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Retour à Calculus through Data & Modelling: Vector Calculus

Avis et commentaires pour d'étudiants pour Calculus through Data & Modelling: Vector Calculus par Université Johns-Hopkins

4.9
étoiles
14 évaluations
2 avis

À propos du cours

This course continues your study of calculus by focusing on the applications of integration to vector valued functions, or vector fields. These are functions that assign vectors to points in space, allowing us to develop advanced theories to then apply to real-world problems. We define line integrals, which can be used to fund the work done by a vector field. We culminate this course with Green's Theorem, which describes the relationship between certain kinds of line integrals on closed paths and double integrals. In the discrete case, this theorem is called the Shoelace Theorem and allows us to measure the areas of polygons. We use this version of the theorem to develop more tools of data analysis through a peer reviewed project. Upon successful completion of this course, you have all the tools needed to master any advanced mathematics, computer science, or data science that builds off of the foundations of single or multivariable calculus....
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1 - 3 sur 3 Avis pour Calculus through Data & Modelling: Vector Calculus

par Nguyen D L

14 févr. 2021

I love the video lecture. This class gave me the confidence to explain vector calculus to my son. The subject I was very lousy at back in college.

Thank you professor Cutrone and the staffs at John Hopkins

par Carlos H G C B

6 avr. 2021

Muy practico y divertido

par 胡启阳

29 juil. 2021

保守场矢量 下的线积分与路径无关