Biochemistry
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Transcript of Biochemistry
BiochemistryChapter 13: Enzymes
Chapter 14: Mechanisms of enzyme action
Chapter 15: Enzyme regulation
Chapter 17: Metabolism- An overview
Chapter 18: Glycolysis
Chapter 19: The tricarboxylic acid cycle
Chapter 20: Electron transport & oxidative phosphorylation
Chapter 21: Photosynthesis
http://www.aqua.ntou.edu.tw/chlin/
Chapter 13
Enzymes – Kinetics and Specificity
Biochemistry
by
Reginald Garrett and Charles Grisham
What are enzymes, and what do they do?
Biological Catalysts Increase the velocity of chemical
reactions
What are enzymes, and what do they do?• Thousands of chemical reactions are proceeding very
rapidly at any given instant within all living cells• Virtually all of these reactions are mediated by
enzymes--proteins (and occasionally RNA) specialized to catalyze metabolic reactions
• Most cells quickly oxidize glucose, producing carbon dioxide and water and releasing lots of energy:
C6H12O6 + 6 O2 6 CO2 + 6 H2O + 2870 kJ of energy
• It does not occur under just normal conditions• In living systems, enzymes are used to accelerate and
control the rates of vitally important biochemical reactions
Figure 13.1Reaction profile showing the large G‡ for glucose oxidation, free energy change of -2,870 kJ/mol; catalysts lower G‡, thereby accelerating rate.
Enzymes are the agents of metabolic function• Enzymes form metabolic pathways by which
– Nutrient molecules are degraded
– Energy is released and converted into metabolically useful forms
– Precursors are generated and transformed to create the literally thousands of distinctive biomolecules
• Situated at key junctions of metabolic pathways are specialized regulatory enzymes capable of sensing the momentary metabolic needs the cell and adjusting their catalytic rates accordingly
Figure 13.2The breakdown of glucose by glycolysis provides a prime example of a metabolic pathway. Ten enzymes mediate the reactions of glycolysis. Enzyme 4, fructose 1,6, biphosphate aldolase, catalyzes the C-C bond- breaking reaction in this pathway.
13.1 – What Characteristic Features Define Enzymes?
• Enzymes are remarkably versatile biochemical catalyst that have in common three distinctive features:
1. Catalytic power– The ratio of the enzyme-catalyzed rate of a reaction to the
uncatalyzed rate
2. Specificity– The selectivity of enzymes for their substrates
3. Regulation– The rate of metabolic reactions is appropriate to cellular
requirements
• Enzymes can accelerate reactions as much as 1016 over uncatalyzed rates!
• Urease is a good example:
– Catalyzed rate: 3x104/sec
– Uncatalyzed rate: 3x10 -10/sec
– Ratio is 1x1014 (catalytic power)
Catalytic power
Specificity
• Enzymes selectively recognize proper substances over other molecules
• The substances upon which an enzyme acts are traditionally called substrates
• Enzymes produce products in very high yields - often much greater than 95%
Specificity• The selective qualities of an enzyme are
recognized as its specificity
• Specificity is controlled by structure of enzyme – the unique fit of substrate with enzyme controls the
selectivity for substrate and the product yield
• The specific site on the enzyme where substrate binds and catalysis occurs is called the active site
Regulation • Regulation of an enzyme activity is essential to the
integration and regulation of metabolism• Because most enzymes are proteins, we can
anticipate that the functional attributes of enzymes are due to the remarkable versatility found in protein structure
• Enzyme regulation is achieved in a variety of ways, ranging from controls over the amount of enzyme protein produced by the cell to more rapid, reversible interactions of the enzyme with metabolic inhibitors and activators (chapter 15)
Nomenclature• Traditionally, enzymes often were named by
adding the suffix -ase to the name of the substrate upon which they acted: Urease for the urea-hydrolyzing enzyme or phosphatase for enzymes hydrolyzing phosphoryl groups from organic phosphate compounds– Resemblance to their activity: protease for the
proteolytic enzyme – Trypsin and pepsin
Nomenclature• International Union of Biochemistry and Molecular Biology
(IUBMB)http://www.chem.qmw.ac.uk/iubmb/enzyme/– Enzymes Commission number: EC #.#.#.#
• A series of four number severe to specify a particular enzyme– First number is class (1-6)– Second number is subclass– Third number is sub-subclass– Fourth number is individual entry
Classification of protein enzymes1.Oxidoreductases catalyze oxidation-reduction reactions2.Transferases catalyze transfer of functional groups from one molecule to another 3.Hydrolases catalyze hydrolysis reactions4.Lyases catalyze removal of a group from or addition of a group to a double bond, or other cleavages involving electron rearrangement5.Isomerases catalyze intramolecular rearrangement (isomerization reactions)6.Ligases catalyze reactions in which two molecules are joined (formation of bonds)
• For example, ATP:D-glucose-6-phosphotransferase (glucokinase) is listed as EC 2.7.1.2.
