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 try to let x approaches a.
<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>?"


<math> f(a) = L,</math>
Sometimes we can't tell what F(a) equals.
 
some times we can't tell what is the F(a) equals to.


example 1
example 1
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[[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 If a = 1 then you will get  
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>
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But in the graph if a = 1 it looks like it is than f(x) = 4
But in the graph if a = 1 it looks like it is than f(x) = 4


So the logic of the limit is approaches to not equal to. (what's the different?)
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.


it will be like this when we say x=1 then x is on.
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.


But if we say x->1 then it could be 1.00000....1 or 9.9999....999, x will not be 1 it will just 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.
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==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

Screen Shot 2021-08-28 at 8.02.52 PM.png

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

  1. Sum Rule: The limit of the sum of two functions is the sum of their limits :
  2. Difference Rule: The limit of the difference of two functions is the difference of their limits :
  3. Product Rule: The limit of a product of two functions is the product of their limits :
  4. Constant Multiple Rule: The limit of a constant times a function is the constant times the limit of the function :

  1. 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.