Critical Assessment of the Surface Tension determined by the Maximum Pressure
     Bubble Method

Benedetto, Franco Emmanuel; Zolotucho, Hector; Prado, Miguel Oscar

doi:10.1590/1516-1439.232513

Abstract

The main factors that influence the value of surface tension of a liquid measured with the Maximum Pressure Bubble Method are critically evaluated. We present experimental results showing the effect of capillary diameter, capillary depth, bubble spheroidicity and liquid density at room temperature. We show that the decrease of bubble spheroidicity due to increase of capillary immersion depth is not sufficient to explain the deviations found in the measured surface tension values. Thus, we propose a simple experimental procedure that allows determining the surface tension of a liquid without any previous knowledge of its density. This procedure is especially useful when the liquid of interest exhibits variations of surface tension and density with time, as for example during condensation reactions to obtain SiO₂ sols from a tetraethyl ortosilicate (TEOS) solutions during their aging process.

surface tension; MPBM; bubble deformation; maximum pressure bubble method

1 Introduction

The surface tension measurement following the maximum pressure bubble method (MPBM) is based on the determination of the pressure difference inside and outside of an air bubble at the moment the bubble is detached from the immersed end of a capillary, as shown in Figure 1. This method has been known for more than 160 years. Simon¹1. Simon M. Recherches Sur La Capillarité. Annales de Chimie et de Physique. 1851; 32:5. began to use it around 1851, and it is a practical method which allows to achieve very good results with low difficulty.

Figure 1
Diagram of the maximum pressure bubble method. Pi = internal bubble pressure and Pe = external bubble pressure.

The expression which relates the liquid surface tension with the pressure difference is obtained by performing an analysis of the work done by the air pressure to increase the volume and the surface area of the bubble while it expands into the sample liquid Equation 1.

γ = \frac{d V}{d A} \times Δ P

(1)

Where dV is the change in the volume of the bubble, dA the surface area change and ΔP the pressure difference between both sides of the interface around the bubble. In the case of a bubble forming at the end of a capillary immersed in the sample liquid, by replacing in Equation 1 the geometrical characteristics of a sphere (dV and dA), one can arrive to Equation 2

γ = \frac{R}{2} \times Δ P

(2)

Where γ is the surface tension and R is the sphere radius. At the moment when the hemispheric bubble is detached from the capillary its radius is equal to capillary radius. Thus, the capillary´s radius is used as value of "R". Equation 2 is known as Young-Laplace²2. Bashforth F. and Adams J. An attempt to test the Theory of Capillary Action. Cambridge University Press; 1883. equation and is developed for completely spherical bubbles. Bubbles with some deformation require the use of a generalized Young’s equation using the radius of curvature at each point around the bubble.

Under these experimental conditions the bubble formed at the end of a capillary is only half a bubble. Moreover, there are other experimental facts that cause deviations from the theoretical situation depicted by Equation 2 such as the effect of gravity, bubble adhesion to the capillary, particles of moisture carried by the air and turbulence generated by the growth of the bubble itself, among others. As described above, in the MPBM there is a tendency for the bubble to be deformed causing erroneous determination of the surface tension values. Bashforth and Adams²2. Bashforth F. and Adams J. An attempt to test the Theory of Capillary Action. Cambridge University Press; 1883. first and Sugden³3. Sugden S. Determination of surface tension from the maximum pressure in bubbles. Journal of the Chemical Society. 1922; 121:858-866. http://dx.doi.org/10.1039/ct9222100858.
http://dx.doi.org/10.1039/ct9222100858... ^,⁴4. Fainerman VB, Mys VD, Makievski AV and Miller R. Application of the maximum bubble pressure technique for dynamic surface tension studies of surfactant solutions using the Sugden two-capillary method. Journal of Colloid and Interface Science. 2006; 304(1):222-225. http://dx.doi.org/10.1016/j.jcis.2006.08.023. PMid:16978639
http://dx.doi.org/10.1016/j.jcis.2006.08... after, created a table with correction factors for small capillary radius depending on the capillary’s immersion depth and its radius. Likewise approaches have also been made to correct numerical mathematics and calculation of surface tension for large capillary radius⁵5. Lane JE. Correction terms for calculating surface tension from capillary rise. Journal of Colloid and Interface Science. 1973; 42(1):145-149. http://dx.doi.org/10.1016/0021-9797(73)90017-9.
http://dx.doi.org/10.1016/0021-9797(73)9...

