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Comparisons between dual-energy X-ray absorptiometry and bioimpedance devices for appendicular lean mass and muscle quality in Hispanic adults

Published online by Cambridge University Press:  15 April 2024

Bassel Nassar
Affiliation:
School of Health and Rehabilitation Sciences, The Ohio State University, Columbus, OH 43210, USA
Grant M. Tinsley
Affiliation:
Department of Kinesiology and Sport Management, Texas Tech University, Lubbock, TX, USA
Kyung-Shin Park
Affiliation:
College of Nursing and Health Sciences, Texas A&M International University, Laredo, TX, USA
Stefan A. Czerwinski
Affiliation:
School of Health and Rehabilitation Sciences, The Ohio State University, Columbus, OH 43210, USA
Brett S. Nickerson*
Affiliation:
School of Health and Rehabilitation Sciences, The Ohio State University, Columbus, OH 43210, USA
*
*Corresponding author: Brett S. Nickerson, email [email protected]
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Abstract

The purpose of this study was to compare single- and multi-frequency bioimpedance (BIA) devices against dual-energy X-ray absorptiometry (DXA) for appendicular lean mass (ALM) and muscle quality index (MQI) metrics in Hispanic adults. One hundred thirty-one Hispanic adults (18–55 years) participated in this study. ALM was measured with single-frequency bioimpedance analysis (SFBIA), multi-frequency bioimpedance analysis (MFBIA) and DXA. ALMTOTAL (left arm + right arm + left leg + right leg) and ALMARMS (left arm + right arm) were computed for all three devices. Handgrip strength (HGS) was measured using a dynamometer. The average HGS was used for all MQI models (highest left hand + highest right hand)/2. MQIARMS was defined as the ratio between HGS and ALMARMS. MQITOTAL was established as the ratio between HGS and ALMTOTAL. SFBIA and MFBIA had strong correlations with DXA for all ALM and MQI metrics (Lin’s concordance correlation coefficient values ranged from 0·86 (MQIMFBIA-ARMS) to 0·97 (Arms LMSFBIA); all P < 0·001). Equivalence testing varied between methods (e.g. SFBIA v. DXA) when examining the different metrics (i.e. ALMTOTAL, ALMARMS, MQITOTAL and MQIARMS). MQIARMS was the only metric that did not differ from the line of identity and had no proportional bias when comparing all the devices against each other. The current study findings demonstrate good overall agreement between SFBIA, MFBIA and DXA for ALMTOTAL and ALMARMS in a Hispanic population. However, SFBIA and MFBIA have better agreement with DXA when used to compute MQIARMS than MQITOTAL.

Type
Research Article
Creative Commons
Creative Common License - CCCreative Common License - BY
This is an Open Access article, distributed under the terms of the Creative Commons Attribution licence (http://creativecommons.org/licenses/by/4.0/), which permits unrestricted re-use, distribution and reproduction, provided the original article is properly cited.
Copyright
© The Author(s), 2024. Published by Cambridge University Press on behalf of The Nutrition Society

Muscular strength and appendicular lean mass (ALM) are often used to diagnose sarcopenia and calculate muscle quality(Reference Cruz-Jentoft, Bahat and Bauer1,Reference Du, Goates and Arensberg2) . The decline of muscular strength and ALM in ageing has resulted in most research being centred on older adults. In addition, poor muscle quality is associated with chronic diseases such as type II diabetes, osteoporosis and cardiovascular disease, all of which can have a profound impact on quality of life and activities of daily living(Reference Park, Goodpaster and Strotmeyer3Reference Murai, Nishizawa and Otsuka5). These health conditions have led to an interest in measuring muscle quality in older populations. Nonetheless, young and middle-aged adults may also benefit from monitoring muscle quality, especially when seeking to improve functional capacity(Reference Barbat-Artigas, Rolland and Zamboni6). For instance, young adults have the greatest increase in the risk of chronic diseases(Reference Hirode and Wong7). Therefore, improving functional capacity is also an important preventative tactic for young-to-middle-aged adults. In addition, early identification of individuals with comprised strength and muscle functionality may help to reduce cost in public health services(Reference Maffiuletti, Ratel and Sartorio8). Collectively, these findings demonstrate the benefit of measuring muscle quality across various age spectra.

Methodological considerations are important to consider when assessing muscle quality. Further, the use of different methods, particularly body composition techniques, may yield different values when seeking to quantify muscle quality. For instance, muscle quality index (MQI), characterised by the ratio of muscular strength relative to skeletal muscle tissue, is often determined using dual-energy X-ray absorptiometry (DXA) for the latter component(Reference Barbat-Artigas, Rolland and Zamboni6,Reference Erlandson, Lorbergs and Mathur9,Reference Oba, Matsui and Arai10) . Nonetheless, alternative approaches for body composition, such as bioimpedance analysis (BIA), can be used as an alternative to DXA for computing MQI(Reference Akamatsu, Kusakabe and Arai11,Reference Sato, Nakamura and Kusuhara12) . The utilisation of different body composition methods across studies can make comparisons of previous findings challenging. For example, conflicting MQI results between studies could be attributed to the utilisation of different body composition methods, instead of differences in characteristics between study cohorts.

