Functions | Lecture 32 | Classifications of functions | One to One Functions | በአማርኛ
Functions | Lecture 02 | Quadratic Equation solving techniques | በአማርኛ
General Physics | Lecture 90| Example with detailed Explanation| in Amharic|በአማርኛ |Habesha Academy
Functions | Lecture 22 | Combination & composition of function | equality of functions | በአማርኛ
Set Theory | Lecture 01 | The Concepts of a set | በአማርኛ
General Physics| Lecture 53| Example with detailed Explanation| Amharic |በአማርኛ |Habesha Academy
Functions | Lecture 15 | Examples: find the domain and range of the functions part 1 | በአማርኛ
Real & Complex Number | Lecture 01 | the real and complex number system | በአማርኛ
Real & Complex Number | Lecture 02 | Mathematical induction with examples | በአማርኛ
Set Theory | Lecture 08| power set | Example with detailed explanations | በአማርኛ
የባህር ዳር ዩኒቨርሲቲ | General Physics | ክፍል 1 | Bahir Dar University Mid Exam
Set Theory | Lecture 21 | Example with detailed explanation | በአማርኛ
General Physics |Lecture 78 | Chapter 3: Dynamics| in Amharic በአማርኛ
General Physics| Lecture 49| Example with detailed Explanation |Amharic |በአማርኛ |Habesha Academy
General Physics |Lecture 92 | Example on application of Newton's second law| in Amharic| በአማርኛ
Functions | Lecture 06 | Relation | Cartesian Product| Domain and Range | በአማርኛ
Polynomial Functions | Lecture 01 | types of functions | Definition of polynomial functions | በአማርኛ
Set Theory | Lecture 02 | Description of set part 1| በአማርኛ
Exponential Functions | Lecture 01 | Exponents and Radicals | በአማርኛ
Real & Complex Number | Lecture 03 | principles of mathematical induction | Examples | በአማርኛ
Set Theory | Lecture 05 | Example with detailed Explanation | በአማርኛ
Set Theory | Lecture 20 | Example with detailed explanation | በአማርኛ
Functions | Lecture 36 | Onto (surjective) Functions with detailed explanations | በአማርኛ
General Physics| Lecture 03|Types of Vectors part 1| Amharic|በአማርኛ| Habesha Academy
Functions | Lecture 01 | Function | interval, linear equation and inequality | በአማርኛ
Freshman mathematics mid-exam solution 1 in Amharic
Functions | Lecture 12 | Domain, Codomain, and range of a function with examples | በአማርኛ
General Physics | Lecture 106 | Uniform Circular Motion | Centripital Acceleration | በአማርኛ
General Physics |Lecture 91| Detailed example with explanation in Amharic|በአማርኛ| Habesha Academy
Mathematical Logic | Lecture 24 | Arguments and Validity | በአማርኛ
የባህር ዳር ዩኒቨርሲቲ | General Physics | ክፍል 2 | Bahir Dar University Mid Exam
Polynomial Functions| Lecture 05| Theorems on Polynomials| Division algorithm| Remainder theorem
Mathematical Logic | Lecture 17 | Quantifier | በአማርኛ
General Physics| Lecture 41|Chapter 2 Kinematics | introduction& frame of reference |በአማርኛ
Functions | Lecture 39 | One to one Correspondence Functions with detailed explanations | በአማርኛ
Polynomial Functions | Lecture 16 | Zeros of a Polynomial | Examples
የጎንደር ዩኒቨርሲቲ General Physics Mid Exam Solution | ክፍል 1| University of Gondar General Physics Mid
Polynomial Functions | Lecture 02 | Example : which of the following are polynomials | በአማርኛ
General Physics| Lecture 12| Graphical method of vector addition| Amharic |በአማርኛ|Habesha Academy|
General Physics| Lecture 70| Projectile Motion| Horizontal and Vertical Projection| Amharic|በአማርኛ
Mathematical Logic | Lecture 21 | Quantifiers occurring in Combination | በአማርኛ
Set Theory | Lecture 04 | empty set, finite, infinite, subset, proper subset| part 1| በአማርኛ
የባህር ዳር ዩኒቨርሲቲ | General Physics | ክፍል 3 | Bahir Dar University Mid Exam
Anthropology chapter two(2) frsh man course in amharic
Freshman mathematics mid-exam solution 2 | in Amharic
History of Habesha | Episode 01
geography freshman course chapter six(6) part one(1)/geography chapter six(6)
Ethiopian aviation university pilot class of 2022
የአዲስ አበባ ዩኒቨርሲቲ Mid Exam ክፍል 2 | Addis Ababa University Maths Mid-Exams | በአማርኛ
Functions | Lecture 35 | Examples : Check whether the functions are one to one or not | በአማርኛ
Set Theory | Lecture 27 | Examples : the numbers of element of union and symmetric | በአማርኛ
Functions |Lecture 44 |Inverse of a Function| Conditions for invertible |Graph of inverse function
Inclusiveness Chapter 1 part 1 in Amharic || For freshman students
Real & Complex Number | Lecture 20 | Example | Find the roots of a complex number | በአማርኛ
General Physics| Lecture 56 Example 2 with detailed Explanation Amharic በአማርኛ Habesha Academy
Mathematics | Lecture 26 | Example | check the validity | በአማርኛ
Functions | Lecture 25 | Examples: Find the domain of Combination & Composition Functions | በአማርኛ
Real & Complex Number | Lecture 15 | Modulus| Argument| Polar form| of complex number part 2 | በአማርኛ
