How do you write the complex number in trigonometric form #3+sqrt3i#?

1 Answer
Narad T.
Oct 17, 2016

#=2sqrt3(cos(pi/6)+sin(pi/6))#

Explanation:

let #z=3+isqrt3#
We have to calculate the modulus #∣z∣=sqrt(3^2+(sqrt3)^2)=sqrt(9+3)=sqrt12=2sqrt3#
Now we have to divide z by ∣z∣
#z/(∣z∣)#=#3/(2sqrt3)+isqrt3/(2sqrt3)=sqrt3/2+i/2#
So #z=2sqrt3(sqrt3/2+i/2)#
Now you compare this to
#z=r(costheta+isintheta )#
You can see that
#costheta=sqrt3/2#
and #sintheta=1/2#
As the signs are positive, the results is in the first quadrant
#theta=30º orpi/6 #
So the anwer is #z=2sqrt3(cos(pi/6)+sin(pi/6))#

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