For use in multiple classrooms, please purchase additional licenses. Take some time to observe the terms and make a guess as to how they progress. Let’s take a look at the Fibonacci sequence shown below. That’s because it relies on a particular pattern or rule and the next term will depend on the value of the previous term. This product is intended for personal use in one classroom only. Recursive sequences are not as straightforward as arithmetic and geometric sequences. Enjoy and I ☺thank you☺ for visiting my ☺Never Give Up On Math☺ store!!!įOLLOW ME FOR MORE MAZES ON THIS TOPIC & OTHER TOPICS Please don't forget to come back and rate this product when you have a chance. This maze could be used as: a way to check for understanding, a review, recap of the lesson, pair-share, cooperative learning, exit ticket, entrance ticket, homework, individual practice, when you have time left at the end of a period, beginning of the period (as a warm up or bell work), before a quiz on the topic, and more. ✰ ✰ ✰Ī DIGITAL VERSION OF THIS ACTIVITY IS SOLD SEPARATELY AT MY STORE HERE They complete it in class as a bell work. ✰ ✰ ✰ My students truly were ENGAGED answering this maze much better than the textbook problems. After seeing the preview, If you would like to modify the maze in any way, please don't hesitate to contact me via Q and A. Please, take a look at the preview before purchasing to make sure that this maze meets your expectations. Students would have to complete 12 of the 15 to reach the end. ❖ How to find the common ratio given the first four terms of a geometric sequence ❖ The Recursive Formula of a Geometric Sequence: a1 = a & An = a (sub n-1) * r ✐ This product is a good review of "Finding the Recursive Formula of a Geometric Sequence".
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