Truncating the series expansion for unsteady velocity-dependent Eyring-Powell fluid

The main difficulty in dealing with the basic differential equations of fluid momentum is in choosing an appropriate problem-solving methodology. In addition, it is necessary to correct minor errors incurred by neglecting some losses. However, in many cases, such methodologies suffer from long proce...

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Veröffentlicht in:Engineering and Applied Science Letters 2020-12, Vol.3 (4), p.28-34
Hauptverfasser: Ghiasi, Emran Khoshrouye, Noeiaghdam, Samad
Format: Artikel
Sprache:eng
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Zusammenfassung:The main difficulty in dealing with the basic differential equations of fluid momentum is in choosing an appropriate problem-solving methodology. In addition, it is necessary to correct minor errors incurred by neglecting some losses. However, in many cases, such methodologies suffer from long processing time (P-time). Therefore, this article focuses on the truncation technique involving an unsteady Eyring-Powell fluid towards a shrinking wall. The governing differential equations are converted to the non-dimensional from through similarity variables. It is seen that the present system is totally convergent in 8th-order approximate solution together with \(\hbar=-0.875\).
ISSN:2617-9695
2617-9709
DOI:10.30538/psrp-easl2020.0049