Biography
Name: Mustafa Ibrahim Hameed
Date of Birth: 22/01/1984
Religion: Muslim
Martial statues: Married
No. of children: 3
Specialization: Science Mathematics
Position: Complex Analysis (Geometric Function Theory, Analytic and Univalent Functions, Starlike and Convex Functions, Meromorphic Functions, Harmonic Univalent Functions).
Scientific Degree: Master of Mathematics / Assistant Teacher
Work Address: College of Education for Pure Sciences / Department of Mathematics
In Scopus: 43Citations by 16 documents, 11Documents, 4h-index
Mobile: 07819789358 / 07735114220
E-mail: mustafa8095@uoanbar.edu.iq / mustafa8095@gmail.com
Scientific Certification:
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Date
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College
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University
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Degree science
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2006-2007
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Education for Pure Sciences
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Anbar
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B.Sc.
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2018/8/18
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Education for Pure Sciences
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Tikrit
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M.Sc.
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2022/8/22
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Education for Pure Sciences
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Baghdad
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Ph.D.
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Publication
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Year
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Research Title
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No.
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2017
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Certain subclass of univalent functions involving fractional q-calculus operator
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1
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2018
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Some results of second-order differential subordination involving generalized linear operator
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2
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2018
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On second-order differential subordination and superordination of analytic functions involving the Komatu integral operator
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3
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2019
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Study of certain subclasses of analytic functions involving convolution operator
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4
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2019
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Some Applications on Subclasses of Analytic Functions Involving Linear Operator
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5
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2019
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On the third Hankel determinant for certain classes of analytic functions
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6
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2021
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Applications of Generalized Hypergeometric Analysis Function of Second Order Differential Subordination
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7
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2021
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Some Classes Of Analytic Functions For The Third Hankel Determinant
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8
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2021
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A New Class of Harmonic Univalent Functions of the Salagean Type
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9
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2021
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Certain Geometric Properties of Meromorphic Functions Defined by a New Linear Differential Operator
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10
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2021
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Using Quasi-Subordination to Solve the Fekete-Szego Problem for a Subclass of Meromorphic Functions
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11
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2022
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On Differential Subordination and Superordination for Univalent Function Involving New Operator
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12
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2022
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A certain Subclass of Meromorphically Multivalent Q-Starlike Functions Involving Higher-Order Q-Derivatives
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13
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2022
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A New Genera Integral Operator Defines Harmonic Multivalent Functions
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14
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2022
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Study Some Differential Subordination and Superordination Results Involving of Certain Class
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15
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2022
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Some Classes of Univalent Function with Negative
Coefficients
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16
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2022
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An application of subclasses of Goodman-Salagean-type harmonic univalent functions involving hypergeometric function
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17
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2022
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Some properties of subclass of P-valent function with new generalized operator
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18
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2022
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Several Subclasses of r-Fold Symmetric Bi-Univalent Functions possess Coefficient Bounds
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19
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2023
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Some Applications of Certain Subclasses of Meromorphic
Functions Defined by Certain Differential Operators
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20
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2023
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SECOND ORDER HANKEL DETERMINANTS FOR CLASS OF BOUNDED TURNING FUNCTIONS DEFINED BY S?L?GEAN DIFFERENTIAL OPERATOR
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21
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2023
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The Investigation of Derivation Pairs in Relation to Semi-Rings
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22
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2023
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Higher-Order Derivatives of Differential Subordination of Multiple Functions
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23
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2023
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Subordination and superordination of analytic functions
described by new operator
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24
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2024
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Some outcomes involving a specific class of functions over differential subordination and superordination
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25
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2024
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Novel classes of bi-univalent functions of the S?l?gean type with
modified sigmoid unit action function
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26
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2024
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Results of third-order differential subordination for holomorphic
functions
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27
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2024
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Applications of Subordination for Holomorphic Functions Stated by Generalized By-Product Operator
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28
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Lectures
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No.
