== Part 1: H2 + H ==

'''Question 1: On a potential energy surface diagram, how is the transition state mathematically defined? How can the transition state be identified, and how can it be distinguished from a local minimum of the potential energy surface?'''

A transition state sits on a saddle in the potential energy surface diagram. On a PES, we need to consider two variables f(x,y), in this case lengths r1 and r2, which are orthogonal axis. A saddle is a kind of stationary point where one variable is at a minimum and the other is at a maximum. So, if both partial first derivatives are at zero. this tells us we have a stationary point, which can be a saddle, a maxima or a minima. A saddle will increase in some directions and decrease in the other axial direction:

<math>\partial{f}</math>/<math>\partial{x}</math> = fx = 0 and <math>\partial{f}</math>/<math>\partial{y}</math> = fy = 0 tells us it is a stationary point

Then from a two dimensial Taylor expansion:
fxxfyy - fxy2 < 0 tells us that we have a saddle point, and moving in one direction isa positive change, and in the other direction it is a negative change.

'''Question 2: Estimate TS distances'''

The estimated distance for the transition state is 0.907742 Å. An initial estimate was made by looking at the position of the ridge position in the potential energy surface plot (around 0.9) and, considering that we have a homonuclear system, the bond lengths r1 and r2 had to be similar. With these two constraints, you could then look at the force values from the programme, and move gradually closer to a value of 0.000 by shifting between negative and positive values. At energy 0, the molecule is sitting on a maxima and doesn't have enough energy to move in either direction.

[[File:Question1bgbg.png]]

'''Question 3: MEP VS dynamics Calculation'''

A MEP calculation provides the shortest trajectory (a "path of least resistance"), where the molecule has no momentum therefore no vibrational energy. On the other hand, the dynamics calculations look at the trajectory of inertial motion (the trajectory under no external forces) therefore at a non-zero momentum. Comparing the trajectories it is clear that the dynamics calculations also considers vibrational stretches of the diatomic, which result in this oscillation in the potential energy from compression and elongation of the bond.

{| class="wikitable" border=1
! Dynamics Trajectory !! MEP trajectory
|-
| [[File:Dynamics p0 r0.9060.916.PNG]] || [[File:Mep p0 r0.9060.916bg.PNG]]
|}

'''Question 4: What can you conclude from the table below?'''

{| class="wikitable" border=1
! p1 (product) !! p2 (reactant) !! Etot !! Reactive? !! Description of the dynamics !! Illustration of the trajectory
|-
| -1.25 || -2.5 || -99.018 || Yes || The trajectory shows that the reaction moves from reactant to product, with enough energy to "roll up" the saddle point ( = the transition state activation energy). As itforms the new diatomic and rolls down the saddle point, it gains potential energy and that can be seen from the vibrational motion of the oscillating trajectory of the product region (y-axis).|| [[File:Question3 1bg.png|300px]]
|-
| -1.5 || -2.0 || -100.456 || No || There is not enough energy for the collision to overcome the energetic barrier: it never reaches the saddle point (= TS) so it remains in the reactant region of the PES. || [[File:Question3 2bg.png|300px]]
|-
| -1.5 || -2.5 || -98.956 || Yes || Again collision is energetic enough to roll up the saddle, reach the TS and forming the new diatomic. Oscillation of the trajectory in the product region indicates vibrational stretches. || [[File:Question3 3bg.png|300px]]
|-
| -2.5 || -5.0 || -84.956 || No || The reactant has high kinetic energy so it passes the saddle: the product has too much vibrational energy and dissociates, so that the initial molecule is reformed. || [[File:Question3 4bg.png|300px]]
|-
| -2.5 || -5.2 || -83.416 || Yes ||The reactant has high kinetic energy so it passes the saddle: the product has too much vibrational energy and dissociates, so that the initial molecule is reformed. The initial molecule also has too much energy, such that the vibrational stretch makes it dissociate again and the product is formed. || [[File:Question3 5bg.png|300px]]
|}

ADD OVERALL ON THE SIGNIFICANCE

'''Question 5: State what are the main assumptions of Transition State Theory. Given the results you have obtained, how will Transition State Theory predictions for reaction rate values compare with experimental values?'''

Assumptions:

1) Once past the TS, the molecular system cannot reform the reactant.

