Study population

We used data from the Kyoto–Kameoka study on older people (age ≥ 65 years) living in Kameoka City, Kyoto Prefecture, Japan. The details of this study are described elsewhere^{(Reference Watanabe, Nanri and Sagayama20,Reference Watanabe, Yoshida and Yoshimura21,Reference Watanabe, Yoshida and Nanri24,Reference Yamada, Nanri and Watanabe26–Reference Watanabe, Nanri and Yoshida28)} . Briefly, ten of Kameoka’s twenty-one districts were selected randomly and postcards were sent to 4831 residents asking them to take part in physical check-up examinations; 1379 took part in physical check-up examinations for the Kyoto–Kameoka study in March and April 2012 (response rate 28·5 %). Of these 1379 participants, 147 individuals participated DLW measurements and 7 d DR in May and June 2012. Participants who did not complete the 7-day DR (n 3) or the DLW method (n 3) were excluded. In total, 141 people participated in this study. Participants were divided into a model developing (n 71) and a validation cohort group (n 70), using the random number generation. The development and validation cohort groups were intended to develop the equation for biomarker-calibrated water consumption and confirm the validation of these equations, respectively.

This study’s protocol was approved by the ethics committees of the National Institutes of Biomedical Innovation, Health and Nutrition (NIBIOHN-76–2), Kyoto University of Advanced Science (No. 20–1) and Kyoto Prefectural University of Medicine (RBMR-E-363). Informed consent in writing was obtained from all participants before data collection.

Doubly labelled water

WT and total energy expenditure (TEE) were measured using the DLW method over periods of approximately 2 weeks in May and June 2012. The details of this study are described elsewhere^{(Reference Watanabe, Nanri and Sagayama20,Reference Watanabe, Yoshida and Yoshimura21)} . Briefly, urine samples were collected from the participants before drinking DLW on the morning of Day 0 (baseline). After collecting urine samples, the participants drank water mixed with 0·12 g/kg of ²H₂O (99·9 atom %, Taiyo Nippon Sanso, Tokyo, Japan) and 2·5 g/kg of H₂ ¹⁸O (10·0 atom %, Taiyo Nippon Sanso, Tokyo, Japan) per total body water estimated from their body weight (measured beforehand). The concentrations of ¹⁸O (N _o ) and ²H (N _d ) in the urine samples were measured using isotope ratio MS (Hydra 20-20 Stable Isotope Mass Spectrometers; SerCon Ltd, Crewe, UK). The N _o and N _d dilution spaces and the attenuation rates of ¹⁸O (k _o ) and ²H (k _d ) in the body were assessed with the modified two-point method using urine samples collected from days 1 to 16 (mean of the slopes from days 1 to 15 and days 2–16). Total body water was calculated using the N _o and N _d dilution spaces in Equation (1)^{(Reference Speakman, Yamada and Sagayama29)}:

(1) $$TBW = \;\left[ {\left( {{N_o}/1\!\cdot\!007} \right)\; + \;\left( {{N_d}/1\!\cdot\!043} \right)} \right]/2\;$$

The carbon dioxide production rate (r _CO2; mol/d) was calculated using the daily attenuation rates of stable isotopes (k _o , k _d ), total body water and Equation (2)^{(Reference Speakman, Yamada and Sagayama29)}:

(2) $$r{\rm{C{O_2}}} = \;0\cdot4554\times TBW\times \left( {1\!\cdot\!007{k_o} - 1\!\cdot\!043{k_d}} \right)\times 22\!\cdot\!26$$

TEE (kcal/d) was calculated using the Weir’s equation (Equation (3)) based on rCO₂ and the 24-h estimated respiratory quotient (RQ)^{(Reference Speakman, Yamada and Sagayama29)}.

(3) $${\rm{TEE}} = r{\rm{C}}{{\rm{O}}_{\rm{2}}}\times \left[ {1\!\cdot\!106 + \left( {3\!\cdot\!94/{\rm{RQ}}} \right)} \right]$$

TEE (kcal/d) estimated using Equation 3 assumes an excellent nutritional status. Assuming that RQ is equal to the food quotient, a value of 0·86 was used for all participants, with reference to previous studies^{(Reference Watanabe, Nanri and Sagayama20,Reference Watanabe, Yoshida and Yoshimura21)} .

