Chapter 7 Exercises #2 - Berkeley City College



Exercises #1

Characteristics of Waves

1. A wave, with a wavelength λ = 2.5 cm, travels at a speed of 15 m/s.

(a) How long does it take for the wave to travel a distance of one wavelength?

Answer: 1.7 x 10–3 s

(b) How many wavelengths (or cycles) does the wave complete after traveling for 1 second?

Answer: 600/s

(c) If the wavelength (λ) stretches to 3.0 cm but the speed remains the same, how many wavelengths (or cycles) does the wave complete in 1 second?

Answer: 500/s

(d) If the wavelength (λ) shrinks to 1.5 cm but the speed remains the same, how many wavelengths (or cycles) does the wave complete in 1 second?

Answer: 1000/s

(e) What can you conclude rergarding the relationship between wavelength and number of cycles traveled in one second, which is also known as frequency (ν)?

Answer: as wavelength increases, frequency decreases, and vice versa.

2. A red light has wavelength λ = 750 nm and a green light has wavelength λ = 550 nm

(a) Which light travels a greater distance in 1 second, red light or green light? Explain.

Answer: none; light travels at the same and constant speed

(b) Which light (red or green) has the greater frequency? Explain.

Answer: Green; light with shorter wavelength has higher frequency

(c) What is the frequency for the red and green light, respectively?

Answer: red light, ν = 4.00 x 1014/s; green light, ν = 5.45 x 1014/s

(d) Which light carries more energy per photon, red light or green light? Explain.

Answer: green light has more energy; radiation energy is proportional to the frequency.

(e) Assuming that the speed of light, c = 2.9979 x 108 m/s, Planck’s constant, h = 6.626 x 10-34 J.s., and Avogadro’s number, NA = 6.022 x 1023/mol, calculate the energy per photon and per mole of photon for each type of light.

Answer: Energy of red light = 2.65 x 10–19 J/photon = 159 kJ/mol

Energy of green light = 3.61 x 10–19 J/photon = 217 kJ/mol

Exercises #2:

Photoelectric Effect

1. The work function of an element is the minimum energy needed to remove an electron from the surface of the solid element. The work function for rubidium is 208.4 kJ/mol.

(a) What is the minimum amount of energy needed to eject a single electron from the surface of rubidium metal? (NA = 6.022 x 1023/mol; h = 6.626 x 10-34 J.s.; c = 2.998 x 108 m/s)

(b) What is the maximum wavelength (λ, in nm) of light that is capable of ejecting electrons and thus producing photoelectric current from rubidium metal? (c) In which spectral region (uv, visible, or infra-red) does this light occur? (d) If a beam of green light with wavelength λ = 550. nm strikes the surface of rubidium metal, will electrons be ejected? If yes, calculate the kinetic energy and speed of the ejected electron.

Answer: (a) 3.46 x 10–19 J; (b) λ0 = 574 nm; (c) visible spectrum;

(d) Yes, kinetic energy, eK = 1.51 x 10–20 J; speed, ve = 1.82 x 105 m/s

Bohr Model for Hydrogen Atom

2. According to the Bohr’s orbit model, electrons may be present at any of the allowed orbits whose energy is defined by the expression: En = -2.179 x 10-18 J(Z2/n2), where Z is the atomic number or nuclear charge, and n = 1, 2, 3, ..is called the quantum number. For hydrogen atom that has Z = 1, the energy of the first four orbits are given below:

——————————————————————————

Quantum # Energy values_________________

n = 1 -2.18 x 10-18 J (lowest energy level or “ground state”)

n = 2 -5.45 x 10-19 J (first excited state)

n = 3 -2.42 x 10-19 J (second excited state)

n = 4 -1.36 x 10-19 J (third excited state)

——————————————————————————

(Speed of light, c = 2.998 x 108 m/s; h = 6.626 x 10-34 J.s.; 1 nm = 10-9 m; 1 m = 109 nm)

(a) Why are the energy values negative?

