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14
The Nature of Living Things
charides, and fats) into oligomers that can be imported into the cell. The funda-
mental process of carbohydrate catabolism is glycolysis, which yields an interme-
diate molecule called pyruvate (CSubscript 33HSubscript 44OSubscript 33). Glycolysis is a principal energy source
for prokaryotes and eukaryotes lacking mitochondria (e.g., erythrocytes). Within
mitochondria, pyruvate is further broken down into acetyl coenzyme A (acetylcoA),
which undergoes the final decomposition in the citric acid (or tricarboxylic or Krebs)
cycle, yielding two molecules of ATP (from ADP), one COSubscript 22, and one NADH (from
NADSuperscript plus+). Oxygen is then used to regenerate the NADSuperscript plus+ and a further molecule of ATP
from ADP, together with a proton that is pumped outside the mitochondrion. The
resulting proton electrochemical potential gradient across the mitochondrial mem-
brane (“protonmotive force”, p.m.f.) drives ATP synthase upon relaxation. This is
called oxidative phosphorylation (respiration). It uses an exogenous electron accep-
tor (oxygen) to generate significant quantities of stored chemical potential (“energy”;
more than 20 molecules of ATP per glucose molecule). Fermentation is an anaerobic
process for further oxidizing pyruvate using an endogenous electron acceptor such
as some other organic compound (lithotrophs use minerals), which yields much less
stored chemical potential per glucose molecule than oxidative phosphorylation, per-
haps only one-twentieth as much, depending on the final products. Photosynthetic
organisms use light to reduce water to oxygen and develop a p.m.f. that is similarly
used to drive ATP synthesis across the thylakoid membrane.
Autotrophs such as plants can use the smallest carbon building block, namely COSubscript 22,
for anabolism, whereas heterotrophs use monomers for building up their catalytic
and structural polymers.
Biological reactions, especially those in vivo within a cell, typically take place in
very confined volumes. This confinement may have a profound effect on the kinetic
mass action law (KMAL). Consider the reaction A + B right arrow Overscript k Subscript normal a Endscripts
ka→C, which Rényi (1953)
has analysed in detail. We have
MathID24dc
dt = ka[¯a ¯b + /\2(γt)] = kaab ,
(14.1)
where lower case symbols denote concentrations, bars denote expected numbers, and
gamma Subscript tγt is the number of C molecules created up to timett. The termDelta squared left parenthesis gamma Subscript t Baseline right parenthesis/\2(γt) expresses the
fluctuations in gamma Subscript tγt: ModifyingAbove gamma Subscript t Superscript 2 Baseline With quotation dash equals ModifyingAbove gamma Subscript t Baseline With quotation dash squared plus Delta squared left parenthesis gamma Subscript t Baseline right parenthesisγ2
t = γt 2 + /\2(γt). Supposing that gamma Subscript tγt approximates to a Poisson
distribution, then Delta squared left parenthesis gamma Subscript t Baseline right parenthesis/\2(γt) will be of the same order of magnitude as ModifyingAbove gamma Subscript t Baseline With quotation dashγt. The KMAL,
which puts a overbar equals a 0 minus c left parenthesis t right parenthesis¯a = a0 −c(t), and so on, the subscript 0 denoting initial concentration
(at t equals 0t = 0), is the first approximation in which Delta squared left parenthesis gamma Subscript t Baseline right parenthesis/\2(γt) is supposed negligibly small
compared to a overbar¯a and b overbar¯b, implying that a overbar b overbar equals ModifyingAbove a b With quotation dash¯a ¯b = ab, whereas, strictly speaking, it is not
since aa and bb are not independent: the disappearance of A at a certain spot (i.e.,
its transformation into C) implies the simultaneous disappearance of B. The neglect
of Delta squared left parenthesis gamma Subscript t Baseline right parenthesis/\2(γt) is justified for molar quantities of starting reagents, 11 but not for reac-
tions in minute subcellular compartments. The number fluctuations (i.e., theDelta squared left parenthesis gamma Subscript t Baseline right parenthesis/\2(γt)
term) will constantly tend to be eliminated by diffusion. This generally dominates
11 Except near the end of the process, whena overbar¯a andb overbar¯b become very small.