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GAS LAWS
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Elements that exist as gases at 250C and 1 atmosphere
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Gas Law Objectives For each of the following pairs of gas properties, (1) describe the relationship between them, (2) describe a simple system that could be used to demonstrate the relationship, and (3) explain the reason for the relationship. V and P when n and T are constant P and T when n and V are constant V and T when n and P are constant n and P when V and T are constant n and V when P and T are constant
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CONCEPT MAP
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Properties of Gases
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Gas Model Gases are composed of tiny, widely-spaced particles.
For a typical gas, the average distance between particles is about ten times their diameter. Because of the large distance between the particles, the volume occupied by the particles themselves is negligible (approximately zero). For a typical gas at room temperature and pressure, the gas particles themselves occupy about 0.1% of the total volume. The other 99.9% of the total volume is empty space. This is very different than for a liquid for which about 70% of the volume is occupied by particles.
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The particles have rapid and continuous motion.
For example, the average velocity of a helium atom, He, at room temperature is over 1000 m/s (or over 2000 mi/hr). The average velocity of the more massive nitrogen molecules, N2, at room temperature is about 500 m/s. Increased temperature means increased average velocity of the particles.
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The particles are constantly colliding with the walls of the container and with each other.
Because of these collisions, the gas particles are constantly changing their direction of motion and their velocity. In a typical situation, a gas particle moves a very short distance between collisions. O2 molecules at normal temperatures and pressures move an average of 10-7 m between collisions. There is no net loss of energy in the collisions. A collision between two particles may lead to each particle changing its velocity and thus its energy, but the increase in energy by one particle is balanced by an equal decrease in energy by the other particle.
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IDEAL GASES The particles are assumed to be point‑masses, that is, particles that have a mass but occupy no volume. There are no attractive or repulsive forces at all between the particles.
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Gas Properties and their Units
Pressure (P) = Force/Area 1 atm = kPa = 760 mmHg = 760 torr Volume (V) unit usually liters (L) 1000 L = 1 m3 Temperature (T) ? K = --- C C = (F - 32) /1.8 Number of gas particles (n) mole
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Force Pressure = Area (force = mass x acceleration) 5.2
Barometer Pressure = (force = mass x acceleration) Units of Pressure 1 pascal (Pa) = 1 N/m2 1 atm = 760 mmHg = 760 torr 1 atm = 101,325 Pa 5.2
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10 miles 0.2 atm 4 miles 0.5 atm Sea level 1 atm 5.2
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Apparatus for Demonstrating Relationships Between Properties of Gases
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Manometers Used to Measure Gas Pressures
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As the pressure increases, volume decreases
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Boyle’s Law P a 1/V Constant temperature P x V = constant
Constant amount of gas P x V = constant P1 x V1 = P2 x V2 5.3
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Boyle’s Law The pressure of an ideal gas is inversely proportional to the volume it occupies if the moles of gas and the temperature are constant.
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Relationship between P and V
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Example 1: 2. 00 L of a gas is at 740. 0 mmHg pressure
Example 1: 2.00 L of a gas is at mmHg pressure. What is its volume at standard pressure (760 mm Hg)? Answer: this problem is solved by inserting values into P1V1 = P2V2. (740.0 mmHg) (2.00 L) =(760.0 mmHg) (x) x = 1.95 L
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Example 2: 5. 00 L of a gas is at 1. 08 atm
Example 2: 5.00 L of a gas is at 1.08 atm. What pressure is obtained when the volume is 10.0 L? (1.08 atm) (5.00 L) =(x) (10.0 L) x = 0.54 atm
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A sample of chlorine gas occupies a volume of 946 mL at a pressure of 726 mmHg. What is the pressure of the gas (in mmHg) if the volume is reduced at constant temperature to 154 mL? P x V = constant P1 x V1 = P2 x V2 P1 = 726 mmHg P2 = ? V1 = 946 mL V2 = 154 mL P1 x V1 V2 726 mmHg x 946 mL 154 mL = P2 = = 4460 mmHg 5.3
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As T increases V increases 5.3
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Variation of gas volume with temperature at constant pressure.
Charles’ & Gay-Lussac’s Law V a T Temperature must be in Kelvin V = constant x T V1/T1 = V2 /T2 T (K) = t (0C) 5.3
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As the temperature increases, volume increases.
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Charles’ Law For an ideal gas, volume and temperature described in kelvins are directly proportional if moles of gas and pressure are constant.
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Relationship between T and V
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Example 1: A gas is collected and found to fill 2. 85 L at 25. 0°C
Example 1: A gas is collected and found to fill 2.85 L at 25.0°C. What will be its volume at standard temperature? Answer: convert 25.0°C to Kelvin and you get 298 K. Standard temperature is 273 K. We plug into our equation like this: x = 2.61 L
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Example #2: 4. 40 L of a gas is collected at 50. 0°C
Example #2: 4.40 L of a gas is collected at 50.0°C. What will be its volume upon cooling to 25.0°C? First of all, 2.20 L is the wrong answer. Sometimes a student will look at the temperature being cut in half and reason that the volume must also be cut in half. That would be true if the temperature was in Kelvin. However, in this problem the Celsius is cut in half, not the Kelvin. Answer: convert 50.0°C to 323 K and 25.0°C to 298 K. Then plug into the equation and solve for x, like this: x = 4.06 L
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A sample of carbon monoxide gas occupies 3. 20 L at 125 0C
A sample of carbon monoxide gas occupies 3.20 L at 125 0C. At what temperature will the gas occupy a volume of 1.54 L if the pressure remains constant? V1 /T1 = V2 /T2 V1 = 3.20 L V2 = 1.54 L T1 = K T2 = ? T1 = 125 (0C) (K) = K V2 x T1 V1 1.54 L x K 3.20 L = T2 = = 192 K 5.3
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