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The first term of a geometric sequence is 6, and the ratio (multiplier) is 0.5. What is the sum of the first 8 terms, rounded to the nearest tenth?

The first term of a geometric sequence is 6, and the ratio (multiplier) is 0.5. What is the sum of the first 8 terms, rounded to the nearest tenth?
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The first term of a geometric sequence is 6, and the ratio (multiplier) is 0.5. What is the sum of the first 8 terms, rounded to the nearest tenth?

User Thay
by
8.2k points

1 Answer

4 votes
The sum of the first
n terms of a geometric sequence is given by:


S_(n)=(a_(1)(1-r^(n)))/(1-2)

Using the known values:

S_(8)=(6(1-0.5^(8)))/(1-0.5)

S_(8)=(6(1-0.00390625))/(0.5)

S_(8)=(6(0.99609375))/(0.5)

S_(8)=(5.9765625)/(0.5)

S_(8)=11.953125

User Kienz
by
7.9k points
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