besulzbach
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Consider f(x) = \sin{(ex)}
and g(x) = \sin{(\pi x)}
Determine the period of f(x) + g(x)?
Is it possible?
Would LCM[\frac{2\pi}{e}, 2] = \frac{2\pi}{e}?
e = \lim_{h \to 0} (1 + h)^\frac{1}{h} \approx 2.718281828
The period of the sum of the functions would be the LCM of their periods.
I just do not know the LCM of \frac{2\pi}{e} and 2
and g(x) = \sin{(\pi x)}
Determine the period of f(x) + g(x)?
Is it possible?
Would LCM[\frac{2\pi}{e}, 2] = \frac{2\pi}{e}?
Homework Equations
e = \lim_{h \to 0} (1 + h)^\frac{1}{h} \approx 2.718281828
The period of the sum of the functions would be the LCM of their periods.
The Attempt at a Solution
I just do not know the LCM of \frac{2\pi}{e} and 2