TAYLOR
Complex number functions
ARG
CONJ
IM
RE
Using mathematical functions
Calculates the nth order Taylor polynomial of expression
at the point where the given variable = 0.
TAYLOR (expression, variable, n)
Example
TAYLOR(1 + sin(s1)
angle measure and Fraction number format (set in
MODES) returns 1+s1^2-1/3*s1^4.
These functions are for complex numbers only. You can
also use complex numbers with all trigonometric and
hyperbolic functions, and with some real-number and
keyboard functions. Enter complex numbers in the form
(x,y), where x is the real part and y is the imaginary part.
Argument. Finds the angle defined by a complex number.
Inputs and outputs use the current angle format set in
Modes.
ARG((x, y))
Example
ARG((3,3)) returns 45 (Degrees mode)
Complex conjugate. Conjugation is the negation (sign
reversal) of the imaginary part of a complex number.
CONJ((x, y))
Example
CONJ((3,4)) returns (3,-4)
Imaginary part, y, of a complex number, (x, y).
IM ((x, y))
Example
IM((3,4)) returns 4
Real part x, of a complex number, (x, y).
RE((x, y))
Example
RE((3,4)) returns 3
2
,s1,5)with Radians
13-7