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<!-- XY-Plane --> | <!-- XY-Plane --> | ||
<div class="tab-pane fade" id="tabs-icons-text-2" role="tabpanel" aria-labelledby="tabs-icons-text-2-tab"> | <div class="tab-pane fade" id="tabs-icons-text-2" role="tabpanel" aria-labelledby="tabs-icons-text-2-tab"> | ||
− | <h2 class= | + | <h2 class=display-3>Distance Traveled to Dispense Fluid</p></h2> |
<small class="h6 text-default"> | <small class="h6 text-default"> | ||
− | + | In order to accurately dispense the output into the desired wells, the plane needed to travel the right amount of steps depending on the well plate. Therefore we needed to calculate how many steps of the stepper motor is required to move from one well to another. Below are the steps and calculations that went into determining this: </p> | |
− | + | ||
+ | To do so, we first determined the distance from center of well to next center well for each microtiter plate.</p> | ||
+ | |||
+ | <div class="row"> | ||
+ | <div class="col-4"><img src="https://static.igem.org/mediawiki/2018/2/2a/T--BostonU_HW--24_well.png" style="width: 100%;" class="img-fluid"></div> | ||
+ | <div class="col-4"><img src="https://static.igem.org/mediawiki/2018/e/ec/T--BostonU_HW--96_wells.png" style="width: 100%;" class="img-fluid"></div> | ||
+ | <div class="col-4"><img src="https://static.igem.org/mediawiki/2018/b/b7/T--BostonU_HW--384_wells.png" style="width: 100%;" class="img-fluid"></div> | ||
+ | </div><br> | ||
+ | |||
+ | Next, we measured the circumference of our pulley.</p> | ||
+ | |||
+ | <div class="row"> | ||
+ | <div class="col-3"></div> | ||
+ | <div class="col-6"><img src="https://static.igem.org/mediawiki/2018/6/6c/T--BostonU_HW--pulley_dia.png" style="width: 100%;" class="img-fluid"></div> | ||
+ | <div class="col-3"></div> | ||
+ | </div> | ||
+ | |||
+ | After obtaining these values, we found the distance it is possible to travel per step, and finally the steps per well. From the documentation for the NEMA-14 stepper motor, we know it steps 200 times in one revolution and has microstepping features up to 1/32 microsteps.</p> | ||
+ | |||
+ | <div class="row"> | ||
+ | <div class="col-3"></div> | ||
+ | <div class="col-6"><img src="https://static.igem.org/mediawiki/2018/2/2d/T--BostonU_HW--eq_1.png" style="width: 100%;" class="img-fluid"></div> | ||
+ | <div class="col-3"></div> | ||
+ | </div> | ||
+ | <div class="row"> | ||
+ | <div class="col-4"></div> | ||
+ | <div class="col-4"><img src="https://static.igem.org/mediawiki/2018/b/b0/T--BostonU_HW--eq_2.png" style="width: 100%;" class="img-fluid"></div> | ||
+ | <div class="col-4"></div> | ||
+ | </div> | ||
+ | |||
+ | From there, since we know how many steps is required for 96 wells, we calculate the microtiter plates with different amounts of wells.</p> | ||
+ | |||
+ | <table class="table-bordered" style="width:100%"> | ||
+ | <tr> | ||
+ | <th>Well Plate</th> | ||
+ | <th>Dimensions</th> | ||
+ | <th>Steps/Well</th> | ||
+ | </tr> | ||
+ | <tr> | ||
+ | <td>24-well plate</td> | ||
+ | <td>4x6 wells (18 mm apart)</td> | ||
+ | <td>90 steps</td> | ||
+ | </tr> | ||
+ | <tr> | ||
+ | <td>96-well plate</td> | ||
+ | <td>8x12 wells (9 mm apart)</td> | ||
+ | <td>45 steps</td> | ||
+ | </tr> | ||
+ | <tr> | ||
+ | <td>384-well plate</td> | ||
+ | <td>16x24 wells (4.5 mm apart)</td> | ||
+ | <td>22.5 steps</td> | ||
+ | </tr> | ||
+ | </table> | ||
+ | </small> | ||
+ | <br> | ||
+ | <h2 class=display-3>Runs Before Failure</p></h2> | ||
+ | <small class="h6 text-default"> | ||
+ | To characterize the amount of runs the XY-stage can perform before failure, we ran TERRA through a set of 15 trials in which fluid was dispensed into two different wells ten times. These trials were run independently from each other by resetting TERRA in between trials. In each trial, two outputs were simulated--one outputting at location 45, and the latter outputting at location 90. The experiments allowed us to understand how many loops TERRA would run through before it fails to output into a correct well location, and therefore requires a reset. </p> | ||
+ | |||
+ | <img src="https://static.igem.org/mediawiki/2018/e/ea/T--BostonU_HW--runs_before_failure.jpeg" width="100%" class="img-fluid"> | ||
+ | <br><br> | ||
+ | <b>Terra averages around 8 runs before it requires a reset. </b> A reset consists of rehoming the device from its starting point, readjusting the tubing, and resetting the plate on the plane.</p> | ||
+ | </small> | ||
+ | <h2 class=display-3>Speed and Time</p></h2> | ||
+ | <small class="h6 text-default"> | ||
