Understanding pascals to standard atmospheres Conversion
The pascal (Pa) is the SI unit of pressure, and the standard atmosphere (atm) is a reference pressure defined as exactly 101325 Pa — roughly the mean sea-level air pressure. Because one atmosphere is a large pressure, a single pascal is only about 9.869 × 10⁻⁶ atm. This conversion is central to chemistry, meteorology, and diving, where reactions, weather, and gas laws are often referenced to atmospheres.
Conversion Formula
To convert pascals to standard atmospheres, multiply by this factor:
Step-by-Step Example
Convert 25 pascals to standard atmospheres.
How to Convert pascals to standard atmospheres
Reference an SI pressure to the sea-level standard atmosphere.
- Take the pascal value: Start with your pressure in pascals, e.g. 25 Pa.
- Multiply by 9.869233 × 10⁻⁶: Equivalently, divide by 101325.
- Expect a tiny number: One atmosphere is large, so small pascal values yield very small atm figures.
- Read the result: 25 × 9.869233 × 10⁻⁶ = 2.467308 × 10⁻⁴ atm.
pascals to standard atmospheres conversion table
| pascals (Pa) | standard atmospheres (atm) |
|---|---|
| 0 | 0 |
| 1 | 0.000009869233 |
| 2 | 0.00001973847 |
| 3 | 0.0000296077 |
| 4 | 0.00003947693 |
| 5 | 0.00004934616 |
| 6 | 0.0000592154 |
| 7 | 0.00006908463 |
| 8 | 0.00007895386 |
| 9 | 0.00008882309 |
| 10 | 0.00009869233 |
| 15 | 0.0001480385 |
| 20 | 0.0001973847 |
| 25 | 0.0002467308 |
| 30 | 0.000296077 |
| 40 | 0.0003947693 |
| 50 | 0.0004934616 |
| 60 | 0.000592154 |
| 70 | 0.0006908463 |
| 80 | 0.0007895386 |
| 90 | 0.0008882309 |
| 100 | 0.0009869233 |
| 150 | 0.001480385 |
| 200 | 0.001973847 |
| 250 | 0.002467308 |
| 300 | 0.00296077 |
| 400 | 0.003947693 |
| 500 | 0.004934616 |
| 600 | 0.00592154 |
| 700 | 0.006908463 |
| 800 | 0.007895386 |
| 900 | 0.008882309 |
| 1000 | 0.009869233 |
| 2000 | 0.01973847 |
| 3000 | 0.0296077 |
| 4000 | 0.03947693 |
| 5000 | 0.04934616 |
| 10000 | 0.09869233 |
| 25000 | 0.2467308 |
| 50000 | 0.4934616 |
| 100000 | 0.9869233 |
| 250000 | 2.467308 |
| 500000 | 4.934616 |
| 1000000 | 9.869233 |
What is pascals?
Pascal (Pa) is the SI unit of pressure, defined as the force of one newton acting on an area of one square meter. This section will delve into the definition, formation, historical context, and practical applications of Pascal.
Pascal Definition
The pascal (Pa) is the SI derived unit of pressure used to quantify internal pressure, stress, Young's modulus, and ultimate tensile strength. It is defined as one newton per square meter.
It can also be described using SI base units:
Formation of Pascal
Pascal as a unit is derived from the fundamental units of mass (kilogram), length (meter), and time (second). Pressure, in general, is defined as force per unit area.
- Force: Measured in Newtons (N), which itself is defined as (from Newton's second law, ).
- Area: Measured in square meters ().
Thus, Pascal combines these: which translates to .
Blaise Pascal and Pascal's Law
The unit is named after Blaise Pascal (1623-1662), a French mathematician, physicist, inventor, writer, and Catholic theologian. He made significant contributions to the fields of mathematics, physics, and early computing.
Pascal's Law (or Pascal's Principle) states that a pressure change occurring anywhere in a confined incompressible fluid is transmitted throughout the fluid such that the same change occurs everywhere.
Mathematically, this is often represented as:
Where:
- is the hydrostatic pressure difference
- is the fluid density
- is the acceleration due to gravity
- is the height difference of the fluid
For further reading about Pascal's Law, you can refer to Pascal's Law and Hydraulics.
Real-World Examples
Here are some examples of pressure measured in Pascals or related units (like kilopascals, kPa):
- Atmospheric Pressure: Standard atmospheric pressure at sea level is approximately 101,325 Pa, or 101.325 kPa.
