PREDICTIVE PERFORMANCE EQUATIONS FOR DIFFERENT DISTANCES IN INDOOR ROWING FOR JUNIOR CATEGORY ROWERS
Athletic performance; Rowing; Sport; Puberty; Mathematical model.
Ones used in Rowing the 2. region of 0-m and 00-00-re m against m 0 tester of m0 test aerobics of a . final result. In view of the above, the objective of the present study was to develop mathematical models capable of predicting the performance of the 2,000-m and 6,000-m test from the maximum stimulus of 100-m and 500-m respectively, performed by young rowers on an indoor rowing ergometer ( EIR ). The study was cross-sectional with a sample composed of 12 male rowing athletes aged between 14 and 16 years in the Juniors category. Somatic development indicators were analyzed by anthropometric parameters. The morphology was verified by dual energy x-ray emission absorptiometry (DXA). After a 24-hour break, start the modality-specific tests. On the first day, the 100-minute test athletes performed a 30-minute break, after a 30-minute break, a 24-h wash-out was performed, followed by a 500-m time trial. 2,000 m. Then, another 24-h wash-out was given, followed by a 6,000-m time trial. All time trial tests were performed on an indoor rowing ergometer. Mathematics predicts the performance of 20.00- model limit of 2.0.00.0.00 limit of 75.00/200.00.00.00.00-0.00-0.753; -Altman Agreement: -2 to +2; 95% CI [-4] - [+4]). Already, the mathematician to estimate the performance of the model6.0.0, remaining, (0.70; β = 19.2; β = 19.2; β = 19.2; β = 0.01; 0.01; 0.01, 0.01, 5.0) significant with the 6,000-m performance in EIR. It is concluded that the prediction of the performance of 2000-m and 6000-m, from mathematical models that use the performance of 100-m and 500-m respectively, is reliable, effective and statistically significant.