How do you write the complex number in trigonometric form $\sqrt{3} + i$ $sqrt3+i$ ?

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How do you write the complex number in trigonometric form $\sqrt{3} + i$ $sqrt3+i$ ?

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Answer 1 · 2016-09-25T19:38:15

For a number of form, $a + b i$ $a + bi$ , the form $A (cos (θ) + i sin (θ))$ $A(cos(theta) + isin(theta))$ is obtained by using $A = sqrt(a² + b²$ and $theta = tan^-1(b/a)$ (adjust $theta$ for the proper quadrant)

Explanation:

$A = sqrt(sqrt3^2 + 1^2$

$A = 2$

$theta = tan^-1(1/sqrt3)$

$theta = pi/6$

Because the signs of "a" and "b" are positive, we do not adjust the quadrant.

$sqrt3 + i = 2(cos(pi/6) + isin(pi/6))$

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How do you write the complex number in trigonometric form $\sqrt{3} + i$ $sqrt3+i$ ?

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