2) The transition state is in equilibrium with the reactant.

3) The transition state motions can be treated classically.

At the saddle point (which lies lower than the fully dissociated H+H+H system or of the fully associated H-H-H), there is a concentration of the transition state (or activated complex) that is in equilibrium with reactant. Because it is found at a higher point relative to the energy axis, the population distribution is governed by the Boltzmann and depends on delta E.
So the transition state theory separates into reactants, products and the region in between, ''d'', the transition state.

How does this compare to reality:
The first assumption is clearly a strong deviation from reality if we look at systems like those modelled in example 4 and 5 from the table above as well as any reversible reaction.
Because it doesn't consider that the product can go back into the reactant, the theoretical rate for the transition state theory will be higher that the one observed.
Secondly, it does not allow for phenomena such as tunneling: in these cases the transition from reactant to product does not involve climbing up an activational barrier but rather "tunnel" through it. This is an effect of quantum theory.
It also ignores the quantisation of energy levels by treating the TS classically, though this is minor.

== Part 2: F-H-H ==
=== PES inspection ===
'''- By inspecting the potential energy surfaces, classify the F + H2 and H + HF reactions according to their energetics (endothermic or exothermic). How does this relate to the bond strength of the chemical species involved?'''

'''- Locate the approximate position of the transition state.'''

'''- Report the activation energy for both reactions.'''

By looking at the potential energy surface, the reactants axis is elevated from the product axis. This means a negative delta E between reactant and product, which means that the reaction is ''exothermic''. This is confirmed by the bond energies: FH = 565 kJ/mol and HH = 432 kJ/mol --> HF is a stronger bond so the formation of FH minus the breakage of HH releases 133 kJ/mol.

To locate the TS distances, we need to use Hammond's postulate and the fact that in an exothermic reaction there is an early TS. closer to the reactant, therefore resembles the reactants.
Distances are:

F-H = 1.8115 Armstrong and H-H = 0.7448 Armstrong
This combination gives the location of the ridge, where a molecule with 0 momentum would be stable.

'''Activation energy:'''

Ea backward = product - TS = 133.788 - 103.226 = 30.562 kcal/mol

Ea forward = reactant - TS = 104.006 - 103.226 = 0.780 kcal/mol

Therefore delta Enthalpy between product and reactant = 30.562 - 0.780 = 29.782 kcal/mol

[[File:Exer2bg1417.png|400px|thumb|centre|Energy vs Time MEP graph for the backward reaction. The F-H distances was offset slightly to 1.7A in order for it to roll down the TS saddle into the product area.]]

[[File:Exer2bg14172.png|400px|thumb|centre|Energy vs Time Dynamics (zoom) graph for the forward reaction. The F-H distances was offset slightly to 1.9A (F and H further a part) and shortening the HH to 0.74A in order for it to roll down the TS saddle into the reactant area.]]

=== Reaction Dynamics ===
'''- In light of the fact that energy is conserved, discuss the mechanism of release of the reaction energy. Explain how this could be confirmed experimentally.'''

An initial set of conditions that makes the forward reaction proceed requires giving some momentum to the atoms. For example, an F-H momentum of -1, F-H bond distance = 1.8 A and H-H = 0.74 Armstrong.

[[File:Energyvstimexer2bg.png]]

[[File:Distanceexer2bg.png]]

'''-Discuss how the distribution of energy between different modes (translation and vibration) affect the efficiency of the reaction, and how this is influenced by the position of the transition state.'''

File:Distanceexer2bg.png

2019-05-23T14:32:59Z

Bg1417:

File:Energyvstimexer2bg.png

2019-05-23T14:32:20Z

Bg1417:

MRD:BMFG1417

2019-05-23T14:06:49Z

Bg1417: /* Reaction Dynamics */

== Part 1: H2 + H ==

'''Question 1: On a potential energy surface diagram, how is the transition state mathematically defined? How can the transition state be identified, and how can it be distinguished from a local minimum of the potential energy surface?'''

