Survey
* Your assessment is very important for improving the workof artificial intelligence, which forms the content of this project
* Your assessment is very important for improving the workof artificial intelligence, which forms the content of this project
Foundations of mathematics wikipedia , lookup
Gödel's incompleteness theorems wikipedia , lookup
Peano axioms wikipedia , lookup
Proofs of Fermat's little theorem wikipedia , lookup
Hyperreal number wikipedia , lookup
List of first-order theories wikipedia , lookup
Number theory wikipedia , lookup
ARITHMETIC SEQUENCES AND SERIES Week Commencing Monday 28th September Learning Intention: • To be able to find the nth term of an arithmetic sequence or series. • To be able to find the number of terms in an arithmetic sequence or series. Contents: 1. What is an Arithmetic Sequence? 2. What is an Arithmetic Series? 3. Assignment 2 4. Finding terms of Arithmetic Sequences and Series 5. Number of terms in a Sequence or Series 6. Finding first term and common difference 7. Assignment 3 ARITHMETIC SEQUENCES AND SERIES What is an Arithmetic Sequence? An arithmetic sequence is a sequence that increases by a constant amount each time. It can be defined by the recurrence relationship: Un+1 = Un + k, where k is a constant number Examples of arithmetic sequences are: 5, 8, 11, 14, 17, ... increasing by 3 each time 100, 95, 90, 85, ... increasing by -5 each time ARITHMETIC SEQUENCES AND SERIES What is an Arithmetic Series? If you add together the terms of an arithmetic sequence we get an arithmetic series – the same terms but instead of comma’s separating them it is a “+” sign. Examples of arithmetic series are: 5 + 8 + 11 + 14 + … 5 + 1 + -3 + -7 + -11 + … ARITHMETIC SEQUENCES AND SERIES Assignment 2 – What are Arithmetic Sequences & Series? Follow the link for Assignment 2 on Arithmetic Sequences and Series in the Moodle Course Area. Completed assignments must be submitted by 5:00pm on Monday 5th October. ARITHMETIC SEQUENCES AND SERIES Finding terms of Arithmetic Sequences and Series For both arithmetic sequences and series the first term is generally called a and the constant it increases by is called the common difference, d. We can use a and d to help us find the nth term of an arithmetic sequence or series. The formula for the nth term is given by: a + (n – 1)d where n is term we are looking for a is the first term d is the common difference ARITHMETIC SEQUENCES AND SERIES Terms of an Arithmetic Series Example: Find the 10th, 20th and nth terms of this arithmetic series: ¼ + 1 + 1¾ + 2½ + … Solution: a = ¼ d = 1 – ¼ = ¾ Using ausing Again, + (n a-1)d + (n -1)d th thterm (i) (iii) (ii) 10 20 nth term term = ¼ + (n (10 (20– –1)¾ 1)¾ = ¼ + ¾n (9)¾ (19)¾ – ¾ = ¾n 7 14½– ½ ARITHMETIC SEQUENCES AND SERIES Number of Terms in a Series If we know the final term in a sequence or series we can use a and d to help us find how many terms there are in sequence or series. ARITHMETIC SEQUENCES AND SERIES Number of Terms in a Series? Example: How many terms are in this arithmetic series: 0.7 + 0.3 + -0.1 + -0.5 + … + -5.7 Solution: We know the last term is -5.7, a = 0.7 and d = -0.4. We can therefore use the formula a + (n – 1)d to form an equation and solve for n. We get: 0.7 + ( n – 1)(-0.4) = -5.7 0.7 – 0.4n + 0.4 = -5.7 (multiplying out brackets) -0.4n = -6.8 (taking numbers to one side) n = -6.8 / -0.4 = 17 (dividing by 0.4) ARITHMETIC SEQUENCES AND SERIES Finding a and d A very popular type of question to be asked in the exam is to find the first term and the common difference when given what two of the terms in the series are. ARITHMETIC SEQUENCES AND SERIES Finding a and d Example: The seventh term in an arithmetic series is 15 and the eight term is 20. Find the first term. Solution: U7 = 15 and U8 = 20, therefore d = 5. Furthermore: a + (7 -1)(5) = 15 a + 30 = 15 a = 15 – 30 = -15 ARITHMETIC SEQUENCES AND SERIES Finding a and d Example: Given that the 3rd term of an arithmetic series is 30 and the 10th term is 9 find a and d. Hence find which term if the first one to become negative. Solution: aU= =36 30 d = -3 and U10 = 9 We want first term to become negative a + (3 -1)dthe = 30 a + (10 – 1)d =i.e 9 3 aa ++ (n 2d–=1)d 30 < 0 (1) a + 9d = 9 (2) Using the equations a and d we(1) have we get: We solve andfound (2) simultaneously to find a and 36 + (nd.– 1)(-3) < 0 Subtracting 36 – 3n + 3 < (1) 0 from (2) gives: 7d =< -21 -3n -39 -3 nd >= 13 That is, from term number 14 onwards the number Therefore, will be negative.a + 2(-3) = 30 a – 6 = 30 a = 36 ARITHMETIC SEQUENCES AND SERIES Assignment 3 – Finding terms of an Arithmetic Series. Follow the link for Assignment 3 on Finding terms of an Arithmetic Series in the Moodle Course Area. This is a Yacapaca Activity. Completed assignments must be submitted by 5:00pm on Monday 5th October.