CSE 220: Systems Fundamentals I
Homework #2
Spring 2017
Assignment Due: Febuary 24, 2017 by 11:59 pm
Assignment Overview
In this assignment you will be creating functions. The goal is to understand passing arguments, returning
values, and the role of register conventions. The theme of the assignment is floating point numbers and
will give you good practice manipulating register values.
You MUST implement all the functions in the assignment as defined. It is OK to implement additional
helper functions of your own in hw2.asm .
> YouMUST follow theMIPS calling and register conventions. If you do not, youWILL lose points.
> Do not submit a file with the functions/labels main or _start defined. You will obtain a ZERO for
the assignment if you do this.
If you are having difficulties implementing these functions,write out the pseudocodeor implement the
functions in a higher-level language first. Once you understand the algorithm andwhat steps to perform,
then translate the logic toMIPS.
When writing your program, try to comment as much as possible. Try to stay consistent with your
formatting. It is much easier for your TA and the professor to help you if we can figure out what your
code does quickly.
Getting started
Download hw2.zip fromPiazza in thehomework sectionof resources. Thisfile contains hw2.asm and
multiple hw2_main files, which you need for the assignment. At the top of your hw2.asm program in
comments put your name and SBU ID number.
# Homework #2
# name: MY_NAME
# sbuid: MY_SBU_ID
CSE 220 Spring 2017 Homework #2 Page 1
How to test your functions
To test your functions, simply open one of the provided hw2_main files in MARS. Next, assemble the
main file and run. Mars will take the contents of the file referenced with the .include at the end
of the file and add the contents of your hw2.asm file to the main file before assembling it. Once the
contents have been substituted into the file, Mars will then assemble it as normal.
Each of the main files tests the functions you are to implement with one of the sample test cases. You
shouldmodify these files or create your own files, to test your functions withmore test cases.
> Your assignment will not be graded using these tests!
Any modifications to the main files will not be graded. You will only submit your hw2.asm file via
Sparky. Make sure that all code require for implementing your functions ( .text and .data ) are in-
cluded in the hw2.asm file! Tomake sure that your code is self-contained, try assemblingyour hw2.asm
file by itself in MARS. If you get any errors (such as a missing label), this means that you need to refactor
(reorganize) your code, possibly bymoving labels you inadvertently defined in a main file to hw2.asm .
> It is highly advised to write your own main programs (new individual files) to test each of your func-
tions thoroughly.
> Make sure to initialize all of your valueswithin your functions! Never assume registers ormemorywill
hold any particular values!
Optional readings
If you are interested there are a few interesting readings about floating point arithmetic which contain
information that youmay not be aware of and can be used to assist youwith the assignment.
What every computer programmer should know about floating point
What Every Computer Scientist Should KnowAbout Floating-Point Arithmetic
Floating-point arithmetic may give inaccurate results in Excel
What Every JavaScript Developer Should KnowAbout Floating Point Numbers
Part I: Helper Functions
In this part of the assignment you will implement basic leaf functions (a function which does not call any
other functions). hw2_main1.asm contains a basic test for each of these functions.
All functions implemented in the assignment must be placed in hw2.asm and follow the standardMIPS
register conventions for functions taught in lecture.
CSE 220 Spring 2017 Homework #2 Page 2
http://blog.reverberate.org/2014/09/what-every-computer-programmer-should.html?m=1
http://docs.oracle.com/cd/E19957-01/806-3568/ncg_goldberg.html
http://support.microsoft.com/kb/78113
http://blog.chewxy.com/2014/02/24/what-every-javascript-developer-should-know-about-floating-point-numbers/
a. int char2digit(char c)
This function converts the ASCII character 0-9 to its integer value, 0-9. Any other ASCII character
results in an error.
c : the ASCII character
returns: the integer value of the character or -1 for error
Examples:
Code Return Value
char2digit(9) 9
char2digit(3) 3
char2digit(@) -1
char2digit(c) -1
b. int memchar2digit(char *c)
This function converts the ASCII character stored at the memory address given by c from 0-9 to
its integer value, 0-9. Any other ASCII character results in an error.
