No, that's not true. The two roots of a quadratic equation must be conjugates only if the equation has all real coefficients.Firepanda said:
but that's impossible: 2(Re a) must be a real number.
Once more, that's impossible. |a| is a real number, its square is a real number.
Use the quadratic formula or complete the square.
Complex solutions refer to the solutions of an equation that involve imaginary numbers. These numbers are not real, but are expressed as a combination of the real number system and the imaginary unit 'i' (where i = √-1).
To find the zeros of an equation with complex solutions, you can use the quadratic formula or factor the equation. When using the quadratic formula, the discriminant (b^2 - 4ac) will be negative, indicating that the roots will involve imaginary numbers. When factoring, the equation will typically have a pair of complex conjugate roots, meaning that the imaginary part will be the same but with opposite signs.
Yes, an equation can have only complex solutions. This occurs when the discriminant of the quadratic formula is negative, or when the equation cannot be factored. In these cases, the solutions will be purely imaginary numbers.
To graph equations with complex solutions, you will need to plot points on a complex plane. The real part of the complex number will be plotted on the horizontal axis, and the imaginary part will be plotted on the vertical axis. The solutions will then be represented as points on the graph.
Complex solutions are important in mathematics because they allow us to solve equations that cannot be solved using only real numbers. They also have applications in many fields, such as engineering, physics, and computer science. In addition, they provide a deeper understanding of the properties and behavior of numbers and equations.