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- Notes of Vector Analysis
- 3: Vector Calculus==== * Derivative of a vector function * Differential equation * Initial value probl... f formulas of differential operators * Harmonic function * Gradient of scalar function * Directional derivative * Level surface * Unit normal vectors * Th... or * Laplace operator * Laplacian of a scalar function $f$ * Laplace's equation * Harmonic function
- Chapter 01: Real Numbers, Limits and Continuity @bsc:notes_of_calculus_with_analytic_geometry
- relation (B.R), Domain of B.R, Range of B.R * Function, Onto or surjective funiton, (1-1) Function, Bijective Function * Real valued function, Image of a function, Bracket function * **Articles of Exercise 1.2** * Fi
- Vector Analysis by Hameed Ullah: Notes
- iple product * Vector triple product * Vector function * Limit of a vector function * Continuity of vector function * Differentiation of a vector function * The vector differential operator * Gradient of a scalar *
- Syllabus & Paper Pattern for General Mathematics (Split Program) @bsc:paper_pattern:punjab_university
- s; Inequalities Limit and Continuity: Limit of a function, left hand and right hand limits, Theorems of lim... and Multiple Integrals: Limit and continuity of a function of two variables; The partial derivative, Computi... t planes and normal lines; Maxima and minima of a function of two variables; Double integral in rectangular
- Chapter 04: Techniques of Integration @bsc:notes_of_calculus_with_analytic_geometry
- egration.jpg" title="Integral of the one variable function" class="mediaright" alt="Integral of the one variable function" /></HTML> These notes are written by **Prof. Muh
- Chapter 11: The Laplace Transform @bsc:notes_of_mathematical_method
- === Let $f$ be a real valued piecewise continuous function defined on $[0,\infty)$. The Laplace transform of $f$, denoted by $\mathcal{L}(f)$, is the function $F$ defined by $ F(s)=\int_0^{\infty} e^{-st} f(t
- General Mathematics (Paper A & B) @bsc:paper_pattern:sargodha_university
- (root of complex number) | |Ex 1.3, 1.4 |Circular function, Hyperbolic functions, Logarithmic function | ====SECTION-II==== ^Chapter 3 (Method)^| |Ex 3.1 |Algebr
- Notes of Metric Spaces
- | ====Contents and summary==== * Real valued function * Metric * Usual Metric * Open Sphere *
- Notes of Metric Spaces by Umer Asghar
- | ====Contents and summary==== * Real valued function * Metric * Usual Metric * Open Sphere *
- Chapter 08: Infinite Series @bsc:notes_of_mathematical_method
- s is developed through the use of special kind of function called sequence. ==== Contents and summary ====