Trigonometric modes – HP 15c User Manual

58

Section 3: Calculating in Complex Mode

58

Keystrokes

Display

195

v371÷

0.5256

O4

0.5256

Stores a

4

.

1.011523068

O5

1.0115

Stores a

5

.

1.517473649

O6

1.5175

Stores a

6

.

Use this program to calculate ln(



(4.2)), then compare it with ln(3.2!) calculated with the

! function. Also calculate ln(



(1 + 5i)).

Keystrokes

Display

4.2

´A

2.0486

Calculates ln(



(4.2)).

´•9

2.048555637

Displays 10 digits.

3.2

´!

7.756689536

Calculates (3.2)! =



(3.2+1).

|N

2.048555637

Calculates ln(3.2!).

1

v

1.000000000

Enters real part of 1 + 5i.

5

´V

1.000000000

Forms complex number
1 + 5i.

´A

-6.130324145

Real part of ln(



(1 + 5i)).

´}

3.815898575

Imaginary part of
ln(



(1 + 5i)).

´•4

3.8159

The complex result is calculated with no more effort than that needed to enter the imaginary
part of the argument z. (The result ln(



(1 + 5i)) has 10 correct digits in each component.)

Trigonometric Modes

Although the trigonometric mode annunciator remains lit in Complex mode, complex
functions are always computed using radian measure. The annunciator indicates the mode
(Degrees, Radians, or Grads) for only the two complex conversions: : and ;.

If you want to evaluate re

i



where



is in degrees, '

can't be used directly because



must

be in radians. If you attempt to convert from degrees to radians, there is a slight loss of
accuracy, especially at values like 180° for which the radian measure



can't be represented

exactly with 10 digits.

However, in Complex mode the ;

function computes re

i



accurately for



in any measure

(indicated by the annunciator). Simply enter r and



into the complex X-registers in the form

r + i



, then execute ; to calculate the complex value

re

i



= r cos



+ ir sin



.

(The program listed under Calculating the n th Roots of a Complex Number at the end of this
section uses this function.)