Numerous studies have compared BIA and DXA for total and regional body composition metrics such as body fat, lean mass and bone mineral content(Reference Nickerson and Snarr13Reference Esco, Snarr and Leatherwood19). For example, research has shown the accuracy of single-frequency bioimpedance analysis (SFBIA) for predicting appendicular lean and fat mass varies based on sex and segmental mass(Reference Nickerson15). In addition, researchers have shown that BIA is more accurate when utilised to predict lean mass instead of fat mass(Reference Nickerson15,Reference Esco, Snarr and Leatherwood19,Reference Nickerson, Esco and Bishop20) . Lastly, validation research has shown BIA can be used to estimate bone mineral content, when compared with DXA, in healthy populations(Reference Nickerson and Tinsley16,Reference Stone, Wingo and Nickerson17) . It is important to highlight that many validation studies on BIA have been completed in non-Hispanic populations. This could be problematic when seeking to generalise BIA devices in Hispanic adults who have differing fat-free mass characteristics than assumed constants (i.e. hydration = 73·8 % of fat-free mass), which are used to predict body composition via bioimpedance technology(Reference Brozek, Grande and Anderson21). For instance, previous research has shown the hydration of fat-free mass varies from 63·76 to 79·55 % in Hispanic adults(Reference Nickerson, Tinsley and Fedewa22). This could potentially have an impact on predicting body composition with BIA devices. Indeed, Nickerson and Snarr(Reference Nickerson and Snarr13) revealed multi-frequency bioimpedance analysis (MFBIA) has large proportional bias when estimating whole-body fat mass in Hispanic females. Despite these findings, the utilisation of BIA in Hispanic adults needs further exploration.

One area that has yet to be evaluated in Hispanic adults is the agreement between various MQI models when using DXA- and BIA-derived ALM. Determining whether simpler techniques such as BIA can be used as an alternative to DXA for MQI models could be very helpful in clinical settings that do not have access to the latter method. For example, the cost and maintenance of a DXA machine can be very expensive. In addition, DXA emits radiation, which may be contraindicated in certain clinical populations and requires certified/licensed operator in some jurisdictions. Consequently, the utilisation of DXA-derived ALM for determining MQI is limited to sophisticated clinical and research settings, which limits its application. As a result, more affordable, user-friendly and non-radiological body composition techniques such as BIA are increasingly popular for computing MQI. Accordingly, the purpose of this study was to compare single- and MFBIA devices against DXA for ALM and MQI metrics in Hispanic adults.

Methods

Participants

One hundred and thirty-one participants (71 F, 60 M) were included in the present analysis (Table 1). Eligible participants were (1) 18 – 65 years of age; (2) reported no cardiac, pulmonary, or metabolic diseases; (3) weight and height < 159 kg and 193 cm, respectively, due to DXA table restrictions; and (4) Hispanic descent. Recruitment occurred via flyers, word of mouth and classroom recruitment. All eligible participants in the present study successfully completed testing. Exclusion criteria included persons with non-disease-related conditions that may affect body composition, intra- and extra-cellular fluid or DXA measurements (i.e. those currently or recently pregnant, persons with limb amputations and individuals with implanted metallic devices). All participants provided written informed consent and completed a medical history questionnaire prior to participation in the study. This study was conducted according to the guidelines presented in the Declaration of Helsinki, and all procedures involving human subjects/patients were approved by the Institutional Review Board of the host university (IRB# 2021-03-16).

Table 1. Subject characteristics mean and standard deviation (SD)

Procedures

All research participants reported to the laboratory for data collection following pre-testing guidelines, which included (1) no high-intensity exercise for 24 h, (2) fasting ≥ 8 h, (3) no alcohol or caffeine for ≥ 24 h, (4) no water intake ≥ 2 h. The adherence to pre-testing guidelines for each participant was assessed via a questionnaire upon arrival at the laboratory. Once pre-testing guideline adherence was ensured, hydration (i.e. urine-specific gravity), anthropometric (i.e. height and body mass), SFBIA, MFBIA, DXA and muscular strength (i.e. handgrip strength (HGS)) assessments were completed. Prior to all anthropometric and body composition measurements, shoes, jewellery and metallic objects were removed to minimise measurement error. Hydration was assessed via urine-specific gravity using a hand-held refractometer (Atago SUR-NE, Atago Corp Ltd., Tokyo, Japan). Participants’ urine-specific gravity values had to fall within the range of > 1·004 and < 1·029 to complete testing(Reference Armstrong23). Standing height was measured to the nearest 0·1 cm using a stadiometer (SECA 213, Seca Ltd., Hamburg, Germany).

Multifrequency bioimpedance analysis

MFBIA was used to measure body mass (BM) to the nearest 0·1 kg. Moreover, MFBIA was the first body composition test completed. ALMTOTAL (left arm + right arm + left leg + right leg) and ALMARMS (left arm + right arm) were computed based upon manufacturer’s instructions (InBody 570, InBody USA, Cerritos, CA). The MFBIA device employed in the current study utilised a tetrapolar 8-point tactile electrode system, which sends three frequencies (i.e. 5, 50, and 500 kHz) of alternating currents through the body. For testing, subjects’ feet were centred on the electrodes and the hand electrodes were grasped with arms being held wide enough so there was no contact between the arms and torso. The position was held for the duration of the test (approximately 45 s). Once the assessment was completed, participants were prompted to return the hand electrodes and step off the device.

