Just a quick reference note, black dots mean "There is a point here", and white dots mean "There is no point here but it comes so close to the point that there is almost no difference - but there still actually is no point here".
This is where the concepts of limits come in. So, what are limits?
Here, we have a function that is a linear equation, except for when it is at (x, L), where there is no point available. This is represented by a white dot. At this point, we can say that the Limit is L.
Hence, we can say that
If we pic any points ϵ units away from L on either side, we will have an x that is δ units away from point "x". We know that we do not have L if we input "x" into the function f(x), because there is no "point" there. L is the limit, or the closest approximation we can get to as you input an x into f(x) that is infinitely close to "x".
If δ is the length between the picked point and "x", no matter how small δ is, these two points will differ, but they are infinitely close so that for any difference doesn't matter, and the limit will be considered "L".
No comments:
Post a Comment