How do you evaluate e^( (3 pi)/2 i) - e^( (15 pi)/8 i) using trigonometric functions?

1 Answer
Binayaka C.
May 20, 2017

e^((3pi)/2i) - e^((15pi)/8i) ~~ -0.924 - 0.617 i

Explanation:

We know e^(itheta) = cos theta +i sin theta

(3pi)/2 =(3*180)/2= 270^0 , (15 pi)/8= (15*180)/8 = 337.5^0

cos 270 =0 ; sin(270) = -1 ; cos 337.5 ~~ 0.924 ;

sin 337.5 ~~ -0.383

:. e^((3pi)/2i) = cos ((3pi)/2)+ i sin ((3pi)/2) = 0 - i

:. e^((15pi)/8i) = cos ((15pi)/8)+ i sin ((15pi)/8) ~~ 0.924 - 0.383 i

:. e^((3pi)/2i) - e^((15pi)/8i) ~~ (0- i) - ( 0.924 - 0.383 i) or

~~ (-0.924) + (-1+0.383)i ~~ -0.924 - 0.617 i [Ans]

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