Dual-energy X-ray absorptiometry

Immediately after MFBIA testing, participants had their criterion ALMTOTAL and ALMARMS derived using DXA (GE Lunar Prodigy; Software version 14.10.022; GE Lunar Corporation, Madison, WI, USA). Prior to each use, the DXA was calibrated according to manufacturer guidelines using a standardised calibration block. Participants were positioned supine on the DXA platform with arms resting along the sides of the body and feet secured with Velcro straps around the ankles to reduce movement for the duration of the scan. Reflection scanning was completed on any participant exceeding the scanning area of the DXA table. The positioning of participants receiving a reflection scan aimed to limit the amount of left side of the body (e.g. left arm) outside the scanning area of the DXA machine. After each scan, a trained technician manually adjusted regions of interest.

Single-frequency bioimpedance analysis

After DXA scans, participants had ALMTOTAL (left arm + right arm + left leg + right leg) and ALMARMS (left arm + right arm) measured with SFBIA (Quantum V, RJL systems, Clinton MI) while lying on the DXA table. For SFBIA testing, the participants’ right and left shoe and sock remained off, and their arms were placed ≥ 30° away from the body with legs separated and not touching. Excess hair at electrode sites was removed, and the skin was cleaned with alcohol pads and dried prior to electrode placement. Surface electrodes were placed on the right and left wrist beside the ulnar head and on the first joint of the middle finger. Surface electrodes were also placed on the right and left foot beside the medial malleolus and on the base of the second toe. Next, leads were attached to the eight electrodes and a single-frequency (i.e. 50 kHz) whole-body impedance measurement was obtained for each subject. ALMTOTAL and ALMARMS were computed using the built-in SFBIA algorithm.

Handgrip strength

All handgrip tests were completed using a hydraulic hand dynamometer (Jamar, Performance Health Supply Inc., Cedarburg, WI). Prior to each test, the dynamometer was adjusted so the second third, fourth and fifth digit of the hand (i.e. proximal interphalangeal joint) was bent 90°. To complete each test, participants were instructed to be in a standing position, hold the dynamometer with the elbow flexed at 90° and squeeze the dynamometer as hard as possible while avoiding the Valsalva manoeuvre(24). HGS was recorded in kg and the dynamometer was reset to zero prior to the next test. This procedure was repeated with the opposite hand and repeated two additional times. The highest value of the three readings for each hand was averaged to compute HGS.

$$\rm HGS=(highest\ left\ hand + highest\ right\ hand)/2$$

Muscle quality index

MQIARMS was defined as the ratio between HGS and ALMARMS (HGS/ALMARMS) for each body composition device (i.e. SFBIA, MFBIA and DXA). MQITOTAL was established as the ratio between HGS and ALMTOTAL (HGS/ALMTOTAL) for each body composition device (i.e. SFBIA, MFBIA and DXA).

Statistical analysis

The linear relationships between DXA, MFBIA and SFBIA for all ALM and MQI variables were established using Deming regression, which accounts for errors in the measurement of both variables(Reference Therneau25), and compared with a perfect relationship (i.e. the line of identity). Pearson’s R2, RMSE and CCC values were also calculated. Equivalence testing(Reference Lakens26) was performed using TOST to determine if DXA, MFBIA and SFBIA variables were equivalent based on equivalence regions of 2·5 %, consistent with previous research(Reference McCarthy, Tinsley and Bosy-Westphal27). Additionally, Bland–Altman analyses were performed,(Reference Bland and Altman28) including estimation of the 95 % limits of agreement and linear regression to examine proportional bias. Associations between alternate MQI metrics were examined using Pearson’s correlations. Statistical analyses were conducted in R (version 4.3.1) using the DescTools, (Reference Signorell29) deming, (Reference Therneau25) and TOSTER (Reference Lakens26) packages. Values are presented as mean ± s d and statistical significance was accepted at P < 0·05.

Results

Total appendicular lean mass outcomes

Correlations between MQI metrics ranged from 0·71 to 0·94 (Fig. 1). Strong, statistically significant correlations were observed for all ALM variables (0·84 < R 2 < 0·93; P < 0·001), with Lin’s concordance correlation coefficient values of 0·91–0·95 (Table 2). The slope and intercept of the Deming regression line did not differ from 1 and 0, respectively, for ALMDXA v. ALMSFBIA and MQIDXA v. MQIMFBIA but significantly differed for ALMDXA v. ALMMFBIA, as well as MQIDXA v. MQISFBIA and ALM and MQI comparisons for MFBIA v. SFBIA (Figs. 2 and 3). Statistical equivalence was demonstrated for DXA v. SFBIA (ALMTOTAL and MQITOTAL), but not for other comparisons. From Bland–Altman analysis, no proportional bias was observed for ALMDXA v. ALMSFBIA or MQIDXA v. MQIMFBIA, but slight proportional bias (|slope| ≤ 0·14) was observed for other comparisons.

Fig. 1. Correlation matrix. Correlations between dual-energy X-ray absorptiometry (DXA), single-frequency bioimpedance analysis (SFBIA) and multiple-frequency bioimpedance analysis (MFBIA) when measuring appendicular lean mass (ALM) and arms lean mass (LM).

Table 2. Comparisons between SFBIA, MFBIA and DXA for ALM and MQI

TOST: two one-sided t tests; CE: constant error; SEE: standard error of the estimate; CCC: Lin’s concordance correlation coefficient; LL: lower limit; UL: upper limit; ALM = appendicular lean mass; MQI = muscle quality index; LM = lean mass; DXA = dual-energy X-ray absorptiometry; SFBIA = single-frequency bioimpedance analysis; MFBIA = multi-frequency bioimpedance analysis.

