Difference between revisions of "Calculus:Limits"
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<math> \lim_{x \to a} f(x) = L,</math> | <math> \lim_{x \to a} f(x) = L,</math> | ||
When you see this equation it means you are | <noinclude> | ||
When you see this equation it means you are trying to let "x" approach "a". | |||
You may have a question why can't we just write it as | You may have a question, "why can't we just write it as <math> f(a) = L</math>?" | ||
Sometimes we can't tell what F(a) equals. | |||
example 1 | example 1 | ||
<math> \lim_{x \to a} f | <math> \lim_{x \to a} f(x) = {x^2-1 \over x-1} </math> | ||
[[File:Screen Shot 2021-08-28 at 8.02.52 PM.png|thumb]] | [[File:Screen Shot 2021-08-28 at 8.02.52 PM.png|thumb]] | ||
But | But if a = 1 then you will get | ||
<math> ({1^2-1 \over 1-1})^2 = ({0 \over 0})^2</math> | <math> ({1^2-1 \over 1-1})^2 = ({0 \over 0})^2</math> | ||
Line 19: | Line 18: | ||
Denominator can't be 0 so it is undefined at that point. | Denominator can't be 0 so it is undefined at that point. | ||
But in the graph if a = 1 it looks like it is than f'(x) = | But in the graph if a = 1 it looks like it is than f(x) = 4 | ||
So the logic of the limit is approaching to not equal to. (what's the difference?) | |||
it will be like this: | |||
When we say x=1 then x is one. | |||
But if we say <math>x \to 1</math> then it could be 1.00000....0001 or 9.9999....999, x will not be 1 it will just be close to one. | |||
When looking at the graph, you will see h equals Δx. Δx means the rate of change of x. Most of the time we will like h or Δx approaches to 0. | |||
</noinclude> | |||
==Properties of Limits== | |||
# Sum Rule: The limit of the sum of two functions is the sum of their limits : <math>\lim_{x \to c} (f(x)+g(x)) = \lim_{x \to c} (f(x)) + \lim_{x \to c} (g(x))</math> | |||
# Difference Rule: The limit of the difference of two functions is the difference of their limits : <math>\lim_{x \to c} (f(x) - g(x)) = \lim_{x \to c} f(x) -\lim_{x \to c} g(x)</math> | |||
# Product Rule: The limit of a product of two functions is the product of their limits : <math>\lim_{x \to c} (f(x) * g(x)) = \lim_{x \to c} f(x) * \lim_{x \to c} g(x)</math> | |||
# Constant Multiple Rule: The limit of a constant times a function is the constant times the limit of the function : | |||
<math>\lim_{x \to c} (k * g(x)) = k * \lim_{x \to c} g(x)</math> | |||
# Quotient Rule: The limit of a quotient of two functions is the quotient of their limits, provided the limit of the denominator is not zero. <math> \lim_{x \to c} {(f(x) \over g(x))}= {\lim_{x \to c} f(x) \over \lim_{x \to c} g(x)}</math> |
Latest revision as of 14:42, 25 November 2021
When you see this equation it means you are trying to let "x" approach "a".
You may have a question, "why can't we just write it as ?"
Sometimes we can't tell what F(a) equals.
example 1
But if a = 1 then you will get
Denominator can't be 0 so it is undefined at that point.
But in the graph if a = 1 it looks like it is than f(x) = 4
So the logic of the limit is approaching to not equal to. (what's the difference?)
it will be like this:
When we say x=1 then x is one.
But if we say then it could be 1.00000....0001 or 9.9999....999, x will not be 1 it will just be close to one.
When looking at the graph, you will see h equals Δx. Δx means the rate of change of x. Most of the time we will like h or Δx approaches to 0.
Properties of Limits
- Sum Rule: The limit of the sum of two functions is the sum of their limits :
- Difference Rule: The limit of the difference of two functions is the difference of their limits :
- Product Rule: The limit of a product of two functions is the product of their limits :
- Constant Multiple Rule: The limit of a constant times a function is the constant times the limit of the function :
- Quotient Rule: The limit of a quotient of two functions is the quotient of their limits, provided the limit of the denominator is not zero.