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13.E: Kinetic Methods (Exercises)

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    1. Equation 13.18 shows how [A]0 is determined using a two-point fixed-time integral method in which the concentration of A for the pseudo-first-order reaction

    \[\mathrm{A + R → P}\]

    is measured at times t1 and t2. Derive a similar equation for the case where the product is monitored under pseudo-first order conditions.

    2. The concentration of phenylacetate can be determined from the kinetics of its pseudo-first order hydrolysis reaction in an ethylamine buffer. When a standard solution of 0.55 mM phenylacetate is analyzed, the concentration of phenylacetate after 60 s is 0.17 mM. When an sample is analyzed the concentration of phenylacetate remaining after 60 s is 0.23 mM. What is the initial concentration of phenylacetate in the sample?

    3. In the presence of acid, solutions of iodide are oxidized by hydrogen peroxide

    \[\ce{2I-}(aq) + \ce{H2O2}(aq) + \ce{2H3O+}(aq) → \ce{4H2O}(l) + \ce{I2}(aq)\]

    When I and H3O+ are present in excess we can use the kinetics of the reaction—which is pseudo-first order in H2O2—to determine the concentration of H2O2 by following the production of I2 with time. In one analysis the absorbance of the solution was measured after 240 s at 348 nm. Analysis of a set of standard solutions of H2O2 gives the results shown in the following table.

    [H2O2] (μM)

    absorbance

    100.0

    0.236

    200.0

    0.471

    400.0

    0.933

    800.0

    1.872

    What is the concentration of H2O2 in a sample if its absorbance is 0.669 after 240 s?

    4. The concentration of chromic acid can be determined by reducing it with an alcohol under conditions that are pseudo-first order in analyte. One approach is to monitor the reaction mixture’s absorbance at a wavelength of 355 nm. A standard of 5.1 × 10–4 M chromic acid yields absorbances of 0.855 and 0.709 at 100 s and 300 s after the reaction’s initiation. When a sample with an unknown amount of chromic acid is analyzed under identical conditions, the absorbances are 0.883 and 0.706. What is the concentration of chromic acid in the sample?

    5. Malmstadt and Pardue developed a variable time method for the determination of glucose based on its oxidation by the enzyme glucose oxidase.22 To monitor the reaction’s progress, iodide is added to the samples and standards. The H2O2 produced by the oxidation of glucose reacts with I, forming I2 as a product. The time required to produce a fixed amount of I2 is determined spectrophotometrically. The following data was reported for a set of calibration standards

    [glucose] (ppm) time (s)
    5.0 146.5 150.0 149.6
    10.0 69.2 67.1 66.0

    20.0

    34.8

    35.0

    34.0

    30.0

    22.3

    22.7

    22.6

    40.0

    16.7

    16.5

    17.0

    50.0

    13.3

    13.3

    13.8

    To verify the method a 1.00-mL aliquot of a standard solution of 40.0 ppm glucose was added to 1.00 mL of the combined reagents, requiring 34.6 s to produce the same extent of reaction. Determine the concentration of glucose in the standard and the percent error for the analysis.

    6. Deming and Pardue studied the kinetics for the hydrolysis of p-nitrophenyl phosphate by the enzyme alkaline phosphatase.23 The reaction’s progress was monitored by measuring the absorbance of p-nitrophenol, which is one of the reaction’s products. A plot of the reaction’s rate (with units of μmol mL–1 sec–1) versus the volume, V, in milliliters of a serum calibration standard containing the enzyme, yielded a straight line with the following equation.

    \[\mathrm{rate} = 2.7×10^{-7} + 3.485 × 10^{-5}\: V\]

    A 10.00-mL sample of serum is analyzed, yielding a rate of 6.84 × 10–5 μmol mL–1 sec–1. How much more dilute is the enzyme in the serum sample than in the serum calibration standard?

    7. The following data were collected for a reaction known to be pseudo-first order in analyte, A, during the time in which the reaction is monitored.

    time (s)

    [A]t (mM)

    2

    1.36

    4

    1.24

    6

    1.12

    8

    1.02

    10

    0.924

    12

    0.838

    14

    0.760

    16

    0.690

    18

    0.626

    20

    0.568

    What are the rate constant and the initial concentration of analyte in the sample?

