Final answer:
The frequency in hertz and the period of the function x(t)=cos(ωx(t+τx)+θx) are all related to the value of ω. The frequency is given by f = ω/(2π) and the period is the reciprocal of the frequency, i.e., T = 1/f. To find these for the given cases, one would need the precise value of ω.
Step-by-step explanation:
In the given function x(t)=cos(ωx(t+τx)+θx), the frequency in hertz and the period of x(t) are fundamentally connected to the value of ω. The frequency, f, in hertz can be determined by the formula f = ω/(2π). Furthermore, the period, T of the function is the reciprocal of the frequency, i.e., T = 1/f.
In order to obtain the frequency and period for each of the given three cases, you would need to know the explicit value of ω for each. Nonetheless, using the given formulas, you are equipped to calculate the frequency in hertz and the period once those values are provided.
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