Low-discrepancy sequences | Diophantine approximation | Sequences and series
A van der Corput sequence is an example of the simplest one-dimensional low-discrepancy sequence over the unit interval; it was first described in 1935 by the Dutch mathematician J. G. van der Corput. It is constructed by reversing the base-n representation of the sequence of natural numbers (1, 2, 3, …). The b-ary representation of the positive integer n (≥ 1) is where b is the base in which the number n is represented, and 0 ≤ dk(n) < b, i.e. the k-th digit in the b-ary expansion of n.The n-th number in the van der Corput sequence is (Wikipedia).
Physics - Thermodynamics 2: Ch 32.1 Def. and Terms (21 of 25) van der Waals Eqn Isotherms Other Form
Visit http://ilectureonline.com for more math and science lectures! In this video I will re-write the van der Waals equation in a different format (one that I prefer). Next video in this series can be seen at: https://youtu.be/9pH5F0l9UEc
From playlist PHYSICS 32.1 THERMODYNAMICS 2 BASIC TERMS
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Visit http://ilectureonline.com for more math and science lectures! In this video I will explain how the parameters change in van der Waals equation: example 2. Next video in this series can be seen at: https://youtu.be/k1mDmRPxpsY
From playlist PHYSICS 32.1 THERMODYNAMICS 2 BASIC TERMS
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Visit http://ilectureonline.com for more math and science lectures! In this video I will look at the isotherms in the PV diagram using van der Waals equation. Next video in this series can be seen at: https://youtu.be/kLt9FS3AI0k
From playlist PHYSICS 32.1 THERMODYNAMICS 2 BASIC TERMS
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