A transition state sits on a saddle in the potential energy surface diagram. On a PES, we need to consider two variables f(x,y), in this case lengths r1 and r2, which are orthogonal axis. A saddle is a kind of stationary point where one variable is at a minimum and the other is at a maximum. So, if both partial first derivatives are at zero. this tells us we have a stationary point, which can be a saddle, a maxima or a minima. A saddle will increase in some directions and decrease in the other axial direction:

<math>\partial{f}</math>/<math>\partial{x}</math> = fx = 0 and <math>\partial{f}</math>/<math>\partial{y}</math> = fy = 0 tells us it is a stationary point

Then from a two dimensial Taylor expansion:
fxxfyy - fxy2 < 0 tells us that we have a saddle point, and moving in one direction isa positive change, and in the other direction it is a negative change.

'''Question 2: Estimate TS distances'''

The estimated distance for the transition state is 0.907742 Å. An initial estimate was made by looking at the position of the ridge position in the potential energy surface plot (around 0.9) and, considering that we have a homonuclear system, the bond lengths r1 and r2 had to be similar. With these two constraints, you could then look at the force values from the programme, and move gradually closer to a value of 0.000 by shifting between negative and positive values. At energy 0, the molecule is sitting on a maxima and doesn't have enough energy to move in either direction.

[[File:Question1bgbg.png]]

'''Question 3: MEP VS dynamics Calculation'''

A MEP calculation provides the shortest trajectory (a "path of least resistance"), where the molecule has no momentum therefore no vibrational energy. On the other hand, the dynamics calculations look at the trajectory of inertial motion (the trajectory under no external forces) therefore at a non-zero momentum. Comparing the trajectories it is clear that the dynamics calculations also considers vibrational stretches of the diatomic, which result in this oscillation in the potential energy from compression and elongation of the bond.

{| class="wikitable" border=1
! Dynamics Trajectory !! MEP trajectory
|-
| [[File:Dynamics p0 r0.9060.916.PNG]] || [[File:Mep p0 r0.9060.916bg.PNG]]
|}

'''Question 4: What can you conclude from the table below?'''

{| class="wikitable" border=1
! p1 (product) !! p2 (reactant) !! Etot !! Reactive? !! Description of the dynamics !! Illustration of the trajectory
|-
| -1.25 || -2.5 || -99.018 || Yes || The trajectory shows that the reaction moves from reactant to product, with enough energy to "roll up" the saddle point ( = the transition state activation energy). As itforms the new diatomic and rolls down the saddle point, it gains potential energy and that can be seen from the vibrational motion of the oscillating trajectory of the product region (y-axis).|| [[File:Question3 1bg.png|300px]]
|-
| -1.5 || -2.0 || -100.456 || No || There is not enough energy for the collision to overcome the energetic barrier: it never reaches the saddle point (= TS) so it remains in the reactant region of the PES. || [[File:Question3 2bg.png|300px]]
|-
| -1.5 || -2.5 || -98.956 || Yes || Again collision is energetic enough to roll up the saddle, reach the TS and forming the new diatomic. Oscillation of the trajectory in the product region indicates vibrational stretches. || [[File:Question3 3bg.png|300px]]
|-
| -2.5 || -5.0 || -84.956 || No || The reactant has high kinetic energy so it passes the saddle: the product has too much vibrational energy and dissociates, so that the initial molecule is reformed. || [[File:Question3 4bg.png|300px]]
|-
| -2.5 || -5.2 || -83.416 || Yes ||The reactant has high kinetic energy so it passes the saddle: the product has too much vibrational energy and dissociates, so that the initial molecule is reformed. The initial molecule also has too much energy, such that the vibrational stretch makes it dissociate again and the product is formed. || [[File:Question3 5bg.png|300px]]
|}

ADD OVERALL ON THE SIGNIFICANCE

'''Question 5: State what are the main assumptions of Transition State Theory. Given the results you have obtained, how will Transition State Theory predictions for reaction rate values compare with experimental values?'''

Assumptions:

1) Once past the TS, the molecular system cannot reform the reactant.

2) The transition state is in equilibrium with the reactant.

3) The transition state motions can be treated classically.

At the saddle point (which lies lower than the fully dissociated H+H+H system or of the fully associated H-H-H), there is a concentration of the transition state (or activated complex) that is in equilibrium with reactant. Because it is found at a higher point relative to the energy axis, the population distribution is governed by the Boltzmann and depends on delta E.
So the transition state theory separates into reactants, products and the region in between, ''d'', the transition state.