ATP + D-glucose ADP + D-glucose-6-phosphate– A phosphate group is transferred from ATP to C-6-OH
group of glucose, so the enzyme is a transferase (class 2)– Transferring phosphorus-containing groups is subclass 7– An alcohol group (-OH) as an acceptor is sub-subclass 1– Entry 2 EC 2.7.1.1 hexokinase
EC 2.7.1.2 glucokinaseEC 2.7.1.3 ketohexokinaseEC 2.7.1.4 fructokinaseEC 2.7.1.5 rhamnulokinaseEC 2.7.1.6 galactokinaseEC 2.7.1.7 mannokinase EC 2.7.1.8 glucosamine kinase . ...EC 2.7.1.156 adenosylcobinamide kinase
• Many enzymes require non-protein components called coenzymes or cofactors to aid in catalysis
1. Coenzymes: many essential vitamins are constituents of coenzyme
2. Cofactors: metal ions
metalloenzymes
• Holoenzyme: apoenzyme (protien) + prosthetic group
Other Aspects of Enzymes
• Mechanisms - to be covered in Chapter 14
• Regulation - to be covered in Chapter 15
• Coenzymes - to be covered in Chapter 17
13.2 – Can the Rate of an Enzyme-Catalyzed Reaction Be Defined in a
Mathematical Way?• Kinetics is concerned with the rates of chemical
reactions• Enzyme kinetics addresses the biological roles of
enzymatic catalyst and how they accomplish their remarkable feats
• In enzyme kinetics, we seek to determine the maximum reaction velocity that the enzyme can attain and its binding affinities for substrates and inhibitors
• These information can be exploited to control and manipulate the course of metabolic events
Chemical kineticsA P
(A I J P)
• rate or velocity (v)v = d[P] / dt or v = -d[A] / dt
• The mathematical relationship between reaction rate and concentration of reactant(s) is the rate law v = -d[A] / dt = k [A]
• k is the proportional constant or rate constant (the unit of k is sec-1)
Chemical kinetics
v = -d[A] / dt = k [A]
• v is first-order with respect to A The order of this reaction is a first-order
reaction
• molecularity of a reactionThe molecularity of this reaction equal 1
(unimolecular reaction)
Figure 13.4Plot of the course of a first-order reaction. The half-time, t1/2, is the time for one-half of the starting amount of A to disappear.
Chemical kineticsA + B P + Q
• The molecularity of this reaction equal 2 (bimolecular reaction)
• The rate or velocity (v)v = -d[A] / dt = -d[B] / dt = d[P] / dt = d[Q] / dt
• The rate law is v = k [A] [B]
• The order of this reaction is a second-order reaction
• The rate constant k has the unit of M-1 sec-1)
The Transition State• Reaction coordinate: a generalized measure of the
progress of the reaction• Free energy (G)• Standard state free energy (25 , 1 atm, 1 M/each)℃• Transition state
– The transition state represents an intermediate molecular state having a high free energy in the reaction.
