Is the ordinary integral a special case of the line integral?

In summary, the conversation discusses the possibility of considering the ordinary integral over the real line as a special case of the line integral, where the line is straight and the field is defined only along the line. While this is possible, there is a difference in terms of defining a field along a 1D line. It is also mentioned that the regular integral along a line in R^2 will always be 0, while it would not make sense for line integrals to be 0 on all lines.
  • #1
LucasGB
181
0
Can I consider the ordinary integral over the real line a special case of the line integral, where the line is straight and the field is defined only along the line?
 
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  • #2
You certainly can do it that way, if you want to.
 
  • #3
But can it be called a field if it is only defined along a 1D line?
 
  • #4
If the field "defined" on the line actually satisfies the requirements to be a field, yes. Say, for example, if you're in C and choose your line to be R, then you're good. But if you choose the imaginary axis to be your line and do not change the definition of multiplication then you do not have a field.

But as for your question, I'm not sure. I think the two may be inherently different. If we're in R^2 the regular integral of any function along a line will be 0 because lines have measure 0, whereas it would be silly to have line integrals be 0 on all lines.
 

1. What is the difference between an ordinary integral and a line integral?

An ordinary integral is a mathematical tool used to calculate the area under a curve in a two-dimensional space. A line integral, on the other hand, is used to calculate the work done by a force along a path in a three-dimensional space.

2. How is the ordinary integral related to the line integral?

The ordinary integral can be seen as a special case of the line integral, where the path in the three-dimensional space is restricted to a straight line in the two-dimensional space. This means that the line integral can be used to calculate the area under a curve in a two-dimensional space, making it a more general tool.

3. Can the ordinary integral be used in three-dimensional spaces?

No, the ordinary integral is limited to two-dimensional spaces. In three-dimensional spaces, the line integral is used instead.

4. How do you calculate the line integral?

To calculate the line integral, you need to parameterize the path and then integrate the product of the function being integrated and the differential of the path parameter along the path.

5. In what situations would you use a line integral instead of an ordinary integral?

A line integral is used when the path is not restricted to a straight line and when the work done by a force needs to be calculated in a three-dimensional space. This is often the case in physics and engineering problems involving forces and motion in three dimensions.

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