4 number of digits and precision – Casio CLASSPAD 330 3.04 User Manual

20060301

4 Number of Digits and Precision

I Number of Digits

Standard Mode

The following applies when the check box next to the “Decimal Calculation” item on the Basic
Format dialog box is not selected.

• Up to 611 digits are stored in memory for integer values.

• Decimal values up to 15 digits are converted to fraction format and saved in memory. When

a mathematical expression cannot be converted to fraction format, the result is displayed in
decimal format.

• Values stored in memory are displayed as-is, regardless of how [Number Format] settings

(Normal 1, Normal 2, Fix 0 – 9, Sci 0 – 9) are configured (except when a decimal value is
displayed).

Decimal Mode

The following applies when the check box next to the “Decimal Calculation” item on the Basic
Format dialog box is selected.

• Values stored in Ans memory and values assigned to variables have the same number of

digits as defined for Standard mode values.

• Values are displayed in accordance with how [Number Format] settings (Normal 1, Normal 2,

Fix 0 – 9, Sci 0 – 9) are configured.

• Displayed values are rounded to the appropriate number of decimal places.

• Some applications store values using a mantissa up to 15 digits long and a 3-digit

exponent.

I Precision

• Internal calculations are performed using 15 digits.
• The error for a single mathematical expression (Decimal mode calculation error) is

p1 at the

10th digit. In the case of exponential display, calculation error is

p1 at the least significant

digit. Note that performing consecutive calculations causes error to be cumulative. Error
is also cumulative for internal consecutive calculations performed for: ^(

x

y

),

x

,

x

!,

n

P

r

,

n

C

r

, etc.

• Error is cumulative and tends to be larger in the vicinity of a function’s singular point(s) and

inflection point(s), and the vicinity of zero. With sinh(

x

) and tanh(

x

), for example, the

inflection point occurs when

x

= 0. In this vicinity, error is cumulative and precision is poor.

A

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Number of Digits and Precision