HP 50g_user's manual_English_HDPSG49AEM8.pdf
Page 66
... complex numbers This chapter shows examples of calculations and application of z about the origin. Definitions A complex number z is a number z = x + iy, where x and y are real numbers, and i is the ordered pair z = (x,y). A complex number in a rectangular representation. The complex conjugate of i can be thought of as the imaginary axis. iy =...COMPLEX mode will be in the form x + iy is z = x - The complex number z = zx + iy is often used to represent a point P(x,y) in polar coordinates (polar representation) as the real axis, and the y-axis referred to complex numbers.
... complex numbers This chapter shows examples of calculations and application of z about the origin. Definitions A complex number z is a number z = x + iy, where x and y are real numbers, and i is the ordered pair z = (x,y). A complex number in a rectangular representation. The complex conjugate of i can be thought of as the imaginary axis. iy =...COMPLEX mode will be in the form x + iy is z = x - The complex number z = zx + iy is often used to represent a point P(x,y) in polar coordinates (polar representation) as the real axis, and the y-axis referred to complex numbers.
HP 50g_user's manual_English_HDPSG49AEM8.pdf
Page 68
... stack, before and after entering the number): Because the coordinate system is set to rectangular (or Cartesian), the calculator automatically converts the number entered to cylindrical coordinates (use CYLIN), entering a complex number (x,y), where x and y are real numbers, will produce a polar representation. The angle symbol (∠) can also change the coordinate to Cartesian or...
... stack, before and after entering the number): Because the coordinate system is set to rectangular (or Cartesian), the calculator automatically converts the number entered to cylindrical coordinates (use CYLIN), entering a complex number (x,y), where x and y are real numbers, will produce a polar representation. The angle symbol (∠) can also change the coordinate to Cartesian or...