Slide 10.14: Floating-point multiplication

Floating-Point Multiplication

1.010₂×2^-1 × –1.110₂×2^-2 = –1.001₂×2^-2

The following steps show how to multiply the above numbers in scientific notation. Again, we assume 4 bits of precision (or 3 bits of fraction).

Step 1. Calculating the Exponent of the Product

   Product exponent (manual) = (–1) + (–2) = –3

   Product exponent (hardware)
 = E_Z = E_X + E_Y – Bias
 = (–1+127) + (–2+127) – 127
 = 124 (value = –3 = 124–127)

Step 2. Multiplying the Significands

Since sign S_X≠S_Y, sign of product S_Z=1 (negative). The result of multiplication is as follows:

 1.010₂×2^-1 × –1.110₂×2^-2 = –10.001100₂×2^-3

Step 3. Normalizing the Product

 –10.001100₂×2^-3 = –1.0001100₂×2^-2

Shifting right by 1 bit has to be followed by incrementing the exponent.

      1.010
  ×   1.110
 ————————————
       0000
      1010
     1010
  + 1010
 ———————————— 
   10001100 or

  10.001100

Step 4. Rounding the Significand: We assumed 4 bits of precision or 3 bits of fraction. Round the significand to nearest digit: –1.0001100₂×2^-2 ≈ –1.001₂×2^-2
Step 5. Checking for Overflow or Underflow: Check whether exponent becomes too large (overflow) or too small (underflow).