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    Arithmetic sequence, Geometric sequence

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    Use the arithmetic sequence of numbers 2, 4, 6, 8, 10... to find the following:
    a) What is d, the difference between any 2 terms?
    Answer:
    Show work in this space.

    b) Using the formula for the nth term of an arithmetic sequence, what is 101st term? Answer:
    Show work in this space.

    c) Using the formula for the sum of an arithmetic sequence, what is the sum of the first 20 terms?
    Answer:
    Show work in this space.

    d) Using the formula for the sum of an arithmetic sequence, what is the sum of the first 30 terms?
    Answer:
    Show work in this space.

    e) What observation can you make about the successive partial sums of this sequence (HINT: It would be beneficial to find a few more sums like the sum of the first 2, then the first 3, etc.)?
    Answer:

    2) Use the geometric sequence of numbers 1, 3, 9, 27, ... to find the following:
    a) What is r, the ratio between 2 consecutive terms?
    Answer:
    Show work in this space.

    b) Using the formula for the nth term of a geometric sequence, what is the 10th term?
    Answer:
    Show work in this space.

    c) Using the formula for the sum of a geometric series, what is the sum of the first 10 terms?
    Answer:
    Show work in this space.

    3) Use the geometric sequence of numbers 1, 1/3, 1/9 , 1/27... to find the following:
    a) What is r, the ratio between 2 consecutive terms?
    Answer:
    Show work in this space.

    b) Using the formula for the sum of the first n terms of a geometric series, what is the sum of the first 10 terms? Carry all calculations to 6 decimals on all assignments.
    Answer:
    Show work in this space.

    c) Using the formula for the sum of the first n terms of a geometric series, what is the sum of the first 12 terms? Carry all calculations to 6 decimals on all assignments.
    Answer:
    Show work in this space.

    d) What observation can make about the successive partial sums of this series? In particular, what whole number does it appear that the sum will always be smaller than?
    Answer:

    4) CLASSIC PROBLEM - A traveling salesman (selling shoes) stops at a farm in the Midwest. Before he could knock on the door, he noticed an old truck on fire. He rushed over and pulled a young lady out of the flaming truck. Farmer Crane came out and gratefully thanked the traveling salesman for saving his daughter's life. Mr. Crane insisted on giving the man an award for his heroism.

    So, the salesman said, "If you insist, I do not want much. Get your checkerboard and place one grain of wheat on the first square. Then place two grains of wheat on the next square. Then place four grains on the third square. Continue this until all 64 squares are covered with grains of wheat." As he had just harvested his wheat, Mr. Crane did not consider this much of an award, but he soon realized he made a miscalculation on the amount of wheat involved.

    a) How much wheat would Mr. Crane have to put on the 24th square?
    Answer:
    Show work in this space.

    b) How much total grain would the traveling salesman receive if the checkerboard only had 24 squares?
    Answer:
    Show work in this space.

    c) Calculate the amount of wheat necessary to fill the whole checkerboard (64 squares). How much wheat would the farmer need to give the salesman? Please provide the answer in either scientific notation, or calculate and show all 20 digits.
    Answer:

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    Solution Preview

    Note: ^ denotes raised to the power of

    Use the arithmetic sequence of numbers 2, 4, 6, 8, 10... to find the following:
    a) What is d, the difference between any 2 terms?
    Answer: d=2
    Show work in this space.

    d= 4-2=6-4=8-6=10-8= 2

    b) Using the formula for the nth term of an arithmetic sequence, what is 101st term? Answer:
    Show work in this space.

    An = A1+(n-1) d
    A101= 2+ (101-1)x 2 = 2 + 200 = 202
    Answer: 202

    c) Using the formula for the sum of an arithmetic sequence, what is the sum of the first 20 terms?
    Answer:
    Show work in this space.

    Sn = n x (A1+An) /2
    A1 = 2
    A20 = 2 + 19x2 = 40
    Therefore Sn = 20 x (2+40)/2 = 10 x 42 = 420
    Answer: Sum of the first 20 terms = 420

    Alternatively:
    Sn = (n/2) x {2 A1 + (n-1)d}
    = (20/2) x { 2 x 2 + 19 x 2} = 10 x 42 = 420

    d) Using the formula for the sum of an arithmetic sequence, what is the sum of the first 30 terms?
    Answer:
    Show work in this space.

    Sn = n x (A1+An) /2
    A1 = 2
    A30 = 2 + 29x2 = 60
    Therefore Sn = 30 x (2+60)/2 = 15 x 62 = 930
    Answer: Sum of the first 30 terms = 930

    Alternatively:
    Sn = (n/2) x {2 A1 + (n-1)d}
    = (30/2) x { 2 x 2 + 29 x 2} = 15 x 62 = 930

    e) What observation can you make about the successive partial sums of this sequence (HINT: It would be beneficial to find a few more sums like the sum ...

    Solution Summary

    Answers problems on arithmetic sequence, geometric sequence

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