Hypercomplex numbers | Historical treatment of quaternions
In mathematics, hypercomplex number is a traditional term for an element of a finite-dimensional unital algebra over the field of real numbers. The study of hypercomplex numbers in the late 19th century forms the basis of modern group representation theory. (Wikipedia).
Algebra Ch 40: Hyperbolas (1 of 10) What is a Hyperbola?
Visit http://ilectureonline.com for more math and science lectures! To donate: http://www.ilectureonline.com/donate https://www.patreon.com/user?u=3236071 We will learn a hyperbola is a graph that result from meeting the following conditions: 1) |d1-d2|=constant (same number) 2) the grap
From playlist THE "HOW TO" PLAYLIST
Hyperbola with Foci (-3, 0), (1, 0) and Vertices (-2, 0), (0, 0)
We find the equation of the hyperbola with foci (-3, 0), (1, 0), and vertices (-2 0), (0,0). Please Subscribe here, thank you!!! https://goo.gl/JQ8Nys
From playlist Conics
Calculus 2: Hyperbolic Functions (1 of 57) What is a Hyperbolic Function? Part 1
Visit http://ilectureonline.com for more math and science lectures! In this video I will explain what are hyperbolic functions and how it compares to trig functions. Next video in the series can be seen at: https://youtu.be/c8OR8iJ-aUo
From playlist CALCULUS 2 CH 16 HYPERBOLIC FUNCTIONS
Hypercomplex numbers | Math History | NJ Wildberger
In the 19th century, the geometrical aspect of the complex numbers became generally appreciated, and mathematicians started to look for higher dimensional examples of how arithmetic interacts with geometry. A particularly interesting development is the discovery of quaternions by W. R. H
From playlist MathHistory: A course in the History of Mathematics
Emmy Noether’s ideas in Gravity, Black holes and AdS/CFT by Loganayagam
DATES: Monday 29 Aug, 2016 - Tuesday 30 Aug, 2016 VENUE: Madhava Lecture Hall, ICTS Bangalore Emmy Noether (1882-1935) is well known for her famous contributions to abstract algebra and theoretical physics. Noether’s mathematical work has been divided into three ”epochs”. In the first (
From playlist The Legacy of Emmy Noether
Origin and Development of Valuation Theory by Sudesh Khanduja
DATES: Monday 29 Aug, 2016 - Tuesday 30 Aug, 2016 VENUE: Madhava Lecture Hall, ICTS Bangalore Emmy Noether (1882-1935) is well known for her famous contributions to abstract algebra and theoretical physics. Noether’s mathematical work has been divided into three ”epochs”. In the first (
From playlist The Legacy of Emmy Noether
Noether's theorem and particle physics by Rohini Godbole
DATES: Monday 29 Aug, 2016 - Tuesday 30 Aug, 2016 VENUE: Madhava Lecture Hall, ICTS Bangalore Emmy Noether (1882-1935) is well known for her famous contributions to abstract algebra and theoretical physics. Noether’s mathematical work has been divided into three ”epochs”. In the first (
From playlist The Legacy of Emmy Noether
Symmetries and Condensed Matter physics by Subhro Bhattacharya
DATES: Monday 29 Aug, 2016 - Tuesday 30 Aug, 2016 VENUE: Madhava Lecture Hall, ICTS Bangalore Emmy Noether (1882-1935) is well known for her famous contributions to abstract algebra and theoretical physics. Noether’s mathematical work has been divided into three ”epochs”. In the first (
From playlist The Legacy of Emmy Noether
Emmy Noether in Erlangen and Göttingen by Ravi Rao
DATES: Monday 29 Aug, 2016 - Tuesday 30 Aug, 2016 VENUE: Madhava Lecture Hall, ICTS Bangalore Emmy Noether (1882-1935) is well known for her famous contributions to abstract algebra and theoretical physics. Noether’s mathematical work has been divided into three ”epochs”. In the first (
From playlist The Legacy of Emmy Noether
Interplay of symmetries and other integrability quantifiers in finite by Lakhsmanan Muthusamy
DATES: Monday 29 Aug, 2016 - Tuesday 30 Aug, 2016 VENUE: Madhava Lecture Hall, ICTS Bangalore Emmy Noether (1882-1935) is well known for her famous contributions to abstract algebra and theoretical physics. Noether’s mathematical work has been divided into three ”epochs”. In the first (
From playlist The Legacy of Emmy Noether
Recognising Fractals from a reasonable distance - Logarithmic Distance Estimation Edition.
