solve in assembley language, MIPS Square Root Calculation: Newton’s iterative method can be used to approximate the square root of a number x. Let the initial guess be 1. Then each new guess can be computed as follows: guess = ((x/guess) + guess) / 2; Write a function called square_root that receives a double-precision parameter x, computes, and returns the approximated value of the square root of x. Write a loop that repeats 20 times and computes 20 guess values, then returns the final guess after 20 iterations. Use the MIPS floating-point register convention (Section 9.6) to pass the parameter x and to return the function result. All computation should be done using double-precision floating-point instructions and registers. Compare the result of the sqrt.d instruction against the result of your square_root function. What is the error in absolute value?
solve in assembley language, MIPS
Square Root Calculation: Newton’s iterative method can be used to approximate the square root
of a number x. Let the initial guess be 1. Then each new guess can be computed as follows:
guess = ((x/guess) + guess) / 2;
Write a function called square_root that receives a double-precision parameter x, computes,
and returns the approximated value of the square root of x. Write a loop that repeats 20 times
and computes 20 guess values, then returns the final guess after 20 iterations. Use the MIPS
floating-point register convention (Section 9.6) to pass the parameter x and to return the
function result. All computation should be done using double-precision floating-point
instructions and registers. Compare the result of the sqrt.d instruction against the result of
your square_root function. What is the error in absolute value?
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