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Published byEarl Chase Modified over 9 years ago
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9-2 Arithmetic Sequences & Series
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When another famous mathematician was in first grade, his teacher asked the class to add up the numbers one through a hundred (1+2+3 etc., all the way up to 100). Write out the teacher’s request in summation notation, then find the answer (no calculators!) Try to figure out an efficient way!
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1 to 100
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Find the sum from 3 to 1,000 or
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TTTThe difference between consecutive terms is constant (or the same). TTTThe constant difference is also known as the common difference (d). (It’s also that number that you are adding everytime!)
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-10,-6,-2,0,2,6,10,… -6--10=4 -2--6=4 0--2=2 2-0=2 6-2=4 10-6=4 Not arithmetic (because the differences are not the same) 5,11,17,23,29,… 11-5=6 17-11=6 23-17=6 29-23=6 Arithmetic (common difference is 6)
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5, 8, 11, 14, 17, 20, 23…
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a n =a 1 +(n-1)d a 1 2 variables need to be known (or solved for): a 1 and d Kind of like in y = mx+b, we need to know m and b a n = d(n-1)+a 1 a n = d(n-1)+a 1
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The is a common difference where d=15, therefore the sequence is arithmetic. Use a n =a 1 +(n-1)d a n =32+(n-1)(15) a n =32+(n-1)(15) a n =32+15n-15 a n =32+15n-15 a n =17+15n a n =17+15n a 12 =17+15(12)=197
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Use a n =a 1 +(n-1)d to find the 1 st term! a 8 =a 1 +(8-1)(.25) 50=a 1 +(7)(.25) 50=a 1 +1.75 48.25=a 1 * Now, use a n =a 1 +(n-1)d to find the rule. a n =48.25+(n-1)(.25) a n =48.25+.25n-.25 a n =48+.25n This is like being given a slope and a (x,y) coordinate. We need to find the “b”!
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Begin by writing 2 equations; one for each term given. a 5 =a 1 +(5-1)d OR 10=a 1 +4d And a 30 =a 1 +(30-1)d OR 110=a 1 +29d Now use the 2 equations to solve for a 1 & d. 10=a 1 +4d 10=a 1 +4d 110=a 1 +29d (subtract the equations to cancel a 1 ) -100= -25d So, d=4 and a 1 =-6 (now find the rule) a n =a 1 +(n-1)d a n =-6+(n-1)(4) OR a n =-10+4n This is like being given 2 coordinates. We have to find the “slope” and the “b”
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-2=-10+4n8=4n2=n
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2+4+6+8+10+12 2+4+6+8+10+12+14+16 2+4+6+8+10+12+14+16… Think of the story of Gauss adding 1 to 100 (12+2)(6/2) = 42 (16+2)(8/2) = 72
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The sum of the terms in an arithmetic sequence The formula to find the sum of a finite arithmetic series is: # of terms 1 st Term Last Term
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Find the sum of the 1 st 25 terms. We know the 1 st term, we need the 25 th term. a n =20+(n-1)(-2) a n =22-2n So, a 25 = -28 (last term) Find n such that S n =-760
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-1520=n(20+22-2n) -1520=-2n 2 +42n 2n 2 -42n-1520=0 n 2 -21n-760=0 (n-40)(n+19)=0 n=40 or n=-19 Always choose the positive solution!
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Your book refers to partial sums of an arithmetic sequence. To find the nth partial sum… simply find the sum of the first n terms. Example: To find the 50 th partial sum, find the sum of the first 50 terms.
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Consider a job offer with a starting salary of $32,500 and an annual raise of $2500. Determine the total compensation from the company through the first ten years of employment.
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9-2 Pg. 659 #3-47 odd, 57, 58, 81, 82
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