Fig. 2. Comparison of body composition devices for estimating appendicular lean mass. Line of Identity: The ordinary least squares regression line as compared with the line of identity is displayed for single-frequency bioimpedance analysis (SFBIA), multi-frequency bioimpedance analysis (MFBIA) and dual-energy X-ray absorptiometry (DXA) comparisons. Root mean square error (RMSE) and coefficient of determination (R 2) are also presented. Results of appendicular lean mass (ALM) are displayed for MFBIA v. DXA (a), SFBIA v. DXA (c), and SFBIA v. MFBIA (e). Bland–Altman Analysis: The relationship between the average of the ALM estimates and a reference method (x-axis) and the difference in the estimate minus that of the reference method (y-axis) is displayed. The linear regression line indicates the degree of proportional bias. Horizontal dashed lines indicate the upper and lower limits of agreement (LOA), and the horizontal solid line indicates the constant error between methods. Linear regression equations and 95 % LOA values are also displayed. Results of ALM are displayed for MFBIA v. DXA (b), SFBIA v. DXA (d) and SFBIA v. MFBIA (f).

Fig. 3. Comparison of body composition devices for measuring muscle quality index in arms and legs (MQITOTAL). Line of Identity: The ordinary least squares regression line as compared with the line of identity is displayed for single-frequency bioimpedance analysis (SFBIA), multi-frequency bioimpedance analysis (MFBIA) and dual-energy X-ray absorptiometry (DXA) comparisons. Root mean square error (RMSE) and coefficient of determination (R 2) are also presented. Results of muscle quality index (MQITOTAL) are displayed for MFBIA v. DXA (Fig. 2(a)), SFBIA v. DXA (Fig. 2(c)) and SFBIA v. MFBIA (Fig. 2(e)). Bland–Altman Analysis: The relationship between the average of the MQITOAL estimates and a reference method (x-axis) and the difference in the estimate minus that of the reference method (y-axis) is displayed. The linear regression line indicates the degree of proportional bias. Horizontal dashed lines indicate the upper and lower limits of agreement (LOA), and the horizontal solid line indicates the constant error between methods. Linear regression equations and 95 % LOA values are also displayed. Results of MQITOTAL are displayed for MFBIA v. DXA (Fig. 2(b)), SFBIA v. DXA (Fig. 2(d)) and SFBIA v. MFBIA (Fig. 2(f)).

Arm lean mass outcomes

Strong, statistically significant correlations were observed for all variables (0·87 < R 2 < 0·98; P < 0·001), with Lin’s concordance correlation coefficient values of 0·86–0·97 (Table 2). The slope and intercept of the Deming regression line did not differ from 1 and 0, respectively, for ARMSDXA v. ARMSSFBIA or any MQIARMS but significantly differed for ARMSDXA v. ARMSMFBIA and ARMSMFBIA v. ARMSSFBIA (Figs. 4 and 5). Statistical equivalence was demonstrated for ARMSDXA v. ARMSMFBIA and MFBIA v. SFBIA (MQIARMS), but not other comparisons. From Bland–Altman analysis, no proportional bias was observed for ARMSDXA v. ARMSSFBIA or any MQIARMS but slight proportional bias (|slope| ≤ 0·14) was observed for other comparisons.

Fig. 4. Comparison of body composition devices for estimating arms lean mass. Line of Identity: The ordinary least squares regression line as compared with the line of identity is displayed for single-frequency bioimpedance analysis (SFBIA), multi-frequency bioimpedance analysis (MFBIA) and dual-energy X-ray absorptiometry (DXA) comparisons. Root mean square error (RMSE) and coefficient of determination (R 2) are also presented. Results of arms lean mass (LM) are displayed for MFBIA v. DXA (Fig. 2(a)), SFBIA v. DXA (Fig. 2(c)) and SFBIA v. MFBIA (Fig. 2(e)). Bland–Altman Analysis: The relationship between the average of the arms LM estimates and a reference method (x-axis) and the difference in the estimate minus that of the reference method (y-axis) is displayed. The linear regression line indicates the degree of proportional bias. Horizontal dashed lines indicate the upper and lower limits of agreement (LOA), and the horizontal solid line indicates the constant error between methods. Linear regression equations and 95 % LOA values are also displayed. Results of arms LM are displayed for MFBIA v. DXA (Fig. 2(b)), SFBIA v. DXA (Fig. 2(d)) and SFBIA v. MFBIA (Fig. 2(f)).

Fig. 5. Comparison of body composition devices for measuring muscle quality index in arms (MQIARMS). Line of Identity: The ordinary least squares regression line as compared with the line of identity is displayed for single-frequency bioimpedance analysis (SFBIA), multi-frequency bioimpedance analysis (MFBIA) and dual-energy X-ray absorptiometry (DXA) comparisons. Root mean square error (RMSE) and coefficient of determination (R 2) are also presented. Results of arms muscle quality index (MQIARMS) are displayed for MFBIA v. DXA (Fig. 2(a)), SFBIA v. DXA (Fig. 2(c)) and SFBIA v. MFBIA (Fig. 2(e)). Bland–Altman Analysis: The relationship between the average of the MQIARMS estimates and a reference method (x-axis) and the difference in the estimate minus that of the reference method (y-axis) is displayed. The linear regression line indicates the degree of proportional bias. Horizontal dashed lines indicate the upper and lower limits of agreement (LOA), and the horizontal solid line indicates the constant error between methods. Linear regression equations and 95 % LOA values are also displayed. Results of MQIARMS are displayed for MFBIA v. DXA (Fig. 2(b)), SFBIA v. DXA (Fig. 2(d)) and SFBIA v. MFBIA (Fig. 2(f)).