6. Johnson CHJ, Lane JE. Surface shape and the calculation of surface tension from maximum bubble pressure. Journal of Colloid and Interface Science. 1974; 47(1):117-121.^-⁷7. Mysels K. The maximum bubble pressure method of measuring surface tension, revisited. Colloids and Surfaces. 1990; 43(2):241-262. http://dx.doi.org/10.1016/0166-6622(90)80291-B.
http://dx.doi.org/10.1016/0166-6622(90)8... .

In this work we use the Young’s theoretical model⁸8. Adamson A and Gast A. Physical chemistry of surfaces. 6th ed. Wiley Interscience; 1997. and perform an experimental correction (method I). It is achieved through a calibration that results from bubble maximum pressure measurements as a function of the capillary depth and using a sample with known surface tension. As a difference with existent procedures for surface tension measurement, the calibration obtained in this paper allows surface tension measurements with capillaries of any diameter and any immersion capillary depth.

Besides, it can be assumed that the internal gas pressure on the bubble surface has a constant value (generated by the injected air), but the external pressure caused by the surrounding liquid increases from top to bottom due to the liquid column variable height. This pressure gradient causes that the bubble is not completely spherical (Figure 2a), but it is like a revolution ellipsoid. Method II consists in taking into account the ellipsoidal bubble shape, instead of spherical, for the surface tension determination. For calculations we used an approximated surface area expression for an ellipsoid developed by Knud-Thomsen⁹9. Numericana. Available from: <http://www.numericana.com/answer/ellipsoid.htm>.. We took the dimensions of the revolution ellipsoid (“a” and “c” Figure 2b) and the pressure difference ΔP from a video recorded at the moment when the bubble detaches from the capillary.

Figure 2
(a) Internal and external pressure over the bubble’s wall, (b) ellipsoid formed from air bubble deformation.

2 Experimental Methods

For the measurement of the surface tension we made a device (Figure 3) that allows us in a controlled manner: a) Generate an air bubble inside the liquid whose γ we are interested to measure (this bubble is located at one extreme of a capillary immersed in the liquid sample) b) increase the bubble inside gas pressure c) measure ΔP between both sides of the interface around the bubble. Using a differential water manometer to measure internal bubble pressure (h_m.ρ_m.g) and a micrometer to measure the immersion capillary depth (l) allows to calculated external bubble pressure (ρ_o.g.l) and substituting in Equation 2 we get:

γ = \frac{R}{2} \times (h_{m} \cdot ρ_{m} \cdot g - l \cdot ρ_{l} \cdot g)

(3)

Where “h_m” is the liquid manometric height, ρ_m is the density of manometric fluid, ”l” is the depth of immersion of the capillary in the fluid to be measured, ρ_l the density of the liquid and g is the acceleration of gravity.

Figure 3
Device for measurement of surface tension.

2.1 Method I

In Equation 3 we introduced a correction factor "β" to account for the bubble´s lack of spheroidicity as explained in Figure 2:

γ = \frac{R}{2} \times (h_{m} \cdot ρ_{m} \cdot g - β \cdot l \cdot ρ_{l} \cdot g)

(4)

To obtain the calibration factor “β” we can rearrange Equation 4 as the linear equation:

h_{m} = β . l . (\frac{ρ_{l}}{ρ_{m}}) + \frac{2. γ}{R . ρ_{m} . g}

(5)

The value of β can be obtained from the slope of the straight line (Equation 5 and Figure 4),

Figure 4
Experimental correction proposed in this work. Linear fitting of experimental data for distilled water to 20 °C. Capillary’s diameter: 0.3 mm, in order to find the value of β, .