+ | A set of 15 trials were run in order to determine the speed of the plate support of the XY-stage. The plate support traveled a distance of 108mm. The time taken to travel was recorded for each trial and then averaged. To calculate the average speed, the distance traveled was divided by the time per run.</p> | ||
+ | |||
+ | <img src="https://static.igem.org/mediawiki/2018/2/27/T--BostonU_HW--speed_and_time.jpeg" width="100%" class="img-fluid"> | ||
+ | <br><br> | ||
+ | The average time taken to transverse the 108 mm was 39.306 seconds. From that, we determined that, <b>with a microstep of 1/4 steps, the XY-stage moves at an average speed of 2.75 mm/sec. The average time taken to travel between wells on a 96 well plate was 3.28 seconds. </b></p> | ||
</small> | </small> | ||
</div> | </div> |
Revision as of 07:35, 17 October 2018
Modeling
Droplet Characterization
Due to the relatively low flow rate that fluid moves at in microfluidic chips, outputs offloaded from microfluidic chips typically form droplets as opposed to a continuous stream. Therefore, in order to accurately dispense these droplets into wells, we created a model to predict their volume so that users can control the end sample volume in the well of interest. To develop the model we used a free-body diagram to identify the forces present right before a droplet falls off the nozzle. Using the sum of the forces we were able to model the volume of the droplet. To test the model we ran preliminary experiments to calculate volumes and compared them against the theoretical value given by the model. Because we can’t directly measuring the volume of the droplet, we used the time interval between droplets and the given flow rate to calculate what the experimental volume is.- the theoretical volume from the model was less than the experimental
- this difference, on average, increased with flow rate
A potential reason for this missing component is that the model assumed that the fluid is static instead of dynamic, due to the constant flow rate of fluid moving through the chip (1). In a dynamic model, the total droplet volume is characterized by the static volume and the pinching volume (1). The pinching volume is formed during the droplet’s fall when the droplet breaks off the tube (1).
However, after researching the physical phenomenon behind dynamic droplets we realized that a complete dynamic model, as described in Zhang et al, required measuring many parameters, making it difficult to implement 1. Therefore, we decided to create our dynamic model empirically by adding a correction factor, which would depend on flow rate.
Zhang et al.
- Zhang, D. F., and H. A. Stone. “Drop Formation in Viscous Flows at a Vertical Capillary Tube.” Physics of Fluids 9, no. 8 (August 1997): 2234–42. https://doi.org/10.1063/1.869346.
Distance Traveled to Dispense Fluid
In order to accurately dispense the output into the desired wells, the plane needed to travel the right amount of steps depending on the well plate. Therefore we needed to calculate how many steps of the stepper motor is required to move from one well to another. Below are the steps and calculations that went into determining this: To do so, we first determined the distance from center of well to next center well for each microtiter plate.Next, we measured the circumference of our pulley.
Well Plate | Dimensions | Steps/Well |
---|---|---|
24-well plate | 4x6 wells (18 mm apart) | 90 steps |
96-well plate | 8x12 wells (9 mm apart) | 45 steps |
384-well plate | 16x24 wells (4.5 mm apart) | 22.5 steps |
Runs Before Failure
To characterize the amount of runs the XY-stage can perform before failure, we ran TERRA through a set of 15 trials in which fluid was dispensed into two different wells ten times. These trials were run independently from each other by resetting TERRA in between trials. In each trial, two outputs were simulated--one outputting at location 45, and the latter outputting at location 90. The experiments allowed us to understand how many loops TERRA would run through before it fails to output into a correct well location, and therefore requires a reset.Terra averages around 8 runs before it requires a reset. A reset consists of rehoming the device from its starting point, readjusting the tubing, and resetting the plate on the plane.
Speed and Time
A set of 15 trials were run in order to determine the speed of the plate support of the XY-stage. The plate support traveled a distance of 108mm. The time taken to travel was recorded for each trial and then averaged. To calculate the average speed, the distance traveled was divided by the time per run.The average time taken to transverse the 108 mm was 39.306 seconds. From that, we determined that, with a microstep of 1/4 steps, the XY-stage moves at an average speed of 2.75 mm/sec. The average time taken to travel between wells on a 96 well plate was 3.28 seconds.