Serial Dilution Lab Conclusion
Advantages of 'Serial Dilutions' This section is not a recipe for your experiment. It explains some principles for designing dilutions that give optimal results. Once you understand these principles, you will be better able to design the dilutions you need for each specific case. Often in experimental work, you need to cover a range of concentrations, so you need to make a bunch of different dilutions. For example, you need to do such dilutions of the standard IgG to make the standard curve in ELISA, and then again for the unknown samples in ELISA.
Serial dilution is often a difficult concept for students to understand. In this short dry lab exercise, students perform serial dilutions using seed beads. This exercise helps students gain skill at performing dilutions without using reagents, bacterial cultures, or viral cultures, while being able to visualize the process. Serial dilutions are made by making the same dilution step over and over, using the previous dilution as the input to the next dilution in each step. Since the dilution-fold is the same in each step, the dilutions are a geometric series (constant ratio between any adjacent dilutions).
You might think it would be good to dilute 1/2, 1/3, 1/10, 1/100. These seem like nice numbers. There are two problems with this series of dilutions.
The dilutions are unnecessarily complicated to make. You need to do a different calculation, and measure different volumes, for each one.
It takes a long time, and it is too easy to make a mistake. The dilutions cover the range from 1/2 to 1/100 unevenly. In fact, the 1/2 vs. 1/3 dilutions differ by only 1.5-fold in concentration, while the 1/10 vs. 1/100 dilutions differ by ten-fold. If you are going to measure results for four dilutions, it is a waste of time and materials to make two of them almost the same.
Serial Dilution Lab Conclusion Examples
And what if the half-maximal signal occurs between 1/10 and 1/100? You won't be able to tell exactly where it is because of the big space between those two. Hindi mp3 song 2017.
Serial dilutions are much easier to make and they cover the range evenly. Serial dilutions are made by making the same dilution step over and over, using the previous dilution as the input to the next dilution in each step. Since the dilution-fold is the same in each step, the dilutions are a geometric series (constant ratio between any adjacent dilutions). For example: 1/3, 1/9, 1/27, 1/81 Notice that each dilution is three-fold relative to the previous one. In four dilutions, we have covered a range of 181/3 = 60-fold.
Serial Dilution Lab Activity
If that isn't enough range, consider a series of five-fold dilutions: 1/5, 1/25, 1/125, 1/625 Here we've covered a (625/5) = 125-fold range. No matter where the half-max falls in a series of 5-fold dilutions, it is no more than 2.2-fold ('middle' square root of a 5-fold step) away from a data point - so the coverage of the range is thorough and even.
When you need to cover several factors of ten (several 'orders of magnitude') with a series of dilutions, it usually makes the most sense to plot the dilutions (relative concentrations) on a logarithmic scale. This avoids bunching most of the points up at one end and having just the last point way far down the scale. Before making serial dilutions, you need to make rough estimates of the concentrations in your unknowns, and your uncertainty in those estimates. For example, if A 280 says you have 7.0 mg total protein/ml, and you think the protein could be anywhere between 10% and 100% pure, then your assay needs to be able to see anything between 0.7 and 7 mg/ml. That means you need to cover a ten-fold range of dilutions, or maybe a bit more to be sure. If the half-max of your assay occurs at about 0.5 mg/ml, then your minimum dilution fold is (700 mg/ml)/(0.5 mg/ml) = 1,400. Your maximum is (7000 mg/ml)/(0.5 mg/ml) = 14,000.
So to be safe, you might want to cover 1,000 through 20,000. In general, before designing a dilution series, you need to decide:. What are the lowest and highest concentrations (or dilutions) you need to test in order to be certain of finding the half-max? These determine the range of the dilution series. How many tests do you want to make? This determines the size of the experiment, and how much of your reagents you consume.
More tests will cover the range in more detail, but may take too long to perform (or cost too much). Fewer tests are easier to do, but may not cover the range in enough detail to get an accurate result.
What volume of each dilution do you need to make in order to have enough for the replicate tests you plan to do? Now suppose you decide that six tests will be adequate (perhaps each in quadruplicate). Well, starting at 1/1,000, you need five equal dilution steps (giving you six total dilutions counting the starting 1/1,000) that end in a 20-fold higher dilution (giving 1/20,000). You can decide on a good step size easily by trial and error.
Would 2-fold work? 1/2, 1/4, 1/8, 1/16, 1/32.
Serial Dilution Lab
Yes, in fact that covers 32-fold, more than the 20-fold range we need. (The exact answer is the 5th root of 20, which your calculator will tell you is 1.82 fold per step. It is much easier to go with 2-fold dilutions and gives about the same result.) So, you need to make a 1/1,000 dilution to start with. Then you need to serially dilute that 2-fold per step in five steps. You could make 1/1,000 by adding 1 microliter of sample to 0.999 ml diluent. Why is that a poor choice?
Because you can't measure 1 microliter (or even 10 microliters) accurately with ordinary pipeters. So, make three serial 1/10 dilutions (0.1 ml 100 microliters into 0.9 ml): 1/10 x 1/10 x 1/10 = 1/1,000. Now you could add 1.0 ml of the starting 1/1,000 dilution to 1.0 ml of diluent, making a 2-fold dilution (giving 1/2,000). Then remove 1.0 ml from that dilution (leaving 1.0 ml for your tests), and add it to 1.0 ml of diluent in the next tube (giving 1/4,000). And so forth for 3 more serial dilution steps (giving 1/8,000, 1/16,000, and 1/32,000).
You end up with 1.0 ml of each dilution. If that is enough to perform all of your tests, this dilution plan will work. If you need larger volumes, increase the volumes you use to make your dilutions (e.g.
2.0 ml + 2.0 ml in each step).
A serial dilution is any dilution in which the concentration decreases by the same factor in each successive step. In serial dilutions, you multiply the dilution factors for each step. The dilution factor or the dilution is the initial volume divided by the final volume. #DF = Vi/Vf# For example, if you add a 1 mL sample to 9 mL of diluent to get 10 mL of solution, #DF = Vi/Vf# = #(1'mL')/(10'mL') = 1/10#. This is a 1:10 dilution. Example 1 What is the dilution factor if you add 0.2 mL of a stock solution to 3.8 mL of diluent? #Vf# = 0.2 mL + 3.8 mL = 4.0 mL #DF = Vi/Vf# = #(0.2'mL')/(4.0'mL') = 1/20#.
This is a 1:20 dilution. Example 2 If you did the above dilution four times, what would be the final dilution factor? Solution 2 Remember that serial dilutions are always made by taking a set quantity of the initial dilution and adding it successively to tubes with the same volume. So you multiply each successive dilution by the dilution factor. You would transfer 0.2 mL from Tube 1 to 3.8 mL of diluent in Tube 2 and mix. Then transfer 0.2 mL from Tube 2 to 3.8 mL of diluent in Tube 3 and mix. Repeat the process until you have four tubes.
The dilution factor after four dilutions is #DF = 1/20 × 1/20 × 1/20 × 1/20 = 1/160000# = 1:160 000 If the concentration of the original stock solution was 100 µg/µL, the concentration in Tube 4 would be 100 µg/µL × #1/160000# = 6.25 × 10⁻⁴ µg/µL Hope this helps.