How do you evaluate # e^( ( 15 pi)/8 i) - e^( ( 13 pi)/12 i)# using trigonometric functions?

1 Answer
Binayaka C.
Feb 7, 2017

#1.89 - 0.064 i#

Explanation:

#(15pi)/8= (15*180)/8 = 337.5^0 ; (13pi)/12= (13*180)/12 = 195^0#

We know #e^(i theta) = cos theta + i sin theta :. e^((15pi)/8 i) = cos 337.5 + i sin 337.5 and e^((13pi)/12 i) = cos 195 + i sin 195 #

# e^((15pi)/8 i) - e^((13pi)/12 i) = (cos 337.5 + i sin 337.5) - (cos 195 + i sin 195 ) = ( cos 337.5 - cos 195) +i ( sin 337.5 - sin 195) = (0.924 - (-0.966) + i (-0.383 - (-0.259) = 1.89 - 0.064 i#

# e^((15pi)/8 i) - e^((13pi)/12 i) = 1.89 - 0.124 i# [Ans]

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