Browsing by Author "Uslu, B"

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    Relationship Between Health Anxiety and Psychological Resilience Among Nursing Students and Predictors of Psychological Resilience in the Last Period of the COVID-19 Pandemic
    Midilli, TS; Kalkim, A; Uslu, B
    Objective: The study aimed to determine health anxiety and psychological resilience and to investigate the relationship between health anxiety and psychological resilience among nursing students in the last period of the coronavirus disease (COVID-19) pandemic. Methods: This cross-sectional and descriptive study was conducted with 507 students in Turkey. The questionnaires used in the study were a student nurse information form, the Health Anxiety Inventory, and the Resilience Scale for Adults. Results: The mean age of the students was 20.70 +/- 1.77 years. The health anxiety mean score was 36.19 +/- 6.55, and the resilience scale mean score was 117.13 +/- 16.00. There was a weak negative correlation between the students' psychological resilience and their health anxiety (r = -0.207, P < 0.001). Conclusion: Having an extended family and having good relationships with family and friends were the predictors of psychological resilience. Social support and psychological care services under a biopsychosocial model by the management of university or faculty should be implemented for university students in order to preserve their resilience and well-being, to cope with the pandemic.
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    Free vibration analysis of axially moving beam under non-ideal conditions
    Bagdatli, SM; Uslu, B
    In this study, linear vibrations of an axially moving beam under non-ideal support conditions have been investigated. The main difference of this study from the other studies; the non-ideal clamped support allow minimal rotations and non-ideal simple support carry moment in minimal orders. Axially moving Euler-Bernoulli beam has simple and clamped support conditions that are discussed as combination of ideal and non-ideal boundary with weighting factor (k). Equations of the motion and boundary conditions have been obtained using Hamilton's Principle. Method of Multiple Scales, a perturbation technique, has been employed for solving the linear equations of motion. Linear equations of motion are solved and effects of different parameters on natural frequencies are investigated.