How can I convert the number 123.45678 * 10^22 to the IEEE 745 singleprecision floating point representation? Can you show me the steps?
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Basically you want binary scientific notation. That is, you want your number to be of the form 2^{α}, and you need to split α into its integral and its fractional part, α = k + β, with β < 1 and k ∈ ℤ. To find α, take logarithms: α = log_{2}123.45678 − 22 log_{2}10. The integral part of the exponent, k, is stored in the exponent field of the IEEE float (after adjusting by the bias), and the fractional part 2^{β} is stored in the mantissa (omitting the leading 1). 

