An *operating point* of a system is a dynamic
configuration that satisfies design and use requirements called *operating
specifications*. You can express such operating specifications
as requirements on the system state ** x** and
inputs

Operating points are essential for designing and implementing system controllers. You can optimize a system at an operating point for performance, stability, safety, and reliability.

The most important and common type of operating point is a *steady
state*, where some or all of the system dynamic variables
are constant.

An important motive for finding operating points is *linearization*,
which determines the system response to small disturbances at an operating
point. Linearization results influence the design of feedback controllers
to govern dynamic behavior near the operating point. A full linearization
analysis requires one or more system outputs, ** y**,
in addition to inputs.

A pilot flying an aircraft wants to find, for a given environment, a state of the aircraft engine and control surfaces that produces level, constant-velocity, and constant-altitude flight relative to the ground. The requirements of "level," "constant velocity," "constant altitude," and "relative to the ground" constitute operating specifications. This operating point is a steady state of the aircraft velocity, altitude, and orientation in space.

You have a number of ways to find an operating point in a Simscape™ model.
You can impose operating specifications and isolate operating points
using Simscape and Simulink^{®} features.

To find a steady state, the Simscape steady-state solver is the most direct method. For a comprehensive suite of operating point and linearization tools, MathWorks recommends Simulink Control Design™ software.

To analyze operating points, you work with the full state vector of your model, which contains:

Simulink components, which can be continuous or discrete.

Simscape components, which are continuous.

Whichever method that you choose to find an operating point,
if you want to use it for linearization, you must save the operating
point information in the form of an operating point object, a simulation
time *t*_{0}, or a state vector *x*_{0} and input vector *u*_{0}.

One way to identify operating points is to simulate your model
and inspect its state ** x** and output

In your Simscape model, set up sensor outputs for whatever block outputs you want to observe.

Connect Scope blocks, To Workspace blocks, or both, to your Simscape block outputs to observe and record simulation behavior.

In the

**Data Import/Export**pane of your model Configuration Parameters settings, select the**Time**,**States**, and**Output**check boxes to record this simulation information in your workspace.

Simscape software provides two workflows to initialize a physical model. The first solves for steady state, where all differential variables have zero derivative. Using this approach you can search for multiple steady states with the steady-state solver by varying the model inputs, parameters, and initial conditions. The second approach is to directly specify initial conditions by specifying initialization priority and targets for block variables. For more information on this approach, see Variable Initialization.

To use the first approach, enable the steady-state solver:

In each, some, or all of the physical networks in your Simscape model, open the Solver Configuration block.

In each block dialog box, select the

**Start simulation from steady state**check box.In the model Configuration Parameters settings, on the

**Data Import/Export**pane, select the**States**check box to record the time series ofvalues in your workspace.*x*If you also have input signals

in the model, you can capture those inputs by connecting To Workspace blocks to the input Simulink signal lines.*u*Close these dialog boxes and start simulation.

The first vector of values ** x**(

Finding an initial steady state is part of the nondefault Simscape simulation sequence. See Initial Conditions Computation.

You can simplify the initial steady-state computation by setting
the simulation time to `0`

. The simulation then solves
for one time step only (time zero) and returns a single state vector ** x**(

You can use Simulink Control Design software to find operating points for models with Simscape components. Simulink Control Design provides both command-line and graphical interfaces for finding and analyzing operating points.

For more information, see Find Steady-State Operating Points for Simscape Models (Simulink Control Design).

You can impose an operating specification on part of a Simscape model by inserting source blocks from the Simscape Foundation Library. These impose specified values of system variables in parts of the model. You can simulate and save the state vector.

However, you cannot obtain an operating point for the original system (without the source blocks) by saving the state values from the model and then removing the source blocks. In general, the number, order, and identity of state components change after adding and removing Simscape blocks in a model.

`trim`

Function Not Supported with Simscape ModelsThe Simulink `trim`

function
is not supported for models containing Simscape components.