centimeters of water (cmH2O) to pascals (Pa) conversion

1 cmH2O = 98.0665 PaPacmH2O
Formula
1 cmH2O = 98.0665 Pa

Understanding Centimeters of Water to Pascals Conversion

The centimeter of water (cmH2O) is a practical gauge unit equal to the pressure of a 1 cm water column at 4°C. The pascal (Pa) is the SI unit of pressure, defined as one newton per square meter. Converting cmH2O to pascals brings water-column measurements into coherent SI terms, which is essential for scientific reporting, instrument calibration, and physics calculations.

Conversion Formula

1 cmH2O=98.0665 Pa1\ \text{cmH2O} = 98.0665\ \text{Pa}

To convert centimeters of water to pascals, multiply by this factor:

Pa=cmH2O×98.0665\text{Pa} = \text{cmH2O} \times 98.0665

Step-by-Step Example

Convert 25 centimeters of water to pascals.

Pa=25×98.0665=2451.66 Pa\text{Pa} = 25 \times 98.0665 = 2451.66\ \text{Pa}

How to Convert Centimeters of Water to Pascals

Move a water-column reading into SI units with one multiplication.

  1. Note the cmH2O value: For instance, 25 cmH2O.
  2. Multiply by 98.0665: This factor is the pascal equivalent of one centimeter of water.
  3. Work it out: 25×98.0665=2451.6625 \times 98.0665 = 2451.66.
  4. Give the result: 25 cmH2O equals 2451.66 Pa.

centimeters of water to pascals conversion table

centimeters of water (cmH2O)pascals (Pa)
00
198.0665
2196.133
3294.1995
4392.266
5490.3325
6588.399
7686.4655
8784.532
9882.5985
10980.665
151470.997
201961.33
252451.662
302941.995
403922.66
504903.325
605883.99
706864.655
807845.32
908825.985
1009806.65
15014709.98
20019613.3
25024516.63
30029419.95
40039226.6
50049033.25
60058839.9
70068646.55
80078453.2
90088259.85
100098066.5
2000196133
3000294199.5
4000392266
5000490332.5
10000980665
250002451663
500004903325
1000009806650
25000024516630
50000049033250
100000098066500

What is the centimeter of water?

The centimeter of water (cmH2O) is a unit of pressure equal to the pressure exerted by a one-centimeter-high column of water under standard conditions. It is used heavily in medicine and respiratory therapy, where small pressures are common.

Definition

The conventional centimeter of water is defined as the pressure of a 1 cm column of water with a density of 1000 kg/m³ under standard gravity (9.80665 m/s²):

1 cmH2O=98.0665 Pa1\ \text{cmH2O} = 98.0665\ \text{Pa}

This is the conventional value. Because water density varies with temperature, more precise variants exist (for example, cmH2O at 4 °C uses water's maximum density of about 999.972 kg/m³, giving roughly 98.064 Pa).

Origin and History

The unit comes directly from the water manometer, an instrument in which pressure is read as the height difference of a water column. Water was chosen for low pressures because it produces a taller, more readable column than mercury (water is about 13.6 times less dense). The convention fixes water density and gravity so the unit has a single agreed value independent of local conditions.

Law and Notable Facts

The centimeter of water is not an SI unit but is permitted in medical contexts, where it remains standard for measuring airway, ventilator, and cerebrospinal-fluid pressures. Roughly 1 cmH2O equals 0.7356 mmHg, so about 1.36 cmH2O make up 1 mmHg.

Real-World Examples and Conversions

  • Mechanical ventilators typically deliver positive end-expiratory pressure (PEEP) of 5 to 10 cmH2O.
  • Normal cerebrospinal-fluid opening pressure in a lumbar puncture is roughly 10 to 18 cmH2O.
  • 1 cmH2O ≈ 98.0665 Pa ≈ 0.098 kPa.
  • A standard atmosphere equals about 1033.2 cmH2O.

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.

1 Pa=1Nm21 \ Pa = 1 \frac{N}{m^2}

It can also be described using SI base units:

1 Pa=1kgms21 \ Pa = 1 \frac{kg}{m \cdot s^2}

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 kgm/s2kg \cdot m/s^2 (from Newton's second law, F=maF=ma).
  • Area: Measured in square meters (m2m^2).

Thus, Pascal combines these: N/m2N/m^2 which translates to (kgm/s2)/m2=kg/(ms2)(kg \cdot m/s^2) / m^2 = kg/(m \cdot s^2).

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:

ΔP=ρgΔh\Delta P = \rho g \Delta h

Where:

  • ΔP\Delta P is the hydrostatic pressure difference
  • ρ\rho is the fluid density
  • gg is the acceleration due to gravity
  • Δh\Delta h 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 ΔP=ρgΔh\Delta P = \rho g \Delta h. Given that the density of water is approximately 1000 kg/m3kg/m^3 and the acceleration due to gravity is 9.8 m/s2m/s^2
  • Weather Forecasts: Atmospheric pressure changes are often reported in hectopascals (hPa), where 1 hPa = 100 Pa.

Frequently Asked Questions

Where does the factor 98.0665 come from?

It is the product of water's density near 1000 kg/m³, standard gravity 9.80665 m/s², and a 0.01 m column height, giving 98.0665 Pa for each centimeter of water.

How many pascals are 25 cmH2O?

Multiply 25 by 98.0665, which equals 2451.66 Pa.

Why convert to pascals at all?

The pascal is the SI unit, so converting from cmH2O ensures pressure values are compatible with other SI quantities in engineering and physics computations.

Is a pascal a small unit?

Yes, one pascal is tiny, which is why a modest 25 cmH2O already amounts to over 2400 Pa, or about 2.45 kilopascals.

How do I convert pascals back to cmH2O?

Multiply the pascal value by 0.01019716; for example, 2451.66 Pa returns to 25 cmH2O.

Complete centimeters of water conversion table

cmH2O
UnitResult
pascals (Pa)98.0665 Pa
kilopascals (kPa)0.0980665 kPa
megapascals (MPa)0.0000980665 MPa
hectopascals (hPa)0.980665 hPa
millibar (mbar)0.980665 mbar
bar (bar)0.000980665 bar
torr (torr)0.7355592 torr
meters of water @ 4°C (mH2O)0.01 mH2O
millimeters of mercury (mmHg)0.7355591 mmHg
standard atmospheres (atm)0.0009678411 atm
technical atmospheres (at)0.001 at
centimeters of mercury (cmHg)0.07355591 cmHg
pounds per square inch (psi)0.01422334 psi
kilopound per square inch (ksi)0.00001422334 ksi
Inches of mercury (inHg)0.02895902 inHg