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Chapter 8: Problem 37

Freon-12 \(\left(\mathrm{CF}_{2} \mathrm{Cl}_{2}\right)\) is commonly used as the refrigerant in central home air conditioners. The system is initially charged to a pressure of 4.8 atm. Express this pressure in each of the following units ( 1 atm \(=14.7\) psi). a. \(\mathrm{mm} \mathrm{Hg}\) b. \(torr\) c. \(Pa\) d. \(psi\)

Short Answer

Expert verified
The given pressure of 4.8 atm is equivalent to: a. 3648 mmHg b. 3648 torr c. 486360 Pa d. 70.56 psi

Step by step solution

01

Conversion to millimeters of mercury (mmHg)

To convert the pressure from atm to mmHg, use the conversion factor 1 atm = 760 mmHg. The given pressure is 4.8 atm. \(4.8 \ \mathrm{atm} \times \frac{760 \ \mathrm{mmHg}}{1 \ \mathrm{atm}} = 3648 \ \mathrm{mmHg}\) Therefore, the pressure is 3648 mmHg.
02

Conversion to torr

To convert the pressure from atm to torr, use the conversion factor 1 atm = 760 torr. The given pressure is 4.8 atm. \(4.8 \ \mathrm{atm} \times \frac{760 \ \mathrm{torr}}{1 \ \mathrm{atm}} = 3648 \ \mathrm{torr}\) Therefore, the pressure is 3648 torr.
03

Conversion to Pascals (Pa)

To convert the pressure from atm to Pa, use the conversion factor 1 atm = 101325 Pa. The given pressure is 4.8 atm. \(4.8 \ \mathrm{atm} \times \frac{101325 \ \mathrm{Pa}}{1 \ \mathrm{atm}} = 486360 \ \mathrm{Pa}\) Therefore, the pressure is 486360 Pa.
04

Conversion to pounds per square inch (psi)

To convert the pressure from atm to psi, use the given conversion factor 1 atm = 14.7 psi. The given pressure is 4.8 atm. \(4.8 \ \mathrm{atm} \times \frac{14.7 \ \mathrm{psi}}{1 \ \mathrm{atm}} = 70.56 \ \mathrm{psi}\) Therefore, the pressure is 70.56 psi. So, the given pressure of 4.8 atm is equivalent to: a. 3648 mmHg b. 3648 torr c. 486360 Pa d. 70.56 psi

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Key Concepts

These are the key concepts you need to understand to accurately answer the question.

Atmospheric Pressure
Atmospheric pressure is the force exerted by the weight of the air above us on Earth's surface. It's a fundamental concept in meteorology and is crucial for understanding pressure changes in various conditions, such as weather systems. Atmospheric pressure at sea level is taken as a standard for measuring pressure, which is approximately 1 atmosphere (atm). This is due to the weight of the column of air above a specific area.
Typical atmospheric pressure can vary with altitude and weather conditions, but standard atmospheric pressure is defined as exactly 101,325 Pascals (Pa) or 760 millimeters of mercury (mmHg). This standard also allows us to make precise conversions between different units of pressure.
Millimeters of Mercury (mmHg)
Millimeters of Mercury, abbreviated as mmHg, is a unit of pressure used in medical and scientific fields to measure blood pressure and other pressures where high precision is required.
The term originates from the height of a mercury column a specific pressure can support. For example, 1 atm of pressure is equivalent to 760 mmHg. Therefore, when converting from atmospheres to mmHg, you multiply the number of atmospheres by 760.
  • 1 atm = 760 mmHg
  • Example: To convert 4.8 atm to mmHg:
    4.8 atm × 760 mmHg/atm = 3648 mmHg
This conversion is applicable in various contexts including laboratory and clinical settings where precise pressure measurements are necessary.
Pascals (Pa)
Pascals are the SI (International System of Units) unit of pressure and are widely used in scientific and engineering applications. One Pascal is defined as one newton of force applied over an area of one square meter. This makes it a very versatile unit for measuring pressure.
  • 1 atm = 101,325 Pa
  • To convert from atm to Pascals:
Simply multiply the pressure in atmospheres by 101,325 Pa/atm.
For instance, a pressure of 4.8 atm is equivalent to:
4.8 atm × 101,325 Pa/atm = 486,360 Pa.
Pascals provide a useful measure in contexts where precise pressure calculations are pivotal, such as in the design of engines and atmospheric studies.
Pounds per Square Inch (psi)
Pounds per square inch (psi) is a common unit of pressure mainly used in the United States. It is especially prevalent in measuring tire pressure, hydraulic systems, and other instances where pressure needs to be measured in laudatory terms.
Psi is defined as one pound-force applied per square inch of area.
  • 1 atm = 14.7 psi
  • To convert atmospheres to psi, use the conversion factor: 1 atm = 14.7 psi
For a practical example, converting 4.8 atm to psi means calculating:
4.8 atm × 14.7 psi/atm = 70.56 psi.
Understanding this conversion is crucial in applications like checking tire pressures, where safety and efficiency heavily depend on maintaining correct psi levels.

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Most popular questions from this chapter

A container is filled with an ideal gas to a pressure of 11.0 atm at \(0^{\circ} \mathrm{C}\). a. What will be the pressure in the container if it is heated to \(45^{\circ} \mathrm{C} ?\) b. At what temperature would the pressure be 6.50 atm? c. At what temperature would the pressure be 25.0 atm?

Small quantities of hydrogen gas can be prepared in the laboratory by the addition of aqueous hydrochloric acid to metallic zinc. $$\mathrm{Zn}(s)+2 \mathrm{HCl}(a q) \longrightarrow \mathrm{ZnCl}_{2}(a q)+\mathrm{H}_{2}(g)$$ Typically, the hydrogen gas is bubbled through water for collection and becomes saturated with water vapor. Suppose 240\. mL of hydrogen gas is collected at \(30 .^{\circ} \mathrm{C}\) and has a total pressure of \(1.032\) atm by this process. What is the partial pressure of hydrogen gas in the sample? How many grams of zinc must have reacted to produce this quantity of hydrogen? (The vapor pressure of water is 32 torr at \(30^{\circ} \mathrm{C}\).)

Urea \(\left(\mathrm{H}_{2} \mathrm{NCONH}_{2}\right)\) is used extensively as a nitrogen source in fertilizers. It is produced commercially from the reaction of ammonia and carbon dioxide: $$2 \mathrm{NH}_{3}(g)+\mathrm{CO}_{2}(g) \longrightarrow \mathrm{H}_{2} \mathrm{NCONH}_{2}(s)+\mathrm{H}_{2} \mathrm{O}(g)$$ Ammonia gas at \(223^{\circ} \mathrm{C}\) and \(90 .\) atm flows into a reactor at a rate of \(500 .\) L/min. Carbon dioxide at \(223^{\circ} \mathrm{C}\) and \(45\) atm flows into the reactor at a rate of \(600 .\) L/min. What mass of urea is produced per minute by this reaction assuming \(100 \%\) yield?

Consider separate \(1.0\) -\(\mathrm{L}\) samples of \(\mathrm{He}(g)\) and \(\mathrm{UF}_{6}(g),\) both at \(1.00\) atm and containing the same number of moles. What ratio of temperatures for the two samples would produce the same root mean square velocity?

A compound has the empirical formula \(\mathrm{CHCI}\) A \(256-\mathrm{mL}\) flask, at \(373 \mathrm{K}\) and \(750 .\) torr, contains \(0.800 \mathrm{g}\) of the gaseous compound. Give the molecular formula.
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