The * is C notation for an address of a value stored inmemory.
*c : the address of an ASCII character in memory
returns: the integer value of the character or -1 for error
Examples:
Note, the prefix 0x indicates the following digits are shown in hexadecimal representation.
Code Memory Address = Stored Value Return Value
memchar2digit(0x40000000) Mem[0x40000000] = 0x39 9
memchar2digit(0x44404440) Mem[0x44404440] = 0x33 3
memchar2digit(0x4FFFFFFF) Mem[0x4FFFFFFF] = 0x4B -1
memchar2digit(0x30303030) Mem[0x30303030] = 0x20 -1
c. (int, int) fromExcessk(int value, int k)
This function converts an excess-k value to its corresponding value in base-10.
value : an excess-k value. If value is 0, an error occurs.
k : a integer value representing excess-k. If k 0, an error occurs.
returns: (i) 0 for success, -1 for error, and (ii) the converted base 10 value upon success, the
original value upon error. Note that the function returns two values: $v0 holds the first
return value and $v1 holds the second return value.
CSE 220 Spring 2017 Homework #2 Page 3
> Assume all input and resultant values are correctly representable in 32-bits.
Examples:
Code Return Value
fromExcessk(23, 127) 0, -104
fromExcessk(-23, 127) -1, -23
fromExcessk(10, 35) 0, -25
fromExcessk(1000,-10) -1, 1000
fromExcessk(2,0) -1, 2
d. int printNbitBinary(int value, int m)
This function prints out the m least-significant bits of the binary representation of value and re-
turns success. If m is in the range [1, 32] the function prints out the m least-significant bits of the
binary representation of the value and returns success (0). Otherwise, the function prints nothing
and returns error (-1).
value : the value to print the binary digits of
m : the number of bits to print of value .
returns: 0 if the print was successful, -1 for error.
> Remember, value is stored in 2s complement binary format in the register.
> value is any 32-bit value in the register.
Basic Algorithm:
shift value left (32-m) bits
while (m > 0)
if (value < 0) print 1, else print 0shift value left 1 bitm = m-1Examples:Code Return Value PrintsprintNbitBinary(-23, 30) 0 111111111111111111111111101001printNbitBinary(10, 3) 0 010printNbitBinary(10, 9) 0 000001010printNbitBinary(1000,-2) -1printNbitBinary(2,100) -1CSE 220 Spring 2017 Homework #2 Page 4Part II: Floating pointIn this section, you will be writing functions to work with strings and floating point values and for-mats. Youwill implement the functions to complete hw2_main2.asm . These functionswill call thefunctions you implemented in Part I.All functions implemented in the assignment must be placed in hw2.asm and follow the standardMIPS register conventions for functions taught in lecture.< Under no circumstances are you to use the floating point registers or floating point MIPSinstructions.e. (int, float) btof(char[] input) The [] is C notation for the starting address of an array of the specified data type storedinmemory.btof will convert a string of binary digits or a string of characters representing a special valueinto its IEEE 754 single precision floating point binary representation. The function will return twovalues, an int and a float. The int is a flag for success or error. The float” is the IEEE-754 singlefloating point representation of the input value stored in the returned register. input : a string of binary digits or special value string representing an IEEE-754 number. Canbe of any length. The IEEE representation should be truncated to fit in IEEE-754 single preci-sion format. returns: (i) 0 conversionwas successful, -1 for error and (ii) the IEEE-754 formatted value of thestring, or unspecified value if an error occurred. Your implementationmay return any value youwant for the unspecified value.This functionmust parse the string until it reaches the end ( ) or an invalid character. Valid binarydigit characters are 0 , 1 , . , + , – , and the ASCII characters in NaN and Inf . If any non-validcharacter/substring is reached, an error occurs.TheSPECIALfloat valueswhichmustbehandledare +0.0 , -0.0 , NaN , +Inf , and -Inf . Thesestrings are CASE-SENSITIVE.