This video is the introduction of the basic concepts of arithmetic progression or arithmetic sequence. This is the first video in a series of math tutorial videos about sequences and series. This is usually taught in class 10 (grade 10 math) or class 11 (grade 11 math).The topics included in this video are the following: (i) defining an arithmetic sequence - The video shows the basic definition and the distinguishing characteristics of an arithmetic sequence or progression. (ii) classifying a sequence as an arithmetic sequence - Some examples are given for you to identify or classify as arithmetic sequence or progression. The terms of the sequences given are used as a basis to classify them. (iii) determining the common difference of an arithmetic sequence - Examples about finding the common difference of a given arithmetic sequence or progression are clearly discussed. (iv) finding the next three (3) terms of an arithmetic sequence - Some arithmetic sequences or progressions are given for you to find the next three terms, using the concept of the common difference of the sequence. The examples are thoroughly explained for better understanding of the basic concepts of arithmetic sequence or progression. A variety of examples are given in the video. The examples show a variation on the value of the common difference and the signs of the terms of the arithmetic progression or arithmetic sequence. A summary is also shown at the last part of the video to summarize: 1) How to identify an arithmetic sequence or progression 2) How to find the common difference of any given arithmetic sequence or progression 3) How to find the next three terms of a given arithmetic sequence or progression The next videos will discuss more concepts of arithmetic progressions or arithmetic sequences. 🕘Video Sections🕘 0:00 Intro 1:55 What is a term? 3:00 What is a common difference? 3:55 What is an arithmetic progression or sequence? 4:17 Identifying arithmetic sequences 5:15 Finding the common difference of an arithmetic progression or sequence 6:00 Finding the next three terms of an arithmetic progression or sequence 13:02 Summary of contents 🎬NOTE: For a better viewing experience, please set the video in HD (1080p) mode. Check out other math videos: 🎥 Visual Proof of Algebraic Identity (a - b)^2 [Part 1]: 🎥 Visual Proof of Algebraic Identity (a-b)^2 [Part 2]: 🎥 Derivation of the nth term Formula of Arithmetic Progression: ▶️PLAYLIST Math Shorts: ▶️PLAYLIST Sequences and Series: ▶️PLAYLIST Math Tutorial Videos: ▶️PLAYLIST Videos on Math Proofs & Derivations: ----------------------------------------------------------------------------------- 🔎About CIE Math Solutions: CIE MATH SOLUTIONS is a free online math resource for mathematics students, teachers, and parents. Video math tutorials cover topics ranging from primary to high school math contents. They are designed to help fellow educators find additional references for their lesson preparation, to help students learn math independently online, and to help parents in guiding their children with their homework. Topics are aligned with the Cambridge and IB Curriculum contents. Math concepts and lessons are presented with clear explanations and detailed examples. Some videos present comprehensive proofs and/or derivations to famous mathematics formulas and equations. Some may be presented in different ways. Some videos presents the detailed explanation and solutions of various math competition/olympiad items, math puzzles and some fun math games. Other videos include math tricks and shortcuts. CIE Math Solutions is a free online math resource for all! #ciemathsolutions #sequencesandseries #arithmeticprogression #mathchannel #mathresources #mathteacher #maths #mathisfun #mathskills ----------------------------------------------------------------------------------- Be part of the CIE Math Family and enjoy exclusive perks for you! Join now! ➡️ Show your support to CIE Math Solutions! I will appreciate if you buy me a coffee. Thank you! ➡️ ----------------------------------------------------------------------------------- Please SUBSCRIBE, LIKE and COMMENT below. SUBSCRIBE to CIE Math Solutions channel for more Math Videos: 👉 CIE Math Solutions on Social Media ✅FOLLOW US ON TWITTER: ✅FOLLOW US ON INSTAGRAM: ✅LIKE US ON FACEBOOK: ✅FOLLOW US ON TUMBLR: 📝MY BLOG: 💬For INQUIRIES, CONTACT ME at ciemathsolutions@