    8. The enzyme acetylcholinesterase catalyzes the decomposition of acetylcholine to choline and acetic acid. Under a given set of conditions the enzyme has a Km of 9 × 10–5 M and a k2 of 1.4 × 104 s–1. What is the concentration of acetylcholine in a sample if the rate of reaction in the presence of 6.61 × 10–7 M enzyme is 12.33 μM s–1? You may assume that the concentration of acetylcholine is significantly smaller than Km.

    9. The enzyme fumarase catalyzes the stereospecific addition of water to fumarate to form l-malate. A standard 0.150 μM solution of fumarase has a rate of reaction of 2.00 μM min–1 under conditions in which the substrate’s concentration is significantly greater than Km. The rate of reaction for a sample under identical condition is 1.15 μM min–1. What is the concentration of fumarase in the sample?

    10. The enzyme urease catalyzes the hydrolysis of urea. The rate of this reaction was determined for a series of solutions in which the concentration of urea was changed while maintaining a fixed urease concentration of 5.0 μM. The following data were obtained.

    [urea] (mM)

    rate (mM s–1)

    0.100

    6.25

    0.200

    12.5

    0.300

    18.8

    0.400

    25.0

    0.500

    31.2

    0.600

    37.5

    0.700

    43.7

    0.800

    50.0

    0.900

    56.2

    1.00

    62.5

    Determine the values of Vmax, k2, and Km for urease.

    11. To study the effect of an enzyme inhibitor Vmax and Km are measured for several concentrations of inhibitor. As the concentration of the inhibitor increases Vmax remains essentially constant, but the value of Km increases. Which mechanism for enzyme inhibition is in effect?

    12. In the case of competitive inhibition, the equilibrium between the enzyme, E, the inhibitor, I, and the enzyme–inhibitor complex, EI, is described by the equilibrium constant KI. Show that for competitive inhibition the equation for the rate of reaction is

    \[\dfrac{d[\ce P]}{dt} =\dfrac{V_\ce{max}[\ce S]}{K_\ce{m}\left\{1 + ([\ce I] / K_\ce{I})\right\} + [\ce S]}\]

    where KI is the formation constant for the EI complex

    \[\mathrm{E + I ⇋ EI}\]

    You may assume that k2 << k–1.

    13. Analytes A and B react with a common reagent R with first-order kinetics. If 99.9% of A must react before 0.1% of B has reacted, what is the minimum acceptable ratio for their respective rate constants?

    14. A mixture of two analytes, A and B, is analyzed simultaneously by monitoring their combined concentration, C = [A] + [B], as a function of time when they react with a common reagent. Both A and B are known to follow first-order kinetics with the reagent, and A is known to react faster than B. Given the data in the following table, determine the initial concentrations of A and B, and the first-order rate constants, kA and kB.

    time (min)

    [C] (mM)

    1

    0.313

    6

    0.200

    11

    0.136

    16

    0.098

    21

    0.074

    26

    0.058

    31

    0.047

    36

    0.038

    41

    0.032

    46

    0.027

    51

    0.023

    56

    0.019

    61

    0.016

    66

    0.014

    71

    0.012

    15. Table 13.1 provides a list of several isotopes commonly used as tracers. The half-lives for these isotopes also are listed. What is the rate constant for the radioactive decay of each isotope?

    16. 60Co is a long-lived isotope (t1/2 = 5.3 yr) frequently used as a radiotracer. The activity in a 5.00-mL sample of a solution of 60Co is 2.1 × 107 disintegrations/sec. What is the molar concentration of 60Co in the sample?

    17. The concentration of Ni a new alloy is determined by a neutron activation analysis. A 0.500-g sample of the alloy and a 1.000-g sample of a standard alloy that is 5.93% w/w Ni are irradiated with neutrons in a nuclear reactor. When irradiation is complete, the sample and standard are allowed to cool and the gamma ray activities measured. Given that the activity is 1020 cpm for the sample and 3540 cpm for the standard, determine the %w/w Ni in the alloy.