Recognising Fractals from a reasonable distance - Logarithmic Distance Estimation Edition. Today's lesson features the following fractals, presented at reasonable distances: Aexion Benesi Pine Tree Benesi Pow 2 Benesi Pow 2 Mandelbulb Box Fold Bulb Pow 2 Box Fold Bulb Menger Box Fold Qua
From playlist Nerdy Rodent Uploads!
Computations with homogeneous coordinates | Universal Hyperbolic Geometry 8 | NJ Wildberger
We discuss the two main objects in hyperbolic geometry: points and lines. In this video we give the official definitions of these two concepts: both defined purely algebraically using proportions of three numbers. This brings out the duality between points and lines, and connects with our
From playlist Universal Hyperbolic Geometry
Calculus 2: Hyperbolic Functions (11 of 57) Basic Hyperbolic Function Identities Part 1
Visit http://ilectureonline.com for more math and science lectures! In this video I will explain the basic hyperbolic function identity (coshx)^2+(sinhx)^2=1. Next video in the series can be seen at: https://youtu.be/OIqy-WQcZkY
From playlist CALCULUS 2 CH 16 HYPERBOLIC FUNCTIONS
What is the definition of a hyperbola
Learn all about hyperbolas. A hyperbola is a conic section with two fixed points called the foci such that the difference between the distances of any point on the hyperbola from the two foci is equal to the distance between the two foci. Some of the characteristics of a hyperbola includ
From playlist The Hyperbola in Conic Sections
Noether's works in Topology by Indranil Biswas
DATES: Monday 29 Aug, 2016 - Tuesday 30 Aug, 2016 VENUE: Madhava Lecture Hall, ICTS Bangalore Emmy Noether (1882-1935) is well known for her famous contributions to abstract algebra and theoretical physics. Noether’s mathematical work has been divided into three ”epochs”. In the first (
From playlist The Legacy of Emmy Noether
Calculus 2: Hyperbolic Functions (49 of 57) What is a Catenary? Part 4 of 4
Visit http://ilectureonline.com for more math and science lectures! In this video I will derive the equation to calculate the tension of the cable at any point along the cable. Part 4 of 4. Next video in the series can be seen at: https://youtu.be/9vu83HMCRTA
From playlist CALCULUS 2 CH 16 HYPERBOLIC FUNCTIONS
Hyperbolic Functions Introduction 6 Ex Calculus 1 PLEASE READ DESCRIPTION
Please note the copy error on the green board, cosh^2(x)=1/2(1+cosh(2x)) Evaluating Hyperbolic Functions for a given value at 7:37 and 8:30 Find values of other 5 Hyperbolic Functions from a given Hyperbolic Function at 12:50 Verifying a Hyperbolic Identity 3 examples at 16:02 20:53 25:21
From playlist Calculus
What is the definition of a hyperbola
Learn all about hyperbolas. A hyperbola is a conic section with two fixed points called the foci such that the difference between the distances of any point on the hyperbola from the two foci is equal to the distance between the two foci. Some of the characteristics of a hyperbola includ
From playlist The Hyperbola in Conic Sections
Algebra Ch 40: Hyperbolas (6 of 10) Graphing Hyperbolas: Example 1
Visit http://ilectureonline.com for more math and science lectures! To donate: http://www.ilectureonline.com/donate https://www.patreon.com/user?u=3236071 We will graph the hyperbolas given these 2 general equations where the center is at the origin: 1) (x^2/9)-(y^2/16)=1 2) (y^2/25)-(x^
From playlist ALGEBRA CH 40 HYPERBOLAS
Noether’s Theorem in Classical Dynamics : Continuous Symmetries by N. Mukunda
DATES: Monday 29 Aug, 2016 - Tuesday 30 Aug, 2016 VENUE: Madhava Lecture Hall, ICTS Bangalore Emmy Noether (1882-1935) is well known for her famous contributions to abstract algebra and theoretical physics. Noether’s mathematical work has been divided into three ”epochs”. In the first (
From playlist The Legacy of Emmy Noether