We have discovered three non-power infinite series representations for Bessel functions of the first kind of integer orders and real arguments. These series contain only elementary functions and are remarkably simple. Each series was derived as a Fourier series of a certain function that contains Bessel function. The series contain parameter $b$ by setting which to specific values one can change specific form of series. Truncated series retain qualitatively behaviour of Bessel functions at large $x$: they have sine-like shape with decreasing amplitude. Derived series allow to obtain new series expansions for trigonometric functions.
On Infinite Series of Bessel functions of the First Kind: $\sum_ν J_{Nν+p}(x), \sum_ν(-1)^νJ_{Nν+p}(x)$
Fourier transform of a Bessel function multiplied by a Gaussian
Bessel functions of integer order in terms of hyperbolic functions
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