β = s l o p e \times (\frac{ρ_{m}}{ρ_{l}})

(6)

2.2 Method II

We also analyzed the possibility of considering the bubble as a revolution ellipsoid analytically. Then:

V = \frac{4}{3} . π . a^{2} . c

(7)

c = k . a

(8)

d V = 4. π . k . a^{2} d a

(9)

For the ellipsoid surface area, as a function of the radii, we used the Knud-Thomsen⁹9. Numericana. Available from: <http://www.numericana.com/answer/ellipsoid.htm>. approximation:

A = 4. π . {(\frac{a^{p} . b^{p} + a^{p} . c^{p} + b^{p} . c^{p}}{3})}^{\frac{1}{p}}

(10)

a = b

(11)

A = 4. π . {(\frac{a^{2 p} + 2. a^{p} . c^{p}}{3})}^{\frac{1}{p}}

(12)

c = k . a

A = 4. π . {(\frac{a^{2 p} . (1 + 2. k^{p})}{3})}^{\frac{1}{p}}

(13)

d A = 8. π . a . {(\frac{1}{3} (1 + 2. k^{p}))}^{\frac{1}{p}} d a

(14)

Where "p" is the constant of Knud-Thomsen, p=1.6075.

Substituting Equation 9 and Equation 14 in Equation 1 we obtain:

γ = (\frac{a}{2. {(\frac{1}{3} (1 + 2. k^{p}))}^{\frac{1}{p}}}) \times (h_{m} . ρ_{m} . g - l . ρ_{l} . g) (

15)

The information required for the calculations was obtained from the individual photos at the bubble detachment moment taken from the process movie recording (Figure 5a and 5b).For all the experiments described above we used distilled water, ethanol 96% v/v, acetone 99,5%, anhydrous gliceryn 99,5% and ethylenglicol pro-analysis (Glycol - 1,2-Etanodiol) for the method I and ethanol 96% v/v for method II.

Figure 5
Pictures of the video recording of the experimental measurement. (a) Maximum pressure instant and (b) ellipsoidal bubble.

The capillary radii used were 0.13 mm, 0.44 mm, 0.82 mm and 1.25 mm for the method I and 1.25 mm for method II.

The manometric fluid used in all experiments was distilled water.

3 Results and Discussion

3.1 Method I: surface tension obtained by MPBM with β correction factor

For the experiments conducted with water and ethanol, the experimental results found with and without the calibration factor “β” are shown in Table1.

Thumbnail

Table 1
Experimental values obtained for surface tension (ST) with and without correction factor “β” for different capillary diameters and relative errors (ERR%).

The errors on the measured surface tension values increase with the increase of the capillary immersion depth and capillary diameter (see Figure 6)

Figure 6
Increased error in the measured surface tension vs. Immersion depth of capillary. a) Surface tension of distilled water measured with capillary radius 1.25 mm, b) surface tension of ethanol 96% measured with capillary radius 1.25 mm, c) surface tension of distilled water measured with capillary radius 0.82 mm, d) surface tension of ethanol 96% measured with capillary radius 0.82 mm.

The larger the radius of the capillary, the greater the bubble deformation and greater the error. The calibration factor produces a great improvement in the measurements, mainly for the capillary of 1.25 mm radius.

Furthermore with the highest surface tension liquid (water) less error occurs than with the lowest surface tension (ethanol). It is expected that the higher the surface tension of the liquid, the more resistant to deformation is the bubble.

