Rates of Reactions
Rates of Reaction – Sample Data C
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Experiment 1
Initial moles of S2O82-
Aliquot #
Cumulative time
recorded from stopwatch
(min) (sec)
Cumulative
time
converted to
seconds (s)
1
2
3
4
5
Experiment 2
Initial moles of S2O82-
Aliquot #
Cumulative time
recorded from stopwatch
(min) (sec)
Cumulative
time
converted to
seconds (s)
1
2
3
4
5
Experiment 3
Initial moles of S2O82-
Aliquot #
Cumulative time
recorded from stopwatch
(min) (sec)
Cumulative
time
converted to
seconds (s)
1
2
3
4
5
0.0024
2
47
3 05
4 44
6 28
8 22
48
5 45
8 52
12 06
15 40
1
1 28
2 52
4 24
5 54
7 29
0.0024
0.0048
Ratesof Reactions
Objectives
1. Use a variety of calibrated glassware to make dilute solutions with known concentrations
of reactants using precision and accuracy.
2. Use color changes to monitor the rate of concentration decrease of a reactant.
3. Practice using the dilution formula to determine the concentrations of solutions diluted
from a more concentrated “stock” solution.
4. Recognize that for a reaction with a reactant coefficient of one, the initial rate of the
reaction can be determined from the negative slope of a plot of reactant concentration near
the start of a reaction as a function of time.
5. Determine the order for each reactant in a rate law by using a series of trials with different
initial reactant concentrations and reaction rates.
6. Determine the rate constant for each trial from initial concentration.
7. Provide the overall rate law for the reaction studied.
Introduction
Chemical reactions can occur at very different rates. Compare the slow oxidation of iron
into iron oxide (rust) with the nearly instantaneous reaction of burning hydrogen gas, once the
initial spark is given. Some variables that affect the rate of a reaction include temperature,
concentration, and whether a catalyst is present. An increase in temperature increases the energy
of the collisions. The addition of a catalyst lowers the activation energy, the minimum energy
required for a reaction to take place, by orienting molecules for favorable interactions. An increase
in concentration increases the probability of a productive collision. Any of these changes may speed
up a reaction. In this experiment, the effect of concentration will be investigated.
The rate of a given reaction is gauged by either the consumption of starting materials
(reactants) or the formation of products. This measurement of concentration is related to time such
that when the concentration, X, of a reactant is monitored (Eq. 1).
rate of reaction = −
–
1
N
0
change in concentration of reactant
change in time
= –
1
N
0
∆[X]
∆?
Equation 1
Rates of Reactions
2
where N is the coefficient of X in the balanced equation. Note the negative sign in the
equation since X has been defined as a reactant and therefore is being consumed (has decreasing
concentration) during the reaction.
Often the initial rate of a reaction is investigated because it is easy to determine initial
concentrations of reactants and an equation can be written that relates reaction rate to the initial
concentrations of all the reactants. Rate may, or may not, depend on the concentration of every
species in the system. Reaction orders characterize how the rate is affected by each reactant
concentration. Consider a reaction involving reactants, X, Y, and Z, where the lower-case letters
in Equation 2 represent coefficients in the balanced equation. The initial rate of a reaction is
investigated because it is easy to determine initial concentrations of reactants and an equation can
be written that relates reaction rate to the initial concentrations of all the reactants. Rate may, or
may not, depend on the concentration of every species in the system. Reaction orders characterize
how the rate is affected by each reactant concentration. Consider a reaction involving reactants, X,
Y, and Z, where the lower-case letters represent coefficients in the balanced equation (Eq. 2).
xX + yY + zZ → qQ + rR
Equation 2
If the rate does not depend on the concentration of Z at all, it is zero order with respect to
Z, in other words, in the rate expression, its exponent is zero (Eq. 3). If the rate doubles every time
the concentration of Y is doubled, the reaction is first order with respect to Y. If doubling the
concentration of X leads to a quadrupling of the rate, it is second order with respect to X. The rate
expression for a reaction can only be determined experimentally and the rate equation for this
example would be Equation 3 where k is the rate constant for the reaction at a given temperature.
