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First Phosphate Corp CEO John Passalacqua joined Steve Darling from Proactive to announce a significant development for the company - the signing of a Joint Development Agreement with Integrals Power Limited of Milton Keynes, United Kingdom. This agreement marks a crucial step forward in First Phosphate's efforts to produce battery-grade iron III phosphate precursor for the lithium iron phosphate (LFP) battery industry outside of China. Passalacqua explained that the agreement outlines an initial phase of joint development focused on creating the technology necessary for producing the iron phosphate precursor for LFP cathode active material (CAM). The goal is to develop a scalable, low-cost, and environmentally compliant process for manufacturing battery-grade iron III phosphate. If successful, this technology could be combined with lithium carbonate or lithium hydroxide to produce LFP CAM. Furthermore, Passalacqua emphasized the collaborative nature of the agreement, with both parties committed to working together to bring the developed process into immediate large-scale production. Under the agreement, First Phosphate will provide the necessary raw materials for producing iron III phosphate, leveraging its phosphate concentrate and magnetite resources. This partnership with Integrals Power Limited represents a significant milestone for First Phosphate Corp as it strives to establish itself as a key player in the supply chain for lithium iron phosphate batteries. By developing innovative technologies and forging strategic partnerships, the company is well-positioned to capitalize on the growing demand for sustainable energy storage solutions. #proactiveinvestors #firstphosphatecorp #phosphate #BéginLamarcheproject #IntegralsPower, #LFPbattery, #batteryproduction, #sustainableenergy, #cleanenergy, #innovation, #environment, #collaboration, #technology, #partnership, #industrynews, #renewableenergy, #greenfuture, #energysector, #businessdevelopment, #investing, #industryinsights, #cleantech, #sustainability, #manufacturing, #jointdevelopment, #ironphosphate, #NorthAmerica, #Europe#invest #investing #investment #investor #stockmarket #stocks #stock #stockmarketnews
In this episode we speak with Philosophy, Cosmology and Consciousness core faculty, Jack Bagby about his engagement with the philosophy of music, from Socrates, to Schopenhauer, and Bergson. We discuss Jack's recent PCC class called The Philosophy of Music and the Attunement of the Soul and dive into the complex ideas of these thinkers regarding the transformative powers of music. Jack explains how the ancient Greek's developed a complex set of tuning systems and alternative temperaments with powerful attributes and psychic properties, in which one can attune themselves to through the development of an affective psychology. Jack, and myself have been experimenting composing and improvising in these these modes and we share 3 pieces based on ancient Greek modes. PCC Forum with Jack Bagby: Tuning, Caring for, and Recollecting the Soul in Socrates' Swansongs Musical Compositions in the Episode by Jack Bagby and Jonathan Kay 1. A Paean of Apollo the Healer in Archytas' Dorian Diatonic 2. Ptolemy soft diatonic 3. A prelude to the compromises of universality. Ptolemy's Even Diatonic John (Jack) Bagby received his PhD. in philosophy from Boston College in 2021, and a B.A. in philosophy and ancient Greek language, from the Pennsylvania State University in 2013. Professor Bagby conducts research on the history of philosophy, focusing on problems related to consciousness, nature, and evolution. He has published in Epoché and Journal for the British Society of Phenomenology, on ancient Greek philosophy and phenomenology (especially Henri Bergson) and has strong research interests in Baruch Spinoza, 19th-20th century European philosophy, process philosophy, philosophy of music, and aesthetics. He is currently working on a translation of Bergson's 1902-3 Lectures at the Collège de France The History of The Idea of Time (Bloomsbury Press), and finishing up the manuscript of his monograph Integrals of Experience: Aristotle and Bergson. When thinking about complex concepts or solving textual problems, Jack loves to construct diagrams and concept maps. Between 2016-2018 he combined his love for creating visualizations with his love of Spinoza to create a website that maps the complex textual citations used in his magnum opus, the Ethics. The EWP Podcast credits East-West Psychology Podcast Website Connect with EWP: Website • Youtube • Facebook Hosted by Stephen Julich (EWP Core Faculty) and Jonathan Kay (PhD student, EWP assistant) Produced by: Stephen Julich and Jonathan Kay Edited and Mixed by: Jonathan Kay Introduction music: Mosaic, by Monsoon on the album Mandala Introduction Voiceover: Roche Wadehra Learn more about your ad choices. Visit megaphone.fm/adchoices Support our show by becoming a premium member! https://newbooksnetwork.supportingcast.fm/new-books-network