Calculation of water consumption using the doubly labelled water method

WT measured using the DLW method was used to assess daily water requirements. Metabolic, respirometry, transcutaneous and PW and WT were calculated according to Equations 4–8 from a previous study^{(Reference Raman, Schoeller and Subar9–Reference Yamada, Zhang and Henderson12)}:

(4) $$r{{\rm{H}}_{\rm{2}}}{\rm{O}} = \;{k_d} \times {N_d}\;$$

where rH₂O is WT (l/d)^{(Reference Raman, Schoeller and Subar9,Reference Schoeller and van Santen11,Reference Yamada, Zhang and Henderson12)} . If the equilibrium of fluid in the body is maintained, rH₂O, which is the water output, is equal to water input. K ₂ and N are the attenuation rates and body water content (kg) of ²H in the body after stable isotope ingestion, respectively. Equation 4 includes a 4 % correction for isotope fractionation, if 50 % of water output is lost as vapour. Metabolic water (W _met; l/d) was calculated using Equation 5^{(Reference Raman, Schoeller and Subar9,Reference Sagayama, Kondo and Shiose10,Reference Watanabe, Inoue and Miyachi30)} :

(5) $$\eqalign{ {W_{met}} = TEE \times \left( {1/100\;000} \right)[0\!\cdot\!{119_{\% fat}} + 0\!\cdot\!{103_{\% pro}} \cr { +\, 0\!\cdot\!{150_{\% carb}}\; + 0\!\cdot\!{168_{\% alc}}]}} $$

The intake of fat (%fat), protein (%pro), carbohydrates (%carb) and alcohol (%alc) per energy intake as estimated from the 7-day DR was multiplied by their coefficients and totalled. Metabolic water was estimated by multiplying this total value by the TEE value obtained using the DLW method. Respirometry water (W _res ; l/d) was calculated by Equation (6)^{(Reference Raman, Schoeller and Subar9,Reference Sagayama, Kondo and Shiose10,Reference Watanabe, Inoue and Miyachi30)} :

(6) $${W_{{\rm{res}}}} = \left[ {{\rm{absolute\;humidity}}/1,000} \right] \times 0\!\cdot\!035r{\rm{C}}{{\rm{O}}_2}$$

This was calculated from the concentration of water in the atmosphere, estimated from the average air temperature and relative humidity during the period when the DLW method was performed. The mean temperature, hours of sunlight, relative humidity and absolute humidity during the study were 20·1°C, 5·5 h/d, 57 % and 9·83 g/m³ in May–June 2012 (spring), respectively. For respiratory air volume, 3·5 % of the inhaled air was assumed to be CO₂ and was calculated from the rCO₂ obtained using the DLW method. Transcutaneous water (W _trans; l/d) was calculated using Equation 7^{(Reference Raman, Schoeller and Subar9,Reference Sagayama, Kondo and Shiose10,Reference Watanabe, Inoue and Miyachi30)} :

(7) $${W_{{\rm{trans}}}} = \left[ {0\!\cdot\!{{18}_{{\rm{absolute\;humidity}}}}/21\!\cdot\!7} \right] \times 0\!\cdot\!5 \times {\rm{BSA}} \times 1\!\cdot\!44$$

In the current study, the transdermal absorption rate per m² of body surface area in atmospheric saturated water vapour (21·7 mg/l) was 0·18 g/m². The body surface area (m²) was estimated using the Dubois equation^{(Reference Du Bois and Du Bois31)}. Because clothing reduces the rate of evaporation of moisture from the skin, the clothing coefficient was assumed to be 50 %. PW (W_pre ; l/d) was calculated using Equation 8^{(Reference Raman, Schoeller and Subar9,Reference Sagayama, Kondo and Shiose10,Reference Watanabe, Inoue and Miyachi30)} :

(8) $${W_{pre}} = \;r{{\rm{H_2}O}} - \left[ {{W_{met}} + {W_{res}} + {W_{trans}}} \right]\;$$

This was calculated by subtracting metabolic, respirometry and transcutaneous water from WT. PW includes the fluid consumed from food and drinks.

Dietary assessment

The participants recorded their meals for seven consecutive days, including weekdays and holidays, during May–June 2012; the details of their records are presented elsewhere^{(Reference Watanabe, Nanri and Yoshida28)}. Briefly, an investigator (a well-trained, senior dietitian) taught the participants how to record their meals using an example meal record sheet completed at the briefing. The dietitian instructed the participants to record all food and drinks consumed at or between meals. Each participant was provided with blank record sheets for recording meals, a digital scale (TANITA, Tokyo, Japan) and printed educational materials on recording meals. Energy and nutrient intake were calculated using WELLNESS21 software (TopBusinessSystem, Okayama, Japan) based on these DR.