How does this compare to reality:
The first assumption is clearly a strong deviation from reality if we look at systems like those modelled in example 4 and 5 from the table above as well as any reversible reaction.
Because it doesn't consider that the product can go back into the reactant, the theoretical rate for the transition state theory will be higher that the one observed.
Secondly, it does not allow for phenomena such as tunneling: in these cases the transition from reactant to product does not involve climbing up an activational barrier but rather "tunnel" through it. This is an effect of quantum theory.
It also ignores the quantisation of energy levels by treating the TS classically, though this is minor.

== Part 2: F-H-H ==
=== PES inspection ===
'''- By inspecting the potential energy surfaces, classify the F + H2 and H + HF reactions according to their energetics (endothermic or exothermic). How does this relate to the bond strength of the chemical species involved?'''

'''- Locate the approximate position of the transition state.'''

'''- Report the activation energy for both reactions.'''

By looking at the potential energy surface, the reactants axis is elevated from the product axis. This means a negative delta E between reactant and product, which means that the reaction is ''exothermic''. This is confirmed by the bond energies: FH = 565 kJ/mol and HH = 432 kJ/mol --> HF is a stronger bond so the formation of FH minus the breakage of HH releases 133 kJ/mol.

To locate the TS distances, we need to use Hammond's postulate and the fact that in an exothermic reaction there is an early TS. closer to the reactant, therefore resembles the reactants.
Distances are:

F-H = 1.8115 Armstrong and H-H = 0.7448 Armstrong
This combination gives the location of the ridge, where a molecule with 0 momentum would be stable.

'''Activation energy:'''

Ea backward = product - TS = 133.788 - 103.226 = 30.562 kcal/mol

Ea forward = reactant - TS = 104.006 - 103.226 = 0.780 kcal/mol

Therefore delta Enthalpy between product and reactant = 30.562 - 0.780 = 29.782 kcal/mol

[[File:Exer2bg1417.png|400px|thumb|centre|Energy vs Time MEP graph for the backward reaction. The F-H distances was offset slightly to 1.7A in order for it to roll down the TS saddle into the product area.]]

[[File:Exer2bg14172.png|400px|thumb|centre|Energy vs Time Dynamics (zoom) graph for the forward reaction. The F-H distances was offset slightly to 1.9A (F and H further a part) and shortening the HH to 0.74A in order for it to roll down the TS saddle into the reactant area.]]

=== Reaction Dynamics ===
'''- In light of the fact that energy is conserved, discuss the mechanism of release of the reaction energy. Explain how this could be confirmed experimentally.'''

An initial set of conditions that makes the forward reaction proceed is

'''-Discuss how the distribution of energy between different modes (translation and vibration) affect the efficiency of the reaction, and how this is influenced by the position of the transition state.'''

MRD:BMFG1417

2019-05-23T13:46:21Z

Bg1417: /* PES inspection */

== Part 1: H2 + H ==

'''Question 1: On a potential energy surface diagram, how is the transition state mathematically defined? How can the transition state be identified, and how can it be distinguished from a local minimum of the potential energy surface?'''

A transition state sits on a saddle in the potential energy surface diagram. On a PES, we need to consider two variables f(x,y), in this case lengths r1 and r2, which are orthogonal axis. A saddle is a kind of stationary point where one variable is at a minimum and the other is at a maximum. So, if both partial first derivatives are at zero. this tells us we have a stationary point, which can be a saddle, a maxima or a minima. A saddle will increase in some directions and decrease in the other axial direction:

<math>\partial{f}</math>/<math>\partial{x}</math> = fx = 0 and <math>\partial{f}</math>/<math>\partial{y}</math> = fy = 0 tells us it is a stationary point

Then from a two dimensial Taylor expansion:
fxxfyy - fxy2 < 0 tells us that we have a saddle point, and moving in one direction isa positive change, and in the other direction it is a negative change.

'''Question 2: Estimate TS distances'''

The estimated distance for the transition state is 0.907742 Å. An initial estimate was made by looking at the position of the ridge position in the potential energy surface plot (around 0.9) and, considering that we have a homonuclear system, the bond lengths r1 and r2 had to be similar. With these two constraints, you could then look at the force values from the programme, and move gradually closer to a value of 0.000 by shifting between negative and positive values. At energy 0, the molecule is sitting on a maxima and doesn't have enough energy to move in either direction.