In this episode we speak with Philosophy, Cosmology and Consciousness core faculty, Jack Bagby about his engagement with the philosophy of music, from Socrates, to Schopenhauer, and Bergson. We discuss Jack's recent PCC class called The Philosophy of Music and the Attunement of the Soul and dive into the complex ideas of these thinkers regarding the transformative powers of music. Jack explains how the ancient Greek's developed a complex set of tuning systems and alternative temperaments with powerful attributes and psychic properties, in which one can attune themselves to through the development of an affective psychology. Jack, and myself have been experimenting composing and improvising in these these modes and we share 3 pieces based on ancient Greek modes. PCC Forum with Jack Bagby: Tuning, Caring for, and Recollecting the Soul in Socrates' Swansongs Musical Compositions in the Episode by Jack Bagby and Jonathan Kay 1. A Paean of Apollo the Healer in Archytas' Dorian Diatonic 2. Ptolemy soft diatonic 3. A prelude to the compromises of universality. Ptolemy's Even Diatonic John (Jack) Bagby received his PhD. in philosophy from Boston College in 2021, and a B.A. in philosophy and ancient Greek language, from the Pennsylvania State University in 2013. Professor Bagby conducts research on the history of philosophy, focusing on problems related to consciousness, nature, and evolution. He has published in Epoché and Journal for the British Society of Phenomenology, on ancient Greek philosophy and phenomenology (especially Henri Bergson) and has strong research interests in Baruch Spinoza, 19th-20th century European philosophy, process philosophy, philosophy of music, and aesthetics. He is currently working on a translation of Bergson's 1902-3 Lectures at the Collège de France The History of The Idea of Time (Bloomsbury Press), and finishing up the manuscript of his monograph Integrals of Experience: Aristotle and Bergson. When thinking about complex concepts or solving textual problems, Jack loves to construct diagrams and concept maps. Between 2016-2018 he combined his love for creating visualizations with his love of Spinoza to create a website that maps the complex textual citations used in his magnum opus, the Ethics. The EWP Podcast credits East-West Psychology Podcast Website Connect with EWP: Website • Youtube • Facebook Hosted by Stephen Julich (EWP Core Faculty) and Jonathan Kay (PhD student, EWP assistant) Produced by: Stephen Julich and Jonathan Kay Edited and Mixed by: Jonathan Kay Introduction music: Mosaic, by Monsoon on the album Mandala Introduction Voiceover: Roche Wadehra Learn more about your ad choices. Visit megaphone.fm/adchoices
In this episode we speak with Philosophy, Cosmology and Consciousness core faculty, Jack Bagby about his engagement with the philosophy of music, from Socrates, to Schopenhauer, and Bergson. We discuss Jack's recent PCC class called The Philosophy of Music and the Attunement of the Soul and dive into the complex ideas of these thinkers regarding the transformative powers of music. Jack explains how the ancient Greek's developed a complex set of tuning systems and alternative temperaments with powerful attributes and psychic properties, in which one can attune themselves to through the development of an affective psychology. Jack, and myself have been experimenting composing and improvising in these these modes and we share 3 pieces based on ancient Greek modes. PCC Forum with Jack Bagby: Tuning, Caring for, and Recollecting the Soul in Socrates' Swansongs Musical Compositions in the Episode by Jack Bagby and Jonathan Kay 1. A Paean of Apollo the Healer in Archytas' Dorian Diatonic 2. Ptolemy soft diatonic 3. A prelude to the compromises of universality. Ptolemy's Even Diatonic John (Jack) Bagby received his PhD. in philosophy from Boston College in 2021, and a B.A. in philosophy and ancient Greek language, from the Pennsylvania State University in 2013. Professor Bagby conducts research on the history of philosophy, focusing on problems related to consciousness, nature, and evolution. He has published in Epoché and Journal for the British Society of Phenomenology, on ancient Greek philosophy and phenomenology (especially Henri Bergson) and has strong research interests in Baruch Spinoza, 19th-20th century European philosophy, process philosophy, philosophy of music, and aesthetics. He is currently working on a