Consider the following floating point format: 1 sign bit, 4 mantissa bits, and 3 exponent bits...
6-bit floating-point encoding: 1 sign bit, 3 exponent bits, 2 frac bits( mantissa/significand) what is the exact 6-bit floating-point encoding for the following numbers: 17 0.5 -6 7.5 Please show the steps
I would like a step by step explanation as to how the 7-bit floating point representations from Format A were converted to Format B. Thanks. Consider the following two 7-bit floating point representations based on the IEEE floating point format. Neither has a sign bit - they can only represent non-negative numbers. i). Format A. There are k=3 exponent bits. The exponent bias is 3. There are n=4 fraction bits. ii). Format B. There are k=4 exponent bits. The exponent...
I would like a step by step explanation as to how the 7-bit floating point representations from Format A were converted to Format B. Thanks. Consider the following two 7-bit floating point representations based on the IEEE floating point format. Neither has a sign bit - they can only represent non-negative numbers. i). Format A. There are k=3 exponent bits. The exponent bias is 3. There are n=4 fraction bits. ii). Format B. There are k=4 exponent bits. The exponent...
Please show work, thanks.
Consider the following two 16-bit floating-point representations 1. Format A. There is one sign bit There are k 6 exponent bits. The exponent bias is 31 (011111) There are n 9 fraction/mantissa bits 2. Format B There is one sign bit There are k 5 exponent bits. The exponent bias is 15 (01111) There are n 10 fraction/mantissa bits Problem 1 (81 points total /3 points per blank) Below, you are given some bit patterns in...
Consider a 9-bit floating-point representation based on the IEEE floating-point format, with one sign bit, four exponent bits (k = 4), and four fraction bits (n = 4). The exponent bias is 24-1-1-7. The table that follows enumerates some of the values for this 9-bit floating-point representation. Fill in the blank table entries using the following directions: e : The value represented by considering the exponent field to be an unsigned integer (as a decimal value) E: The value of...
If we use the IEEE standard floating-point single-precision representation (1 sign bit, 8 bit exponent bits using excess-127 representation, 23 significand bits with implied bit), then which of the following hexadecimal number is equal to the decimal value 3.875? C0780000 40007800 Oo 40780000 40A80010 The binary string 01001001110000 is a floating-point number expressed using a simplified 14-bit floating-point representation format (1 sign bit, 5 exponent bits using excess-15 representation, and 8 significand bits with no implied bit). What is its...
A certain microcomputer uses a binary floating-point format with 4 bits for the exponent contains 4 bits. The arithmetic e and 1 bit for the sign sigma. The normalized mantissa uses rounding. (a) Find the machine epsilon, i.e., the distance between 1 and the next larger floating- point number. (b) Let x = (7.125)_10. Find its floating-point approximation A(x). Give A(x) in decimal. (c) What is the relative error in A(x)
2. Represent 25.28255 in 32 bit IEEE-754 floating point format as shown in the following format discussed in class. Sign Bit BIT 31 Exponent BITS 30:23 Mantissa BITS 22:0 BYTE 3+1 bit 7 Bits BYTE 1 BYTE O
Assume a 10-bit floating point representation format where the Exponent Field has 4 bits and the Fraction Field has 6 bits and the sign bit field uses 1 bit S Exponent Field: 4 bits Fraction Fleld: 5 bits a) What is the representation of -8.80158 × 10-2 in this Format - assume bias =2M-1-1=24-1-1=7 (where N= number of exponent field bits) for normalized representation 1 -bias =-6 : for denormalized representationb) What is the range of representation for...
What are the sign, mantissa, and exponent, of the single precision 32-Bits (IEEE754) floating point binary representation of 3.3? Show all steps needed to get the answer. Is the single precision floating point representation of 3.3 precise? Explain.