Raised Cosine Filters

Enter corner frequency ``alpha'', in Hz. This is the frequency at which the response is 0.5 = -6 dB (unless you select ``square root'' below, in which case it's -3 dB). In a pulse-shaping application, ``alpha'' is half the baud rate.
Corner frequency:

Enter the value of ``beta'', in the range 0 to 1:

Enter the length of the finite-impulse response, in samples. A suggested starting value is

• 4 × (sample rate / corner frequency) + 1 .

The larger the value, the more accurate the filter, but the slower its execution.
Impulse length:

Do you want the filter to include x / sin x compensation for the step output of real-life DACs? You may select the raised-cosine response and the compensation individually. Tick (check) the ``Sqrt'' button for a square-root raised-cosine response.

• Raised-cosine response:	Yes	Sqrt	No
  Compensation function:	Yes		No

You may apply a Hamming window to the time-domain impulse response. This can improve the frequency-domain response by significantly reducing the amplitude of the sidelobes, but for short filters it can distort the shape of the response in the passband. Tick (check) here to apply windowing:

If you are going to execute the generated filter on a fixed-point processor, you will want to know how the filter behaves when the coefficents are truncated to n bits. To find out, enter the value of n in the box. (If you are not interested in this feature, leave the field blank. For more information, click here.)
Truncate coefficients to bits

By default, the frequency response graph has a linear magnitude scale. If that is what you want, leave the following box blank. If you want a logarithmic magnitude scale in dB, enter the lower limit of the magnitude scale in dB here (e.g. -80).
Lower limit (dB), or blank for linear scale:

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