• Activation energy:– Barriers to chemical reactions occur because a reactant
molecule must pass through a high-energy transition state to form products.
– This free energy barrier is called the activation energy.
Decreasing G‡ increase reaction rate
Two general ways may accelerate rates of chemical reactions
1. Raise the temperatureThe reaction rate are doubled by a 10℃
2. Add catalysts– True catalysts participate in the reaction, but are
unchanged by it. Therefore, they can continue to catalyze subsequent reactions.
– Catalysts change the rates of reactions, but do not affect the equilibrium of a reaction.
(a) Raising the temperate (b) Adding a catalyst
• Most biological catalysts are proteins called enzymes (E).
• The substance acted on by an enzyme is called a substrate (S).– Enzymes accelerate reactions by lowering the
free energy of activation – Enzymes do this by binding the transition state
of the reaction better than the substrate – The mechanism of enzyme action in Chapter
14
13.3 – What Equations Define the Kinetics of Enzyme-Catalyzed
Reactions?1. The Michaelis-Menten Equation
2. The Lineweaver-Burk double-reciprocal plot
3. Hanes-Woolf plot
Vmax [S]
Km + [S]v =
• Figure 13.7 Substrate saturation curve for an enzyme-catalyzed reaction. The amount of enzyme is constant, and the velocity of the reaction is determined at various substrate concentrations. The reaction rate, v, as a function of [S] is described by a rectangular hyperbola. At very high [S], v = Vmax. The H2O molecule provides a rough guide to scale. The substrate is bound at the active site of the enzyme.
The Michaelis-Menten Equation• Louis Michaelis and Maud Menten's theory • It assumes the formation of an enzyme-substrate
complex (ES)
E + S ES
• At equilibriumk-1 [ES] = k1 [E] [S]
And
Ks = =
k1
k-1
[E] [S]
[ES]
k-1
k1
The Michaelis-Menten Equation
E + S ES E + P
• The steady-state assumptionES is formed rapidly from E + S as it disappears by
dissociation to generate E + S and reaction to form E + P
d[ES] dt• That is; formation of ES = breakdown of ES
k1 [E] [S] = k-1[ES] + k2[ES]
k1
k-1
= 0
k2
Figure 13.8Time course for the consumption of substrate, the formation of product, and the establishment of a steady-state level of the enzyme-substrate [ES] complex for a typical enzyme obeying the Michaelis-Menten, Briggs-Haldane models for enzyme kinetics. The early stage of the time course is shown in greater magnification in the bottom graph.
The Michaelis-Menten Equation k1 [E] [S] = k-1[ES] + k2[ES] = (k-1+ k2) [ES]
[ES] = ( ) [E] [S]
Km =
Km is Michaelis constant
Km [ES] = [E] [S]
k-1+ k2
k1
k-1+ k2
k1
The Michaelis-Menten Equation Km [ES] = [E] [S]
Total enzyme, [ET] = [E] + [ES]
[E] = [ET] – [ES]
Km [ES] = ([ET] – [ES]) [S] = [ET] [S] – [ES] [S]
Km [ES] + [ES] [S] = [ET] [S]
(Km + [S]) [ES] = [ET] [S]
[ES] = Km + [S]
[ET] [S]
The Michaelis-Menten Equation
[ES] =
The rate of product formation is
v = k2 [ES]
v =
Vmax = k2 [ET] v =
Km + [S]
[ET] [S]
Km + [S]
k2 [ET] [S]
Km + [S]
Vmax [S]
Understanding Km
• The Michaelis constant Km measures the substrate concentration at which the reaction rate is Vmax/2.