    18. The vitamin B12 content of a multivitamin tablet is determined by the following procedure. A sample of 10 tablets is dissolved in water and diluted to volume in a 100-mL volumetric flask. A 50.00-mL portion is removed and treated with 0.500 mg of radioactive vitamin B12 having an activity of 572 cpm. After homogenization, the vitamin B12 in the sample is isolated and purified, producing 18.6 mg with an activity of 361 cpm. Calculate the milligrams of vitamin B12 in a multivitamin tablet.

    19. The oldest sample that can be dated by 14C is approximately 30 000 years. What percentage of the 14C still remains after this time span?

    20. Potassium–argon dating is based on the nuclear decay of 40K to 40Ar (t1/2 = 1.3 × yr). If no 40Ar is originally present in the rock, and if 40Ar can not escape to the atmosphere, then the relative amounts of 40K and 40Ar can be used to determine the age of the rock. When a 100.0-mg rock sample was analyzed it contains 4.63 × 10–6 mol of 40K and 2.09 × 10–6 mol 40Ar. How old is the rock sample?

    21. The steady state activity for 14C is 15 cpm of carbon. If counting is limited to 1 hr, what mass of carbon is needed to give a percent relative standard deviation of 1% for the sample’s activity? How long must we monitor the radioactive decay from a 0.50-gram sample of carbon to give a percent relative standard deviation of 1% for the activity?

    22. To improve the sensitivity of a FIA analysis you might do any of the following: inject a larger volume of sample, increase the flow rate, decrease the length and the diameter of the manifold’s tubing, or merge separate channels before injecting the sample. For each action, explain why it leads to an improvement in sensitivity.

    23. Figure 13.31 shows a fiagram for a solution of 50.0-ppm PO43– using the method in Representative Method 13.2. Determine values for h, ta, T, t ′, ∆t, and T ′. What is the sensitivity of this FIA method, assuming a linear relationship between absorbance and concentration? How many samples can be analyzed per hour?

    Figure13.31.jpg

    Figure 13.31 Diagram for Problem 13.23.

    23. A sensitive method for the flow injection analysis of Cu2+ is based on its ability to catalyze the oxidation of di-2-pyridyl ketone hydrazone (DPKH).24 The product of the reaction is fluorescent and can be used to generate a signal when using a fluorimeter as a detector. The yield of the reaction is at a maximum when the solution is made basic with NaOH. The fluorescence, however, is greatest in the presence of HCl. Sketch an appropriate FIA manifold for this analysis.

    24. The concentration of chloride in seawater can be determined by a flow injection analysis. The analysis of a set of calibration standards gives the following results.

    [Cl] (ppm)

    absorbance

    5.00

    0.057

    10.00

    0.099

    20.00

    0.230

    30.00

    0.354

    40.00

    0.478

    50.00

    0.594

    75.00

    0.840

    A 1.00-mL sample of seawater is placed in a 500-mL volumetric flask and diluted to volume with distilled water. When injected into the flow injection analyzer an absorbance of 0.317 is measured. What is the concentration of Cl in the sample?

    25. Ramsing and co-workers developed an FIA method for acid–base titrations using a carrier stream consisting of 2.0 × 10–3 M NaOH and the acid–base indicator bromothymol blue.25 Standard solutions of HCl were injected, and the following values of ∆t were measured from the resulting fiagrams.

    [HCl] (M)

    t (s)

    [HCl] (M)

    t (s)

    0.008

    3.13

    0.080

    7.71

    0.010

    3.59

    0.100

    8.13

    0.020

    5.11

    0.200

    9.27

    0.040

    6.39

    0.400

    10.45

    0.060

    7.06

    0.600

    11.40

    A sample with an unknown concentration of HCl is analyzed five times, giving values of 7.43, 7.28, 7.41, 7.37, and 7.33 s for ∆t. Determine the concentration of HCl in the sample and its 95% confidence interval.

    26. Milardovíc and colleagues used a flow injection analysis method with an amperometric biosensor to determine the concentration of glucose in blood.26 Given that a blood sample that is 6.93 mM in glucose has a signal of 7.13 nA, what is the concentration of glucose in a sample of blood if its signal is 11.50 nA?

    27. Fernández-Abedul and Costa-García developed an FIA method for detecting cocaine in samples using an amperometric detector.27 The following signals (arbitrary units) were collected for 12 replicate injections of a 6.2 × 10–6 M sample of cocaine.