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Subjects
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Lectures
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Stage
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File
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Video
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1 |
Complex Functions
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Complex Numbers
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Third
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2 |
Complex Functions
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Absolute Value
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Third
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3 |
Complex Functions
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polar coordinates
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Third
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4 |
Complex Functions
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polar coordinates
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Third
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5 |
Complex Functions
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Powers and Roots
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Third
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|
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6 |
Complex Functions
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Analytic Functions
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Third
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|
|
|
7 |
Complex Functions
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Continuity
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Third
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|
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8 |
Complex Functions
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Cauchy Riemann Equations
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Third
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|
|
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9 |
Complex Functions
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Cauchy Riemann Equations in Polar Coordinates
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Third
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|
|
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10 |
Complex Functions
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Analytic Functions
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Third
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|
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11 |
Complex Functions
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Harmonic Functions
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Third
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12 |
Complex Functions
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Harmonic Conjugate
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Third
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13 |
Complex Functions
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Exercises
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Third
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14 |
Complex Functions
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Elementary Functions
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Third
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15 |
Complex Functions
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Trigonometric Functions
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Third
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16 |
Complex Functions
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References
|
Third
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17 |
Set Theory
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Periodic Functions
|
Third
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18 |
Set Theory
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Theorems
|
Third
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19 |
Set Theory
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Orthogonality
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Third
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20 |
Set Theory
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Properties Orthogonality
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Third
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21 |
Set Theory
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Even and Odd Functions
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Third
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22 |
Set Theory
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Fourier Series
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Third
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23 |
Set Theory
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Examples of Fourier Series
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Third
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|
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24 |
Set Theory
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Examples2 of Fourier Series
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Third
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|
|
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25 |
Set Theory
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One Dimension Wave Equation
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Third
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|
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26 |
Set Theory
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Example in One Dimension Wave Equation
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Third
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27 |
Set Theory
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Example Wave Equation
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Third
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28 |
Set Theory
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References
|
Third
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29 |
Calculus
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Basic Concepts
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First
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30 |
Calculus
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The Function
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First
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31 |
Calculus
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Properties of exponential, logarithm, Equation of
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First
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32 |
Calculus
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Theorem of Limit
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First
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33 |
Calculus
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Continuity
|
First
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34 |
Calculus
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Derivative
|
First
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35 |
Calculus
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Chain Rule
|
First
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36 |
Calculus
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Integration
|
First
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37 |
Calculus
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Integration by partial fractions
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First
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38 |
Calculus
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Integration by parts
|
First
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39 |
Calculus
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References
|
First
|
|
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Academic certificates
|
Date
|
College
|
University
|
Degree science
|
|
2006-2007
|
Education for Pure Sciences
|
Anbar
|
B.Sc.
|
|
2018/8/18
|
Education for Pure Sciences
|
Tikrit
|
M.Sc.
|
|
2022/8/22
|
Education for Pure Sciences
|
Baghdad
|
Ph.D.
|
Supervision
Supervision schedule for fourth-year students
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No.
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Year
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Students' Names
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Research Title
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1
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fourth
|
Alaa A. Saleh
|
Impaired Integration and Some of Its Applications
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|
2
|
fourth
|
Lubab A. Ahmed
|
Partial Differential Equations, Their Solution Methods, and Some of Their Applications
|
|
3
|
fourth
|
Shaker S. Khalaf
|
Matrixes and Their Economic Uses
|
|
4
|
fourth
|
Nour F. Saray
|
The Relationship Between the Binomial and Normal Distributions
|
|
5
|
fourth
|
Hala A. Sakin
|
Higher-Order Homogeneous and Nonhomogeneous Linear Differential Equations
|
Other
- Geometric Function Theory: Analytic and Univalent Functions, Starlike and Convex Functions, Meromorphic Functions, Fractional Calculus, Harmonic Univalent Functions, Uniformly Starlike and Uniformly Convex Functions.
- Special Functions.
- Application of (functional analysis, linear Algebra)
