Thermochemistry Laboratory Report Essay

AbstractThe purposes of these three experimentations be to determine the heat capacity of a calorimeter and with that selective in formattingion, confirm Hesss righteousness and observe enthalpy removes within replys. By measuring the change in temperature that occurs with the interaction of twain different reactants, we were able to determine both the calorimeter aeonian and the change in enthalpy of a hug drugding(p) response. The results were rather entangled, as some numbers more(prenominal) closely resembled the theoretical set than others did. institutionThe first experiment is devoted to rise uping the calorimeter constant for a polystyrene cup. Whenever a reaction takes place inside a calorimeter, some heat is befuddled to the calorimeter and its surroundings. In order to achieve maximum accuracy, we must know scarce how a lot heat will be lost, so that the results of the next ii experiments will be as correct as possible. The equation utilize to determine it is a simple manipulation of the everywhereall heat of the reaction equation, which is Overall Heat = (Sp.Ht. hot body of urine * people of urine * budge in temperature) + (Sp.Ht. coolwater * Mass of water * permute in temperature) + (Cp calorimeter * Change in temperature) Since an flaw is determine to happen during the observational process, three unhurriednesss were d genius to keep an eye on an modal(a). This experiment is springy to the success of the following twain thermochemistry experiments.The second experiment, entitled Hesss Law, is a simple confirmation of said law. To do so, we take three reactions, where one of them is the corresponding as the other two, and measure the heats of reaction for each of them. Hesss Law states that the heat of reaction of the one reaction should equal to the jibe of the heats of reaction for the other two. The three reactions employ in this experiment be (1) NaOH(s) Na+(aq) + OH-(aq)(2) NaOH(s) + H+(aq) + Cl-(aq) H2 O(l) + Na+(aq) + Cl-(aq) (3) Na+(aq) + OH-(aq) + H+(aq) + Cl-(aq) H2O(l) + Na+(aq) + Cl-(aq) In order to find the heat released by each reaction, we use a variant of the overall heat of a reaction equation, which was q = Sp.Ht. * m * Change in temp.. In addition to finding the change in enthalpy, change in entropy was also figure development theoretical determines in given reference tables. Finally, the overall free energy released was measured using the equation Change in free energy = Change in enthalpy (Temperature * Change in entropy). All of this is then utilise to verify Hesss Law by calculating the portion erroneous belief involved in the experiment.The terzetto experiment, called Thermochemistry Acid + Base, combines the concepts of the previous two experiments. The main concept is to observe the change in enthalpy that results from the various reactions surrounded by strong and weak acids and shanks. There were four reactions used in this experiment, and they argon(1) HCl(aq) + NaOH(aq) NaCl(aq) + H2O(l)(2) HCl(aq) +NH3(aq) NH4Cl(aq)(3) HC2H3O2(aq) + NaOH(aq) NaC2H3O2(aq) + H2O(l)(4) HC2H3O2(aq) + NH3(aq) NH4C2H3O2(aq)By monitoring the change in temperature that results from the reaction of an acid and a base, it is possible to calculate the overall energy for each reaction, also cognise as H rxn/mole of limiting reactant. This data-based value drop be comp ard with the theoretical to determine how accurate the experiment was. The lower the percent fallacy, the more accurate we were at calculating the energy involved in each reaction.ExperimentalIn order to do any calculation for energy, we first had to find the calorimeter constant. In order to do that, we first took and weighed a polystyrene cup (our calorimeter) and added approximately vitamin C g of warm water to it. The material measurements are recorded in Table 1-1. The mass of the cup with the water in it were recorded to find the exact mass of the water added. Nex t, a cylinder was weighed, like the cup, and well-nigh 48 mL of cool water was added. The total was weighed and recorded in the same table. Afterwards, temperature sensors connected through a LabPro device were suspended in the two containers and the computing machines DataMate course of study was used to record temperature over a 90 second judgment of conviction interval. After a few seconds of entropy collection from the separate liquids, they were abstruse  together and stirred with the sensors until there was no period left. By using Graphical Analysis, a graph of the selective information was printed, displaying temperature vs. judgment of conviction. Tangent lines were drawn on the graph in order to determine the initial and net temperatures of the two liquids. The above procedure was repeated two more times for the pastime of precision. Finally, we calculated the calorimeter constant using the command listed in the Introduction section. stock-still though we conducted an experiment to find the heat capacity of a calorimeter, we were given a new value for the constant for experiment 2, due to inaccuracy in our results. For the lab called Hesss Law, we first started by setting up the calculator to collect temperature data again. The procedure is the same as the one used in the last experiment, except that the time interval is set to 4 minutes. Next, we obtain a polystyrene cup to use as our calorimeter and fill it with 100 g of water. The cup is laid within a 250-mL beaker to keep it in a sustained environment. A temperature sensor is placed in the water and is stabilized. Then, we obtained solid NaOH and weighed ab erupt 2 grams to the nearest thousandth decimal point. This value is recorded, along with all other data in Table 2-1. Afterwards, data collection begins and after ab start 15 seconds, the NaOH is added to the water. The resulting resultant role is stirred for the season of the time interval and by using Graphical Analysis a graph is produced. This procedure is repeated twice more for 0.5 M HCl in place of water for one trial, and then 1.0 M HCl and 1.0 M NaOH solution for the third trial. All of the measurements are recorded in the table mentioned above.For the final experiment, the procedure is very similar to its predecessors. We began by initializing the LabPro and DataMate to collect temperature data over time (this time it is a 180 