Difference between revisions of "Imaginary unit/Introductory"
(dollar sign) |
(→Solution 1: LaTeX) |
||
(3 intermediate revisions by 3 users not shown) | |||
Line 1: | Line 1: | ||
− | + | #Find the sum of <math>i^1+i^2+\ldots+i^{2006}</math>. | |
− | Find the sum of <math>i^1+i^2+\ldots+i^{2006} | + | #Find the product of <math>i^1 \times i^2 \times \cdots \times i^{2006}</math>. |
− | + | ||
− | + | __TOC__ | |
− | #<math>i^1 | + | |
− | + | == Solution 1 == | |
− | + | Since <math>i</math> repeats in a n exponential series at every fifth turn, the sequence <math>i, -1, -i, 1</math> repeats. Note that this sums to <math>0</math>. That means that all sequences <math>i^1+i^2+\ldots+i^{4k}</math> have a sum of zero (k is a natural number). Since <math>2006=4\cdot501+2</math>, the original series sums to the first two terms of the powers of i, which equals <math>-1+i</math>. | |
− | + | ||
− | + | == Solution 2 == | |
− | + | <math>i \cdot -1 \cdot -i \cdot 1 = -1</math>, so the product is equal to <math>(-1)^{501} \times i^{2005} \times i^{2006} = -1 \times i \times -1 = i</math>. |
Latest revision as of 12:15, 27 October 2007
- Find the sum of .
- Find the product of .
Contents
Solution 1
Since repeats in a n exponential series at every fifth turn, the sequence repeats. Note that this sums to . That means that all sequences have a sum of zero (k is a natural number). Since , the original series sums to the first two terms of the powers of i, which equals .
Solution 2
, so the product is equal to .