Answer: This is the energy to counter or balance the attraction by the nucleus

(b) An electron in hydrogen atom jumps from the first orbit (n = 1) to the 4th orbit (n = 4). What is the energy change (ΔE) for the electron? Does the electron gain or lose energy? Explain. What are the frequency (ν) and wavelength (λ) of light that would provide just enough energy for the electron to make this jump? In what spectral region is this light found, uv, visible, or infra-red region?

Answer: ΔE = 2.044 x 10–18 J; ν = 3.085 x 1015/s; λ = 97.25 nm

(c) The same electron then jumps from the 4th orbit to the second orbit (n = 2). What is the energy change (ΔE) for the electron in this jump? Does the electron gain or lose energy? Explain. What are the frequency (ν) and wavelength (λ) of light emitted from this energy change? In what spectral region is this light emitted, uv, visible, or infra-red region?

Answer: ΔE = –4.09 x 10–19 J; ν = 6.17 x 1014/s; λ = 486 nm

(d) A spectral line in the Balmer series for hydrogen is observed at λ = 380 nm. If this is the result of an electron transition from a higher energy level n to energy level n = 2, what is the quantum number n for the higher energy level? [1/λ = RH(1/n2 - 1/22); RH = 1.097 x 107 m-1]

Answer: n = 10; (electron transition from n = 10 to n = 2)

Wave-Particle Duality

3. An electron and a proton are accelerated to 25.0% the speed of light. What wavelengths are associated with each of them? Express all wavelengths in picometers (1 m = 1012 pm)

(me = 9.11 x 10-31kg; mp = 1.67 x 10-27 kg; h = 6.63 x 10-34 J.s.; c = 3.00 x 108 m/s)

Answer: wavelength of electron = 9.7 x 10–12 m = 9.70 pm;

Wavelength of proton = 5.29 x 10–15 m = 0.00529 pm.

Uncertainty Principle

4. An electron is traveling at a speed of 1.5 x 107 m/s, with an uncertainty of 1.0%. What is the absolute value of the uncertainty (Δv) in the electron’s speed? If the location of the electron is simultaneously measured, what is the minimum uncertainty (Δx) in the determination of the electron’s location? Assuming that an electron is about 10-17 m in diameter, how many times large is Δx relative to the size of an electron? {(Δx).(Δp) > h/4π; h = 6.63 x 10-34 J.s.; me = 9.11 x 10-31 kg}

Answer: Δx > 3.9 x 10–10 m (~ 4 x 107 times the size of an electron)

Exercises #3:

1. (a) For n = 3, identify the possible values of l. Answer: l = 0, 1, and 2

(b) For l = 3, identify the possible values of ml. Answer: ml = -3, -2, -1, 0, 1, 2, & 3

(c) What are the letter designations for the angular momentum quantum number l = 1, 2, 3, and 4, respectively?

Answer: p, d, f, and g, respectively.

2. (a) What sets of quantum numbers identify orbitals in subshells 2p, 3d, and 4f, respectively?

Answer: 2p: n = 2, l = 1, ml = -1, 0, or +1;

3d: n = 3, l = 2, ml = -2, -1, 0, 1, or 2;

4f: n = 4, l = 3, ml = -3, -2, -1, 0, 1, 2, or 3.

(b) What sets of quantum numbers identify three electrons having the same spin in subshell 2p?

Answer: electron #1: n = 2, l = 1, ml = -1, ms = +1/2; electron #2: n = 2, l = 1, ml = +1, ms = +1/2;

electron #3: n = 2, l = 1, ml = 0, ms = +1/2;

3. For n = 4, specify the number of orbitals with l = 3. Specify the maximum number of electrons that can occupy this subshell.

Answer: l = 3, # of orbital = 7 (2l + 1);

# of electrons = 14

4. How many electrons in an atom have the following sets of quantum numbers:

(a) n = 4 and l = 2? Answer: 10

(b) n = 4, l = 2, and ml = 2? Answer: 2

(c) n = 4, l = 2, ml = 2, and ms = +1/2? Answer: 1

(d) n = 4 and ml = 2 ? Answer: 4

(e) n = 4 and ms = +1/2 ? Answer: 16

5. Which sets of quantum numbers are NOT allowed in the wave-mechanic model? Explain.

(a) n = 3, l = 2, ml = 1; (d) n = 3, l = 0, ml = 1;

(b) n = 2, l = 2, ml = 1; (e) n = 2, l = 1, ml = 1;

(c) n = 1, l = 0, ml = 0; (f) n = 0, l = 0, ml = 0.

