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SIFAT-SIFAT DASAR INTEGRAL HENSTOCK
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This paper was a review about theory of Henstock integral. Riemann gave a definition of integral based on the sum of the partitions in Integration area (interval [a, b]). Thosepartitions is a -positive constant. Independently, Henstock and Kurzweil replaces - positive constant on construction Riemann integral into a positive function, ie (x)>0 forevery x[a, b]. This function is a partition in interval [a, b]. From this partitions, we can defined a new integral called Henstock integral. Henstock integral is referred to as acomplete Riemann integral, because the basic properties of the Henstock integral is more constructive than Riemann Integral.
Title: SIFAT-SIFAT DASAR INTEGRAL HENSTOCK
Description:
This paper was a review about theory of Henstock integral.
Riemann gave a definition of integral based on the sum of the partitions in Integration area (interval [a, b]).
Thosepartitions is a -positive constant.
Independently, Henstock and Kurzweil replaces - positive constant on construction Riemann integral into a positive function, ie (x)>0 forevery x[a, b].
This function is a partition in interval [a, b].
From this partitions, we can defined a new integral called Henstock integral.
Henstock integral is referred to as acomplete Riemann integral, because the basic properties of the Henstock integral is more constructive than Riemann Integral.
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