translation of Bergson's 1902-3 Lectures at the Collège de France The History of The Idea of Time (Bloomsbury Press), and finishing up the manuscript of his monograph Integrals of Experience: Aristotle and Bergson. When thinking about complex concepts or solving textual problems, Jack loves to construct diagrams and concept maps. Between 2016-2018 he combined his love for creating visualizations with his love of Spinoza to create a website that maps the complex textual citations used in his magnum opus, the Ethics. The EWP Podcast credits East-West Psychology Podcast Website Connect with EWP: Website • Youtube • Facebook Hosted by Stephen Julich (EWP Core Faculty) and Jonathan Kay (PhD student, EWP assistant) Produced by: Stephen Julich and Jonathan Kay Edited and Mixed by: Jonathan Kay Introduction music: Mosaic, by Monsoon on the album Mandala Introduction Voiceover: Roche Wadehra Learn more about your ad choices. Visit megaphone.fm/adchoices Support our show by becoming a premium member! https://newbooksnetwork.supportingcast.fm/music
10 - Salah: Integrals - Ship of Salvation - Shaykh Irshaad Sedick
Entrevista en Sans i estalvis con Adam Martín, en esta ocasión hablamos sobre la actualidad de la nutrición así como del libro ¿Qué pasa con la nutrición? 📖 Mi quinto libro, '¿Qué pasa con la nutrición?', ya a la venta: https://amzn.to/3KkuNp8 Programa original en: https://go.ivoox.com/rf/112503772 📌 VIAJETAL: Gastronomía y viajes 100% vegetales -Ivoox: https://www.ivoox.com/podcast-viajetal-gastronomia-viajes-100-vegetales_sq_f11809058_1.html -YouTube: https://www.youtube.com/channel/UCG2i9bO4xksDxPoiChYIRzQ -Instagram: https://www.instagram.com/viajetal/ -Spotify: https://open.spotify.com/show/0giAlYsGKs2GWSmXb3ZlJf Blog: https://www.midietacojea.com Twitter: https://bit.ly/twitter-mdc Instagram: https://instagram.com/midietacojea/ Facebook: https://www.facebook.com/Midietacojea Canal de Youtube: https://www.youtube.com/midietacojea TikTok: https://bit.ly/TikTok-mdc
1756, France - A 27 year old man publishes two volumes on integral calculus. His work is recognized by his peers, he gets elected to the Royal Society in London, but his career as a mathematician also ends with those two volumes. A few decades later, a man circumnavigates the globe, but does not immediately get recognition for it. And all this is connected to one of the most popular flowers in the world. This week, we celebrate Women's History Month and uncover the tragic history of the discovery and naming of one of the most beloved flowers known to mankind and the systematic denial of the contribution of the woman who discovered it. Tune in and discover, what history could feel like if we acknowledged the contribution of women. Till then Check out the other episodes, Anne Frank, Lootera and Endless Life of Trees Anne Frank, Lootera and Endless Life of TreesThe Trees that built Venice The Trees that built VeniceElm Trees, National Revolutions and Modern Paper Elm Trees, National Revolutions and Modern PaperEuropean Impressionism, Japanese Nationalism and Cherry Blossom Trees European Impressionism, Japanese Nationalism and Cherry Blossom TreesThe tree that built New Zealand The tree that built New ZealandLiving Fossils, National Identities and 200 Mn year old trees Living Fossils, National Identities and 200 MM year old trees You can check previous episodes of 'Podcasts from Nowhere' on IVM Podcasts websitehttps://ivm.today/3xuayw9You can reach out to our host Utsav on Instagram: @whywetravel42(https://www.instagram.com/whywetravel42 )You can listen to this show and other awesome shows on the IVM Podcasts app on Android: IVM Podcasts - Apps on Google Play or all other major audio platforms.See omnystudio.com/listener for privacy information.
Jim talks with Ken Wharton about how to describe entangled states as sums over histories of particle paths using the path integral method. He shows how this works for Bell-type experiments, entanglements swapping, delayed choice experiments, and the triangle network. This leads to a second way to describe what happens quantum mechanically without introducing non-locality (but requiring other classical ideas to break down).Show Notes: http://frontiers.physicsfm.com/70
Feynman integrals are indispensable for precision calculations, not only for high-energy particle physics experiments, but also for example for QED precision experiments at lower energies or precision studies in gravitational wave physics. In recent years there has been a significant progress in our abilities to compute Feynman integrals, revealing a rich and fascinating mathematical structure, relating Feynman integrals to (algebraic) geometry. In this talk I will review these recent developments.