Discussion

The purpose of this study was to compare SFBIA and MFBIA devices against DXA for ALM and MQI metrics in Hispanic adults. Results demonstrated that SFBIA and MFBIA had strong correlations with DXA for all ALM and MQI metrics. In addition, equivalence testing varied between methods (e.g. SFBIA v. DXA) when examining the different metrics (i.e. ALMTOTAL, ALMARMS, MQITOTAL, and MQIARMS). Lastly, there was proportional bias, albeit slight, for multiple comparisons between the bioimpedance devices and DXA when evaluating ALM and MQI. Nonetheless, MQIARMS was the only metric that did not differ from the line of identity and had no proportional bias when comparing all the devices against each other. These findings could be an indicator that MQIARMS, rather than MQITOTAL, may be better to use when there are different body composition techniques being administered across multiple research and clinical settings. It is also possible that MQIARMS performed better due to the use of a measure of upper body strength with ALMARMS. To support this postulation, future research may seek to evaluate MQI models that use lower body strength tests and ALMTOTAL and ALMLEGS.

Comparisons between bioimpedance devices and DXA have shown mixed results when seeking to estimate body composition in the upper and lower extremities. For example, Esco et al. (Reference Esco, Snarr and Leatherwood19) found MFBIA and DXA had excellent agreement when used to predict appendicular lean soft tissue (i.e. arms and legs) in collegiate female athletes. It is worth noting the lean soft tissue measures from Esco et al. (Reference Esco, Snarr and Leatherwood19) excluded bone tissue. Contrarily, Brewer et al. (Reference Brewer, Blue and Hirsch30) found that MFBIA significantly underestimated ALM when compared against DXA in Division I college athletes. In addition, Nickerson(Reference Nickerson15) found large mean differences between SFBIA and DXA when comparing arms, legs, and total ALM in physically active adults. However, the 95 % limits of agreement were small for all the comparisons, which suggest there may have been fixed bias of the SFBIA device(Reference Nickerson15). Collectively, the current study findings demonstrate good overall agreement between SFBIA, MFBIA and DXA for ALMTOTAL and ALMARMS in a Hispanic population.

The comparison of MQI between different body composition methods is limited. Nonetheless, a previous study found a strong association (r = 0·81; P < 0·001) between a field- and laboratory-based model using BMI and DXA, respectively(Reference Melo, Moraes and Nascimento31). Something worth highlighting is BMI and DXA utilise different metrics (kg/m2 and kg, respectively). Therefore, analysis in previous research was limited to correlations and not equivalence testing and Bland–Altman analysis(Reference Melo, Moraes and Nascimento31). Accordingly, the current study adds to previous literature by employing identical body composition metrics (i.e. ALMTOTAL and ALMARMS) across multiple devices (i.e. SFBIA, MFBIA, and DXA), which allows for a more comprehensive interpretation and rigorous statistical analysis. This brings forth a common issue in the literature which includes the use of different methods for measuring body composition and muscular strength components of MQI. For example, body composition can be measured with DXA, BIA, BMI, magnetic resonance imaging or computed tomography when calculating MQI. Moreover, muscular strength can be measured using grip strength, chair stand test, leg extensions, etc.(Reference Cruz-Jentoft, Bahat and Bauer1). Altogether, the lack of consensus on which methods to use when quantifying MQI makes comparing previous research extremely difficult.

The similar agreement between all three body composition methods when predicting MQIARMS is a talking point worth further discussion. For example, previous research from Nickerson(Reference Nickerson15) revealed the agreement between SFBIA and DXA varies based on sex and segmental mass. Specifically, results demonstrated the error of SFBIA, when predicting segmental lean mass, was larger for males than females. One potential explanation of the increased error of SFBIA, when compared with DXA, was attributed to the larger segmental mass of males than females(Reference Nickerson15). Accordingly, it is plausible the SFBIA and MFBIA devices in the current study have better agreement with DXA when used to predict MQIARMS than MQITOTAL since the former muscle quality metric has less segmental mass than the latter. The use of MQIARMS may also be more sensitive for detecting sex differences than MQITOTAL. For instance, Lopes et al. (Reference Lopes, Vaz-Gonçalves and Schincaglia32) found MQI was higher in females than males when using dominant HGS and the corresponding arm’s ALM(Reference Lopes, Vaz-Gonçalves and Schincaglia32). Contrarily, there were no differences between males and females when comparing MQITOTAL (i.e. combined HGS and ALMTOTAL)(Reference Lopes, Vaz-Gonçalves and Schincaglia32). The current study is the first ever to demonstrate similarity between MQIARMS and differences amongst MQITOTAL when comparing multiple body composition methods with similar body composition metrics (i.e. ALM). These findings highlight the need to further explore MQI models when using various body composition tools, muscular strength methods (e.g. handgrip, chair stands, leg extension) and ALM measures (e.g. arms, legs, combined).