The current study employed a self-administered FFQ, which consisted of forty-seven food and drink items^{(Reference Tokudome, Goto and Imaeda32)}. Assessments of dietary intake using this questionnaire have been validated previously^{(Reference Watanabe, Nanri and Sagayama20,Reference Watanabe, Nanri and Yoshida28)} . We asked how often they consumed the food and drinks in the FFQ in the past year. For portion sizes, a uniform value for each sex was calculated from the 1-day weighted DR^{(Reference Tokudome, Goto and Imaeda32)}. Energy intake, food weight and fluid intake from drinks were calculated from the intake frequency, and the portion sizes of each food and drink were calculated using a program developed based on the Japanese Food Standard Composition List^{(Reference Tokudome, Goto and Imaeda32)}. Calculating the water intake from food using FFQ with this program is impossible. Therefore, as the mean ratio of water in the foods in the DR of this population was 69 %, water intake from food was estimated to be 69 % of the food weight from the FFQ. The estimate of PW by FFQ was calculated from the sum of water intake from food and drinks.

Covariates

In the Kyoto–Kameoka study, a Needs in the Sphere of Daily Life survey (baseline survey) was conducted on July 29, 2011 and constituted questions based on sitting and sleep time. Subsequently, the Health and Nutrition Status Survey (additional survey), which includes the FFQ was conducted on February 14, 2012. The details of these surveys are described elsewhere^{(Reference Yamada, Nanri and Watanabe26)}. Variables with significant associations in a multivariate regression analysis were evaluated as follows: height (response: enter number), weight (response: enter number), sleep time: ‘How many hours do you actually sleep for? (This may differ from the time you spend in bed.)’ (response: enter number), sitting time: ‘How much time do you spend sitting or lying down during the day? (e.g. TV, reading, chatting; not including sleep)’ (response: enter number), dentures: ‘Do you use dentures?’ (response: yes, no), dry mouth: ‘Are you bothered by dry mouth?’ (response: yes, no), self-reported need care: ‘Do you need someone’s care and assistance in your daily life?’ (response: yes, no), and writing abilities: ‘Are you able to fill out the documents you submit to government offices or hospitals by yourself?’ (response: yes, no).

We previously reported that self-reported heights and weights were no different from heights and weights measured in a Kyoto–Kameoka study subcohort (n 1169) (mean difference: –0·9 cm in height and 0·4 kg in weight)^{(Reference Watanabe, Yoshida and Watanabe27)}. The correlation coefficients between the self-reported and actual measurements were 0·970 for height and 0·965 for weight^{(Reference Watanabe, Yoshida and Watanabe27)}. Further, as a measure of the reproducibility of self-reports, the inter-class correlation coefficients of height and weight were 0·970 and 0·958, respectively^{(Reference Watanabe, Yoshida and Watanabe27)}. BMI was calculated by dividing the self-reported weight (kg) by the square of the height (m).

Statistical analysis

For descriptive statistics, continuous and categorical variables on participant characteristics in the developing and validation cohorts were expressed as mean and sd and as the number and percentage, respectively. The Shapiro–Wilk test was used to confirm the distribution and normality (skewness, kurtosis) of the WT data measured using the DLW method. This analysis showed that these data had non-normal distributions. Therefore, variables such as WT and PW were shown as the median and interquartile range. To compare the water consumption in participants’ characteristics, we used the Mann–Whitney U test and Kruskal–Wallis’ test in unpaired samples.

To develop a formula for predicting WT and PW measured using the DLW method, a multivariate linear regression analysis was performed using forward stepwise selection. This model used water consumption measured using the DLW method as the dependent variable. The explanatory variables of this model were all data of the individual characteristics obtained from the Kyoto–Kameoka study questionnaires, including physique, dietary intake estimated from FFQ, oral status, physical activity levels and social and mental health^{(Reference Yamada, Nanri and Watanabe26)}. Following a previous study^{(Reference Neuhouser, Tinker and Shaw19)}, logarithmic transformation was applied to the regression coefficients of all variables in this analysis (link function = log). The gaussian distribution (family = gaussian) adequately fits the data when compared with the other distributions such as Poisson, gamma and binomial (lowest values of Akaike information criterion). The constructed model was confirmed to meet the conditions of use for linear models (assumption of normality, homoscedasticity and error term independence). A biomarker-calibrated equation was developed to estimate WT and PW using covariates that retained significant associations in this multivariate regression model.

To confirm the validity of the regression equation that was developed, the WT and PW estimates from the regression equation and the DLW method were compared in the validation cohort using the Wilcoxon signed-rank test. The ability to rank individuals in the population of WT and PW estimates from the regression equation was evaluated using Spearman’s rank and Pearson’s correlation analysis with respect to the values measured using the DLW method. In addition, using the Meng’s Z-test^{(Reference Meng, Rosenthal and Rubin33)}, we compared the equivalence of validity of the water consumption by the correlation coefficients between the PW estimated from FFQ and the regression equation, against those estimated using DLW method. A two-tailed significance level of 5 % was used in the analysis. STATA MP, version 15.0 (StataCorp LP) was used for all analyses.