Difference between revisions of "Differentiation Rules"
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For any fixed real number <math>c</math> , | For any fixed real number <math>c</math> , | ||
<center><math>\frac{d}{dx}\big[c\cdot f(x)\big]=c\cdot\frac{d}{dx}\big[f(x)\big]</math></center> | <center><math>\frac{d}{dx}\big[c\cdot f(x)\big]=c\cdot\frac{d}{dx}\big[f(x)\big]</math></center> | ||
− | The reason, of course, is that one can factor <math>c</math> out of the numerator, and then of the entire limit, in the definition. The details are left as an | + | The reason, of course, is that one can factor <math>c</math> out of the numerator, and then of the entire limit, in the definition. The details are left as an exercise. |
'''Example''' | '''Example''' | ||
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* [https://youtu.be/K3MxofAF-9o The Quotient Rule] by patrickJMT | * [https://youtu.be/K3MxofAF-9o The Quotient Rule] by patrickJMT | ||
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+ | ==Licensing== | ||
+ | Content obtained and/or adapted from: | ||
+ | * [https://en.wikibooks.org/wiki/Calculus/Differentiation/Differentiation_Defined Differentiation Defined, Wikibooks: Calculus/Differentiation] under a CC BY-SA license |
Latest revision as of 15:43, 15 January 2022
Contents
Differentiation Rules
The process of differentiation is tedious for complicated functions. Therefore, rules for differentiating general functions have been developed, and can be proved with a little effort. Once sufficient rules have been proved, it will be fairly easy to differentiate a wide variety of functions. Some of the simplest rules involve the derivative of linear functions.
Derivative of a constant function
For any fixed real number ,
Intuition
The graph of the function is a horizontal line, which has a constant slope of 0. Therefore, it should be expected that the derivative of this function is zero, regardless of the values of and .
Proof
The definition of a derivative is
Let for all . (That is, is a constant function.) Then . Therefore
Let . To prove that , we need to find a positive such that, for any given positive , whenever . But , so for any choice of .
Examples
Note that, in the second example, is just a constant.
Derivative of a linear function
For any fixed real numbers and ,
The special case shows the advantage of the notation—rules are intuitive by basic algebra, though this does not constitute a proof, and can lead to misconceptions to what exactly and actually are.
Intuition
The graph of is a line with constant slope .
Proof
If , then . So,
Constant multiple and addition rules
Since we already know the rules for some very basic functions, we would like to be able to take the derivative of more complex functions by breaking them up into simpler functions. Two tools that let us do this are the constant multiple rule and the addition rule.
The Constant Rule
For any fixed real number ,
The reason, of course, is that one can factor out of the numerator, and then of the entire limit, in the definition. The details are left as an exercise.
Example
We already know that
Suppose we want to find the derivative of
Another simple rule for breaking up functions is the addition rule.
The Addition and Subtraction Rules
Proof
From the definition:
By definition then, this last term is
Example
What is the derivative of ?
The fact that both of these rules work is extremely significant mathematically because it means that differentiation is linear. You can take an equation, break it up into terms, figure out the derivative individually and build the answer back up, and nothing odd will happen.
We now need only one more piece of information before we can take the derivatives of any polynomial.
The Power Rule
For example, in the case of the derivative is as was established earlier. A special case of this rule is that .
Since polynomials are sums of monomials, using this rule and the addition rule lets you differentiate any polynomial. A relatively simple proof for this can be derived from the binomial expansion theorem.
This rule also applies to fractional and negative powers. Therefore
Derivatives of polynomials
With these rules in hand, you can now find the derivative of any polynomial you come across. Rather than write the general formula, let's go step by step through the process.
The first thing we can do is to use the addition rule to split the equation up into terms:
We can immediately use the linear and constant rules to get rid of some terms:
Now you may use the constant multiplier rule to move the constants outside the derivatives:
Then use the power rule to work with the individual monomials:
And then do some algebra to get the final answer:
These are not the only differentiation rules. There are other, more advanced, differentiation rules, which will be described in a later chapter.
Resources
- Differentiation Rules PowerPoint file created by Dr. Sara Shirinkam, UTSA.
- Basic Differentiation Rules For Derivatives by The Organic Chemistry Tutor
- Power rule for derivatives by Krista King
- The Product Rule for Derivatives by patrickJMT
- Product rule - 3+ functions by Krista King
- The Quotient Rule by patrickJMT
Licensing
Content obtained and/or adapted from:
- Differentiation Defined, Wikibooks: Calculus/Differentiation under a CC BY-SA license