Theorem 3.60. Let X be a Hausdorff space. If x and y are sequential limit points of X with respect to the same sequence, then x = y. Problem 3.61. Show (by example) that the assumption that X is a Hausdorff space in Theorem 3.60 is necessary.

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solve 3.61 in detail please 

i posted this question on chegg and received the wrong answer so please don't copy and paste the wrong answer.

 

Theorem 3.60. Let X be a Hausdorff space. If x and y are sequential limit points of X
with respect to the same sequence, then x = y.
Problem 3.61. Show (by example) that the assumption that X is a Hausdorff space in
Theorem 3.60 is necessary.
Problem 3.62. Is there an example of a Hausdorff space X, a subset Y C X, and a point
x € X such that x is a limit point of Y, but not a sequential limit point of Y ?
Transcribed Image Text:Theorem 3.60. Let X be a Hausdorff space. If x and y are sequential limit points of X with respect to the same sequence, then x = y. Problem 3.61. Show (by example) that the assumption that X is a Hausdorff space in Theorem 3.60 is necessary. Problem 3.62. Is there an example of a Hausdorff space X, a subset Y C X, and a point x € X such that x is a limit point of Y, but not a sequential limit point of Y ?
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