Difference between revisions of "Team:Aalto-Helsinki/Modeling micelle"
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If we assume that our enzymes have a density that is common to enzymes, our task becomes easier. Based on this paper, the average density of proteins is 1.37 g/ml. Because we want to calculate the volume, and in effect, their radius, we invert this value, thus getting 0.73 ml/g.</p> | If we assume that our enzymes have a density that is common to enzymes, our task becomes easier. Based on this paper, the average density of proteins is 1.37 g/ml. Because we want to calculate the volume, and in effect, their radius, we invert this value, thus getting 0.73 ml/g.</p> | ||
| − | <p>Using some clever calculation, we get that the relationship between mass and volume for proteins is \[V(nm^3)=\frac{0.73\tfrac{nm^3}{g}10^{21}\tfrac{nm^3}{cm^3}}{6.023\cdot 10^-3 \tfrac{nm^3}{Da}} M(Da).\] We can calculate the radius by \[r_{min} = \left( \frac{3V}{4\pi} \right)^{1/3}\] if we know the volume of a sphere, so we get that \( R_{min}=0.066\cdot M(Da) \).</p> | + | <p>Using some clever calculation, we get that the relationship between mass and volume for proteins is |
| + | \[V(nm^3)=\frac{0.73\tfrac{nm^3}{g}10^{21}\tfrac{nm^3}{cm^3}}{6.023\cdot 10^-3 \tfrac{nm^3}{Da}} M(Da).\] | ||
| + | We can calculate the radius by | ||
| + | \[r_{min} = \left( \frac{3V}{4\pi} \right)^{1/3}\] | ||
| + | if we know the volume of a sphere, so we get that \( R_{min}=0.066\cdot M(Da) \).</p> | ||
<p>The mass of CAR is <a href = "http://www.uniprot.org/uniprot/B2HN69">127 797 DA</a> and the mass of ADO is <a href="http://www.rcsb.org/pdb/explore/explore.do?structureId=4KVS">27 569.15 Da</a>. Now the radius would be 3,5 nm for CAR and 2 nm for ADO. The mass of Gfp is 26 890 Da, which makes its radius roughly 2 nm.</p> | <p>The mass of CAR is <a href = "http://www.uniprot.org/uniprot/B2HN69">127 797 DA</a> and the mass of ADO is <a href="http://www.rcsb.org/pdb/explore/explore.do?structureId=4KVS">27 569.15 Da</a>. Now the radius would be 3,5 nm for CAR and 2 nm for ADO. The mass of Gfp is 26 890 Da, which makes its radius roughly 2 nm.</p> | ||
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<h2 id="adocar">Calculations for Ado and Car</h2> | <h2 id="adocar">Calculations for Ado and Car</h2> | ||
| − | <p>We can estimate how many amphiphilic proteins we can theoretically fit in one micelle by calculating how big solid angles they take with attached enzymes. The easiest way to estimate the solid angles is to think the amphiphilic proteins linked with enzymes as cones. We can calculate the solid angle \( \Omega \) for these by \[ \Omega = 2\pi \left( 1-\cos(\theta) \right), \] where \( \theta \) is half of the apex angle. So for CAR we get \[ \Omega_{cone-CAR} = 2\pi \left( 1-\cos\left( \arctan\left(\frac{3.5}{14.1}\right)\right) \right) \approx 0.185 \text{ rad} \] and for ADO \[ \Omega_{cone-ADO} = 2\pi \left( 1-\cos\left( \arctan\left(\frac{2}{9.8}\right)\right) \right) \approx 0.127 \text{ rad}.\]</p> | + | <p>We can estimate how many amphiphilic proteins we can theoretically fit in one micelle by calculating how big solid angles they take with attached enzymes. The easiest way to estimate the solid angles is to think the amphiphilic proteins linked with enzymes as cones. We can calculate the solid angle \( \Omega \) for these by |
| + | \[ \Omega = 2\pi \left( 1-\cos(\theta) \right), \] | ||
| + | where \( \theta \) is half of the apex angle. So for CAR we get | ||
| + | \[ \Omega_{cone\text{-}CAR} = 2\pi \left( 1-\cos\left( \arctan\left(\frac{3.5}{14.1}\right)\right) \right) \approx 0.185 \text{ rad} \] | ||
| + | and for ADO | ||
| + | \[ \Omega_{cone\text{-}ADO} = 2\pi \left( 1-\cos\left( \arctan\left(\frac{2}{9.8}\right)\right) \right) \approx 0.127 \text{ rad}.\]</p> | ||
<p style="color:gray">--picture of this cone-like structure? is it needed or can this be understood without it?--</p> | <p style="color:gray">--picture of this cone-like structure? is it needed or can this be understood without it?--</p> | ||
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<p style="color:gray">--picture of pyramid structure? is it needed or can this be understood without it?--</p> | <p style="color:gray">--picture of pyramid structure? is it needed or can this be understood without it?--</p> | ||