Although the current study has many strengths, it is not without limitations. First, it is worth mentioning the present study utilised young- and middle-aged adults. As a result, it is unknown whether the current study findings can be generalised to older adults. MQI is commonly evaluated in older adults due to loss of muscular strength and ALM, which is associated with ageing. Nonetheless, MQI is important to evaluate across various age spectrums, including young- and middle-aged adults, particularly those interested in training interventions designed to improve physical functioning. Second, the current study sample consisted of Hispanic adults. Consequently, it is unknown whether the present study findings can be generalised to non-Hispanic populations. Nonetheless, most of the research, regarding MQI, has been centred on non-Hispanic populations. Thus, the present study filled a gap in the literature by evaluating a population that has been underrepresented in body composition research. Altogether, the present study results should only be generalised to Hispanic adults 18 – 55 years of age. Third, it should be noted that current study results only apply to the SFBIA and MFBIA devices utilised in the present study. Numerous BIA devices are commercially available for use. Therefore, assuming results apply to all SFBIA and MFBIA should be avoided until further research can be conducted utilising devices not included in the present study. Nonetheless, the present study uniquely showed that SFBIA and MFBIA have a similar agreement with DXA when used to predict ALM and MQI. The ability of MFBIA to utilise low and high frequencies is often assumed to result in better accuracy than simpler SFBIA technology, which uses a single low-frequency electrical current. However, our results demonstrate MFBIA does not result in better agreement than SFBIA. Thus, both devices yielded similar outcomes and are very promising for use when seeking to compute MQI. Lastly, the current study did not record the dominant hand of participants during testing. It is possible there are differences between dominant and non-dominant HGS. Therefore, the average HGS (left hand + right hand)/2 was used to compute MQI models in the current study. This approach likely helped minimise differences that may have existed between the dominant and non-dominant hand.

Conclusion

Comparisons of BIA v. DXA for measuring MQITOTAL and MQIARMS have yet to be explored. Additionally, it was previously unknown whether various BIA devices (i.e. SFBIA and MFBIA) could be used interchangeably for measuring MQI, when compared with DXA. The current study uniquely showed that SFBIA and MFBIA have better agreement with DXA when used to compute MQIARMS than MQITOTAL. These results have significant clinical implications when seeking to compute MQI with different body composition methods (i.e. DXA, MFBIA, and SFBIA). For example, MQIARMS is advised for research facilities and multi-site studies that comprise of different body composition methods. Furthermore, MQIARMS may be better to assess than MQITOTAL when patients visit numerous healthcare locations that utilise varying BIA models for analysis of ALM. Future steps include the following: (1). Evaluating BIA devices beyond the models examined in the present study; (2). Comparison of MQI across various races/ethnicities; (3). Steps toward a consensus on how to standardise the measurement of MQI; and (4). Longitudinal studies evaluating the associations between MQI and health-related outcomes in clinical populations undergoing prevention and treatment interventions (e.g. obesity, sarcopenia and cancer).

Acknowledgements

The authors would like to acknowledge Rocio Gallegos for her efforts in the administrative assistance and data collection of the current study.

Research reported in this publication was supported by the National Institute of General Medical Sciences of the National Institutes of Health under Award Number SC1GM135099. The content is solely the responsibility of the authors and does not necessarily represent the official views of the National Institutes of Health.

B. S. N. and S. A. C. contributed to conceptualisation, study design and funding acquisition. B. S. N. and K-S. P. contributed to data collection and project administration. G. M. T. conducted all statistical analyses. B. N., B. S. N. and G. M. T. contributed to writing the original draft preparation and editing. B. M. provided a critical review of the manuscript. All authors have read and agreed to the final version of the manuscript.

The authors have no potential, perceived or real conflicts of interest to disclose.