Using the proposed method, measurements of the surface tension on glycerol, ethylene glycol and acetone were also performed, using a capillary of radius 0.3 mm and a correction factor β=0.98 for all this liquid samples (Table 2). For this measurements, β was previously obtained by a calibration experiment carried out on distilled water as was described above. In Table 2 we also show experimental reference values of surface tension of these liquids found in the bibliography¹⁰10. Lide DR. CRC Handbook of Chemistry and Physics. 90th ed. CRC Press; 2009.. One useful result of this work is that from the results obtained for different liquids (Table 2), we observe that the β value obtained with a distillated water calibration is the same that the β value obtained with other liquids. Except in the case when we use a 0.82 mm radius capillary, it is possible to calculate the approximate density of an unknown sample by using the value of β obtained with distillated water. Following on, from Equation 6:

Thumbnail

Table 2
Experimental results with β=0.98, for glycerol, ethylene glycol and acetona.

ρ_{l} = β \times \frac{ρ_{m}}{s l o p e}

(16)

When we obtain the “slope” by plotting the maximum gauge pressure at different depths of immersion of the capillary in the sample of unknown density, after fitting a linear function, the value of the intercept (OO) allows us to calculate the surface tension value (Equation 5).

γ = \frac{O O \times R \times ρ_{m} \times g}{2}

(17)

By the method described above we measured the change in density and surface tension of TEOS during the gelation process (Table 3). The density of a TEOS sol-gel solution prepared in this work showed a growth about 41% from its initial value. The surface tension increased about 18% (see Table 3) after the same time.

Thumbnail

Table 3
Experimental results from gelation process of TEOS sol-gel.

For TEOS solution preparation we used tetraethyl ortosilicate (Si(OC₂H₅)₄) 98%, ethanol absolute (C₂H₅OH) 99,8% and distillated water (H₂O). The solution was prepared at 40 °C. The molar relation of solution was Si(OC₂H₅)₄/C₂H₅OH/ H₂O = 1/6,4/1.

3.2 Method II: surface tension obtained by MPBM with the ellipsoid bubble shape approximation

The experimental results obtained using Equation 15 approximating the bubble shape to an ellipsoid (without using the β correction factor) and by measuring the bubble dimensions obtained in the videos recording of experiments with ethanol 96% v/v and a capillary’s radius of 1.25 mm could be divided into two groups for its analysis:

#1 - Average surface tension, for depths of capillary up to 30 mm.

#2 - Average surface tension, for depths of capillary up to 4 mm.

The relative errors (Table 4) for spherical and ellipsoidal bubble shapes were taken with respect to the theoretical value of ethanol 96% surface tension 0.254 [J/m²], which was calculated¹¹11. Pérez Ones O. Evaluation of physical properties of ethanol-water mixtures (II). Revista Facultad de Ingeniería Universidad de Antioquia. 2010; 52:62-74. at the temperature of the experiment (20°C) with the following expressions:

γ_{m i x} = \sum_{i} x_{i} . γ_{i}

(18)

Where 𝛄_m_i_x is the surface tension of 96% ethanol-water mix and x_i and 𝛄_i are the fractional composition and surface tension of each component in the solution.

Thumbnail

Table 4
Experimental results for ethanol 96% v/v with ellipsoid geometrical approach for #1 immersion depth until 30 mm and #2 immersion depth until 4 mm.

The surface tension of pure ethanol, between 273-373 °K can be adjusted with Equation 19 and the surface tension of water between 273-403 °K by Equation 20.

γ_{e t} = 0,0244. e^{- 0,0046 T}

(19)

γ_{w} = 0,0761 - {0,1754.10}^{- 3} . T (

20)

Where 𝛄_e_t and 𝛄_w are surface tension of pure ethanol and water respectively, and T the temperature in Kelvin degrees.

4 Conclusions

According to the experimental evidence:

The error in the surface tension values measured with the described device (Figure 3) increases with the increasing of the capillary immersion depth (l).

For a fixed capillary immersion depth the error in the surface tension values measured increases with increasing capillary diameter.

