# Difference between revisions of "Scientific notation"

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'''Scientific notation''' or [[^|exponential]] notation is used to express very large or small numerical values by [[SINGLE]] or [[ | '''Scientific notation''' or [[^|exponential]] notation is used to express very large or small numerical values by [[SINGLE]], [[DOUBLE]], or [[_FLOAT]] accuracy. | ||

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* [[^|^ Exponential operator]] | * [[^|^ Exponential operator]] | ||

* [[SINGLE]], [[DOUBLE]] | * [[SINGLE]], [[DOUBLE]], [[_FLOAT]] | ||

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## Latest revision as of 00:07, 4 October 2021

**Scientific notation** or exponential notation is used to express very large or small numerical values by SINGLE, DOUBLE, or _FLOAT accuracy.

*Usage:* -9.7587E+04 or 4.6545D-9

**E**denotes SINGLE precision accuracy,**D**denotes DOUBLE precision accuracy, and**F**denotes _FLOAT precision accuracy. D, E, and F are part of the number.- To translate the notation, multiply the number preceding the letter by the value of 10 raised to the power following the letter.
- PRINT USING can display the normal numerical values. You will have to use less digits than the real value.
- INPUT WILL accept the letter E with SINGLE or DOUBLE variables while D can only be used with DOUBLE variables.

*Sample 1:* +2.184D+3 means to multiply 2.184 by 1,000 (1,000 is 10 raised to the third power, or 10 ^ 3 ).

- To multiply by 10 raised to a positive power, just move the decimal point to the right by 3.
- The result is 2184 in DOUBLE accuracy.

*Sample 2:* -5.412D-2 is negative 5.412 times .01 (10 raised to the -2 power or 10 ^ -2 ).

- To multiply a number by 10 raised to a negative power, just move the decimal point to the left by 2.
- The result is -.05412 in DOUBLE accuracy.

*Sample 3:* 3.07E+12 is a positive 3.07 times 1,000,000,000,000 (10 raised to the 12 power or 10 ^ 12).

- To multiply a number by 10 raised to a positive power, just move the decimal point to the right by 12.
- The result is 3,070,000,000,000 in SINGLE accuracy.

*Example:* A string function that displays extremely small or large exponential decimal values.

* *
num# = -2.34D-15
PRINT num#
PRINT StrNum$(num#)
END
FUNCTION StrNum$ (n#)
value$ = UCASE$(LTRIM$(STR$(n#)))
Xpos% = INSTR(value$, "D") + INSTR(value$, "E") 'only D or E can be present
IF Xpos% THEN
expo% = VAL(MID$(value$, Xpos% + 1))
IF VAL(value$) < 0 THEN
sign$ = "-": valu$ = MID$(value$, 2, Xpos% - 2)
ELSE valu$ = MID$(value$, 1, Xpos% - 1)
END IF
dot% = INSTR(valu$, "."): L% = LEN(valu$)
IF expo% > 0 THEN add$ = STRING$(expo% - (L% - dot%), "0")
IF expo% < 0 THEN min$ = STRING$(ABS(expo%) - (dot% - 1), "0"): DP$ = "."
FOR n = 1 TO L%
IF MID$(valu$, n, 1) <> "." THEN num$ = num$ + MID$(valu$, n, 1)
NEXT
ELSE StrNum$ = value$: EXIT FUNCTION
END IF
StrNum$ = sign$ + DP$ + min$ + num$ + add$
END FUNCTION * *

-2.34D-15 -.00000000000000234

*See also:*

*Navigation:*