Nein, im Lehrplan steht es nicht. Dafür aber Gedichtinterpretation, dass Errechnen eines Integrals oder ... Dabei ist der Umgang mit Geld, die Berechnung von Zinsen, Glaubenssätze dazu oder unternehmerisches Denken aus meiner Sicht mindestens genauso wichtig, wenn nicht praxisrelevanter. Aber höre selbst. akademie-fuer-lernmethoden.de
Our 103rd Zoomcast (April 21, 2022); Our host #CharlotteSistaCFerrell announces our continued celebration of National Poetry Month and invites Lesley Hebert to read her poem Inner Child. In response, Neall Ryon reads Talk to the Child from his book From the Other Side. Yoshimi reads her poem Blood Lines and tells us about the mentoring she received from the poet who inspired it. Jeannie Kamins shares a poem she wrote to her husband on Valentine's Day, the poem he wrote in response, and the ceramic memorabilia box she keeps them in. Neall Ryon responds with his poem Intimacy. Charlotte reads her poem Integrals of Life on intimacy with nature. We engage in free ranging discussions about intimacy with self and others and the concept of Intention Healing. Charlotte highlights upcoming PBA sessions and encourages us to record a SPIN - story, poem, interview, or ‘novelty'- item for the PBA website. Contact her at pbaafc@gmail.com. Sponsored by the 411 Seniors Centre Society; The Government of Canada: New Horizons Grant; and G & F Financial.
Matt von Hippel is (a) my cousin and (b) a professor at the Niels Bohr International Academy in Copenhagen, Denmark, where he researches scattering amplitudes in gauge and gravity theories. Matt received his PhD in 2014 from SUNY Stony Brook, and from 2014 to 2017 he was a postdoctoral fellow at the Perimeter Institute. Today Matt joined us to discuss Feynman integrals. Apparently "Feynman integral" means different things to different people; the kind discussed here are those associated with "Feynman diagrams". The talk was engaging and fun, and at the end Matt fielded mathematical questions from the audience, which included both usual BCC members and some NEU mathematics faculty. This was a fun one and I encourage you to watch it, if you didn't make the live event! Matt's personal page at the NBIA is HERE. Matt's popular physics blog is HERE. Matt can be found on Twitter HERE. This talk can be found in video form HERE. You can learn more about the Boston Computation Club HERE.
TEACHING CARE 1-TO-1 ONLINE TUITION AND COACHING CLASSES by top teachers of India
Please see You Tube Video here for Distance and displacement - Integrals For more free online class videos, you can visit our You Tube Channel here Teaching Care provides Online classes by best teachers; online tuition classes, online tutors and live 1-to-1 coaching classes for CBSE, ICSE, IGCSE, IB, state boards, NTSE, Olympiads, JEE and NEET. Best tutorials for English, Mathematics, Science, Physics, Chemistry, Biology, Coding Classes, Computer Science, Accountancy, Business Studies, Economics, Hindi, Engineering etc for class 4th to class 12th to UG & PG levels. Book free trial class at Teaching Care or Call +91-9811000616, +91-9821126195 or Sign Up here for free demo class or email us at hr@teachingcare.com --- Send in a voice message: https://anchor.fm/teachingcare/message
TEACHING CARE 1-TO-1 ONLINE TUITION AND COACHING CLASSES by top teachers of India
Please see You Tube Video here for Distance and displacement - Integrals For more free online class videos, you can visit our You Tube Channel here Teaching Care provides Online classes by best teachers; online tuition classes, online tutors and live 1-to-1 coaching classes for CBSE, ICSE, IGCSE, IB, state boards, NTSE, Olympiads, JEE and NEET. Best tutorials for English, Mathematics, Science, Physics, Chemistry, Biology, Coding Classes, Computer Science, Accountancy, Business Studies, Economics, Hindi, Engineering etc for class 4th to class 12th to UG & PG levels. Book free trial class at Teaching Care or Call +91-9811000616, +91-9821126195 or Sign Up here for free demo class or email us at hr@teachingcare.com --- Send in a voice message: https://anchor.fm/teachingcare/message
Shareable link to the document (has all of the mathematical examples that will be discussed in both this episode and the following episode): https://docs.google.com/document/d/1VfEVBscCPTfoyTDyv4ZRFJYL9Luzyd1UHvjxzz-uwpg/edit?usp=sharing References: Derivative - Wikipedia https://en.wikipedia.org/wiki/Derivative Power Rule - Wikipedia https://en.wikipedia.org/wiki/Power_rule All derivative calculations were checked using this website https://www.derivative-calculator.net/ Product Rule - Wikipedia https://en.wikipedia.org/wiki/Product_rule Quotient Rule - Wikipedia https://en.wikipedia.org/wiki/Quotient_rule Chain Rule - Wikipedia https://en.wikipedia.org/wiki/Chain_rule Integral - Wikipedia https://en.wikipedia.org/wiki/Integral Line Integral (AKA a Contour Integral in Complex Analysis) - Wikipedia https://en.wikipedia.org/wiki/Line_integral All integral calculations were checked using this calculator (can also calculate derivatives, but I was not near the calculator when I was working on the derivative portion of the chapter): https://www.amazon.com/Texas-Instruments-TI-84-Graphing-Calculator/dp/B00TFYYWQA Reverse Power Rule - KhanAcademy https://www.khanacademy.org/math/ap-calculus-ab/ab-integration-new/ab-6-8a/e/intro-to-integration Riemann Integral - Wikipedia https://en.wikipedia.org/wiki/Riemann_integral Fundamental Theorem(s) of Calculus - Wikipedia https://en.wikipedia.org/wiki/Fundamental_theorem_of_calculus Differential Equation - Wikipedia https://en.wikipedia.org/wiki/Differential_equation Partial Differential Equation - Wikipedia https://en.wikipedia.org/wiki/Partial_differential_equation
As a consequence of electric-magnetic duality, partition functions of four-dimensional gauge theories can be expressed in terms of modular forms in many cases. I will discuss new results for the modularity of topologically twisted partition functions of N=2 and N=4 supersymmetric theories, and in particular how these partititon functions may involve (iterated) integrals of modular forms.
