nicksauce said:Thanks that was quite helpful. Just one thing though... in the proof I needed to say that there exists just one equilateral triangle with (1,0) as a vertex, and has all the sides length 1 away from the origin. Is this as obvious as it intuitively seems to me, or do you think I should try to prove it?
Complex variables are numbers that have both real and imaginary components. They are represented in the form a + bi, where a is the real part and bi is the imaginary part.
Complex variables are used in various fields of mathematics, such as calculus, analysis, and geometry. They are particularly useful in solving problems involving functions, equations, and geometric shapes.
In complex analysis, triangles are used as a tool to understand and analyze complex functions. The vertices of a triangle can represent points on the complex plane, and the sides of the triangle can represent complex numbers and their corresponding angles.
In the geometry of triangles, complex variables are used to represent and analyze the properties of triangles in the complex plane. They can be used to determine the angles, sides, and areas of triangles, as well as their transformations and symmetries.
Complex variables have numerous applications in real life, including in physics, engineering, and economics. They are used to model and analyze various physical systems, such as electrical circuits and fluid dynamics, as well as in financial forecasting and risk assessment.