The roots of the quadratic equation ax2 + bx + c = 0, a ≠0 are given by the following formula:
In this formula, the term b2–4ac is called the discriminant. If b2–4ac = 0, then the equation has a single (repeated) root. If b2–4ac > 0, the equation has two real roots. If b2–4ac<0, the equation has two complex roots. Write a program that prompts the user to input the value of a (the coefficient of x2), b (the coefficient of x), and c (the constant term) and outputs the type of roots of the equation. Furthermore, if b2–4ac≥0, the program should output the roots of the quadratic equation. (Hint: Use the function pow from the header file cmath to calculate the square root. Chapter 3 explains how the function pow is used.)
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