[[File:Question1bgbg.png]]

'''Question 3: MEP VS dynamics Calculation'''

A MEP calculation provides the shortest trajectory (a "path of least resistance"), where the molecule has no momentum therefore no vibrational energy. On the other hand, the dynamics calculations look at the trajectory of inertial motion (the trajectory under no external forces) therefore at a non-zero momentum. Comparing the trajectories it is clear that the dynamics calculations also considers vibrational stretches of the diatomic, which result in this oscillation in the potential energy from compression and elongation of the bond.

{| class="wikitable" border=1
! Dynamics Trajectory !! MEP trajectory
|-
| [[File:Dynamics p0 r0.9060.916.PNG]] || [[File:Mep p0 r0.9060.916bg.PNG]]
|}

'''Question 4: What can you conclude from the table below?'''

{| class="wikitable" border=1
! p1 (product) !! p2 (reactant) !! Etot !! Reactive? !! Description of the dynamics !! Illustration of the trajectory
|-
| -1.25 || -2.5 || -99.018 || Yes || The trajectory shows that the reaction moves from reactant to product, with enough energy to "roll up" the saddle point ( = the transition state activation energy). As itforms the new diatomic and rolls down the saddle point, it gains potential energy and that can be seen from the vibrational motion of the oscillating trajectory of the product region (y-axis).|| [[File:Question3 1bg.png|300px]]
|-
| -1.5 || -2.0 || -100.456 || No || There is not enough energy for the collision to overcome the energetic barrier: it never reaches the saddle point (= TS) so it remains in the reactant region of the PES. || [[File:Question3 2bg.png|300px]]
|-
| -1.5 || -2.5 || -98.956 || Yes || Again collision is energetic enough to roll up the saddle, reach the TS and forming the new diatomic. Oscillation of the trajectory in the product region indicates vibrational stretches. || [[File:Question3 3bg.png|300px]]
|-
| -2.5 || -5.0 || -84.956 || No || The reactant has high kinetic energy so it passes the saddle: the product has too much vibrational energy and dissociates, so that the initial molecule is reformed. || [[File:Question3 4bg.png|300px]]
|-
| -2.5 || -5.2 || -83.416 || Yes ||The reactant has high kinetic energy so it passes the saddle: the product has too much vibrational energy and dissociates, so that the initial molecule is reformed. The initial molecule also has too much energy, such that the vibrational stretch makes it dissociate again and the product is formed. || [[File:Question3 5bg.png|300px]]
|}

ADD OVERALL ON THE SIGNIFICANCE

'''Question 5: State what are the main assumptions of Transition State Theory. Given the results you have obtained, how will Transition State Theory predictions for reaction rate values compare with experimental values?'''

Assumptions:

1) Once past the TS, the molecular system cannot reform the reactant.

2) The transition state is in equilibrium with the reactant.

3) The transition state motions can be treated classically.

At the saddle point (which lies lower than the fully dissociated H+H+H system or of the fully associated H-H-H), there is a concentration of the transition state (or activated complex) that is in equilibrium with reactant. Because it is found at a higher point relative to the energy axis, the population distribution is governed by the Boltzmann and depends on delta E.
So the transition state theory separates into reactants, products and the region in between, ''d'', the transition state.

How does this compare to reality:
The first assumption is clearly a strong deviation from reality if we look at systems like those modelled in example 4 and 5 from the table above as well as any reversible reaction.
Because it doesn't consider that the product can go back into the reactant, the theoretical rate for the transition state theory will be higher that the one observed.
Secondly, it does not allow for phenomena such as tunneling: in these cases the transition from reactant to product does not involve climbing up an activational barrier but rather "tunnel" through it. This is an effect of quantum theory.
It also ignores the quantisation of energy levels by treating the TS classically, though this is minor.

== Part 2: F-H-H ==
=== PES inspection ===
'''- By inspecting the potential energy surfaces, classify the F + H2 and H + HF reactions according to their energetics (endothermic or exothermic). How does this relate to the bond strength of the chemical species involved?'''

'''- Locate the approximate position of the transition state.'''

'''- Report the activation energy for both reactions.'''

