How do you evaluate $e^( ( 3 pi)/8 i) - e^( ( 19 pi)/6 i)$ using trigonometric functions?

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How do you evaluate $e^( ( 3 pi)/8 i) - e^( ( 19 pi)/6 i)$ using trigonometric functions?

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Answer 1 · 2016-04-09T22:31:31

$1.249 + 1.424i$

Explanation:

According to Euler's formula,

$e^(ix) = cosx + isinx$ .

Using values for $x$ from the question,

$x = (3pi)/8$
$e^((3pi)/8i) = cos((3pi)/8) + isin((3pi)/8)$
$= cos67.5 + isin67.5$
$= 0.383 + 0.924i$

$x = (19pi)/6$
$e^((19pi)/6i) = cos((19pi)/6) + isin((19pi)/6)$
$= cos570 + isin570$
$= -0.866 - 0.500i$

Putting these two values together,

$0.383 + 0.924i + 0.866 + 0.500i = 1.249 + 1.424i$

You can check the trigonometric values, there's a margin for error with rounding (or if I've accidentally done radians rather than degrees or vice versa on a calculator) but the equation is correct. Simply use Euler's formula, enter your values for $x$ and solve with a calculator.

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How do you evaluate $e^( ( 3 pi)/8 i) - e^( ( 19 pi)/6 i)$ using trigonometric functions?

1 Answer

Explanation:

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Science

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Humanities

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How do you evaluate e^( ( 3 pi)/8 i) - e^( ( 19 pi)/6 i) e^( ( 3 pi)/8 i) - e^( ( 19 pi)/6 i) using trigonometric functions?

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Explanation:

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How do you evaluate $e^( ( 3 pi)/8 i) - e^( ( 19 pi)/6 i)$ using trigonometric functions?