4.1 Method I

The use of the proposed experimental factor (β) causes improvement substantial error decrease in the measured surface tension values. For example, the percent relative errors (Table 1) in the best case are reduced from about 37% to 2%.

Moreover the calibration obtained in this paper allows surface tension measurements with capillaries of any diameter and immersion capillary depth. This is an advantage whit respect to previously published procedures.

4.2 Method II

The use of a bubble ellipsoidal geometry in the mathematical model does improve the error obtained in measurement of surface tension using our device only for immersion capillary immersion depths up to 4 mm. (Table 4). For larger depths errors up to 30% are obtained even after applying this correction showing that other physical phenomena are taking place besides the deformation.

For both methods, the calibration constant “β" method or the bubble approximation to an ellipsoid, the error in the measurement of surface tension is diminished, although each method has a depth range of capillary immersion where it is applicable.

MPBM with correction factor (β) is a simple and practical method for the surface tension measurement of a substance with an unknown density, obtaining measurements with a relative error lower than 2,5%.

We also show in this paper that the proposed method I allows to measure density and surface tension of a liquid during a gelation process.

Acknowledgments

We acknowledge Mr. Simón Prastalo for his help on the apparatus mounting.

References

¹
Simon M. Recherches Sur La Capillarité. Annales de Chimie et de Physique. 1851; 32:5.
²
Bashforth F. and Adams J. An attempt to test the Theory of Capillary Action. Cambridge University Press; 1883.
³
Sugden S. Determination of surface tension from the maximum pressure in bubbles. Journal of the Chemical Society. 1922; 121:858-866. http://dx.doi.org/10.1039/ct9222100858.
» http://dx.doi.org/10.1039/ct9222100858
⁴
Fainerman VB, Mys VD, Makievski AV and Miller R. Application of the maximum bubble pressure technique for dynamic surface tension studies of surfactant solutions using the Sugden two-capillary method. Journal of Colloid and Interface Science. 2006; 304(1):222-225. http://dx.doi.org/10.1016/j.jcis.2006.08.023. PMid:16978639
» http://dx.doi.org/10.1016/j.jcis.2006.08.023
⁵
Lane JE. Correction terms for calculating surface tension from capillary rise. Journal of Colloid and Interface Science. 1973; 42(1):145-149. http://dx.doi.org/10.1016/0021-9797(73)90017-9.
» http://dx.doi.org/10.1016/0021-9797(73)90017-9
⁶
Johnson CHJ, Lane JE. Surface shape and the calculation of surface tension from maximum bubble pressure. Journal of Colloid and Interface Science. 1974; 47(1):117-121.
⁷
Mysels K. The maximum bubble pressure method of measuring surface tension, revisited. Colloids and Surfaces. 1990; 43(2):241-262. http://dx.doi.org/10.1016/0166-6622(90)80291-B.
» http://dx.doi.org/10.1016/0166-6622(90)80291-B
⁸
Adamson A and Gast A. Physical chemistry of surfaces. 6th ed. Wiley Interscience; 1997.
⁹
Numericana. Available from: <http://www.numericana.com/answer/ellipsoid.htm>.
¹⁰
Lide DR. CRC Handbook of Chemistry and Physics. 90th ed. CRC Press; 2009.
¹¹
Pérez Ones O. Evaluation of physical properties of ethanol-water mixtures (II). Revista Facultad de Ingeniería Universidad de Antioquia. 2010; 52:62-74.

Publication Dates

Publication in this collection
Jan-Feb 2015

History

Received
19 Dec 2013
Reviewed
16 Jan 2015

All content of the journal, except where identified, is licensed under a Creative Commons

[1] ¹
Simon M. Recherches Sur La Capillarité. Annales de Chimie et de Physique. 1851; 32:5.

[2] ²
Bashforth F. and Adams J. An attempt to test the Theory of Capillary Action. Cambridge University Press; 1883.

