Textbook Question
From the data in Table 18.1, calculate the partial pressures of carbon dioxide and argon when the total atmospheric pressure is 1.05 bar.
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Ch.18 - Chemistry of the Environment
Chapter 18, Problem 17a
The dissociation energy of a carbon-bromine bond is typically about 276 kJ/mol. (a) What is the maximum wavelength of photons that can cause C-Br bond dissociation?
Verified step by step guidance1
Step 1: Understand that the dissociation energy of a bond is the energy required to break that bond. In this case, we are given the dissociation energy of a carbon-bromine bond in kJ/mol. We need to convert this energy into Joules (J) because the formula we will use requires the energy in Joules. To do this, we use the conversion factor 1 kJ = 1000 J and 1 mol = 6.022 x 10^23 molecules (Avogadro's number).
Step 2: Use the formula for the energy of a photon, E = h * c / λ, where E is the energy, h is Planck's constant (6.626 x 10^-34 J*s), c is the speed of light (3.00 x 10^8 m/s), and λ is the wavelength. We are solving for λ, so we rearrange the formula to get λ = h * c / E.
Step 3: Substitute the values of h, c, and E (converted to Joules per molecule in step 1) into the formula. Remember to keep the units consistent, i.e., use Joules for energy, meters per second for the speed of light, and Joules*seconds for Planck's constant.
Step 4: Calculate the value of λ. This will give you the maximum wavelength of photons that can cause C-Br bond dissociation.
Step 5: Check your answer. The wavelength should be in the range of ultraviolet or visible light, as these are the types of light that typically have enough energy to break chemical bonds.
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Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Dissociation Energy
Dissociation energy is the amount of energy required to break a bond between two atoms in a molecule. It is typically expressed in kilojoules per mole (kJ/mol) and indicates the strength of the bond; higher values correspond to stronger bonds. In this context, the dissociation energy of the carbon-bromine bond is 276 kJ/mol, which is crucial for determining the energy of photons needed for bond dissociation.
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Photon Energy
Photon energy is the energy carried by a single photon, which can be calculated using the equation E = hν, where E is energy, h is Planck's constant (6.626 x 10^-34 J·s), and ν (nu) is the frequency of the photon. This relationship shows that the energy of a photon is directly proportional to its frequency and inversely proportional to its wavelength, allowing us to relate energy to wavelength using the equation λ = c/ν, where c is the speed of light.
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Wavelength and Energy Relationship
The relationship between wavelength and energy is fundamental in quantum chemistry. As the wavelength of light increases, its energy decreases, and vice versa. This inverse relationship is expressed in the equation E = hc/λ, where λ is the wavelength. To find the maximum wavelength that can cause C-Br bond dissociation, one must convert the dissociation energy from kJ/mol to joules per photon and then apply this equation to solve for λ.
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Related Practice
Open Question
The average concentration of carbon monoxide in the air in an Ohio city in 2006 was 3.5 ppm. Calculate the number of CO molecules in 1.0 L of this air at a pressure of 759 torr and a temperature of 22 °C.
Open Question
(b) What is the concentration of neon in the atmosphere in molecules per liter, assuming an atmospheric pressure of 730 torr and a temperature of 296 K?
Open Question
In CF3Cl, the C-Cl bond dissociation energy is 339 kJ/mol. In CCl4, the C-Cl bond dissociation energy is 293 kJ/mol. What is the range of wavelengths of photons that can cause C-Cl bond rupture in one molecule but not in the other?
Textbook Question
(b) Use the energy requirements of these two pro- cesses to explain why photodissociation of oxygen is more important than photoionization of oxygen at altitudes below about 90 km.
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Textbook Question
The wavelength at which the O2 molecule most strongly absorbs light is approximately 145 nm. (a) In which region of the electromagnetic spectrum does this light fall?
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