Final answer:
To solve the complex equation s⁴ = 1/2 - √3/2i, we can convert the right side of the equation to polar form and take the fourth root of both sides. The solutions are cos(60°) + isin(60°), cos(150°) + isin(150°), cos(240°) + isin(240°), cos(330°) + isin(330°).
Step-by-step explanation:
To solve the complex equation s⁴ = 1/2 - √3/2i, we can start by converting the right side of the equation to polar form. Then, we can take the fourth root of both sides to find the value of s.
- Write the complex number in polar form: 1/2 - √3/2i = cos(240°) + isin(240°)
- We can now take the fourth root of both sides to find s: s = cos(60°) + isin(60°), cos(150°) + isin(150°), cos(240°) + isin(240°), cos(330°) + isin(330°)
- Therefore, the solutions to the equation are: s = cos(60°) + isin(60°), cos(150°) + isin(150°), cos(240°) + isin(240°), cos(330°) + isin(330°)
Learn more about Complex Equations