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Competitive Inhibition

Competitive inhibition occurs when an inhibitor molecule competes with the substrate for binding to the enzyme’s active site. This form of inhibition is characterized by the fact that the inhibitor and the substrate cannot bind to the enzyme at the same time, as they share the same binding site.

Key Features of Competitive Inhibition:

  1. Mechanism:
    • The inhibitor molecule resembles the substrate in shape and structure, so it can bind to the enzyme’s active site.
    • When the inhibitor binds, it blocks the substrate from binding to the enzyme and prevents the enzyme from catalyzing the reaction.
    • Importantly, the inhibition can be overcome by increasing the concentration of the substrate, since the substrate will eventually “outcompete” the inhibitor for the active site.
  2. Effect on Reaction Kinetics:
    • Apparent KmK_m: The apparent Michaelis constant (KmK_m) increases because the enzyme’s affinity for the substrate decreases due to competition with the inhibitor. In other words, higher substrate concentrations are needed to achieve the same reaction rate as when no inhibitor is present.
    • VmaxV_\text{max}: The maximum reaction rate (VmaxV_\text{max}) remains unchanged because, at high substrate concentrations, the enzyme becomes saturated with substrate, and the inhibitor’s effect is diminished.
  3. Lineweaver-Burk Plot:
    • In a Lineweaver-Burk plot, competitive inhibition causes the slope to increase (because KmK_m increases), but the y-intercept remains unchanged (because VmaxV_\text{max} is unaffected). This is because the enzyme is still capable of reaching VmaxV_\text{max} if enough substrate is present to outcompete the inhibitor.
    • The x-intercept (which is −1/Km-1/K_m) shifts to the left, indicating that KmK_m has increased.

    The equation for a Lineweaver-Burk plot with competitive inhibition becomes:

    1v=KmVmax⋅1[S]+1Vmax\frac{1}{v} = \frac{K_m}{V_\text{max}} \cdot \frac{1}{[S]} + \frac{1}{V_\text{max}}In the presence of a competitive inhibitor:

    1v=(Km′Vmax)⋅1[S]+1Vmax\frac{1}{v} = \left(\frac{K_m^{\prime}}{V_\text{max}}\right) \cdot \frac{1}{[S]} + \frac{1}{V_\text{max}}where Km′>KmK_m^{\prime} > K_m due to the competition between substrate and inhibitor.

  4. Reversibility:
    • Competitive inhibition is reversible because increasing the concentration of the substrate can overcome the inhibitor’s effects. The inhibition only occurs when the inhibitor is present in sufficient concentrations to outcompete the substrate for enzyme binding.

Mathematical Expression of Competitive Inhibition:

For competitive inhibition, the Michaelis-Menten equation is modified as follows:

v=Vmax[S]Km(1+[I]/Ki)+[S]v = \frac{V_\text{max} [S]}{K_m(1 + [I]/K_i) + [S]}

Where:

As the concentration of the inhibitor increases, the term (1+[I]/Ki)(1 + [I]/K_i) increases, leading to a higher apparent KmK_m, meaning a higher substrate concentration is needed to reach the same reaction rate.

Example of Competitive Inhibition:

Summary of Effects:

Effect Competitive Inhibition
KmK_m Increases (apparent decrease in enzyme affinity for substrate)
VmaxV_\text{max} No change (can still reach maximum rate at high substrate concentration)
Lineweaver-Burk Plot Slope increases; y-intercept remains unchanged

Graphical Representation:


In summary, competitive inhibition is a type of enzyme inhibition where the inhibitor competes with the substrate for the enzyme’s active site. It can be overcome by increasing substrate concentration, and while it increases the apparent KmK_m, it does not change the maximum rate (VmaxV_\text{max}) of the reaction.

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