Josh,<br><br>If the same 100 MHz clock is used to drive the ADC, DAC and FPGA DSP cores, then the sample rate of both the ADC and the DAC will be 100 MS/s. In other words, the DAC will not run at 400 MS/s as shown in the figure (see below)--<b>please comment</b>.<br>
<br><br><img src="data:image/png;base64,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" alt=""><br>
<br>The block diagram shows that dual ADCs and DACs are used. Presumably, depending on the RF board, one ADC/DAC is assigned to I-data and the other to Q-data--<b>please comment</b>.<br><br>In my application, I am using the MATLAB UHD support. You referenced the following part of the UHD code manual:<br>
<br><table class="memname"><tbody><tr><td class="memname">virtual void <a class="el" href="http://files.ettus.com/uhd_docs/doxygen/html/classuhd_1_1usrp_1_1multi__usrp.html#a587cfb5be38a16fec532793b34fbf947">uhd::usrp::multi_usrp::set_rx_rate</a> </td>

          <td>(</td>
          <td class="paramtype">double </td>
          <td class="paramname"><em>rate</em>, </td>
        </tr>
        <tr>
          <td class="paramkey"><br></td>
          <td><br></td>
          <td class="paramtype">size_t </td>
          <td class="paramname"><em>chan</em> = <code><a class="el" href="http://files.ettus.com/uhd_docs/doxygen/html/classuhd_1_1usrp_1_1multi__usrp.html#afeaca319029cb49f7041461345ab641c">ALL_CHANS</a></code> </td>
        </tr>
        <tr>
          <td><br></td>
          <td>)</td>
          <td><br></td><td><code> [pure virtual]</code></td>
        </tr>
      </tbody></table>


<p>Set the RX sample rate. </p>
<dl class="params"><dt><b>Parameters:</b></dt><dd>
  <table class="params">
    <tbody><tr><td class="paramname">rate</td><td>the rate in Sps </td></tr>
    <tr><td class="paramname">chan</td><td>the channel index 0 to N-1 </td></tr></tbody></table></dd></dl>This confuses me even more as my understanding thus far is that the ADC sample rate and DAC sample rates are fixed (at 100 MS/s) and that the "only" control one has over the effective sampling rate is to adjust the decimation and interpolation factors (in MATLAB these are definitely the only parameters that can be adjusted).<br>
<br>Could someone please provide further clarity?<br><br><div class="gmail_quote">On Wed, Sep 19, 2012 at 6:58 PM, Josh Blum <span dir="ltr"><<a href="mailto:josh@ettus.com" target="_blank">josh@ettus.com</a>></span> wrote:<br>
<blockquote class="gmail_quote" style="margin:0 0 0 .8ex;border-left:1px #ccc solid;padding-left:1ex"><div class="im"><br>
<br>
On 09/19/2012 09:06 AM, Rancid Fisch wrote:<br>
> Greetings USRP experts of the world,<br>
><br>
> The block diagram (<br>
> <a href="https://www.ettus.com/content/files/06983_Ettus_N200-210_DS_Flyer_HR_1.pdf" target="_blank">https://www.ettus.com/content/files/06983_Ettus_N200-210_DS_Flyer_HR_1.pdf</a>),<br>
> shows that the sample rate of the ADC is 100 MS/s, that the sample rate of<br>
> the DAC is 400 MS/s, and that both ADC and DAC are fed with the same clock<br>
> (ADC/DAC Clock).<br>
><br>
> Firstly, please confirm the following:<br>
><br>
</div>>    - the sample rate of the ADC is *fixed *at 100 MS/s<br>
>    - the sample rate of the DAC is *fixed *at 400 MS/s<br>
>    - both ADC and DAC are fed with the *same *clock (ADC/DAC Clock)<br>
><br>
<br>
The same 100 MHz clock drives ADC, DAC, and all FPGA DSP cores.<br>
<div class="im"><br>
> Secondly, using the above (or their corrected versions) as working<br>
> assumptions, how does one set the decimation of the Digital Down-Converter<br>
> (DDC) and the interpolation of the Digital Up-Converter (DUC) so that<br>
> different sampling rates can be used?<br>
><br>
<br>
</div>It depends on what application you are using. There is a UHD API call to<br>
set rx/tx sample rate in Sps:<br>
<a href="http://files.ettus.com/uhd_docs/doxygen/html/classuhd_1_1usrp_1_1multi__usrp.html#a587cfb5be38a16fec532793b34fbf947" target="_blank">http://files.ettus.com/uhd_docs/doxygen/html/classuhd_1_1usrp_1_1multi__usrp.html#a587cfb5be38a16fec532793b34fbf947</a><br>

<br>
The gnuradio, mathworks, or labview wrappers will all have a similar<br>
parameter to set.<br>
<div class="im"><br>
> Thirdly, as you can gather, I am struggling to come to grasps with the<br>
> basic method of operation. Therefore, if anyone could post some sort of<br>
> introductory text that explains, perhaps with the use of a diagram or two,<br>
> how the sampling, clocking and sampling conversion works within the USRP,<br>
</div>> then I would be very happy [?].<br>
><br>
<br>
You may find this helpful:<br>
<a href="http://www.ettus.com/content/files/kb/application_note_frontends_subdevices_antenna_ports.pdf" target="_blank">http://www.ettus.com/content/files/kb/application_note_frontends_subdevices_antenna_ports.pdf</a><br>

<br>
<a href="http://www.ettus.com/kb" target="_blank">http://www.ettus.com/kb</a><br>
<br>
<a href="http://code.ettus.com/redmine/ettus/projects/uhd/wiki" target="_blank">http://code.ettus.com/redmine/ettus/projects/uhd/wiki</a><br>
<br>
-josh<br>
<br>
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</blockquote></div><br><br clear="all"><br>-- <br><div>__________</div><div>Rancid Fisch<br></div><div><br></div><div><a href="mailto:rancid.fisch@gmail.com" target="_blank">mailto:rancid.fisch@gmail.com</a></div><br>