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kiriyama
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1. Prove if f:R->R is periodic and continuous, then f is uniformly continuous
2. There exists h that does not equal zero such that f(x+h)=f(x)
2. There exists h that does not equal zero such that f(x+h)=f(x)
Uniform continuity is a type of continuity that ensures that a function's behavior remains consistent over a certain range of values. This means that the function remains close to its values as the input values change.
Uniform continuity differs from regular continuity in that it focuses on the behavior of a function over a specific range of values, rather than just a single point. This means that a function can be uniformly continuous without being continuous at a specific point, but a function must be continuous at every point in order to be uniformly continuous.
To prove uniform continuity for periodic and continuous functions, we typically use the definition of uniform continuity, which states that for any given epsilon greater than zero, there exists a delta greater than zero such that the distance between the function's values at two points within delta is less than epsilon. We then use algebraic manipulations and the periodicity of the function to show that this condition is satisfied.
Some common techniques used in uniform continuity proofs include the use of the definition of uniform continuity, the triangle inequality, and algebraic manipulations. In some cases, we may also use the intermediate value theorem to show that a function is uniformly continuous.
No, not all continuous functions are uniformly continuous. A function must satisfy the definition of uniform continuity in order to be considered uniformly continuous. While all uniformly continuous functions are continuous, the reverse is not always true.