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Number Systems.

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Presentation on theme: "Number Systems."— Presentation transcript:

1 Number Systems

2 Number Systems: Decimal Binary Hexadecimal Binary Coded Decimal (BCD)

3 The decimal system is a base 10 (modulo 10) number system:
10 digits: Counting beyond 9 requires additional place values as powers of 10: ______ ______ ______ ______ ______ (104) (103) (102) (101) (100)

4 (in digital terms, logic 0 or logic 1)
The Binary System: The Binary System is a base 2 (mod 2) number system: 2 digits: 0 or 1 (in digital terms, logic 0 or logic 1) Counting beyond 1 requires additional place values as powers of 2: ______ ______ ______ ______ ______ (24) (23) (22) (21) (20)

5 Example: Convert 3710 to binary.
METHOD I: Sum-of-weights: ____ ____ ____ ____ ____ ____ METHOD II: Repeated-division-by-base (here, base 2) 37/2 = 18 remainder of 1  This is your LSB 18/2 = 9 remainder of 0 9/2 = 4 remainder of 1 4/2 = 2 remainder of 0 2/2 = 1 remainder of 0 ½ = 0 remainder of 1  This is your MSB This process gives you the same result: 3710 is in binary. 1 1 1

6 Convert to decimal: Sum-of-weights uses total of each place value: 1x64 + 0x32 + 1x16 + 1x8 + 0x4 + 1x2 + 0x 1 =

7 The Hexadecimal System
The Hexadecimal system is a base 16 (mod 16) number system: “Hexa” = 6 “Decimal” = 10 16 digits: A b C d E F representing decimal 10 through decimal 15 (use of lower case helps differentiate between b and 8 or d and 0 in a digital display)

8 Convert 5810 to hexadecimal:
Sum-of-weights: ____ ____ ____ Check: 3x x1 = = 5810 = 3A16 ***Repeated division-by-base is most effective for larger conversions. 3 A

9 THE SHORTCUT FOR CONVERTING
Tips for Conversions: THE SHORTCUT FOR CONVERTING BINARY TO HEXADECIMAL HEXADECIMAL TO BINARY Since there is a relationship between 2 and 16 (24 = 16), there is a relationship between the place values in binary and the place values in hexadecimal – look for groups of 4 instead of 3. Example: Convert to hexadecimal: = b516

10 Tips for Conversions (Continued):
Convert 3F716 to binary: *Remember to represent each digit as a 4-bit binary word!* Drop initial 0’s to simplify. 3F716 =

11 Binary Coded Decimals (BCD)
Uses a 4-bit binary representation of each digit in decimal Example: 672 in BCD would be Example: is BCD for 9658 ***In BCD, there will not be values beyond 1001 (decimal 9)

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