2015م - 1444هـ


In this playlist you'll learn all about Complex Numbers - what they are, why they matter, and how to solve a variety of problems that require them. Complex Numbers can be confusing, especially because the most fundamental fact about them seems to contradict one of the most basic things you learn in early mathematics: you can't take the square root of a negative number. In fact, negative numbers have square roots too, and including them in our number system is enormously powerful for unlocking new ways of representing mathematical realities in the world around us.



في قائمة التشغيل هذه ، ستتعلم كل شيء عن الأرقام المعقدة - ما هي وسبب أهميتها وكيفية حل مجموعة متنوعة من المشكلات التي تتطلبها. يمكن أن تكون الأرقام المعقدة مربكة ، خاصة لأن الحقيقة الأساسية عنها تبدو متناقضة مع أحد أهم الأشياء الأساسية التي تتعلمها في الرياضيات المبكرة: لا يمكنك أخذ الجذر التربيعي لرقم سالب. في الواقع ، للأرقام السالبة جذور تربيعية أيضًا ، وإدراجها في نظام الأعداد لدينا قوي للغاية لفتح طرق جديدة لتمثيل الحقائق الرياضية في العالم من حولنا.



A complex number is a number that can be expressed in the form a + bi, where a and b are real numbers, and i is a solution of the equation x2 = −1. Because no real number satisfies this equation, i is called an imaginary number. For the complex number a + bi, a is called the real part, and b is called the imaginary part. Despite the historical nomenclature "imaginary", complex numbers are regarded in the mathematical sciences as just as "real" as the real numbers, and are fundamental in

many aspects of the scientific description of the natural world.[note 1][1]



العدد المركب هو رقم يمكن التعبير عنه بالصيغة a + bi ، حيث a و b أرقام حقيقية ، و i هو حل المعادلة x2 = −1. نظرًا لعدم وجود رقم حقيقي يلبي هذه المعادلة ، يُطلق على i رقمًا وهميًا. بالنسبة للرقم المركب a + bi ، يسمى a الجزء الحقيقي ، ويسمى b الجزء التخيلي. على الرغم من التسميات التاريخية "الخيالية" ، تعتبر الأعداد المركبة في العلوم الرياضية "حقيقية" مثل الأعداد الحقيقية ، وهي أساسية في العديد من جوانب الوصف العلمي للعالم الطبيعي.



Complex numbers allow solutions to certain equations that have no solutions in real numbers. For example, the equation



{displaystyle (x+1)^{2}=-9}{displaystyle (x+1)^{2}=-9}

has no real solution, since the square of a real number cannot be negative. Complex numbers provide a solution to this problem. The idea is to extend the real numbers with an indeterminate i (sometimes called the imaginary unit) that is taken to satisfy the relation i2 = −1, so that solutions to equations like the preceding one can be found. In this case the solutions are −1 + 3i and −1 − 3i, as can be verified using the fact that i2 = −1:

According to the fundamental theorem of algebra, all polynomial equations with real or complex coefficients in a single variable have a solution in complex numbers. In contrast, some polynomial equations with real coefficients have no solution in real numbers. The 16th-century Italian mathematician Gerolamo Cardano is credited with introducing complex numbers in his attempts to find solutions to cubic equations.[2]



Formally, the complex number system can be defined as the algebraic extension of the ordinary real numbers by an imaginary number i.[3] This means that complex numbers can be added, subtracted, and multiplied, as polynomials in the variable i, with the rule i2 = −1 imposed. Furthermore, complex numbers can also be divided by nonzero complex numbers. Overall, the complex number system is a field.



Geometrically, complex numbers extend the concept of the one-dimensional number line to the two-dimensional complex plane by using the horizontal axis for the real part and the vertical axis for the imaginary part. The complex number a + bi can be identified with the point (a, b) in the complex plane. A complex number whose real part is zero is said to be purely imaginary; the points for these numbers lie on the vertical axis of the complex plane. A complex number whose imaginary part is zero can be viewed as a real number; its point lies on the horizontal axis of the complex plane. Complex numbers can also be represented in polar form, which associates each complex number with its distance from the origin (its magnitude) and with a particular angle known as the argument of this complex number.



The geometric identification of the complex numbers with the complex plane, which is a Euclidean plane ({displaystyle mathbb {R} ^{2}}mathbb {R} ^{2}), makes their structure as a real 2-dimensional vector space evident. Real and imaginary parts of a complex number may be taken as components of a vector with respect to the canonical standard basis. The addition of complex numbers is thus immediately depicted as the usual component-wise addition of vectors. However, the complex numbers allow for a richer algebraic structure, comprising additional operations, that are not necessarily available in a vector space; for example, the multiplication of two complex numbers always yields again a complex number, and should not be mistaken for the usual "products" involving vectors, like the scalar multiplication, the scalar product or other (sesqui)linear forms, available in many vector spaces; and the broadly exploited vector product exists only in an orientation-dependent form in three dimensions.