    24.5

    24.1

    24.1

    23.8

    23.9

    25.1

    23.9

    24.8

    23.7

    23.3

    23.2

    23.2

    (a) What is the relative standard deviation for this sample?

    (b) If it took 10.5 min to obtain these replicate analyses, what is the expected sample throughput in samples per hour?

    (c) The following calibration data are available

    [cocaine] (μM) signal (arb. units)

    0.18

    0.8

    0.36

    2.1

    0.60

    2.4

    0.81 3.2
    1.0 4.5
    2.0 8.1
    4.0 14.4
    6.0 21.6
    8.0 27.1
    10.0 32.9

    In a typical analysis a 10.0-mg sample is dissolved in water and diluted to volume in a 25-mL volumetric flask. A 125-μL aliquot is transferred to a 25-mL volumetric flask and diluted to volume with a pH 9 buffer. When injected into the flow injection apparatus a signal of 21.4 (arb. units) is obtained. What is the %w/w cocaine in the sample?

    28. Holman, Christian, and Ruzicka described an FIA method for determining the concentration of H2SO4 in nonaqueous solvents.28 Agarose beads (22–45 μm diameter) with a bonded acid–base indicator are soaked in NaOH and immobilized in the detector’s flow cell. Samples of H2SO4 in n-butanol are injected into the carrier stream. As a sample passes through the flow cell, an acid–base reaction takes place between H2SO4 and NaOH. The endpoint of the neutralization reaction is signaled by a change in the bound indicator’s color and is detected spectrophotometrically. The elution volume needed to reach the titration’s endpoint is inversely proportional to the concentration of H2SO4; thus, a plot of endpoint volume versus [H2SO4]–1 is linear. The following data is typical of that obtained using a set of external standards.

    [H2SO4] (mM) end point volume (mL)

    0.358

    0.266

    0.436

    0.227

    0.560

    0.176

    0.752

    0.136

    1.38

    0.075

    2.98

    0.037

    5.62

    0.017

    What is the concentration of H2SO4 in a sample if its endpoint volume is 0.157 mL?

    13.5.3 Solutions to Practice Exercises

    Practice Exercise 13.1

    Figure 13.32 shows the calibration curve and calibration equation for the external standards. Substituting 2.21 × 10–3 M for [CH3NO2]t=2s gives [CH3NO2]0 as 5.21 × 10–2 M.

    Figure13.32.jpg

    Figure 13.32 Calibration curve and calibration equation for Practice Exercise 13.1.

    Click here to return to the chapter.

    Practice Exercise 13.2

    Figure 13.33 shows the calibration curve and calibration equation for the external standards. Substituting 3.52 × 10–2 M for [Fe(SCN)2+]t=10s gives [SCN]0 as 6.87 × 10–2 M.

    Figure13.33.jpg

    Figure 13.33 Calibration curve and calibration equation for Practice Exercise 13.2.

    Click here to return to the chapter.

    Practice Exercise 13.3

    Figure 13.34 shows the Lineweaver–Burk plot and equation for the data in Practice Exercise 13.3. The y-intercept of 9.974 min/∆AU is equivalent to 1/Vmax; thus, Vmax is 0.10 ∆AU/min. The slope of 11.89 min/∆AU•mM is equivalent to Km/Vmax; thus, Km is 1.2 mM.

    Figure13.34.jpg

    Figure 13.34 Lineweaver–Burk plot and equation for Practice Exercise 13.3.

    Click here to return to the chapter.

    Practice Exercise 13.4

    Figure 13.35 shows the Lineweaver–Burk plots for the two sets of data in Practice Exercise 13.4. The nearly identical x-intercepts suggests that phenylthiourea is a noncompetitive inhibitor.

    Figure13.35.jpg

    Figure 13.35 Lineweaver–Burk plots for Practice Exercise 13.4.

    Click here to return to the chapter.

    Contributors and Attributions

    David Harvey (DePauw University)


    13.E: Kinetic Methods (Exercises) is shared under a CC BY-NC-SA 4.0 license and was authored, remixed, and/or curated by LibreTexts.

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