123 porno tubeWhile making machines which is actuated by without **closed loop control**, you more often than not want to calibrate the stepper motors in software to make the machine move exactly as you want it to. If you tell the machine to move 10 mm in a direction, you don’t want it to move 9 mm or 11 mm.

In motion control software (such as **Grbl**) you need to specify an axis’ **steps per mm** or equivalent, i.e. how many steps the motor has to run to achieve a motion of 1 mm (note that this number doesn’t need to be an integer).

So, how do we find this number? Before going into that, we’re going to talk about some stepper motor basics and microstepping.

### Microstepping

A very common resolution for stepper motors is 200 steps per revolution (aka. 1.8 degrees per step). We will use this resolution as an example in the rest of this post. Often 200 steps per revolution may not be sufficient to acheive the accuracy required by the men upstairs.

To increase the accuracy you can enable **microstepping**. This will increase the number of steps per revolution with a factor of 2^{n} (n is an integer). Microstepping up to 8x (i.e. 8 times the full step resolution – resulting in 1600 steps per revolution in our example above) is common, but you may even find stepper systems with 256x microstepping.

One **VERY important drawback** with microstepping you should take into consideration is that the holding torque drastically decreases as the microstepping factor increases. According to micromo.com a microstepping factor of 8x will give you only 19.51% holding torque compared to what you get from not enabling microstepping (256x microstepping will give you as little as 0.61% of the original holding torque)!

Thus microstepping is a dangerous double-edged sword that should be handled with great care.

### Calculating Steps/mm Using Belts and Pulleys

In many of our machines we have used **belts** and **pulleys** to actuate them. These belts and pulleys come in many shapes and sizes, but one standard we have grown accustomed to is the **GT2** standard. GT2 belts and pulleys come in (at least) three different sizes: 2 mm, 3 mm and 5 mm pitch.

The following equations obviously work with chains instead of belts as well, as long as you input the correct pitch. Note that these equations don’t take **backlash** into account.

##### Linear Motion

Here’s a simple equation you can use to calculate **steps per mm** for linear motion with belts and pulleys.

**s _{rev}** is the number of steps per revolution for the motor

**f**is the microstepping factor (1, 2, 4, 8 etc.)

_{m}**p**is the pitch (e.g. 2mm)

**N**is the number of teeth on the pulley attached to the motor shaft.

_{t}

EXAMPLE:Using the motor in our previous example with 2x microstepping, 2 mm pitch belts and a 20 teeth pulley will give us10 steps per mm, i.e. a resolution of 0.1mm.

A typical setup to use this equation for can be a trolley which moves linearly along an axis. One end of the belt (an open-ended one) is attached to the trolley and goes around the motor pulley, then around an idle pulley on the opposite side of the motor before the other end is attached to the trolley as well (this scheme is used both in **this** and **this** project).

##### Rotational Motion

Sometimes you want to keep things rotational. Perhaps you want to draw on a cylindrical surface or make a miniature steamroller to drive back and forth? Imagine a setup with a closed belt going around two pulleys just like the chain on a bicycle. One of the pulleys is attached to the motor shaft while the other pulley is attached to a shaft on a different axis (for instance the roller on our miniature steamroller).

Here’s a usable equation to calculate steps/mm for this kind of setup:

**s _{rev}** is the number of steps per revolution for the motor

**N**is the number of teeth on the final (passive) pulley

_{f}**f**is the microstepping factor (1, 2, 4, 8 etc.)

_{m}**N**is the number of teeth on the motor pulley

_{m}**D**is the diameter of the roller in our steamroller example.

_{r}

EXAMPLE:Using the same motor as before with 8x microstepping, a 40 teeth pulley on the roller axis, a 20 teeth pulley on the motor axis and a 200 mm roller diameter will give us approximately5.09 steps per mm, i.e. a resolution of around 0.2 mm.

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To confirm that the calibrations are correct, or just to make them more accurate, you should do some simple “post-calibrations”. This is particularly easy if you’re calibrating a drawing machine, 3D printer, a CNC machine or anything else that leaves a distinct measureable mark. To do this simple, but effective calibration process, tell the machine to move a certain distance (not too short). Measure the distance traveled and compare it to the intended travel distance. If they are identical: *HUZZAH!* If not, adjust your steps/mm settings with a ratio equal to the error.

Now go and make some awesome machines! ?