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Synthesis and Antibacterial Evaluation of Some Novel 2-Arylamino-4-phenyl-thiazolyl Derivatives
Kokila A. Parmar,Bharat G. Suthar,Sarju Parajapati 대한화학회 2010 Bulletin of the Korean Chemical Society Vol.31 No.4
A series of 2-aminothiazoles derivatives have been synthesized and tested for in vitro antibacterial activity on different microorganisms. Syntheses have been carried out following simple methodology in excellent isolated yields. The structure and purity of the original compounds were confirmed by IR, NMR, Mass spectroscopy, and elemental analysis. All compounds were tested for antibacterial activity against S. aureus, S. pyogenes, E. coli, P. aeruginosa, S. typhi and V. parahaemolyticus. These preliminary results indicate that some of compounds are exhibiting good activity.
Synthesis and Antibacterial Evaluation of Some Novel 2-Arylamino-4-phenyl-thiazolyl Derivatives
Parmar, Kokila A.,Suthar, Bharat G.,Parajapati, Sarju Korean Chemical Society 2010 Bulletin of the Korean Chemical Society Vol.31 No.4
A series of 2-aminothiazoles derivatives have been synthesized and tested for in vitro antibacterial activity on different microorganisms. Syntheses have been carried out following simple methodology in excellent isolated yields. The structure and purity of the original compounds were confirmed by IR, NMR, Mass spectroscopy, and elemental analysis. All compounds were tested for antibacterial activity against S. aureus, S. pyogenes, E. coli, P. aeruginosa, S. typhi and V. parahaemolyticus. These preliminary results indicate that some of compounds are exhibiting good activity.
STABILITY OF A SEXVIGINTIC FUNCTIONAL EQUATION
Lee Jung Rye,Park Choonkil,Pinelas Sandra,Govindan Viya,Tamilvanan K.,Kokila G. 경남대학교 수학교육과 2019 Nonlinear Functional Analysis and Applications Vol.24 No.2
In this paper, we estabilish the general solution of sexvigintic functional equation f (x + 13y) − 26f (x + 12y) + 325f (x + 11y) − 2600f (x + 10y) + 14950f (x + 9y)−65780f (x + 8y) + 230230f (x + 7y) − 657800f (x + 6y) + 1562275f (x + 5y)−3124550f (x + 4y) + 5311735f (x + 3y) − 7726160f (x + 2y) + 9657700f (x + y)−10400600f (x) + 9657700f (x − y) − 7726160f (x − 2y) + 5311735f (x − 3y)−3124550f (x − 4y) + 1562275f (x − 5y) − 657800f (x − 6y) + 230230f (x − 7y)−65780f (x − 8y) + 14950f (x − 9y) − 2600f (x − 10y) + 325f (x − 11y)−26f(x − 12y) + f (x − 13y) = 26!f(y) and investigate the Hyers-Ulam stability of this functional equation in Banach spaces using two different methods.