• associated with the affinity of enzyme for substrate
• Small Km means tight binding; high Km means weak binding
v =
When v = Vmax / 2
Vmax Vmax [S]
2 Km + [S]
Km + [S] = 2 [S]
[S] = Km
Km + [S]
Vmax [S]
=
Understanding Vmax
The theoretical maximal velocity • Vmax is a constant • Vmax is the theoretical maximal rate of the reaction -
but it is NEVER achieved in reality • To reach Vmax would require that ALL enzyme
molecules are tightly bound with substrate • Vmax is asymptotically approached as substrate is
increased
The dual nature of the Michaelis-Menten equation
Combination of 0-order and 1st-order kinetics
• When S is low ([s] << Km), the equation for rate is 1st order in S
• When S is high ([s] >>Km), the equation for rate is 0-order in S
• The Michaelis-Menten equation describes a rectangular hyperbolic dependence of v on S
• The actual estimation of Vmax and consequently Km is only approximate from each graph
The turnover numberA measure of catalytic activity
• kcat, the turnover number, is the number of substrate molecules converted to product per enzyme molecule per unit of time, when E is saturated with substrate.
• kcat is a measure of its maximal catalytic activity
• If the M-M model fits, k2 = kcat = Vmax/Et
• Values of kcat range from less than 1/sec to many millions per sec (Table 13.4)
The catalytic efficiencyName for kcat/Km
An estimate of "how perfect" the enzyme is
• kcat/Km is an apparent second-order rate constant
v = (kcat/Km) [E] [S]
• kcat/Km provides an index of the catalytic efficiency of an enzyme
• kcat/Km = k1 k2 / (k-1 + k2)
• The upper limit for kcat/Km is the diffusion limit - the rate at which E and S diffuse together
Linear Plots of the Michaelis-Menten Equation
• Lineweaver-Burk plot
• Hanes-Woolf plot
• Smaller and more consistent errors across the plot
V =
1 Km + [S]V Vmax [S]
Vmax [S]
Km + [S]
=
13.4 – What Can Be Learned from the Inhibition of Enzyme Activity?
• Enzymes may be inhibited reversibly or irreversibly
• Reversible inhibitors may bind at the active site (competitive) or at some other site (noncompetitive)
• Enzymes may also be inhibited in an irreversible manner
– Penicillin is an irreversible suicide inhibitor
Competitive inhibition
km = km (1 + )app
E + S ES E + P+I
EI
k-1
k3
k1 kcat
V = = = kcat [E]t [S]
km (1 + [I]/ KI) + [S]
kcat [E]t [S] Vmax[S]
km + [S] km + [S]app app
[I]
KI
A competitive inhibitor competes with substrate for the binding site. It changes the apparent km.
k-3
KI= k-3 / k3
Figure 13.13Lineweaver-Burk plot of competitive inhibition, showing lines for no I, [I], and 2[I]. Note that when [S] is infinitely large (1/[S] 0), Vmax is the same, whether I is present of not.
mI
-1-intercept
[I]K 1 +
K
x
Figure 13.14Structures of succinate, the substrate of succinate dehydrogenase (SDH), and malonate, the competitive inhibitor. Fumarate (the product of SDH action on succinate) is also shown.
Noncompetitive inhibition
E + S ES E + P+ +I I
EI + S EIS
k-1
k3
k1 kcat
k-1
k1
Vmax = Vmax (1 + )app
V= = = {kcat (1 + [I]/ KI)} [E]t [S]
km + [S]
kcat [E]t [S] Vmax [S]
km + [S] km + [S]
app app
[I]
KI
k-3 k-3k3
Figure 13.15Lineweaver-Burk plot of pure noncompetitive inhibition. Note that I does not alter Km but that it decreases Vmax. In the presence of I, the y-intercept is equal to (1/Vmax)(1 + I/KI).
KI = KI’
Figure 13.16Lineweaver-Burk plot of mixed noncompetitive inhibition. Note that both intercepts and the slope change in the presence of I. (a) When KI is less than KI'; (b) when KI is greater than KI'.