As a cosmic being Living among the human species From whom I am evolving Sometimes it feels futile Awaiting their evolution Anticipating the resonant integrals Realizing the coded mission In the living experience As a cosmic being Awaiting anticipating All the other cosmic beings Until then I am an alien Known thus to myself Since words alone identify My configuring transforming elements Ever decipherable transcriptions About this cosmic being Anticipating the resonant integrals In, oh yeah, in the living experience with you Oh, oh, oh yeah
The Chapter of Purification and Prayer – Lesson 10 Sheikh Ibrahim El-Shafie continues explaining the Islamic Obligatory Knowledge and completes explaining the Integrals of the Prayer. YouTube: https://youtu.be/-fnrWU1yqKU Facebook: https://www.facebook.com/sheikhibrahimelshafie/videos/393621547988357/
T'expliquem quin suplements t'ajudaran a combatre les primers refredats, l'insomni del canvi horari i els petits problemes circulatoris t
This course covers differential, integral and vector calculus for functions of more than one variable. These mathematical tools and methods are used extensively in the physical sciences, engineering, economics and computer graphics.
This course covers differential, integral and vector calculus for functions of more than one variable. These mathematical tools and methods are used extensively in the physical sciences, engineering, economics and computer graphics.
This course covers differential, integral and vector calculus for functions of more than one variable. These mathematical tools and methods are used extensively in the physical sciences, engineering, economics and computer graphics.
This course covers differential, integral and vector calculus for functions of more than one variable. These mathematical tools and methods are used extensively in the physical sciences, engineering, economics and computer graphics.
This course covers differential, integral and vector calculus for functions of more than one variable. These mathematical tools and methods are used extensively in the physical sciences, engineering, economics and computer graphics.
We discuss the details involved in differentiating an integral, examine the notation used and outline the proof that the result is just the integrand.
Demonstrates an example of integrating a function that is a product of even powers of sinx and cos x, with assistance from double-angle formulae
An example of integrating a function that is a product of an odd power of tan x and a power of secx
An example of integrating a function that is a product of an even power of sec x and a power of tanx
We complete the integration introduced in part 1, using Cauchy's residue theorem.
A more difficult example of integrating a function that is a product of even powers of sin x or cos x
A more difficult example of integrating a function that is a product of odd powers of sin x or cos x
An example of integrating a function that is a product of odd powers of sinh x or cosh x
An example of integrating a function that is a product of odd powers of sin x and cos x
For a quadratic equation of the form ax^2+bx+c=0, the discriminant function b^2-4ac is introduced, as a way of determining how many roots this equation has. This is then applied to problems of determining how many points of intersection the curves representing quadratic functions have.
We attempt to evaluate an integral that is not well-defined and investigate how this problem manifests itself in the complex contour version of the integral.
We evaluate another integral similar to that in parts 1 and 2 but containing a sine rather than a cosine. Here we prepare the integral for contour integration.
We complete the integration introduced in part 3, using Cauchy's residue theorem.
We prepare integral from 0 to 2 Pi of 1/(2+cos(theta)) for integration in the complex plane.
Area under a curve - integration Circular functions Exponential functions Hyperbolic functions Area between two curves Average value of a function
The second half of calculus looks for the distance traveled even when the speed is changing. Finding this "integral" is the opposite of finding the derivative. Professor Strang explains how the integral adds up little pieces to recover the total distance.