Open-loop gain

The open-loop gain of an operational amplifier is the gain obtained when no feedback is used in the circuit. Open loop gain is usually exceedingly high; in fact, an ideal operational amplifier has infinite open-loop gain. Typically an op-amp may have a maximal open-loop gain of around . Normally, feedback is applied around the op-amp so that the gain of the overall circuit is defined and kept to a figure which is more usable. The very high open-loop gain of the op-amp allows a wide range of feedback levels to be applied to achieve the desired performance.

The open-loop gain of an operational amplifier falls very rapidly with increasing frequency. Along with slew rate, this is one of the reasons why operational amplifiers have limited bandwidth.

The definition of open-loop gain (at a fixed frequency) is

where is the input voltage difference that is being amplified. The dependence on frequency is not displayed here.

Role in non-ideal gain

The open-loop gain is a physical attribute of an operational amplifier that is often finite in comparison to the usual gain, denoted . While open-loop gain is the gain when there is no feedback in a circuit, an operational amplifier will often be configured to use a feedback configuration such that its gain will be controlled by the feedback circuit components.

Take the case of an inverting operational amplifier configuration. If the resistor between the single output node and the inverting input node is and the resistor between a source voltage and the inverting input node is , then the ideal gain for such a circuit at the output terminal is defined, ideally, to be:

However, with the use of open-loop gain, the equation becomes:

Notice that the equation becomes effectively the same for the ideal case as approaches infinity.

In this manner, the open-loop gain is important for computing the actual gain for a given non-ideal operational amplifier network in situations where the ideal model of an operational amplifier begins to become inaccurate.

See also


This article is issued from Wikipedia - version of the 10/25/2016. The text is available under the Creative Commons Attribution/Share Alike but additional terms may apply for the media files.