₁ ,d₁ ) + (e₁  , f₁ )]     LEFT IAW OF DISTRIBUTION                                                 =    (a₁, b₁) (    c₁ + e₁ , d₁+ f₁ )                                  ...

 IOTA  describes   the real quantity of complex form to solve complex number equation and equation may be trigonometry, algebra equation, quadric equation and any equation of complex number   mathematically IOTA  denoted by the sign  I or  ι  complex number Z  =  a +bi   where a and b are real number  iota is the imaginary  POWER OIOTA   when the power of iota change it describes the real number and complex number , usually real value of  IOTA  is    ι =  √⁻1 POWER OF IOTA IN DIAGRAM //// CUBE ROOT OF UNITY POWER? solve iota power EXAMPLE  if  we   find the iota power 8 SOLUTION                                   ᵢ⁸ = (ᵢ₄)² =(1)²=1     any power of iota divided by 4 to             EXAMPLE: 2    ...

DEFINITION OF UNION The set of all elements of SET A and SET B is called the union of sets where repeating element eliminates symbolically we denote the sign " U  union of two set A and B is denoted by the sign AUB says set of all element A and B Words union mean together and we read AUB A union B AUB = { set of all elements, such that, all elements of A and B } mathematically we write AUB = { y: y is part of A or part of B } if we have set A = { 1,2,3,4,5,6,7 } and B = { 5,6,7,8,9 } AUB ={ 1,2,3,4,5,6,7 } U { 5,6,7,8,9 } AUB = { 1,2,3,4,5,6,7,8,9 } A U B diagram is shown as we take an example to more explanation Example 1 :   if we have set S = { 15,16 ,17,20,25} T = { 12, 13,14 }   S U T = { 12,13,14,15,16,17,20,25} Example 2   R = { 0,1,7,9,11.17 } and S = { 5,7,,11,15 }     R U S = { 0.1,7,9,11,15,17 }           we cannot repea...

The addition of real and imaginary parts of the number is called a complex number a complex number is the builder of explained math to different group algebra, Trigonometry, set theory electronic, magnetics field, current measuring, DC and AC, construction building, etc. basically, complex number in the form of a real number, imaginary number a + bi if the real part is zero then the resultant value is imaginary if the imaginary part is zero then the resultant value is a  real number complex number diagram is shown below    what is complex plane CUBE ROOT OF UNITY PIWER ??? THE COMPLEX NUMBER PLAN SHOWN BELOW 👩                                                                    z = a + bi where a is the real number and b is also a real number       ...

SET OF   .. { NATURAL ,WHOLE ,INTEGERS,RATIONAL,IRRATIONAL},NUMBER  IS CALLED REAL NUMBER .   if real number  +   iota  then the number  is called  complex number  "  complex number  "   is   briefly explain  in  another post MULTIPLICATIVE PROPERTY OF REAL NUMBER???  ''''    EXPLANATION''''                                                                                                                                                                            ...

POWER OF IOTA  HOW SOLVE USE OF REAL NUMBER PROPERTIES            natural    number properties EX. 1                                                              5 + 8 = 8 + 5                (COMMUTATIVE PROPERTY} EX. 2                                                              (b +1) +3 /4 = b +( 1 +3 /4 )           (associative property) b is any number prove an associative property of real number           a =3 , b ...

  The  number  which starts from   1   is called the natural number      vane diagram of the natural number  below                          Number line  of  natural number  ------------------------------------------------------------------------------------------------------- 1    2   3   4  5   6    7   8    9    10    11   12   13    14     15      16      17           and so on Properties of natural number 1 closure property 2 commutative property 3 Associative property we explain these properties under ( Addition, subtraction, multiplication, and division ) with a binary operation Addition 1;  closure   ...