< Your functionMUSTCALL char2digit or memchar2digit .< All input argument strings, which are not SPECIAL float values, will always contain asingle radix point (.) and have at least 1 binary digit on either side of the radix point.Examples:Note, the prefix 0b indicates the following digits are the binary representation for the floatingpoint representation. This notation is similar to the hexadecimal representation 0x .CSE 220 Spring 2017 Homework #2 Page 5Code Return Valuesbtof(“010.001”) 0, 0b01000000000010000000000000000000btof(“+010.001”) 0, 0b01000000000010000000000000000000btof(“-010.001”) 0, 0b11000000000010000000000000000000btof(“-0.0001”) 0, 0b10111101100000000000000000000000btof(“11110.001110001110001110001”) 0, 0b01000001111100011100011100011100btof(“-11110.001110001110001110001”) 0, 0b11000001111100011100011100011100btof(“+0.0”) 0, 0b00000000000000000000000000000000btof(“-0.0”) 0, 0b10000000000000000000000000000000btof(“NaN”) 0, 0b01111111111111111111111111111111btof(“+Inf”) 0, 0b01111111100000000000000000000000btof(“-Inf”) 0, 0b11111111100000000000000000000000btof(“213.2”) -1, ?btof(“iNF”) -1, ?btof(“nan-12.3”) -1, ?btof(“-11.1A”) -1, ?btof(“@.2”) -1, ? ? denotes an unspecified return value. Your implementation may return any value youwant.f. int print_parts(float value)This function takes the binary representation of a single precision IEEE-754 float value as a param-eter and returns a 1 if the value is positive, 0 if the value is a special value ( +0 , -0 , NaN , +Inf ,and -Inf ), and -1 if the value is negative. This function will print out the sign of the number, thebinary and decimal value of the exponent, and the binary and decimal value of themantissa.< Your functionMUSTCALL printNbitBinary .< Your functionMUST print the EXACT format shown in the examples. All spaces are singlespaces.< DONOT use system call 35 to print the binary. It always prints out 32 bits. value : the binary representation of a floating point value. returns: 1 if the value is positive, 0 if the value is a special value, and -1 if the value is negativeExamples – Note the argument is shown as a hexadecimal value to save space:CSE 220 Spring 2017 Homework #2 Page 6Code Return Value Printsprint_parts(0x40080000) 1 0 +Value: 2.125 10000000 12800010000000000000000000 524288print_parts(0xC1F1C71C) -1 1 -Value: -30.222222 10000011 13111100011100011100011100 7456540print_parts(0x7F800000) 0 0 +Value: +Inf 11111111 25500000000000000000000000 0 Use the IEEE 754 Converter to assist with checking your values.g. int print_binary_product(float value)This function takes the binary representation of a single precision IEEE-754float value as a parame-ter prints the value in a binary product format (which is similar to scientific notation):1.mantissa 2+/exponent if it is a non-special value. The function will return 1 if the value is printable in binaryproduct form or 0 if the value is a special value. value : the binary representation of a floating point value. returns: 1 if the value is printable in binary product form or 0 if the value is a special value< Your functionMUSTCALL printNbitBinary and fromExcessk .< Your functionMUST print the EXACT format shown in the examples. All spaces are singlespaces.Examples – Note the argument is shown as a hexadecimal value to save space:Code Rtn Val Printsprint_binary_product(0x40080000) 1 +1.00010000000000000000000 x 2^+1print_binary_product(0xC1F1C71C) 1 -1.11100011100011100011100 x 2^+4print_binary_product(0xBDDC0000) 1 -1.10111000000000000000000 x 2^-4print_binary_product(0x3DDC0000) 1 +1.10111000000000000000000 x 2^-4print_binary_product(0x7F800000) 0Hand-in InstructionsSee Sparky Submission Instructions on piazza for hand-in instructions.< There is no tolerance for homework submission via email. Work must be submitted through Sparky.Please do not wait until the last minute to submit your homework. If you are struggling, stop by officehours for additional help.CSE 220 Spring 2017 Homework #2 Page 7http://www.binaryconvert.com/result_float.html
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