References

Cruz-Jentoft, AJ, Bahat, G, Bauer, J, et al. (2019) Sarcopenia: revised European consensus on definition and diagnosis. Age Ageing 48, 601.CrossRefGoogle ScholarPubMed
Du, K, Goates, S, Arensberg, MB, et al. (2018) Prevalence of sarcopenia and sarcopenic obesity vary with race/ethnicity and advancing age. Divers Equal Health Care 15, 175183.CrossRefGoogle Scholar
Park, SW, Goodpaster, BH, Strotmeyer, ES, et al. (2006) Decreased muscle strength and quality in older adults with type 2 diabetes: the health, aging, and body composition study. Diabetes 55, 18131818.CrossRefGoogle ScholarPubMed
Hsu, W-L, Chen, C-Y, Tsauo, J-Y, et al. (2014) Balance control in elderly people with osteoporosis. J Formosan Med Assoc 113, 334339.CrossRefGoogle ScholarPubMed
Murai, J, Nishizawa, H, Otsuka, A, et al. (2018) Low muscle quality in Japanese type 2 diabetic patients with visceral fat accumulation. Cardiovasc Diabetol 17, 110.CrossRefGoogle ScholarPubMed
Barbat-Artigas, S, Rolland, Y, Zamboni, M, et al. (2012) How to assess functional status: a new muscle quality index. J Nutr Health Aging 16, 6777.CrossRefGoogle ScholarPubMed
Hirode, G & Wong, RJ (2020) Trends in the prevalence of metabolic syndrome in the United States, 2011–2016. JAMA 323, 25262528.CrossRefGoogle ScholarPubMed
Maffiuletti, NA, Ratel, S, Sartorio, A, et al. (2013) The impact of obesity on in vivo human skeletal muscle function. Curr Obes Rep 2, 251260.CrossRefGoogle Scholar
Erlandson, M, Lorbergs, A, Mathur, S, et al. (2016) Muscle analysis using pQCT, DXA and MRI. Eur J Radiol 85, 15051511.CrossRefGoogle ScholarPubMed
Oba, H, Matsui, Y, Arai, H, et al. (2021) Evaluation of muscle quality and quantity for the assessment of sarcopenia using mid-thigh computed tomography: a cohort study. BMC Geriatrics 21, 18.CrossRefGoogle ScholarPubMed
Akamatsu, Y, Kusakabe, T, Arai, H, et al. (2022) Phase angle from bioelectrical impedance analysis is a useful indicator of muscle quality. J Cachexia Sarcopenia Muscle 13, 180189.CrossRefGoogle ScholarPubMed
Sato, H, Nakamura, T, Kusuhara, T, et al. (2020) Effectiveness of impedance parameters for muscle quality evaluation in healthy men. J Physiol Sci 70, 53.CrossRefGoogle ScholarPubMed
Nickerson, BS & Snarr, RL (2022) Proportional bias of multifrequency bioimpedance analysis is larger in Hispanic females than males. Nutr Res 103, 4046.CrossRefGoogle ScholarPubMed
Nickerson, BS, Snarr, RL & Ryan, GA (2019) Validity of foot-to-foot bioelectrical impedance for estimating body composition in NCAA Division I male athletes: a 3-compartment model comparison. J Strength Cond Res 33, 33613366.CrossRefGoogle Scholar
Nickerson, BS (2018) Agreement between single-frequency bioimpedance analysis and dual energy x-ray absorptiometry varies based on sex and segmental mass. Nutr Res 54, 3339.CrossRefGoogle ScholarPubMed
Nickerson, B & Tinsley, G (2018) Utilization of BIA-derived bone mineral estimates exerts minimal impact on body fat estimates via multicompartment models in physically active adults. J Clin Densitometry 21, 541549.CrossRefGoogle ScholarPubMed
Stone, TM, Wingo, JE, Nickerson, BS, et al. (2018) Comparison of bioelectrical impedance analysis and dual energy x-ray absorptiometry for estimating bone mineral content. Int J Sport Nutr Exerc Metab 28, 542546.CrossRefGoogle ScholarPubMed
Esco, MR, Nickerson, BS & Russell, AR (2017) Comparison of bioelectrical impedance and DXA for measuring body composition among adults with Down syndrome. Disabil Health J 10, 548551.CrossRefGoogle ScholarPubMed
Esco, MR, Snarr, RL, Leatherwood, MD, et al. (2015) Comparison of total and segmental body composition using DXA and multifrequency bioimpedance in collegiate female athletes. J Strength Cond Res 29, 918925.CrossRefGoogle ScholarPubMed
Nickerson, BS, Esco, MR, Bishop, PA, et al. (2017) Validity of selected bioimpedance equations for estimating body composition in men and women: a four-compartment model comparison. J Strength Cond Res 31, 19631972.CrossRefGoogle ScholarPubMed
Brozek, J, Grande, F, Anderson, JT, et al. (1963) Densitometric analysis of body composition: revision of some quantitative assumptions. Ann N Y Acad Sci 110, 113140.CrossRefGoogle ScholarPubMed
Nickerson, BS, Tinsley, GM, Fedewa, MV, et al. (2020) Fat-free mass characteristics of Hispanic adults: comparisons with non-Hispanic caucasians and cadaver reference values. Clin Nutr 39, 30803085.CrossRefGoogle ScholarPubMed
Armstrong, LE (2005) Hydration assessment techniques. Nutr Rev 63, S40S54.CrossRefGoogle ScholarPubMed
American College of Sports Medicine (2017) ACSM’s Health-Related Physical Fitness Assessment Manual, 5th ed. Philadelphia, PA: Wolters Kluwer Health, Lippincott Williams & Wilkins.Google Scholar
Therneau, T (2018) deming: Deming, Theil-Sen, Passing-Bablock and Total Least Squares Regression. (accessed October 2023).Google Scholar
Lakens, D (2017) Equivalence tests: a practical primer for t tests, correlations, and meta-analyses. Social Psychol Personal Sci 8, 355362.CrossRefGoogle Scholar
McCarthy, C, Tinsley, GM, Bosy-Westphal, A, et al. (2023) Total, regional appendicular skeletal muscle mass prediction from dual-energy x-ray absorptiometry body composition models. Sci Rep 13, 2590.CrossRefGoogle Scholar
Bland, JM & Altman, DG (1986) Statistical methods for assessing agreement between two methods of clinical measurement. Lancet 1, 307310.CrossRefGoogle ScholarPubMed
Signorell, A (2022) DescTools: Tools for Descriptive Statistics. (accessed October 2023).Google Scholar
Brewer, GJ, Blue, MN, Hirsch, KR, et al. (2019) Appendicular body composition analysis: validity of bioelectrical impedance analysis compared with dual-energy x-ray absorptiometry in division I college athletes. J Strength Cond Res 33, 29202925.CrossRefGoogle ScholarPubMed
Melo, G, Moraes, M, Nascimento, E, et al. (2022) Field-based v. laboratory-based estimates of muscle quality index in adolescents with and without Down syndrome. J Intellect Disabil Res 66, 10001008.CrossRefGoogle Scholar
Lopes, LCC, Vaz-Gonçalves, L, Schincaglia, RM, et al. (2022) Sex and population-specific cutoff values of muscle quality index: results from NHANES 2011–2014. Clin Nutr 41, 13281334.CrossRefGoogle Scholar
Figure 0

Table 1. Subject characteristics mean and standard deviation (SD)

Figure 1

Fig. 1. Correlation matrix. Correlations between dual-energy X-ray absorptiometry (DXA), single-frequency bioimpedance analysis (SFBIA) and multiple-frequency bioimpedance analysis (MFBIA) when measuring appendicular lean mass (ALM) and arms lean mass (LM).

