AuthorWrite something about yourself. No need to be fancy, just an overview. ArchivesCategories |
Back to Blog
Sequences and series activity1/17/2024 Answer key included.SAVEPurchase Arithmetic and Geometric Sequences and Series Puzzle Maze BUNDLE which includes this activity plus:Geometric Sequences. In the final lesson of this module you will consider how you can add the terms of an infinite geometric series. This activity could be used as a review or something for your students to do while you are out There are 10 questions reviewing arithmetic sequences and series (no sigma notation questions). You also investigated problems that can be solved with geometric series, such as the problem of the bouncing ball and the investment questions in Project Connection. For the second formula, you combined the general term of a geometric sequence with the first geometric series formula. This is the method you used to derive the second geometric series formula. The second approach involves combining known formulas or relationships to create a new formula. This flexible resource on Arithmetic Sequences and Series allows students to either build interactive math notebooks with guided notes (keys included) and foldable activities OR use the included presentation handouts (keys included) with the PowerPoint presentation for focused instruction. This is the method you used to derive the first geometric series formula, Easy questions are worth the fewest points and the harder questions are worth the most. It is a game meant to be played as a class with students split into small groups, but could be used in many different ways. The general case, or formula, is then deduced by substituting variables for the numerical values. This game is a football-themed review of arithmetic and geometric sequences and series. The first approach is to start with a specific case using actual numerical values. You practised two commonly accepted approaches for formula derivation. In this lesson you derived two formulas that can be used to determine the sum of any number of terms in a geometric series. Write the first five terms of the sequence whose nth term is a n n n+1. Therefore, the required terms are 3, 8, 15, 24 and 35. I quickly see that the differences dont match for instance. Write the first five terms of the sequence whose nth term is a n n (n + 2). Lesson 11-8 Prove statements by using mathematical induction. The first thing I have to do is figure out which type of sequence this is: arithmetic or geometric. It is not always convenient to add the individual terms of a geometric series due to the large number of terms. NCERT Solutions for Class 11 Maths Chapter 9 Exercise 9.1. Geometric series represent the sum of the terms of a geometric sequence.
0 Comments
Read More
Leave a Reply. |