Rate = k [X]2
[Y]1
[Z]0
Equation
3
The overall order of a reaction is the summation of the orders of all the components. For
the above example, the overall order is 2 + 1 + 0 = 3.
Rates of Reactions
3
The order of each component must be determined experimentally. This is done by changing
the concentration of only one component at a time and then noting the change in rate. Once the
order of every component in known, then the rate constant, k, can be determined using
concentration information from one of the trials. Once k is determined along with the order of the
reaction, the rate expression can be used to calculate or predict the rate with different
concentrations.
The reaction that will be investigated is an oxidation-reduction with peroxydisulfate ion
(S2O82-), and the iodide ion (I-). The iodide is oxidized to iodine (I2) and the peroxydisulfate is
reduced to the sulfate ion (SO42-) (Eq. 4).
S!O”!#(aq) + 2I#(aq) → I!(aq) + 2 SO$!#(aq)
Equation
4
Starch is the indicator for the reaction and will turn blue in the presence of I2. Since the
starch will turn blue instantly in the presence of I2, we would not be able to determine the rate with
just these two reactants in the solution with the indicator. We would see a blue color change
instantly as soon as the first molecules of iodine would form, and we would not be able to gather
any time dependent data. Therefore, we must add something to slow the appearance of the blue
color. The thiosulfate (S2O32-) will be added for this purpose. As the iodide reacts with the S2O82-
(Eq. 4), it is converted to iodine, I2, which will immediately react with the thiosulfate (S2O32-) (Eq.
5) which is also present in solution. The thiosulfate will reduce the I2 back to I-, which will not turn the
solution blue.
2S!O%!#(aq) + I!(aq) → 2I#(aq) + S$O&!#(aq)
Equation
5
After some time, all of the S2O32- will be consumed and more I2 will be produced. The
excess I2. The excess will complex with the starch indicator, turning the solution blue. The data
you collect will be the time delay between the addition of the thiosulfate and the change in color.
You will indirectly measure the disappearance of S2O32- (Eq. 4) and, thus, be able to determine the
rate of the reaction.
Rates of Reactions
4
Experimental Design
You will start with a relatively small amount of thiosulfate (2.0 x 10-4 mole) in solution
compared with the initial amounts of peroxydisulfate and iodide. When the 2.0 x 10-4 moles are
consumed in a reaction with iodine (at which time the solution will turn blue), 1.0 x 10-4 moles of
peroxydisulfate will have reacted with iodide because of the stoichiometry of the reactions. You
will record the time from the start of the reaction and then add another 2.0 x 10-4 moles of
thiosulfate (1.00 mL). The solution will become colorless again as the thiosulfate reacts with the
iodine. When the blue color reappears, you will record the time. You will then repeat these steps
three more times for a total of five data points. You will go through this procedure a total of three
times with different initial concentrations iodide and peroxydisulfate but with the same amount of
thiosulfate each time.
A relatively small number of moles of peroxydisulfate is consumed during each time
interval, so the reaction should be in the linear initial portion of the rate curve for the duration of
the reaction investigated. You will plot the concentration of peroxydisulfate remaining as a
function of time (Figure 1).
Figure 1. Concentration of S2O82- over time.
0.039
0.04
0.041
0.042
0.043
0.044
0.045
0.046
0.047
0.048
0.049
0 200 400 600 800 1000 1200
M
ol
ar
ity
o
f S
2O
82
–
Time (s)
Rates of Reactions
5
Since peroxydisulfate (S2O82-) is the species monitored during the experiment and its
coefficient is 1 as seen in the balanced equation (Equation 4), the value of N from Equation 1 is
equal to 1 and therefore the initial rate of the reaction is the negative of the slope of the line you
have plotted (Eq. 6).
rate of reaction = −-
1
1
0
Δ[S!O”!#]
∆?
Equation
6
The values of the rate of reaction from each trial will be used to determine the order and
rate constant for the reaction of peroxydisulfate with iodine. Notice the slope of the graph will be
negative because the concentration of the peroxydisulfate is decreasing. However, the rate of the
reaction is positive (Eq. 7).
