CALCULUS

Scared of calculus symbols? No need to be as they are not meant to scare you. They are really very simple once you know how to think about them and know what they represent. For example, often you will see the symbol d or perhaps dx in a formula. Well, d simply means a small amount of something. So, dx simply means a small amount of whatever x represents. Don't try to multiply the two (d and x), they are not meant for that, just think of dx as a small amount of x, period. The symbol dx is called a differential. Also, you might have seen this symbol, called an integral. Now that is scary, right? No, not any more because I know it is simply a tall skinny S. Now how can a tall skinny S scare anyone? If you think of as meaning "the sum of" (the word sum starts with an S) well, that isn't scary either. I know that 4 is the sum of 2 + 2 already. Let's say you wanted to add up all the little bits of x and determine the sum of all the dx's you have. Now putting these two symbols together,dx simply represents "the sum of", all the "little bits of x" that you have. This process is often called integration. Integral calculus involves adding up little bits of things. A better definition might be, "the part of calculus that deals with integration and its application in the solution of differential equations and in determining areas or volumes etc." For more information and explanation of the definitions of integral and differential calculus see this page - HERE - and more HERE.
So how does calculus help us in electronics? The whole purpose of calculus is to make very difficult calculations easier. Yes, sometimes down right easy or usually at least somewhat easier. Most people think calculus is designed to make simple calculations difficult to impossible. But that is only because they really don't speak or understand calculus. It is sort of a foreign language. Learn to understand the language like we did above and calculus gets a lot easier. One example is calculating a transformer rate of change in output voltage at any one given instant. A much easier problem to solve if you use calculus. Who dreamed this calculus stuff up any way? If you want to read about the history of calculus go HERE. If you want another clear explanation of calculus read this - HERE.
See some examples of differential calculus and how it it used in electronics HERE.
Useful calculus links
Rules for limits
Derivative of a constant
Common derivatives
Derivatives of power functions of e
Trigonometric derivatives
Rules for derivatives
The antiderivative (Indefinite integral)
Common antiderivatives
Antiderivatives of power functions of e
Rules for antiderivatives
Definite integrals and the fundamental theorem of calculus
Differential equations
Calculus Reference
Calculus Resources - Comprehensive!!
Calculus Tutorial
Calculus Explained with Pictures
Calculus Aids - Reference - Solutions - Formulas
Calculus Without Tears
GREAT CALCULUS Java Applets for Learning
Understanding CapacitanceInductance Formulas - Science Forums and Debate
A function is something whereby you can put in some variable and get a different, dependant variable out. So, if f(x)=2x-3, you can put in some value, say 6, and get f(6)=2(6)-3=9.Differentiation of a function is the generation of another function for which the "y-value" (value of the dependant variable at a given "x-value," or independant variable) of the second is equal to the gradient, or slope, of the first.For example, take the function y=f(x)=x^2. For any given x, there is a y that is equal to x^2. The derivative of this function happens to be f1(x)=2x, meaning that for a given point on the original curve, its slope can be represented by 2x. So, at x=4, f(x)=4^2=16, and its slope at that point, f1(x)=2(4)=8, or 8 units up for every 1 unit over.The dy/dx means instantaneous change in y divided by instantaneous change in x. An explanation: Slope is measured by change in y divided by change in x. So between two points on a curve, the y-value of the second minus the y -value of the first, all divided by the x-value of the second divided by the x-value of the first, will give you the slope of the straight line between those two points, also called the secant. But we want the slope at a point, which poses some problems. How can there be any change at one point? Well, there can't, really, but what we can do is find the change between two points which are closer to one another than any finite distance. We can determine through algebra that as you make the distance between them smaller and smaller, the change in y over change in x gets closer and closer to some definite ratio, which is the "limit" as the distance between them "approaches zero." Thus, the "dy/dx" is that ratio at an infinitely small distance, thereby effectively being the slope at one point.Understanding CapacitanceInductance Formulas - Science Forums and Debate
If it's an upper case sigma then that means the sum of a sequence.
It's got everything to do with integrals. An integral is the sum of the rectangles under the curve, change in x (width) times height, the change in width approaches zero and the number of rectangles approaches infinity. Sums are where integrals come from. It's basically "the sum of all y-values."Understanding CapacitanceInductance Formulas - Science Forums and Debate
For AC electronics, designing circuits is easily done, using complex numbers.Imagine a voltage source with a angular frequency ω and amplitude A, so as function of time you have V(t) = A*cos(ωt).Now, replace this with a voltage X(t) = A*exp(ωt). Now, the real voltage can be written as the real part of X(t), being Re(X(t)) = A*cos(ωt).Using this formalism, you can treat every passive linear component as a complex resistor Z. For lumped devices there are basically three types:Capacitor with capacity C: Z = 1/jωCResistor with resistance R: Z = RInductor with inductance L: Z = jωLHere the number j has the property j² = -1.Now I'll give an example with three nodes, GND, VIN, VOUT. Between GND and VIN there is a voltage source X(t). Between VIN and VOUT there is a resistor R. Between VOUT and GND is a capacitor C. What is the output voltage as function of input voltage?This now can be easily solved. We introduce a complex voltage XOUT and XIN.We have a series connection of two resistors. Using basic circuitry for resistors you findXOUT = XIN * (ZC / (ZC + ZR)), where ZC is the capacitor's complex resistance and ZR is the resistor's complex resistance.Now XOUT = XIN *(1/jωC) / (R + (1/jωC)) = XIN / (1 + jωRC)So, you have XOUT as function of XIN and the angular frequency ω.The amplification as function of frequency ω can be written as 1/sqrt(1+ω²R²C²). There also is a phase shift, between input and output. That is -arg(1 + jωRC). For small ω (close to DC), the phase shift is close to 0, for high ω, the phase shift is almost 90 degrees.If you understand complex numbers, then this should be easy to grasp, otherwise it indeed will be very difficult for you to determine transfer functions of capactive and inductive circuits.The key to understanding these things is"transfer function""complex arithmetic""bode plot""poles and zeros""laplace transform"http://en.wikipedia.org/wiki/Transfer_function
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Understanding CapacitanceInductance Formulas - Science Forums and Debate


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Calc 101 Automatic Calculus Solutions
AP Physics & Calculus Problems of the Week From Kentridge High School
Interactive Calculus - Teachers can write Ron Larson odx@psu.edu for a free subscription.
AP Calculus from the College Board
Physics and Calculus Problems of the Week
Finite Mathematics and Applied Calculus Resource Page
Alvirne HS Problem of the Week A gold mine of current and archived problems
Visual Calculus
Dave Slomer's Calcu Page
The Rental Car Problem from CCP
Mr. Calculus
The rise of calculus For the history buffs among us
www.calculus.net
AP Calculus on the Web from Sandy Ray
First Semester Calculus The Continuity-Differentiability Issue
The Calculus Hater's Homepage The other side heard from (poor fellow)
Karl's Calculus Tutor Lots of information
AP Distance-Learning Project
Dr. Papa's Course at Rice U. complete with exams
Integral Calc Exam from U of Pitt
Differentiation Problems from U of Pitt
Integration Problems Same Place
CalculusQuest
Learning Calculus A How-To-Be-Successful List of Tips
The MATHMAN Something about teaching Calculus to 7 year olds
Dr. Sloane's Calculus 1 and 2
I Love Calculus
Need to understand electronics, with or without the math? Everyone needs this book. The title is a little misleading but believe me you don't want to be without this clearly written, hands on, basic electronics book.