Answer: (b) l cannot equal n; (d) l = 0, ml must be 0; and (f) n cannot be 0.

6. Which of the following sets of quantum numbers, n, l, ml, and ms, correctly describes an electron occupying a spherical orbital in the fourth energy level in the hydrogen atom?

(a) 4, 3, 3, -1/2; (b) 4, 2, 0, +1/2; (c) 4, 1, 1, +1/2;

(d) 4, 3, -3, -1/2; (e) 4, 0, 0, +1/2. Answer: (e)

7. Write the electron configuration for each of the following atoms. Draw the orbital “box” diagrams for the outer-most shell electrons, and use the Hund’s rule to determine the number of unpaired electrons in each atom.

(a) C: 1s2 2s2 2p2; (( (( ( (

(b) O: 1s2 2s2 2p4; (( (( (( ( (

(c) Mg: 1s2 2s2 2p6 3s2; (( (( (( (( (( ((

(d) P: 1s2 2s2 2p6 3s2 3p3 ; (( (( (( (( (( (( ( ( (

(e) Cl: 1s2 2s2 2p6 3s2 3p5; (( (( (( (( (( (( (( (( (

(f) Ar: 1s2 2s2 2p6 3s2 3p6; (( (( (( (( (( (( (( (( ((

(g) Cr: [Ar] 4s1 3d5; [Ar] ( ( ( ( ( (

(h) Fe: [Ar] 4s2 3d6; [Ar] (( (( ( ( ( (

(i) Zn: [Ar] 4s2 3d10; [Ar] (( (( (( (( (( ((

(j) Se: [Ar] 4s2 3d10 4p4; [Ar] (( (( (( (( (( (( (( (( ((

(k) Sr: [Kr] 5s2; [Kr] ((

(l) Pb: [Xe] 6s2 4f14 5d10 6p2

8. Identify an element with the following electron configuration: [Xe]6s2 4f14 5d10.

Answer: Mercury (Hg)

9. How does ionization energy generally change in going down a group of elements in the Periodic Table? Explain why.

Answer: Ionization energy decreases down a group because atomic size increases and effective nuclear charge decreases. As nuclear attraction gets stronger, it becomes easier to remove an electron from the outermost shell.

10. How does the ionization energy generally change in going across a period in the Periodic Table? Explain why.

Answer: Ionization energy increases left-to-right across period because effective nuclear charge increases and atomic size decreases. As nuclear attraction gets stronger, it is more difficult to remove an electron from the outermost shell.

11. How do the electron affinity and electronegativity generally change in going down a group in the Periodic Table? Explain why.

Answer: Both decrease because as atomic size get larger and effective, nuclear attraction on valence electrons, including bonding, get weaker. If an electron is added to a large atom, there will be less attraction by the nucleus and less energy will be released.

12. Which element in each pair has the higher ionization energy? Explain why.

(a) Ba or Cs; (Ba – smaller atom, greater effective nuclear attraction)

(b) Br or Kr; (Kr – smaller atom, greater effective nuclear attraction)

(c) S or Se; (S – smaller atom, greater effective nuclear attraction)

(d) C or Si; (C – smaller atom, greater effective nuclear attraction)

(e) Mg or Al; (Mg – anomaly; electron is removed from 3s orbital in Mg, but from 3p orbital in Al; 3p orbital has a higher energy than 3s; it is easier to remove an electron form an orbital with higher energy level)

13. For each set, list the elements in order of increasing ionization energy.

(a) Br, Mg, Ca; (Ca < Mg < Br)

(b) Te, I, Xe; (Te < I < Xe)

(c) Ga, Ge, In; (In < Ga < Ge)

(d) Na, Si, Ar; (Na < Si < Ar)

(e) Li, Na, K; (K < Na < Li)

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