Rate of reaction = –slope
Equation 7
Rates of Reactions
6
Procedure
1. Prepare two flasks for each experiment (Table 1) using the stock solutions (Table 2).
Remember to include these steps in your notebook. DO NOT CONFUSE the S2O32- with
the S2O82-!
Table 1. Reaction Concentrations and Volumes for Experiments 1-3
Experiment 1 Experiment 2 Experiment 3
Flask #1
0.1 M EDTA 3 drops 3 drops 3 drops
1% Starch Indicator 1.0 mL 1.0 mL 1.0 mL
0.20M Na2S2O3 1.00 mL 1.00 mL 1.00 mL
KNO3 12.0 mL 24.0 mL 12.0 mL
0.20M KI 24.0 mL 12.0 mL 12.0 mL
Flask #2
0.20M (NH4)2S2O8 12.0 mL 12.0 mL 24.0 mL
Total Volume 50.0 mL 50.0 mL 50.0 mL
Table 2. Concentrations of Stock Solutions
Solution Concentration Solution Concentration
KNO3 0.20 M KI 0.20 M
Na2S2O3 0.20 M Starch indicator ~1%
NH4S2O8 0.20 M EDTA ~0.1 M
The peroxydisulfate, iodide and thiosulfate ions are not found alone but as ammonium,
potassium and sodium salts, respectively.
The KNO3 is added to maintain the ionic strength of the solutions.
The EDTA is added to complex out any spurious metals that might act as a catalyst for the
reaction and change the overall rate.
Rates of Reactions
7
2. Only one experiment at a time can be performed.
3. The components in Flask #1 and Flask #2 for Experiment #1 will be mixed together and
stirred at a slow rate with a magnetic stir bar. Note the speed that the stir bar is spinning
and try to complete all three experiments with the same spin rate.
4. Since temperature affects the rate, it will be important to try and maintain consistent
temperatures.
5. Begin timing right when the two flasks are mixed together. Note the time when the flask
contents turn blue. The color change may not be blue. The color may appear to be purple,
black, blue, or even orange. Just go with it.
6. If you have not seen a color change in 10 min, then something is wrong!
7. IMMEDIATELY add 1.00 mL of the thiosulfate solution (S2O32-) with a volumetric pipet
and continue timing for the next data point. (Do NOT restart the timer; you are recording
cumulative time.)
8. Repeat, adding 1.00 mL of the S2O32- solution each time the solution turns blue until five
data points are collected. Depending on your technique the first data point may need to be
discarded.
9. Repeat the above process for Experiments #2 and #3 being sure to change the
concentration of the reactants as shown in Table 1.
Calculations
During the experiment you are measuring the moles of peroxydisulfate being consumed.
You will plot the concentration (mol/L) of peroxydisulfate remaining in the flask. Since you can
determine the initial number of moles of S2O82- from your initial volumes and concentrations of
reactants (Table 1) and you know the number of moles of S2O82- being consumed as the reaction
progresses, you can determine the moles of S2O82- remaining for each color change of solution
during the reaction. You must convert this to concentration, which means you will be dividing by
the volume in the reaction flask.
The total volume of each of the experiments is determined when the reaction is initiated;
when Flask 2 is poured into Flask 1. Since you are increasing the volume in the flask by 1.00 mL
each time the solution turns blue, you must take this additional volume into account when
computing the concentration of subsequent samples (Sample Calculation 1).
Rates of Reactions
8
Sample Calculation 1. Calculation of Concentration in Trial 1
Initially, (Table 1) you have
0.20 mol (NH%)&S&O’
L
x 0.0120 L = 0.0024 mol (NH%)&S&O’
After the solution turns blue the first time, the amount of remaining (NH4)2S2O8
is:
0.0024 mol (NH%)&S&O’ − 1.0?10(% (NH%)&S&O’ = 0.0024 mol (NH%)&S&O’
This is dissolved in 50 mL so
0.0023 mol (NH%)&S&O’
0.050 L
= 0.046 M (NH%)&S&O’
For the concentration information on S2O82-, the first row on the table should be completed
as shown in the following example (Figure 2).