Figure 2

Table 2. Comparisons between SFBIA, MFBIA and DXA for ALM and MQI

Figure 3

Fig. 2. Comparison of body composition devices for estimating appendicular lean mass. Line of Identity: The ordinary least squares regression line as compared with the line of identity is displayed for single-frequency bioimpedance analysis (SFBIA), multi-frequency bioimpedance analysis (MFBIA) and dual-energy X-ray absorptiometry (DXA) comparisons. Root mean square error (RMSE) and coefficient of determination (R2) are also presented. Results of appendicular lean mass (ALM) are displayed for MFBIA v. DXA (a), SFBIA v. DXA (c), and SFBIA v. MFBIA (e). Bland–Altman Analysis: The relationship between the average of the ALM estimates and a reference method (x-axis) and the difference in the estimate minus that of the reference method (y-axis) is displayed. The linear regression line indicates the degree of proportional bias. Horizontal dashed lines indicate the upper and lower limits of agreement (LOA), and the horizontal solid line indicates the constant error between methods. Linear regression equations and 95 % LOA values are also displayed. Results of ALM are displayed for MFBIA v. DXA (b), SFBIA v. DXA (d) and SFBIA v. MFBIA (f).

Figure 4

Fig. 3. Comparison of body composition devices for measuring muscle quality index in arms and legs (MQITOTAL). Line of Identity: The ordinary least squares regression line as compared with the line of identity is displayed for single-frequency bioimpedance analysis (SFBIA), multi-frequency bioimpedance analysis (MFBIA) and dual-energy X-ray absorptiometry (DXA) comparisons. Root mean square error (RMSE) and coefficient of determination (R2) are also presented. Results of muscle quality index (MQITOTAL) are displayed for MFBIA v. DXA (Fig. 2(a)), SFBIA v. DXA (Fig. 2(c)) and SFBIA v. MFBIA (Fig. 2(e)). Bland–Altman Analysis: The relationship between the average of the MQITOAL estimates and a reference method (x-axis) and the difference in the estimate minus that of the reference method (y-axis) is displayed. The linear regression line indicates the degree of proportional bias. Horizontal dashed lines indicate the upper and lower limits of agreement (LOA), and the horizontal solid line indicates the constant error between methods. Linear regression equations and 95 % LOA values are also displayed. Results of MQITOTAL are displayed for MFBIA v. DXA (Fig. 2(b)), SFBIA v. DXA (Fig. 2(d)) and SFBIA v. MFBIA (Fig. 2(f)).

Figure 5

Fig. 4. Comparison of body composition devices for estimating arms lean mass. Line of Identity: The ordinary least squares regression line as compared with the line of identity is displayed for single-frequency bioimpedance analysis (SFBIA), multi-frequency bioimpedance analysis (MFBIA) and dual-energy X-ray absorptiometry (DXA) comparisons. Root mean square error (RMSE) and coefficient of determination (R2) are also presented. Results of arms lean mass (LM) are displayed for MFBIA v. DXA (Fig. 2(a)), SFBIA v. DXA (Fig. 2(c)) and SFBIA v. MFBIA (Fig. 2(e)). Bland–Altman Analysis: The relationship between the average of the arms LM estimates and a reference method (x-axis) and the difference in the estimate minus that of the reference method (y-axis) is displayed. The linear regression line indicates the degree of proportional bias. Horizontal dashed lines indicate the upper and lower limits of agreement (LOA), and the horizontal solid line indicates the constant error between methods. Linear regression equations and 95 % LOA values are also displayed. Results of arms LM are displayed for MFBIA v. DXA (Fig. 2(b)), SFBIA v. DXA (Fig. 2(d)) and SFBIA v. MFBIA (Fig. 2(f)).

Figure 6

Fig. 5. Comparison of body composition devices for measuring muscle quality index in arms (MQIARMS). Line of Identity: The ordinary least squares regression line as compared with the line of identity is displayed for single-frequency bioimpedance analysis (SFBIA), multi-frequency bioimpedance analysis (MFBIA) and dual-energy X-ray absorptiometry (DXA) comparisons. Root mean square error (RMSE) and coefficient of determination (R2) are also presented. Results of arms muscle quality index (MQIARMS) are displayed for MFBIA v. DXA (Fig. 2(a)), SFBIA v. DXA (Fig. 2(c)) and SFBIA v. MFBIA (Fig. 2(e)). Bland–Altman Analysis: The relationship between the average of the MQIARMS estimates and a reference method (x-axis) and the difference in the estimate minus that of the reference method (y-axis) is displayed. The linear regression line indicates the degree of proportional bias. Horizontal dashed lines indicate the upper and lower limits of agreement (LOA), and the horizontal solid line indicates the constant error between methods. Linear regression equations and 95 % LOA values are also displayed. Results of MQIARMS are displayed for MFBIA v. DXA (Fig. 2(b)), SFBIA v. DXA (Fig. 2(d)) and SFBIA v. MFBIA (Fig. 2(f)).