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Math 30P Geometric Sequences 1 Believe it or not we studied sequences in grade 10 A sequence is a set of numbers in a definite order which are written separated by commas A common way to define a sequence is in terms of the nth term formula Ex #1 Write the next two terms of the following sequence and describe a rule which can be used to form the sequence a) 1, 3, 5, 7, ... c) 2, 3, 5, 7, 11, ... b) 2, 4, 8, 16, ... d) 1, 1, 2, 3 ,5, ... 2 Some terminology The first term of a sequence is written t1, the second term of a sequence is written as t2 and the general term, or the nth term is written as tn. The general term provides a formula which can be used to determine any term of the sequence Example: 1, 3, 5, 7, ... has the nth term formula tn= 2n 1 Infinite Sequence is a seqeunce that goes on forever 3, 6, 12, ... Finite sequence is one that has a specific number of terms 3, 6, 12, ... 192 The general term for the sequence 3, 6, 12,... is tn=3(2)n1 3 Ex #2 a) List the first three terms of the sequence tn = 3n2n b) Determine the 8th term of the seqeunce tn = 4n2 9 4 Types of Sequences Others Arithmetic terms are created by adding the same number to the preceding term 1, 7, 13, 19, ... they have a common difference (6 above) Geometric terms are created by multiplying the same number to the preceding term 2, 4, 8, 16, 32,... Math 10P They have a common ratio (2 above) tn = t1 + (n1)d Find common ration by t2 t1 5 Finding the Common ration In order to find the common ratio we must divide two adjacent terms. The term farther to the right in the sequence must go in the numerator Find the common ratio a) 6, 12, 24, .... b) 1, 5, 25, ... c) 10, 5, 5/2,... 6 Developing the nth term formula Consider the following sequence 3, 6, 12, 24, ... t1 = 3 t2 = 6 = 3(2)1 t3 = t4 = t5 = t6 = The general formula for a geometric sequence n1 tn = ar a = t1 r = common ratio n = position of the term being considered 7 Ex#5: Determine the general term (nth term formula) and calcualte the seventh for each of the following a) 32, 16 ,8, . . . b) 1/3 , 1/6 , 1/12, .. . . 8 Write the general term for the sequence 1/4, 1/8, 1/16, ... Given the sequence 32, 64, 128, ... , 16383, determine: a) The number of terms in the sequence b) Which term is 1024? 9 Given the geometric sequence with t4=54 and t7=1458, find the: a) first term b) common ratio c) general term 10 Ex #9 x, x + 5, x + 9 are the first three terms in a geometric sequence. Determine the exact value of each term 11 Geometric means these are terms inserted between adjacent terms Insert 4 geometric means between 81 and 1/729 12 PAges 164168 #115 13