KI = KI’
E + S ES E + P + I
EIS
k-1
k1 kcat
k-3k3
Uncompetitive inhibition
Figure 13.17Lineweaver-Burk plot of pure uncompetitive inhibition. Note that I does not alter Km but that it decreases Vmax. In the presence of I, the y-intercept is equal to (1/Vmax)(1 + I/KI).
Irreversible inhibition
• Irreversible inhibition occurs when substances combine covalently with enzymes so as to inactivate them irreversibly.
• Suicide substrates are inhibitory substrate analogs designed, via normal catalytic actions of the enzyme, a very reactive group is generated. This reactive group then forms a covalent bond with a nearby functional group within the active site of the enzyme, thereby causing irreversible inhibition
• Almost all irreversible enzyme inhibitors are toxic substances, either natural or synthetic. Such as penicillin
Figure 13.18Penicillin is an irreversible inhibitor of the enzyme glycoprotein peptidase, which catalyzes an essential step in bacterial cell wall synthesis.
13.5 - What Is the Kinetic Behavior of Enzymes Catalyzing Bimolecular
Reactions?• Enzymes often use two (or more) substrates
Bisubstrate reactions:
A + B P + Q
1 Reactions may be sequential or single-displacement reactions (both A and B are bound to the enzyme)
E + A + B AEB PEQ E + P + Q– And they can be random or ordered
2 Ping-pong or double-displacement reactions
enzyme
Figure 13.19 Single-displacement bisubstrate mechanism.
The conversion of AEB to PEQ is the rate-limiting step in random, single-displacement reactions
Figure 13.20 Random, single-displacement bisubstrate mechanisms where A does not affect B binding, and vice versa
In an ordered, single-displacement reaction
Similar to 1st-order reaction
double-displacement (ping-pong) reactions
Glutamate:aspartate aminotransferase
13.6 – How Can Enzymes Be So Specific?
• “Lock and key” hypothesis was the first explanation for specificity
• “Induced fit” provides a more accurate description
• Induced fit favors formation of the transition-state intermediate
Figure 13.24 A drawing, roughly to scale, of H2O, glycerol, glucose, and an idealized hexokinase molecule
13.7 – Are All Enzymes Proteins?
Relatively new discoveries • RNA molecules that are catalytic have been termed
“Ribozymes” – Examples: RNase P and peptidyl transferase– The ribosome is a ribozyme
• Antibody molecules can have catalytic activity (called Abzymes) - antibodies raised to bind the transition state of a reaction of interest
Figure 13.25RNA splicing in Tetrahymena rRNA maturation: (a) the guanosine-mediated reaction involved in the autocatalytic excision of the Tetrahymena rRNA intron, and (b) the overall splicing process. The cyclized intron is formed via nucleophilic attack of the 3'-OH on the phosphodiester bond that is 15 nucleotides from the 5'-GA end of the spliced-out intron. Cyclization frees a linear 15-mer with a 5'-GA end.
Figure 13.26 (a) The 50S subunit from H. marismortui. (b) The aminoacyl-tRNA (yellow) and the peptidyl-tRNA (orange) in the peptidyl transferase active site.
The cyclic phosphonate ester analog of the cyclic transition state
13.8 Is It Possible to Design An Enzyme to Catalyze Any Desired Reaction?
• A known enzyme can be “engineered” by in vitro mutagenesis, replacing active site residues with new ones that might catalyze a desired reaction
• Another approach attempts to design a totally new protein with the desired structure and activity– This latter approach often begins with studies “in
silico” – i.e., computer modeling– Protein folding and stability issues make this approach
more difficult– And the cellular environment may provide
complications not apparent in the computer modeling
Figure 13.29 cis-1,2-Dichloroethylene (DCE) is an industrial solvent that poses hazards to human health.
Site-directed mutations (F108L, I129L, and C248I) have enabled the conversion of a bacterial epoxide hydrolase to catalyze the chlorinated epoxide hydrolase reaction.
rapidly limited