[3] ³
Sugden S. Determination of surface tension from the maximum pressure in bubbles. Journal of the Chemical Society. 1922; 121:858-866. http://dx.doi.org/10.1039/ct9222100858.
» http://dx.doi.org/10.1039/ct9222100858

[4] ⁴
Fainerman VB, Mys VD, Makievski AV and Miller R. Application of the maximum bubble pressure technique for dynamic surface tension studies of surfactant solutions using the Sugden two-capillary method. Journal of Colloid and Interface Science. 2006; 304(1):222-225. http://dx.doi.org/10.1016/j.jcis.2006.08.023. PMid:16978639
» http://dx.doi.org/10.1016/j.jcis.2006.08.023

[5] ⁵
Lane JE. Correction terms for calculating surface tension from capillary rise. Journal of Colloid and Interface Science. 1973; 42(1):145-149. http://dx.doi.org/10.1016/0021-9797(73)90017-9.
» http://dx.doi.org/10.1016/0021-9797(73)90017-9

[6] ⁶
Johnson CHJ, Lane JE. Surface shape and the calculation of surface tension from maximum bubble pressure. Journal of Colloid and Interface Science. 1974; 47(1):117-121.

[7] ⁷
Mysels K. The maximum bubble pressure method of measuring surface tension, revisited. Colloids and Surfaces. 1990; 43(2):241-262. http://dx.doi.org/10.1016/0166-6622(90)80291-B.
» http://dx.doi.org/10.1016/0166-6622(90)80291-B

[8] ⁸
Adamson A and Gast A. Physical chemistry of surfaces. 6th ed. Wiley Interscience; 1997.

[9] ⁹
Numericana. Available from: <http://www.numericana.com/answer/ellipsoid.htm>.

[10] ¹⁰
Lide DR. CRC Handbook of Chemistry and Physics. 90th ed. CRC Press; 2009.

[11] ¹¹
Pérez Ones O. Evaluation of physical properties of ethanol-water mixtures (II). Revista Facultad de Ingeniería Universidad de Antioquia. 2010; 52:62-74.

Capillary	Sample	β factor [constant]	Theoretical ST (*) [J/m²]	ST measured without β [J/m²]	ERR%(**) without β	ST measured using β [J/m²]	ERR%(**) using β
r = 1.25 mm	distilled water	0.91	0.07296	0.06409	12.1	0.07169	1.7
r = 1.25 mm	ethanol 96%	0.90	0.02532	0.01593	37.1	0.02487	1.8
r = 0.82 mm	distilled water	0.92	0.07310	0.06819	6.7	0.07233	1.1
r = 0.82 mm	ethanol 96%	0.84	0.02534	0.02109	16.8	0.02538	0.2
r = 0.44 mm	distilled water	0.9	0.07306	0.07084	3.0	0.07355	0.7
r = 0.13mm	distilled water	0.99	0.07327	0.07181	2.0	0.07189	1.9

	ST measured [J/m²]	β	ST reference values [J/m²]
Glycerol	0.0659 ± 0.0039	0.98	0.0645
Ethylene Glycol	0.0467 ± 0.0022	0.98	0.0479
Acetone	0.0223 ± 0.0013	0.98	0,0234

Time [h]	Density [Kg/m³]	TS [N/m]
0	675.45	0.0231 ± 0.0003
1	871.01	0.0243 ± 0.0006
2	951.86	0.0273 ± 0.0005

Sample	ERR% sphere	ERR% ellipsoid
#1	37.1	31.7
#2	14.7	2.9

Brazil

Brazil

Critical Assessment of the Surface Tension determined by the Maximum Pressure Bubble Method

Abstract

1 Introduction

2 Experimental Methods

2.1 Method I

2.2 Method II

3 Results and Discussion

3.1 Method I: surface tension obtained by MPBM with β correction factor

3.2 Method II: surface tension obtained by MPBM with the ellipsoid bubble shape approximation

4 Conclusions

4.1 Method I

4.2 Method II

Acknowledgments

References

Publication Dates

History