document.write( "Question 74490: 3) Use the geometric sequence of numbers 1, 1/2, 1/4, 1/8,…to find the following:
\n" ); document.write( "a) What is r, the ratio between 2 consecutive terms?
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\n" ); document.write( "\n" ); document.write( "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? Please round your answer to 4 decimals.
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\n" ); document.write( "\n" ); document.write( "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? Please round your answer to 4 decimals.
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\n" ); document.write( "\n" ); document.write( "d) What observation can make about these sums? In particular, what whole number does it appear that the sum will always be smaller than?
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Algebra.Com's Answer #53524 by jim_thompson5910(35256) $\"\"$ $\"About$

You can put this solution on YOUR website!
a)
\n" ); document.write( "The ratio r is the factor to get from term to term. So
\n" ); document.write( "r=nth term/(n-1) term
\n" ); document.write( " $\"r=%281%2F8%29%2F%281%2F4%29=%284%2F8%29=1%2F2\"$
\n" ); document.write( " $\"r=1%2F2\"$
\n" ); document.write( "The sequence is cut in half each term, so the sequence is $\"%281%2F2%29%5En\"$ \r
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\n" ); document.write( "\n" ); document.write( "b)
\n" ); document.write( "The sum of a geometric series is
\n" ); document.write( " $\"S=a%281-r%5En%29%2F%281-r%29\"$ where a=1
\n" ); document.write( " $\"S=%281-%281%2F2%29%5E10%29%2F%281-%281%2F2%29%29\"$ So plug in n=10 to find the sum of the first 10 partial sums
\n" ); document.write( " $\"S=%281-1%2F1024%29%2F%281%2F2%29\"$
\n" ); document.write( " $\"S=2046%2F1024\"$
\n" ); document.write( "So the sum of the first ten terms is $\"2046%2F1024\"$ or 1.99805 approximately\r
\n" ); document.write( "\n" ); document.write( "c)
\n" ); document.write( "Use the same formula to find the sum of the 1st 12 terms
\n" ); document.write( " $\"S=a%281-r%5En%29%2F%281-r%29\"$ where a=1
\n" ); document.write( " $\"S=%281-%281%2F2%29%5E12%29%2F%281-%281%2F2%29%29\"$ So plug in n=12 to find the sum of the first 12 partial sums
\n" ); document.write( " $\"S=%281-1%2F4096%29%2F%281%2F2%29\"$
\n" ); document.write( " $\"S=8190%2F4096\"$
\n" ); document.write( "So the sum of the first twelve terms is $\"8190%2F4096\"$ or 1.99951 approximately\r
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\n" ); document.write( "\n" ); document.write( "d)
\n" ); document.write( "It appears that the sums are approaching a finite number of 2. This is because each term is getting smaller and smaller. This observation is justified by the fact that if $\"abs%28r%29%3C1\"$ then the infinite series will approach a finite number. In other words
\n" ); document.write( "If $\"abs%28r%29%3C1\"$ (the magnitude of r has to be less than 1) then,
\n" ); document.write( " $\"S=a%2F%281-r%29\"$ Where S is the infinite series. So if we let a=1 and r=1/2 we get
\n" ); document.write( " $\"S=1%2F%281-%281%2F2%29%29\"$
\n" ); document.write( " $\"S=1%2F%281%2F2%29\"$
\n" ); document.write( " $\"S=2\"$ So this verifies that our series approaches 2. Hope this helps. \n" ); document.write( "

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