| − | <p>The solid angle \( \Omega\) for this kind of structure can be calculated by \[\Omega = 4\arcsin\left( \sin\left(\theta\right) ^2 \right),\] where \( \theta\) is again half of the apex angle. This yields us \[\Omega_{pyramid-CAR} = 4\arcsin\left( \sin\left(\arctan\left( \frac{3.5}{14.1} \right) \right) ^2 \right) \approx 0.232 \text{ rad}\] and \[\Omega_{pyramid-ADO} = 4\arcsin\left( \sin\left(\arctan\left( \frac{2}{9.8} \right) \right) ^2 \right) \approx 0.16 \text{ rad}.\] </p> | + | <p>The solid angle \( \Omega\) for this kind of structure can be calculated by |
| + | \[\Omega = 4\arcsin\left( \sin\left(\theta\right) ^2 \right),\] where \( \theta\) is again half of the apex angle. This yields us \[\Omega_{pyramid\text{-}CAR} = 4\arcsin\left( \sin\left(\arctan\left( \frac{3.5}{14.1} \right) \right) ^2 \right) \approx 0.232 \text{ rad}\] | ||
| + | and | ||
| + | \[\Omega_{pyramid\text{-}ADO} = 4\arcsin\left( \sin\left(\arctan\left( \frac{2}{9.8} \right) \right) ^2 \right) \approx 0.16 \text{ rad}.\] </p> | ||
<p>By this method of calculation we could get at most 32 of both fusion proteins in one micelle.</p> | <p>By this method of calculation we could get at most 32 of both fusion proteins in one micelle.</p> | ||
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</figure> | </figure> | ||
| − | <p>We can think that this structure consists of a single cone whose centre is the centre of CAR fusion protein and the side goes along ADO fusion protein. We can further take some of the empty areas into account by thinking this as pyramid instead of cone. This yields us \[\Omega_{CAR\&ADO} = 4\arcsin\left( \sin\left( \arccos\left( \frac{14.1^2+9.8^2-5.5^2}{2\cdot14.1\cdot 9.8} \right) \right) ^2 \right) \approx 0.3336 \text{ rad}.\]</p> | + | <p>We can think that this structure consists of a single cone whose centre is the centre of CAR fusion protein and the side goes along ADO fusion protein. We can further take some of the empty areas into account by thinking this as pyramid instead of cone. This yields us |
| + | \[\Omega_{CAR\&ADO} = 4\arcsin\left( \sin\left( \arccos\left( \frac{14.1^2+9.8^2-5.5^2}{2\cdot14.1\cdot 9.8} \right) \right) ^2 \right) \approx 0.3336 \text{ rad}.\]</p> | ||
<p>This means that there fits about 37 of these pyramid structures in one micelle, so 37 CAR-enzymes. For ADO we can approximate that there is about twice as many of them than CAR fusion proteins (this is justified in infinite field so we approximate with it here), so the amount of ADO would be 74 and the whole amount of fusion proteins in this micelle 111. Since there is probably even more efficient way of packing these proteins in one micelle, the real upper bound might be even larger.</p> | <p>This means that there fits about 37 of these pyramid structures in one micelle, so 37 CAR-enzymes. For ADO we can approximate that there is about twice as many of them than CAR fusion proteins (this is justified in infinite field so we approximate with it here), so the amount of ADO would be 74 and the whole amount of fusion proteins in this micelle 111. Since there is probably even more efficient way of packing these proteins in one micelle, the real upper bound might be even larger.</p> | ||
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<h2 id="gfp">Calculations for Gfp</h2> | <h2 id="gfp">Calculations for Gfp</h2> | ||
| − | <p>For comparison we calculated how big micelles we could possibly get with green fluorescent protein. Since the Gfp is same size as Ado, we can use values from previous calculations. With cone-approximation we get \[\frac{4\pi}{ \Omega_{cone-ADO}} \approx 98\] of these fusion proteins in one micelle, and with pyramid-approximation \[\frac{4\pi}{ \Omega_{pyramid-ADO}} \approx 78\] fusion proteins. The real value is thus probably somewhere between them. | + | <p>For comparison we calculated how big micelles we could possibly get with green fluorescent protein. Since the Gfp is same size as Ado, we can use values from previous calculations. With cone-approximation we get |
| + | \[\frac{4\pi}{ \Omega_{cone\text{-}ADO}} \approx 98\] | ||
| + | of these fusion proteins in one micelle, and with pyramid-approximation | ||
| + | \[\frac{4\pi}{ \Omega_{pyramid\text{-}ADO}} \approx 78\] fusion proteins. The real value is thus probably somewhere between them. | ||
</p> | </p> | ||
Revision as of 07:13, 5 August 2015
