GCSE Revision; Revision Cards; Books; Geometric Progressions Practice Questions. Click here for Questions. Click here for Answers. Practice Questions. Previous: Triangles: Lengths of Sides Practice Questions. Next: Set Notation Practice Questions. GCSE Revision Cards. 5-a-day Workbooks.
In geometric sequences, the term-to-term rule is to multiply or divide by the same value. Learn other sequences including square numbers and the Fibonacci sequence. ... GCSE exam-style questions ...
In a \(geometric\) sequence, the term to term rule is to multiply or divide by the same value. Example Show that the sequence 3, 6, 12, 24, … is a geometric sequence, and find the next three terms.
Past paper questions by topic with mark schemes, model answers and video solutions for Geometric Progression (Higher) of Edexcel Maths GCSE (9-1). Get £10 off your first lesson on PMT Tuition in April with the code PMTAPR2025.
GCSE Maths Revision | Algebra Geometric Sequences - Worksheet Applied 1) The first terms in a sequence are 5 7 , 21 , 63 , 189 , 567 (a) What is the common ratio for this sequence? (b) Work out the difference between the and term. (c) Explain why the number is no6t iℎn the 7s e ℎquence. 413340 2) Below are the frequencies of different notes on a piano.
Geometric Sequences: GCSE Maths Revision Guide. 1. What is a Geometric Sequence? A geometric sequence is a sequence of numbers in which each term is found by multiplying or dividing the previous term by a fixed, non-zero number called the common ratio. Here are a few examples of a geometric sequence,
These are sometimes called arithmetic sequences or progressions. A common difference is added to or subtracted from one term to get to the next term. Other types of sequences that you may also come across include. Quadratic sequences (square numbers) Cube numbers. Triangular numbers. Geometric sequences. Fibonacci sequences
Free sequences GCSE maths revision guide, including step by step examples, and free worksheet and exam questions. Maths Tutoring for Schools. Primary Programmes; ... Here we will learn about different types of sequences including arithmetic sequences, geometric sequences and quadratic sequences and how to generate them and find missing terms ...
Maths revision video and notes on geometric sequences and series. This includes the proof of the sum formula, the sum to infinity and the nth term of geometric sequences. GCSE Revision. GCSE Papers . Edexcel Exam Papers OCR Exam Papers AQA Exam Papers Eduqas Exam Papers. A Level Revision.
Free online GCSE video tutorials, notes, exam style questions, worksheets, answers for all topics in Foundation and Higher GCSE. ... GCSE Revision Grade 1 # Videos Exam Questions Exam Questions Booklet Solutions; 1.1: Addition and Subtraction: ... Sequences (Nth Term) Exam Questions: Sequences (nth term) Solutions: 4.8: Expanding and Factorising:
Geometric Sequences. In a geometric sequence you must multiply by a constant number (common ratio) r to go from one term to the next. Taking the following example: 3 9 27 81 243. Each number is multiplied by 3 each time, giving us the common ratio of r = 3. The term to term formula is U n ₊₁ = 3Uₙ with U₁ = 3.
Sequences are an important area of mathematics, and understanding how to work with them is essential for your Maths exam. In this guide, we will explore various types of sequences, including term-to-term rules, position-to-term rules, arithmetic sequences, quadratic sequences, geometric sequences, and special sequences. You’ll also learn how to find and use the nth term of a sequence.
Continuing sequences (arithmetic, quadratic, geometric and fibonacci) Generate sequences from nth term Find nth term ... GCSE Maths Foundation Revision. Revision sheets for GCSE Foundation Maths with PowerPoints to display and reveal answers. The following (with answers) are covered: Number: 1. Number Properties x3 2.
A geometric sequence can also be referred to as a geometric progression and sometimes as an exponential sequence. In a geometric sequence, the term-to-term rule would be to multiply by a constant, r. a n+1 = r.a n. r is called the common ratio and can be found by dividing any two consecutive terms, or. r = a n+1 / a n. In the sequence 4, 8, 16 ...
Geometric sequence worksheet with 38 applied, reasoning and exam questions and answers; for use in class and as GCSE Maths revision. Maths Tutoring for Schools. ... Suitable for GCSE maths revision for AQA, OCR and Edexcel exam boards; Unlock access to download your free resource .
GCSE Maths 9-1 Sequences Exam Bundle. This bundle of resources covers the 3 main sections of Sequences at GCSE Level **'Arithmetic Sequences' 'Quadratic Sequences' 'Geometric Sequences'** It's perfect for revision and checking off some of the trickier topics such as Quadratic sequences and Geometric sequences It's applicable for all major exam boards such as Edexcel, AQA and OCR It's priced at ...
In a geometric sequence, the term-to-term rule would be to multiply by a constant This multiplier is called the common ratio and can be found by dividing any two consecutive terms Consider the sequence 4, 8, 16, 32, 64, ...
Eg. 10, 100 ,1000, 10000 is a geometric sequence as you need to multiply the previous term by 10 to go from one term to another. Dividing by a constant also shows a geometric sequence: 500, 100, 20,4 - in this sequence we are dividing by 5 to go from one term to the next. Finding the nth term
Geometric Sequences. A Geometric Sequence is a sequence where each term after the first is found by multiplying the previous term by a fixed non-zero number called the common ratio. The formula to find the nth term in a geometric sequence is ar^(n-1), where a is the first term and r is the common ratio. For example, in the sequence 3, 6, 12, 24 ...
