Intermembrane space of mitochondrion: Difference between revisions

Revision as of 03:30, 28 October 2024

This article describes a component of the organelle mitochondrion in cells.
Unless otherwise specified, information about this component is about its in situ occurrence in vivo, i.e., its occurrence in its usual location in living cells.

Definition

The intermembrane space of mitochondrion is a space between the two membranes of a mitochondrion: the outer mitochondrial membrane and inner mitochondrial membrane.

Summary

Item	Value
Type of organisms whose cells contain the intermembrane space	Same as the organisms whose cells contain mitochondria: eukaryotic cells only, including plant cells, animal cells, and the cells of protists and fungi
Type of cells within the organisms that contain the intermembrane space	Same as the cells that contain mitochondria: all cells except red blood cells in mammals (other vertebrates do have mitochondria in their red blood cells).
Number of intermembrane spaces per cell	Same as the number of mitochondria: 1 to 1000s, depending on the energy needs of the cell
Size	$~200$ angstrom or $~20nm$ thickness (very approximate), accounting for less than 5% of the length (less than 10% even if you consider that it's on both sides).
Location within the mitochondrion	It is right inside of the boundary of the mitochondrion (the boundary is the outer mitochondrial membrane).
What's on both sides of it	Inside: inner mitochondrial membrane, outside: outer mitochondrial membrane
Structural components	The intracristal space is the part of the intermembrane space between the folds (cristae) of the inner mitochondrial membrane. The peripheral space is the part of the intermembrane space farther out of the inner mitochondrial membrane.
pH	About 7.0 to 7.4. Although still a little alkaline, it is less so than the mitochondrial matrix and less so than the rest of the cell, due to the pumping out of protons from the mitochondrial matrix as part of the electron transport chain.

Size and shape

Limitations of study

Unlike the mitochondrion as a whole, the intermembrane space of mitochondrion is too small to be seen with a light microscope. The electron microscope that is necessary to see it can be destructive to the living cell and may change the shape of the mitochondrion.

Size and volume calculation

We use this size range for the mitochondrion:

The length is generally at least 1 $\mu m$ and at most 4 $\mu m$ .
The tubular radius is generally at least 0.5 $\mu m$ and at most 1 $\mu m$ .

We also use that the thickness of the intermembrane space is about 20 $nm$ .

Illustratively, and using the biggest size estimates, let's say the mitochondrion has a length of 4 $\mu m$ , a tubular radius of 1 $\mu m$ , and an intermembrane space that is uniformly 20 $nm$ thickness. Let's model the mitochondrion and mitochondrial matrix as cylinders.

Volume of the mitochondrion is $\pi r^{2}h$ where $r=1\mu m,h=4\mu m$ , giving $12.57\mu m^{3}$
Volume of the mitochondrial matrix (the inner cylinder) is $\pi r^{2}h$ where $r=0.98\mu m,h=3.96\mu m$ (these values are obtained by subtracting the thickness of the IMS from the radius and twice the thickness of the IMS from the height), giving $11.95\mu m^{3}$ . The difference is $0.62\mu m^{3}$ .

A cubic micrometer ( $\mu m^{3}$ ) is the same as a femtoliter, or $10^{-15}$ liters. So the volume of the intermembrane space works out to be $0.62fL$ . But this is the upper end. The lower end would be roughly about 1/16 of this, or about $0.04fL$ .

Note that this calculation is most faithful for the peripheral IMS. The intercristal IMS is not covered here, but likely does not cover much volume (its significance is more in terms of the high surface area that it covers, not the volume).

Mass

Since most cellular matter is approximately as dense as water, we can approximate the density of the intermembrane space using the density of water, which is about 1 gram per milliliter. Based on the volume estimate above, we get that the mass of a mitochondrion is approximately between 0.04 and 0.62 picograms, where a picogram is $10^{-12}$ grams.

@@ Line 16: / Line 16: @@
 | Number of intermembrane spaces per cell || Same as the number of mitochondria: 1 to 1000s, depending on the energy needs of the cell
 |-
-| Size || <math>~200</math> angstrom or <math>~20 nm</math> thickness (very approximate), accounting for less than 5% of the diameter (less than 10% even if you consider that it's on both sides).
+| Size || <math>~200</math> angstrom or <math>~20 nm</math> thickness (very approximate), accounting for less than 5% of the length (less than 10% even if you consider that it's on both sides).
 |-
 | Location within the mitochondrion || It is right inside of the boundary of the mitochondrion (the boundary is the [[outer mitochondrial membrane]]).
@@ Line 26: / Line 26: @@
 | pH || About 7.0 to 7.4. Although still a little alkaline, it is less so than the mitochondrial matrix and less so than the rest of the cell, due to the pumping out of protons from the mitochondrial matrix as part of the [[electron transport chain]].
 |}
+==Size and shape==
+===Limitations of study===
+Unlike the [[mitochondrion]] as a whole, the intermembrane space of mitochondrion is too small to be seen with a light microscope. The electron microscope that is necessary to see it can be destructive to the living cell and may change the shape of the mitochondrion.
+===Size and volume calculation===
+We use this size range for the mitochondrion:
+* The length is generally at least 1 <math>\mu m</math> and at most 4 <math>\mu m</math>.
+* The tubular radius is  generally at least 0.5 <math>\mu m</math> and at most 1 <math>\mu m</math>.
+We also use that the thickness of the intermembrane space is about 20 <math>nm</math>.
+Illustratively, and using the biggest size estimates, let's say the mitochondrion has a length of 4 <math>\mu m</math>, a tubular radius of 1 <math>\mu m</math>, and an intermembrane space that is uniformly 20 <math>nm</math> thickness. Let's model the mitochondrion and mitochondrial matrix as cylinders.
+* Volume of the mitochondrion is <math>\pi r^2 h</math> where <math>r = 1 \mu m, h = 4 \mu m</math>, giving <math>12.57 \mu m^3</math>
+* Volume of the mitochondrial matrix (the inner cylinder) is <math>\pi r^2 h</math> where <math>r = 0.98 \mu m, h =3.96 \mu m</math> (these values are obtained by subtracting the thickness of the IMS from the radius and twice the thickness of the IMS from the height), giving <math>11.95 \mu m^3</math>. The difference is <math>0.62 \mu m^3</math>.
+A cubic micrometer (<math>\mu m^3</math>) is the same as a femtoliter, or <math>10^{-15}</math> liters. So the volume of the intermembrane space works out to be <math>0.62 fL</math>. But this is the upper end. The lower end would be roughly about 1/16 of this, or about <math>0.04 fL</math>.
+Note that this calculation is most faithful for the peripheral IMS. The intercristal IMS is not covered here, but likely does not cover much volume (its significance is more in terms of the high surface area that it covers, not the volume).
+===Mass===
+Since [[most cellular matter is approximately as dense as water]], we can approximate the density of the intermembrane space using the density of water, which is about 1 gram per milliliter. Based on the volume estimate above, we get that the mass of a mitochondrion is approximately between 0.04 and 0.62 picograms, where a picogram is <math>10^{-12}</math> grams.