عندي فاينال كمان يومين و لسه بقول هصحي اذاكر ال matrices لقيت حضرتك بتشرحها مفيش حاجه اكتر من كدا تشجعني مكسلش 😂♥️ ربنا يبارك فيك ي دكتور ♥️♥️
@dr.ahmedhagag
9 ай бұрын
موفق ان شاء الله بالامتحان دعواتنا لك بالنجاح
@استغفرالله-م7ه7ط
2 күн бұрын
جزاك الله خيرا ى دكتور ❤
@ahmed24-z2b
2 ай бұрын
جزاك الله خيرا يا دكتور انا دعيتلك في الصلاة مش عارف اشكرك ازاي بحبك في الله
@moneerwishahi8577
13 күн бұрын
شرح جميل شكرا
@nairaibrahim7105
9 ай бұрын
كل الدعم
@mohabmohamed1438
4 ай бұрын
Linear equations are first-degree equations with one or more variables. A system of linear equations is a set of such equations that can be solved together. The solution can be unique, infinite, or non-existent, depending on the relationship between the equations. Key moments: 00:01 Linear equations involve multiple variables and coefficients, forming a system of equations that can be solved by substituting values to find a consistent solution. -Definition of linear equations and system of equations. It explains the concept of linear equations and the system of equations formed by them. -Coefficients and variables in linear equations. It discusses the coefficients and variables present in linear equations and their significance in solving the system. -Solving linear systems. It covers the process of solving linear systems by determining values for variables that satisfy all equations in the system. 05:05 The video discusses the concept of unique solutions in equations, where systems can have one unique solution, infinite solutions, or no solution based on the alignment of linear equations. It explores the idea of consistent systems and the implications of different types of solutions. -Different scenarios in equation solutions. It explains the outcomes of equations having one unique solution, infinite solutions, or no solution based on the alignment of linear equations. -Consistent systems and their solutions. It delves into the concept of consistent systems, where equations have either one unique solution, infinite solutions, or no solution, depending on their alignment. -Illustration of unique solutions in equations. It describes how unique solutions in equations result in intersecting lines, representing scenarios where equations have one unique solution. 10:11 Understanding matrices is crucial for solving systems of equations. Matrices are arrays of numbers organized in rows and columns, used to represent and solve mathematical problems efficiently. -Matrices can provide solutions for multiple equations simultaneously, but not all combinations of equations. They are essential for representing and solving complex mathematical systems. -Matrices are utilized in various fields like data structures and computer science to store and manipulate data efficiently in memory. They enable the creation of solutions for intricate systems. -Understanding the structure of matrices, with rows and columns, is fundamental for performing operations and transformations on data. Matrices play a vital role in mathematical computations and problem-solving. 15:22 Understanding linear systems involves matrix operations like row swapping, multiplication, and addition to find unique or infinite solutions, ensuring consistency across equations. -Matrix operations in linear systems. Row swapping, multiplication, and addition are key to finding solutions and ensuring consistency in equations. -Identifying unique or infinite solutions. By manipulating matrices through operations, solutions can be determined as unique, infinite, or non-existent based on consistency across equations. -Matrix transformations for solution derivation. Utilizing operations like row swapping and multiplication, matrices can be transformed to solve linear systems effectively and derive solutions. 20:29 Understanding matrix operations like multiplication and addition is crucial in manipulating matrices to achieve desired results in mathematical calculations. -Manipulating matrices involves operations like negative transposition, multiplication, and addition to achieve specific outcomes. -The process of changing matrix elements through operations like multiplication and addition leads to different results based on the mathematical operations applied. -Understanding how to interchange and manipulate matrix elements using mathematical operations is essential in solving equations and representing mathematical concepts visually.
@sohailasaied6586
Ай бұрын
ممتاز ♥️♥️
@abdelmonemdawoud6109
4 ай бұрын
اللهم صل وسلم وزد وبارك عليك يا حبيبي يا سيدي ومولاي يا رسول الله ❤
@naeemaali3482
7 ай бұрын
سؤال افضل كتاب عن جبر الخطي كمرجع؟
@al7d
5 ай бұрын
لو سمحت يا دكتور ايش الجهاز او التطبيق المستخدم للشرح.. كل الشكر والتقدير لجهودكم 🌹
@karim_Ahmed-ld1rr
9 ай бұрын
شابتر 6 يادكتور الحقنا
@dr.ahmedhagag
9 ай бұрын
شكرا لاهتمامك لكن احتاج الي شرح الفصول بالترتيب (قد لا اصل للفصل السادس سريعا) اعتذر لكون الشرح في وقت حرج بالنسبة للامتحانات و لكن لظروف خارجه عن ارادتي وبالتوفيق باذن الله
@karim_Ahmed-ld1rr
9 ай бұрын
@@dr.ahmedhagag شكرا جدا وكفايا تعب حضرتك معانا وذوقك❤️
Пікірлер: 16