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Noncompartmental Models
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Introduction
• The noncompartmental approach for data analysis does not require any specific compartmental model for the system (body) and can be applied to virtually any pharmacokinetic data.
• There are various noncompartmental approaches, including statistical moment analysis, system analysis, or the noncompartmental recirculatory model
• The main purpose of the noncompartmental approach is to estimate various pharmacokinetic parameters, such as systemic clearance, volume of distribution at steady state, mean residence time, and bioavailability without assuming or understanding any structural or mechanistic properties of the pharmacokinetic behavior of a drug in the body
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Introduction
• In addition, many noncompartmental methods allow the estimation of those pharmacokinetic parameters from drug concentration profiles without the complicated, and often subjective, nonlinear regression processes required for the compartmental models
• Owing to this versatility and ruggedness, the noncompartmental approach is a primary pharmacokinetic data analysis method for the pharmaceutical industry
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Statistical moment theory
• Suppose one could observe a single molecule, from the time it is administered into the body ( t = 0) until it is eventually eliminated ( t = tel )
• Clearly, tel is not predictable• This individual molecule could be eliminated
during the first minute or could reside in the body for weeks. If, however, one looks at a large number of molecules collectively, their behavior appears much more regular
• The collective, or mean time of residence, of all the molecules in the dose, is called the mean residence time (MRT).
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Mean Residence Time (MRT)
• A mean time interval during which a drug molecule resides in the body before being excreted
0
0
).(
).(
dttC
dttCt
AUC
AUMCMRT
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AUC vs. AUMC
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Estimating AUC and AUMCLinear trapezoidal method
0 t1 t2 t3 tlast
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Estimating AUC and AUMCLinear trapezoidal method
2)( 12
1221
CCttAUC tt
2)( 1122
1221
CtCtttAUMC tt
• For samples until the last observed concentration (t2<= tlast)
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• For the last observed sample and infinity (t2= ∞)
• Clast is the last observed conc. at time tlast ,λ is the slope of the terminal phase of the plasma drug concentration-time profile on a semilog scale (i.e. log(Conc) vs. time)
Estimating AUC and AUMCLinear trapezoidal method
last
t
CAUC
last
2lastlastlast
t
CCtAUMC
last
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Estimating Pharmacokinetic Parameters with Moment Analysis
A. Clearance: The systemic clearance (Cl) of a drug can be estimated as the intravenous dose (Div) divided by the AUC after intravenous bolus administration (AUCiv):
iv
iv
AUC
DCl
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Estimating Pharmacokinetic Parameters with Moment Analysis
B. Volume of Distribution at Steady State: The volume of drug distribution at steady state (Vdss) can be estimated as the product of MRT after intravenous bolus injection (MRTiv) and CI:
iv
iv
iv
ivivSS AUC
D
AUC
AUMCClMRTVD
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Estimating Pharmacokinetic Parameters with Moment Analysis
C. Bioavailability. Bioavailability (F) of a drug generally refers to the fraction of a dose administered via a route other than intravenous injection that reaches the systemic circulation:
iv
oral
oral
iv
AUC
AUC
D
DF
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Estimating Pharmacokinetic Parameters with Moment Analysis
D.Mean Residence Time. The mean residence time (MRT) is the average time spent by a single drug molecule in the body before being excreted via elimination processes, regardless of the route of administration.
• The MRT values after administration by routes other than intravenous bolus injection are always greater than MRTiv
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Estimating Pharmacokinetic Parameters with Moment Analysis
• Differences in MRT values following administration via these other routes and MRTiv can be viewed as the average time required for drug molecules to reach the systemic circulation from the site of administration
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mean absorption time (MAT)
• The difference between MRT after oral administration (MRToral) and MRTiv is the mean absorption time (MAT), representing the average time required for the drug to reach the systemic circulation from the gastrointestinal tract after oral administration:
oral
oraloral
iv
iviv
ivoral
AUC
AUMCMRT
AUC
AUMCMRT
MRTMRTMAT
,
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intravenous infusion
• If the dose of drug is administered by intravenous infusion, the MRTiv may be calculated as:
2infusion
time)(Infusion MRTMRTiv
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