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Formation Constant Lab Report
Determine the constant of formation for an iron compound
£6.25 Preview RemoveGCSE Chemistry 2.5 - Organic Chemistry
These are concise, exam-focused notes made using the WJEC specification and BBC Bitesize. (I achieved an A*.) This is one of six topics in the unit.
£0.99 Preview RemoveIntegration Problems
50 solved integration problems which cover most basic integration ideas. they are great use for first and second year students.
£2.50 Preview RemoveBayesian Statistics
This is an essay about Bayesian Statistics and its course.
£31.25 Preview RemoveSection 1-3-Problem Solving
Introduction to Complex Numbers on the college level. Includes detailed examples of adding, subtracting, multiplying and dividing Complex Numbers.
£3.13 Preview RemoveThe concept of infinity
These notes brake down the complete concept of infinity and it will show you how you can count past infinity
£2.50 Preview RemovePermutaion,Combination,Probability
Permutation : Permutation means arrangement of things. The word arrangement is used, if the order of things is considered. Combination: Combination means selection of things. The word selection is used, when the order of things has no importance
£2.50 Preview RemovePreliminaries and Foundations of Calculus
The topic "Preliminaries and Foundations of Calculus" typically covers the essential concepts and tools needed to understand and study calculus. These foundational ideas lay the groundwork for more advanced topics in calculus and include the following key areas: 1. Functions and Graphs: A function is a relationship between a set of inputs (domain) and a set of possible outputs (range), where each input is related to exactly one output. Understanding the concept of a function is crucial, as calculus primarily deals with functions and their properties. Graphing functions helps in visualizing their behavior, such as identifying limits, continuity, and asymptotes. 2. Limits and Continuity: The concept of a limit is central to calculus, describing the behavior of a function as the input approaches a particular value. Continuity refers to whether a function behaves smoothly without breaks or jumps in its graph. The notion of limits is foundational for defining derivatives and integrals. 3. Sequences and Series: A sequence is an ordered list of numbers, and a series is the sum of the terms of a sequence. Convergence of sequences and series plays an important role in understanding the behavior of functions at infinity or as they approach certain values. 4. Real Numbers and Algebra: Understanding the real number system (including rational and irrational numbers) and basic algebraic operations are important for solving problems in calculus. Concepts such as inequalities, powers, exponents, and polynomials are frequently used in calculus. 5. Rates of Change: The rate of change of a function, such as velocity or growth rate, is often studied in calculus. This leads to the concept of the derivative, which is the primary tool for studying rates of change. 6. Derivatives: The derivative of a function represents how the function changes as its input changes. It’s used to analyze the slope of a curve, tangents to curves, and optimization problems. 7. Integrals: Integration is the reverse process of differentiation and is concerned with finding the area under a curve or accumulating quantities over an interval. The integral is fundamental for solving problems related to total accumulation, such as areas, volumes, and work. 8. The Fundamental Theorem of Calculus: This theorem links differentiation and integration, showing that the two processes are essentially inverses of each other. It provides the foundation for calculating definite integrals. Together, these preliminaries form the essential groundwork for studying more complex topics in calculus, such as differential equations, multivariable calculus, and advanced integration techniques.
£6.25 Preview RemoveOrdinary differential equation
In mathematics, an ordinary differential equation (ODE) is a differential equation containing one or more functions of one independent variable and the derivatives of those functions. The term ordinary is used in contrast with the term partial differential equation which may be with respect to more than one independent variable.
£2.50 Preview Remove