Initial moles of S2O82-
Aliquot #
Cumulative time
recorded from stopwatch
(min) (sec)
Cumulative
time
converted to
seconds (s)
Mole of
S2O82-
Consumed
Mole of
S2O82-
Remaining
Concentration of
S2O82-
Remaining
(mol/L)
1 1.0 x10-4 mol 0.0023 mol 0.046 M
Figure 2. Sample Table from Report.
After you have completed the first three tables on the Report Sheet, you will use the dilution
formula and the information in Table 1 to determine the initial concentrations of peroxydisulfate
and iodide for each experiment to complete the fourth table on the lab report.
Graphs
You will create a graph for each of the first three tables. In each graph you will plot the
remaining concentration of S2O82- (Molarity) as a function of cumulative time in seconds. Create
a scatter plot for each graph and add a trendline with an equation shown on the graph. The negative
Rates of Reactions
9
slope of the trendline is the rate of the reaction. Note that the rate of a reaction is always a positive
value.
Once you have the rates for all three trials from the slopes of the graphs and the initial
concentrations of the two reactants, peroxydisulfate and iodide, you can determine the order of
each reactant and the overall order of the reaction, the rate constant, and the rate law. The rate
constant should be very similar among the three experiments. The average rate constant value will
be used to write the rate law. The rate law will have the generalized form (Eq. 8).
rate = k [S2O”!
#]’ [I#](
Equation 8
In Eq. 8, a and b are the reaction orders; k is the rate constant. You will solve for a, b, and
k using the experimental data. Use the format option to view at least two significant figures in the
equation for the line. Remember to use the appropriate units for the rate constant, k.
Once you have the rate law, you can determine the rate of the reaction given any
concentrations of the reactants.
You will turn in 3 graphs along with your data sheet and calculations.
Rates of Reactions
10
Rates of Reaction Report Sheet
Name: Partner:
Instructor: Section Code: Date:
15 points total for Tables 1-3.
Experiment 1
Initial moles of S2O82-
Aliquot #
Cumulative time
recorded from stopwatch
(min) (sec)
Cumulative
time
converted to
seconds (s)
Mole of
S2O82-
Consumed
Mole of
S2O82-
Remaining
Concentration of
S2O82-
Remaining
(mol/L)
1
2
3
4
5
Experiment 2
Initial moles of S2O82-
Aliquot #
Cumulative time
recorded from stopwatch
(min) (sec)
Cumulative
time
converted to
seconds (s)
Mole of
S2O82-
Consumed
Mole of
S2O82-
Remaining
Concentration of
S2O82-
Remaining
(mol/L)
1
2
3
4
5
Experiment 3
Initial moles of S2O82-
Aliquot #
Cumulative time
recorded from stopwatch
(min) (sec)
Cumulative
time
converted to
seconds (s)
Mole of
S2O82-
Consumed
Mole of
S2O82-
Remaining
Concentration of
S2O82-
Remaining
(mol/L)
1
2
3
4
5
Rates of Reactions
11
Values for the first two columns of the following table come from using the dilution
formula and the concentrations used (Table 1). Values for the final column come from
the graphs.
Data Analysis
Experiment
Initial [S2O82-]
(mol/L)
2 pts each
Initial [I-]
(mol/L)
2 pts each
Initial rate
(mol/Ls)
5 pts each
1 __________ __________ __________
2 __________ __________ __________
3 __________ __________ __________
Calculations for the order of S2O82- (6 pts)
Calculations for the order of I- (6 pts)
Sample calculations for rate constant, k, (Exp 1) using the orders determined for reactants. (6 pts)
Rates of Reactions
12
Calculate the rate constant, k, for each experiment. Be sure to show units. (3 pts each)
Rate Constant for Experiment 1 ___________
Rate Constant for Experiment 2 ___________
Rate Constant for Experiment 3 ___________
Average Rate Constant ___________
Rate law for this reaction. Show values for k, a, and b in the expression (Eq. 8). (3 pts each)
Using the rate equation determined, what would be the predicted rate of reaction if the
initial concentration of S2O82- were 0.085M and the initial concentration of I- were 0.030M?
Show calculations. (4 pts)
Include all 3 graphs. (18 pts)
