In Exercises 1–10, plot each complex number and find its absolute value. z = 4i

Complex numbers are numbers that have a real part and an imaginary part, expressed in the form z = a + bi, where 'a' is the real part and 'b' is the coefficient of the imaginary unit 'i'. In the given example, z = 4i, the real part is 0 and the imaginary part is 4, indicating that the number lies purely on the imaginary axis in the complex plane.

To plot a complex number on the complex plane, the horizontal axis represents the real part, while the vertical axis represents the imaginary part. For z = 4i, the point is plotted at (0, 4), which shows that it is located 4 units above the origin along the imaginary axis, illustrating the geometric representation of complex numbers.

The absolute value (or modulus) of a complex number z = a + bi is calculated using the formula |z| = √(a² + b²). This value represents the distance from the origin to the point (a, b) in the complex plane. For z = 4i, the absolute value is |4i| = √(0² + 4²) = 4, indicating that the distance from the origin to the point (0, 4) is 4 units.