Revision #46 → #1039 · back to history
addedBinary number8fbb99db4b70
addedBinary number as dyadic rationala7b554490898
addedBase-2 numeral system79185f791297
addedNumbers representable by bit sequencesabe82c91ce8a
addedEquivalent binary notations91d0b256f8f5
addedReading binary digit-by-digit28f2078331f2
addedDecimal counting symbolse2fa46482eb9
addedBinary counting procedure0f419549a466
addedBinary place value as powers of 24899adb07f71
addedConvert 100101 to decimal1eb3f962bacd
addedBinary addition of single digits6c1d0940fcea
addedCarrying in addition175b05c019d2
addedAdding 01101 and 10111e309b3a400d1
addedXOR addition rule493ca007eddf
addedLong carry method1e91453c7683
addedLong carry addition examplefef7dc174778
addedAddition table vs disjunction2bf4e87ab8f6
addedBinary subtraction of single digits4cee3c603812
addedBorrowing in subtractiond7bba0903be1
addedTwo's complement subtraction formula8ee2fa613131
addedBinary multiplication by partial productsd04e3620924c
addedPartial product outcomesf17130639478
addedMultiply 1011 by 10100f12626db626
addedMultiplication table vs conjunctionae503a90a90e
addedBinary long divisionf0616b9a8eac
addedDivide 11011 by 10164df5d945645
addedBinary square root algorithm342e37347482
addedTerminating binary fraction condition81590730af35
added1/10 has no finite binary formc67980ec4217
addedBinary expansion of 1/31b0613a4d222
addedBitwise operation2df3b6d7aa54
addedArithmetic shift left as multiplication2a034bb06cc7
addedDecimal to binary by division5485d230bb42
addedConvert 357 to binaryfeb301d6171f
addedBinary to decimal algorithmea3cc8d557b9
addedConvert 10010101101 to decimalf1dae58053b5
addedHorner scheme applicationa2a487d1ddf6
addedFractional conversion by doubling6325b044bf7d
addedRepeating fraction 0.3 in binarycc01451fd61b
added0.1 in binary29db688bbc1b
addedForm of terminating binary fractionsc6ce099653cc
addedDivide-and-conquer conversion9310fc49ece3
addedFour bits per hex digit5d499a3eb2cc
addedHexadecimal to binaryc48126386e2d
addedBinary to hexadecimalb206e890737e
addedHexadecimal to decimal96ee2492b6d4
addedThree bits per octal digit2545308d891b
addedOctal to binarye0d25530c33e
addedOctal to decimal817fdf8405a7
addedRepresenting non-integers with radix pointf78bdae8aaf3
addedBinary 11.01 equals 3.25a33386b11bd5
addedDyadic rationals terminate1a3ae4733cd1
addedOther rationals recurc342fc014841
addedNon-terminating non-recurring are irrationalcb25457a782f
addedPatterned irrational binary number8ec2855e37ab
addedBinary representation of sqrt 2b51d4a359280