By looking at the potential energy surface, the reactants axis is elevated from the product axis. This means a negative delta E between reactant and product, which means that the reaction is ''exothermic''. This is confirmed by the bond energies: FH = 565 kJ/mol and HH = 432 kJ/mol --> HF is a stronger bond so the formation of FH minus the breakage of HH releases 133 kJ/mol.

To locate the TS distances, we need to use Hammond's postulate and the fact that in an exothermic reaction there is an early TS. closer to the reactant, therefore resembles the reactants.
Distances are:

F-H = 1.8115 Armstrong and H-H = 0.7448 Armstrong
This combination gives the location of the ridge, where a molecule with 0 momentum would be stable.

'''Activation energy:'''

Ea backward = product - TS = 133.788 - 103.226 = 30.562 kcal/mol

Ea forward = reactant - TS = 104.006 - 103.226 = 0.780 kcal/mol

Therefore delta Enthalpy between product and reactant = 30.562 - 0.780 = 29.782 kcal/mol

[[File:Exer2bg1417.png|400px|thumb|centre|Energy vs Time MEP graph for the backward reaction. The F-H distances was offset slightly to 1.7A in order for it to roll down the TS saddle into the product area.]]

[[File:Exer2bg14172.png|400px|thumb|centre|Energy vs Time Dynamics (zoom) graph for the forward reaction. The F-H distances was offset slightly to 1.9A (F and H further a part) and shortening the HH to 0.74A in order for it to roll down the TS saddle into the reactant area.]]

=== Reaction Dynamics ===
'''- In light of the fact that energy is conserved, discuss the mechanism of release of the reaction energy. Explain how this could be confirmed experimentally.'''

'''-Discuss how the distribution of energy between different modes (translation and vibration) affect the efficiency of the reaction, and how this is influenced by the position of the transition state.'''

2019-05-23T13:23:37Z

Bg1417: Bg1417 uploaded a new version of File:Exer2bg1417.png

MRD:BMFG1417

2019-05-23T13:19:45Z

Bg1417: /* PES inspection */

== Part 1: H2 + H ==

'''Question 1: On a potential energy surface diagram, how is the transition state mathematically defined? How can the transition state be identified, and how can it be distinguished from a local minimum of the potential energy surface?'''

A transition state sits on a saddle in the potential energy surface diagram. On a PES, we need to consider two variables f(x,y), in this case lengths r1 and r2, which are orthogonal axis. A saddle is a kind of stationary point where one variable is at a minimum and the other is at a maximum. So, if both partial first derivatives are at zero. this tells us we have a stationary point, which can be a saddle, a maxima or a minima. A saddle will increase in some directions and decrease in the other axial direction:

<math>\partial{f}</math>/<math>\partial{x}</math> = fx = 0 and <math>\partial{f}</math>/<math>\partial{y}</math> = fy = 0 tells us it is a stationary point

Then from a two dimensial Taylor expansion:
fxxfyy - fxy2 < 0 tells us that we have a saddle point, and moving in one direction isa positive change, and in the other direction it is a negative change.

'''Question 2: Estimate TS distances'''

The estimated distance for the transition state is 0.907742 Å. An initial estimate was made by looking at the position of the ridge position in the potential energy surface plot (around 0.9) and, considering that we have a homonuclear system, the bond lengths r1 and r2 had to be similar. With these two constraints, you could then look at the force values from the programme, and move gradually closer to a value of 0.000 by shifting between negative and positive values. At energy 0, the molecule is sitting on a maxima and doesn't have enough energy to move in either direction.

[[File:Question1bgbg.png]]

'''Question 3: MEP VS dynamics Calculation'''

A MEP calculation provides the shortest trajectory (a "path of least resistance"), where the molecule has no momentum therefore no vibrational energy. On the other hand, the dynamics calculations look at the trajectory of inertial motion (the trajectory under no external forces) therefore at a non-zero momentum. Comparing the trajectories it is clear that the dynamics calculations also considers vibrational stretches of the diatomic, which result in this oscillation in the potential energy from compression and elongation of the bond.

{| class="wikitable" border=1
! Dynamics Trajectory !! MEP trajectory
|-
| [[File:Dynamics p0 r0.9060.916.PNG]] || [[File:Mep p0 r0.9060.916bg.PNG]]
|}

'''Question 4: What can you conclude from the table below?'''

