2. Represent the following decimal integers in (unsigned) binary, octal, and hexadecimal forms. Do each conversion directly from the decimal form to the other form. You must show all the steps in converting from the decimal form to each other form.
a. 77 b. 64 c. 140
3. Represent the following numbers in (unsigned) binary form and in decimal form. Show the conversion steps.
a. (AD)16
b. (77)16
c. (17)16
d. (17)8
e. (64)8
f. (140)8
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2. Represent the following decimal integers in (unsigned) binary, octal, and hexadecimal forms. Do each conversion...
- ZOOM + To TITUITU.UUT 6 Convert each of the following octal numbers to binary, hexadecimal and decimal using the most appropriate conversion method. (a) 371 7. Convert each of the following decimal numbers to binary, octal and decimal using the most appropriate conversion method. (a) 3D65E 8. Show how a 16-bit computer using a two's complement number system would perform the following computations. (a) (2925)10 -(16850).0 = (?). (b) (16850)10-(2925)10 = (?)10
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Convert each of the following decimal numbers to binary, octal and hexadecimal numbers: (a) 65 (b) 893.
Exercise 1.25 Convert the following decimal numbers to unsigned binary numbers Exercise 1.31 Repeat Exercise 1.29, but convert to 8-bit sign/magnitude numbers KExercise 1.32 Repeat Exercise 1.30, but convert to 8-bit sign/magnitude numbers (a) 4210 (b) 6310 Exercise 1.33 Convert the following 4-bit two's complement numbers to 8-bit two's complement numbers. (c) 22910 (d) 84510 (a) 0101 b) 1010 XExercise 1.26 Convert the following decimal numbers to unsigned binary numbers. Exercise 1.34 Convert the following 4-bit two's complement numbers to...
Convert each of the following hexadecimal numbers to 1) binary 2) decimal 3) Octal numbers? a. 4C b. E8c. 6D2d. 31B
Convert each of the following decimal numbers to binary, octal, and hexadecimal numbers. e) 174.25 f) 250.8
(1) Convert this Hexadecimal to Binary, Octal and Decimal : ABCDEF (2) how the representation of each of these numbers in both two’s complement and sign magnitude formats. Use the following assumptions: ● Assume that the sign magnitude number should be represented in the fewest number of bits possible. ● Assume that the sign bit for negative sign magnitude numbers should be a 1. ● Assume that the two’s complement numbers should be 8 bit numbers. 1. 108 2. -65
2. DECIMALTOOCTAL,HEXADECIMAL,ANDBINARY(QUICKLY) The decimal value you will be converting from will be your SID divided by 10000. If, for example, your SID is 123456789, then you will be converting from 12345.6789. Use the method described in the Chapter 1 lecture slide #19, #21, and #24 for conversion to octal and hexadecimal. Use the “quick method” (slide #25) to convert the final result from either to binary. Show your work. Octal: Hexadecimal: Binary:
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1. BINARYTODECIMAL,OCTAL(QUICK),ANDHEXADECIMAL(QUICK) The binary value you will be converting from will be derived from your Student ID (SID). Take each decimal digit of your SID and assign a “1” above it in the corresponding column on the “Binary Value” row below. If a “1” is already present from a past duplicate digit, keep it as a “1”. Place 0’s in any of the remaining empty columns of the “Binary Value”. You should now have a 10 digit unique binary value...