- Tire Pressure: Car tire pressure is often measured in PSI (pounds per square inch), but can be converted to Pascals. For example, 35 PSI is roughly 241 kPa.
- Hydraulic Systems: The pressure in hydraulic systems, like those used in car brakes or heavy machinery, can be several megapascals (MPa).
- Water Pressure: The water pressure at the bottom of a 1-meter deep pool is approximately 9.8 kPa (ignoring atmospheric pressure). The Hydrostatic pressure can be determined with formula . Given that the density of water is approximately 1000 and the acceleration due to gravity is 9.8
- Weather Forecasts: Atmospheric pressure changes are often reported in hectopascals (hPa), where 1 hPa = 100 Pa.
What is the standard atmosphere?
The standard atmosphere (atm) is a unit of pressure defined as a fixed reference value close to the average atmospheric pressure at sea level. It is widely used in chemistry, physics, engineering, and diving to express pressures relative to typical sea-level conditions.
Definition
The standard atmosphere is defined exactly as 101,325 pascals:
This is equivalent to 1013.25 hectopascals (millibars), 760 millimeters of mercury (torr), and about 14.6959 pounds per square inch. The value was fixed by the 10th General Conference on Weights and Measures (CGPM) in 1954.
Origin and History
Early pressure measurement grew from Evangelista Torricelli's 1643 barometer experiments, which showed the atmosphere supports a mercury column about 760 mm high. The "atmosphere" became a convenient reference for a whole unit of ambient pressure. In 1954 the CGPM adopted the exact value 101,325 Pa, based on a 760 mm mercury column at 0 °C under standard gravity, to remove the temperature and location dependence of earlier definitions.
Law and Notable Facts
The standard atmosphere is accepted for use with the SI but is not an SI unit; the SI unit of pressure is the pascal. IUPAC now recommends the bar (100,000 Pa) rather than the atmosphere as the standard pressure for reporting thermodynamic data, though "atm" remains common. Note that the technical atmosphere (at) is a different unit equal to 98,066.5 Pa.
Real-World Examples and Conversions
- Average sea-level air pressure is very close to 1 atm (101.325 kPa).
- Ocean pressure increases by roughly 1 atm for every 10 meters of seawater depth, so a diver at 30 m experiences about 4 atm total.
- A typical car tire inflated to 32 psi holds about 2.2 atm of gauge pressure.
- The pressure inside a champagne bottle is roughly 6 atm (about 608 kPa).
Frequently Asked Questions
How many standard atmospheres are in one pascal?
About 9.869233 × 10⁻⁶ atm, because one atmosphere is defined as exactly 101325 pascals.
How do I convert pascals to standard atmospheres?
Multiply the pascal value by 9.869233 × 10⁻⁶. For example, 25 Pa equals about 2.467308 × 10⁻⁴ atm.
How do I convert standard atmospheres back to pascals?
Multiply the atm value by 101325 to return to pascals.
Is the standard atmosphere the same as a bar?
No. One standard atmosphere is 101325 Pa while one bar is exactly 100000 Pa, so an atmosphere is about 1.325% larger than a bar.
Where is the atmosphere unit commonly used?
It is widely used in chemistry for gas-law and equilibrium calculations, in meteorology for reference pressures, and in scuba diving to express depth-related pressure.
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Complete pascals conversion table
| Unit | Result |
|---|---|
| kilopascals (kPa) | 0.001 kPa |
| megapascals (MPa) | 0.000001 MPa |
| hectopascals (hPa) | 0.01 hPa |
| millibar (mbar) | 0.01 mbar |
| bar (bar) | 0.00001 bar |
| torr (torr) | 0.007500617 torr |
| meters of water @ 4°C (mH2O) | 0.0001019716 mH2O |
| millimeters of mercury (mmHg) | 0.007500616 mmHg |
| standard atmospheres (atm) | 0.000009869233 atm |
| centimeters of water (cmH2O) | 0.01019716 cmH2O |
| technical atmospheres (at) | 0.00001019716 at |
| centimeters of mercury (cmHg) | 0.0007500616 cmHg |
| pounds per square inch (psi) | 0.0001450377 psi |
| kilopound per square inch (ksi) | 1.450377e-7 ksi |
| Inches of mercury (inHg) | 0.0002952998 inHg |