{| class="wikitable" border=1
! p1 (product) !! p2 (reactant) !! Etot !! Reactive? !! Description of the dynamics !! Illustration of the trajectory
|-
| -1.25 || -2.5 || -99.018 || Yes || The trajectory shows that the reaction moves from reactant to product, with enough energy to "roll up" the saddle point ( = the transition state activation energy). As itforms the new diatomic and rolls down the saddle point, it gains potential energy and that can be seen from the vibrational motion of the oscillating trajectory of the product region (y-axis).|| [[File:Question3 1bg.png|300px]]
|-
| -1.5 || -2.0 || -100.456 || No || There is not enough energy for the collision to overcome the energetic barrier: it never reaches the saddle point (= TS) so it remains in the reactant region of the PES. || [[File:Question3 2bg.png|300px]]
|-
| -1.5 || -2.5 || -98.956 || Yes || Again collision is energetic enough to roll up the saddle, reach the TS and forming the new diatomic. Oscillation of the trajectory in the product region indicates vibrational stretches. || [[File:Question3 3bg.png|300px]]
|-
| -2.5 || -5.0 || -84.956 || No || The reactant has high kinetic energy so it passes the saddle: the product has too much vibrational energy and dissociates, so that the initial molecule is reformed. || [[File:Question3 4bg.png|300px]]
|-
| -2.5 || -5.2 || -83.416 || Yes ||The reactant has high kinetic energy so it passes the saddle: the product has too much vibrational energy and dissociates, so that the initial molecule is reformed. The initial molecule also has too much energy, such that the vibrational stretch makes it dissociate again and the product is formed. || [[File:Question3 5bg.png|300px]]
|}

ADD OVERALL ON THE SIGNIFICANCE

'''Question 5: State what are the main assumptions of Transition State Theory. Given the results you have obtained, how will Transition State Theory predictions for reaction rate values compare with experimental values?'''

Assumptions:

1) Once past the TS, the molecular system cannot reform the reactant.

2) The transition state is in equilibrium with the reactant.

3) The transition state motions can be treated classically.

At the saddle point (which lies lower than the fully dissociated H+H+H system or of the fully associated H-H-H), there is a concentration of the transition state (or activated complex) that is in equilibrium with reactant. Because it is found at a higher point relative to the energy axis, the population distribution is governed by the Boltzmann and depends on delta E.
So the transition state theory separates into reactants, products and the region in between, ''d'', the transition state.

How does this compare to reality:
The first assumption is clearly a strong deviation from reality if we look at systems like those modelled in example 4 and 5 from the table above as well as any reversible reaction.
Because it doesn't consider that the product can go back into the reactant, the theoretical rate for the transition state theory will be higher that the one observed.
Secondly, it does not allow for phenomena such as tunneling: in these cases the transition from reactant to product does not involve climbing up an activational barrier but rather "tunnel" through it. This is an effect of quantum theory.
It also ignores the quantisation of energy levels by treating the TS classically, though this is minor.

== Part 2: F-H-H ==
=== PES inspection ===
'''- By inspecting the potential energy surfaces, classify the F + H2 and H + HF reactions according to their energetics (endothermic or exothermic). How does this relate to the bond strength of the chemical species involved?'''

'''- Locate the approximate position of the transition state.'''

'''- Report the activation energy for both reactions.'''

By looking at the potential energy surface, the reactants axis is elevated from the product axis. This means a negative delta E between reactant and product, which means that the reaction is ''exothermic''. This is confirmed by the bond energies: FH = 565 kJ/mol and HH = 432 kJ/mol --> HF is a stronger bond so the formation of FH minus the breakage of HH releases 133 kJ/mol.

To locate the TS distances, we need to use Hammond's postulate and the fact that in an exothermic reaction there is an early TS. closer to the reactant, therefore resembles the reactants.
Distances are:

F-H = 1.8115 Armstrong and H-H = 0.7448 Armstrong
This combination gives the location of the ridge, where a molecule with 0 momentum would be stable.

Activation energy:

[[File:Exer2bg1417.png]]

=== Reaction Dynamics ===
'''- In light of the fact that energy is conserved, discuss the mechanism of release of the reaction energy. Explain how this could be confirmed experimentally.'''

'''-Discuss how the distribution of energy between different modes (translation and vibration) affect the efficiency of the reaction, and how this is influenced by the position of the transition state.'''