second interval). First, we measure as close as we idler to 50 g of a base of our choice in a 100-mL graduated cylinder. A temperature sensor is placed in the cylinder. Next, we weighed 100 g of a chosen acid in the calorimeter. The calorimeter is placed in a 1000-mL beaker for stability and a temperature sensor is submerge in the acid. After the sensors have a chance to equilibrate, we started to collect data. When about 15 seconds have passed, we poured the base into the calorimeter with the acid and stirred for the duration of the time with both sensors. The n, when time was up, we used Graphical Analysis to print the resulting temperature vs. time graph. This processed is repeated three more times until every faction of strong and weak acids and bases is used.AnalysisThe data we recorded for the first experiment appears to be accurate, though drawing tangent lines to find final and initial points has its inherent inaccuracy. Using the ordinance discussed in the introduction, our equation turned out like the following0 = (47.166 g * 4.184 J/gC * 16.561 C) + (98.874 g * 4.184 J/gC * -9.4139 C) + (Cp calorimeter * -9.4139 C)Cp calorimeter = -66.522 J/CThe average of the three obtained values is as simple as adding them all together and dividing by three, the number of values, which looked like this (-66.522 + 348.619 + 225.669)/3 = 169.255 J/C. This number is much higher than the default value we were given for the next lab, which was only 15.0 J/C.For the Hesss Law experiment, the numbers looked much better. The first thing we did wit h the data was solve for the change in temperature, which was just final temperature deduction initial temperature. The result gave us something like this 23.9 C 19 C = 4.9 C. Second, we calculated the heat released by each equation, which is shown as this q = Sp.Ht. * m * tq = 4.18 J/gC * 99.524 g * 4.9 Cq = -2.038 kJThen, the heat lost to the calorimeter was calculated using the formula q = Cp * t. From that, we found that q = 15.0 J/C * 4.9 C = -0.0735 kJ. Next, the total H was found by adding both values of q above, which just equals -2.1115 kJ. In order to find H/mol NaOH, we had to find how many moles were used in each reaction based on the mass of NaOH weighed and recorded in Table 2-1. The format for finding the number of moles looked like the following 2.0810 g NaOH * (1 mol NaOH / 40 g NaOH) = 0.052 mol NaOH. This value is used to split up the H to find the H/mol NaOH value, which equaled -40.606 kJ/mol. Using the H of Reaction 2 as the theoretical value, and th e combined H values of Reactions 1 and 3, we can find out our percent error, which is shown below as% error = abs ((theoretical experimental) / theoretical) * 100% error = abs ((79.56 94.87) / 79.56) * 100% error = 19.24 %The above values can all be found on Table 2-1. The above process was repeated with data collected from the whole class, which yielded a 14.47 % error. Finally, using theoretical numbers, we calculated H, S, and G for reaction 2. For the first two, a similar equation of sum of products minus sum of reactants equals H and S respectively. G is calculated using the formula in the introduction, which looked like G = -98.8 298(0.0580) = -116.062 kJ/mol.With the data collected in the third experiment a multitude of calculations were carried out. All of the following data can be found in Table 3-1. First, we solved for H rxn, which is the same as the overall heat equation described in the introduction. The calculation looked liked the followingH rxn = (4.184 J/gC * 98 .781 g * 4.35 C) + (4.184 J/gC * 48.5133 g * 4.0 C) + (15.0 J/C * 4.35 C)H rxn = -2.68 kJNext, we needed to calculate the limiting reactant for each reaction, which was just the reactant that yielded the least product. The regularity for determining it is like so98.781 g HCl * (1 mol HCl / 36 g HCl) * (1 mol NaCl / 1 mol HCl) * (1 g NaCl / 1 mol NaCl) = 2.744 g NaCl48.5153 g NaOH * (1 mol NaOH / 40 g NaOH) * (1mol NaCl / 1 mol NaOH) * (1 g NaCl / 1 mol NaCl) = 1.213 g NaCl Then, we take the H rxn above and divide it by the moles of limiting reactant, which we discovered above (since each solution is 1.0 M, the moles used is the number of grams divided by 1000). This new H rxn / moles of limiting reactant is the experimental value to becompared to the theoretical value obtained with given numbers. Comparing these two values using the % error equation above, the % error of one of the reactions comes out to be just 1.25%. The rest of the numbers can be observed in Table 3-2. This con cludes all of the calculations that were involved in all of the experiments. completionThe results of this experiment were a mix of both very accurate and nowhere close. For the first experiment, the values for the calorimeter constant were very imprecise, ranging from negative values to ten times greater than the theoretical 15.0 J/C. This is most likely due to a series of miscalculations and human error. In experiment two, the numbers were far more favorable, with a 19.24 % error for our data and a 14.47 % error for the unblemished class. This number still seems too high to justify the verification of Hesss Law and should probably be redone with more care in consistently measuring reactants, but other than that, the experiment was completed well enough. The results for the final experiment are also quite mixed. While some experimental values had only a 1.25 % error, others were grossly erroneous with about 65.1 % error. The most inaccurate data was the ones collected for the reac tion of a weak acid and a strong base, which yielded an obviously flawed 300 % error. For the results that were inaccurate, the source of error was most likely to due a miscalculation on my part, maybe in the calculation of the theoretical values, or the experimental for that matter. Much more care must be taken when repeating this lab, for the possible errors are numerous. The purpose of these three labs were to observe the nature of heat and reactions, which the experiments do rather nicely. The procedures described do an excellent job describing the purpose of each step, though they are easy to do incorrectly. In the end, the experiments yielded mediocre results, a mixed bag of incredibly accurate to just very wrong. Thermochemistry is indeed a rather elusive topic, but these experiments make it much more tangible.