QUESTION 1
Convert 1 0110 1010 from binary to decimal, assuming nine-bit two's complement binary representation.
Provide only the number. For a negative number provide the negative sign.
Example 79 NOT +79 or 78 Decimal
Example -79 NOT negative 79 or -79 Decimal
QUESTION 2
Count the next 10 numbers in base 5 starting after 3434. (Don't include 3434)
Provide you answer with only numbers and spaces. No extra spaces or words
Example 410 411 412 NOT 410, 411, 412
Question 1)
1 0110 1010
--> It starts with 1. So, decimal number is negative. Now take 2's compliment.
1 0110 1010
0 1001 0101 --> 1's compliment
0 1001 0110 --> 2's compliment
Which converts to 150 in decimal
--> So, the number is -150
Question 2)
--> given number is 3434 in base5. Next 10 numbers are:
3440 3441 3442 3443 3444 4000 4001 4002 4003 4004
QUESTION 1 Convert 1 0110 1010 from binary to decimal, assuming nine-bit two's complement binary representation....
Convert the following numbers from binary to decimal, assuming nine-bit two’s complement binary representation: 1 0110 1010
(5 points) Convert the following decimal numbers to 8-bit two's complement binary numbers and carry out the additions in binary. Indicate whether the sum overflows the 8-bit result. If not show the result as a decimal number. a) 39 + (-78) b) -43 + (-92)
1. What is the largest decimal number we can represent with a 16 bit two's complement number? 2. Convert the following signed binary numbers to decimals. 11001 010011 1110100 1100111 3. Convert the following decimal numbers to 6-bit two's complement binary numbers and add them. Note if there is an overflow. 7 + 13 Two's complement/binary number for 7: Two's complement/binary number for 13: Sum: Overflow? 4. Convert the following decimal numbers to 6-bit two's complement binary numbers...
2. Convert the following two's complement binary numbers to decimal numbers. These numbers are integers. a. 110101 b. 01101010 c. 10110101 3. Convert the following decimal numbers to 6-bit two's complement binary numbers and add them. Write the results in 6-bit two's complement binary number format and decimal number format. Indicate whether or not the sum overflows a 6-bit result. a. 14 + 12 b. 30 + 2 C. -7 + 20 d. -18-17 4. What is the signed/magnitude and two's complement range of...
Convert the following decimal numbers to 6-bit two's complement binary number and add them. Keep result in binary form. Enter yes/no for any overflows (overflows only, not carried bits). 16 + 9 .............. Overflow?................... 27 + 31 .............. Overflow?....................... (-4) + 19 .............. Overflow? ........................ 3 + (-32) ............ Overflow? ........................ (-16) + (-9) ............... Overflow? .............................. (-27) + (-31) ................ Overflow? ...........................................
Do the following number conversions assuming two's complement representation is used for binary numbers. Douto check your answers becauses mentioned in class.portul credt will not be please digit is wrong in your answer. Do not put any space between ages/bits in your answers a. (113710 - 02 (8-bit binary number) b. (-97)10 - 12 (8-bit binary number) C. (0101 11002 D10 (decimal number) d. (1010 00112 010 (decimal number e. (3C7B)16 12 (16-bit binary number) f. (0100 1011 1000 1110)2-(...
1.Convert the following decimal and binary numbers into signed integer 32-bit representation (2’s complement for negative numbers). -99
(b) Convert -41 (written in decimal representation) into its signed integer 8-bit representation using the two's complement method. That is find the two's complement of -41, when the number of overall bits used are 8.
Convert the decimal numbers A and B to 5-bit binary numbers. Using two’s complement representation, show (i) how to subtract the two 5-bit binary numbers (A−B); (ii) how to translate the binary result back to decimal
5. Express (76) 10 and (-114)10 in 8-bit binary two's complement arithmetic and then add the numbers. What would be the representation (0)10 in 16-bit binary two's complement? (be sure to show your work). 6. Create two 16-bit 2's complement integer such that their sum causes an overflow. Why does the sum of a negative 2's complement number and a positive 2's complement number never generate an overflow? Discuss.