Answer:
<u>-improved posture</u>
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Explanation:
Stretching is a form of physical activity that leads to improvements in flexibility, circulation and posture. In stretching, muscles are flexed and relaxed in several specific methods; these include
- Dynamic stretches, where motion allowing for the expansion of muscles for a limited period, are carried out. This is usually part of a pre-workout, warm-up routine.
- Static, where a stretch is held in place for up to 30 second-intervals. These positions are typically very comfortable. This is usually part of a post-workout, cool-down routine.
Answer:
to gauge the public's interest in a product
Explanation:
it seems like the best option :)
<span>The correct answer is true; insufficient flexibility does indeed increase an athlete's risk of an injury. This is because a less flexible muscle is more likely to be pulled or torn by movement than one that is able to be moved in a greater range of motion. Thus, it is important for athletes to work of their flexibility.</span>
Insights into the nature of wave propagation that are radically new and qualitative come from the nonlinear theory of gas dynamics.
In the year 1985's Viscoelasticity and Rheology Associated terms Deflection Amplitudes Border Situation Theory of Shells Dynamic Force Continuum Theory Nonlinear functions include, for instance: Given that it is a quadratic function, f(x) = x2 is nonlinear. Given that it is an exponential function, f(x) = 2x is nonlinear. As it stands, f(x) = x3 - 3x is nonlinear. A nonlinear equation is one in which the highest degree of any term is two or greater. Since equation 1 has the highest degree of 2, and equation 2 involves variables x and y, this is an example of a nonlinear equation. + 2x + 1 = 0, 3x + 4y = 5, etc.
The dependant variable in a differential equation needs to be of the first degree for it to be linear. Since x2 is not a first power in the equation x+x2=0, it is not a linear differential equation. Examples of Variables and Nonlinear Relationships Quadratic Relationships, as an example. Cubic relationships, as an example. Exponential Relationships, Example 3. Logarithmic Relationships, Example 4. Cosine Relationships, Example 5. Further Resources.
Learn more about non-linear theory https://brainly.in/question/11121655
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