Laplace Transformation
... In Mathematics, a transform is usually a device that converts one type of problem into another type. The main application of D.E using Laplace Transformation and Inverse Laplace Transformation is that, By solving D.E directly by using Variation of Parameters, etc methods, we first find the general s ...
... In Mathematics, a transform is usually a device that converts one type of problem into another type. The main application of D.E using Laplace Transformation and Inverse Laplace Transformation is that, By solving D.E directly by using Variation of Parameters, etc methods, we first find the general s ...
2006_30
... Ever since the dawn of civilization, natural numbers stimulated the curiosity of homo-sapiens. Geometric investigations led to the discovery of hidden relationships among natural numbers. For instance, the Pythagorean Theorem led to an interesting Diophantine equation. Books 7,8,9 of Euclid’s elemen ...
... Ever since the dawn of civilization, natural numbers stimulated the curiosity of homo-sapiens. Geometric investigations led to the discovery of hidden relationships among natural numbers. For instance, the Pythagorean Theorem led to an interesting Diophantine equation. Books 7,8,9 of Euclid’s elemen ...
PDF
... of its accuracy and non destructive nature; and finds its applications in medical imaging, detection, cleaning, diagnosis, physiotherapy, dentistry, surgical tools, radiology, industries, automobile industry, sonochemistry, spectroscopy, agriculture and even as weapons. NDT is perhaps better known i ...
... of its accuracy and non destructive nature; and finds its applications in medical imaging, detection, cleaning, diagnosis, physiotherapy, dentistry, surgical tools, radiology, industries, automobile industry, sonochemistry, spectroscopy, agriculture and even as weapons. NDT is perhaps better known i ...
Exploring Mathematics Through Problem Solving, Part I
... During the old days, when people look up on the sky and see 8 stars lining up on a straight line, they think that special phenomenon must be set up artificially on purpose. The former great astronomer Carl Sagan said that this is really nothing special about it. He pointed out that, actually, if you ...
... During the old days, when people look up on the sky and see 8 stars lining up on a straight line, they think that special phenomenon must be set up artificially on purpose. The former great astronomer Carl Sagan said that this is really nothing special about it. He pointed out that, actually, if you ...
Comparing and Ordering Rational Numbers
... Since the LCM of 18 and 12 is 36, the LCD of the fractions is 36. ...
... Since the LCM of 18 and 12 is 36, the LCD of the fractions is 36. ...
Full text
... [4] A. T. Benjamin, N. T. Cameron and J. J. Quinn, Fibonacci determinants – A combinatorial approach, The Fibonacci Quarterly, 45.1 (2007), 39–55. [5] A. T. Benjamin and M. A. Shattuck, Recounting determinants for a class of Hessenberg matrices, Integers: Electronic J. Comb. Number Theory, 7 (2007), ...
... [4] A. T. Benjamin, N. T. Cameron and J. J. Quinn, Fibonacci determinants – A combinatorial approach, The Fibonacci Quarterly, 45.1 (2007), 39–55. [5] A. T. Benjamin and M. A. Shattuck, Recounting determinants for a class of Hessenberg matrices, Integers: Electronic J. Comb. Number Theory, 7 (2007), ...
WedJune15 - Math.utah.edu
... we get to the row with zero remainder, the last b-entry will be the gcd of the bottom row (since it divides the bottom row’s a value). Thus this last b-entry is also the gcd of the top row! If we look at the numerators and denominators for two successive rows they have the ...
... we get to the row with zero remainder, the last b-entry will be the gcd of the bottom row (since it divides the bottom row’s a value). Thus this last b-entry is also the gcd of the top row! If we look at the numerators and denominators for two successive rows they have the ...
Mathematics of radio engineering
The mathematics of radio engineering is the mathematical description by complex analysis of the electromagnetic theory applied to radio. Waves have been studied since ancient times and many different techniques have developed of which the most useful idea is the superposition principle which apply to radio waves. The Huygen's principle, which says that each wavefront creates an infinite number of new wavefronts that can be added, is the base for this analysis.