If the period of sin^2x+2 cos^2 x is
k, then the positive integral
multiple of k is
Answers
Answer:
function is said to be periodic if there exists a positive real number “T” such that
f(x+T)=f(x)for allx∈D
where “D” is the domain of the function f(x). The least positive real number “T” (T>0) is known as the fundamental period or simply the period of the function. The “T” is not a unique positive number. All integral multiple of “T” within the domain of the function is also the period of the function. Hence,
f(x+nT)=f(x);n∈Z,for allx∈D
In the context of periodic function, an “aperiodic” function is one, which in not periodic. On the other hand, a function is said to be anti-periodic if :
f(x+T)=−f(x)for allx∈D
Periodicity and period
In order to determine periodicity and period of a function, we can follow the algorithm as :
Put f(x+T) = f(x).
If there exists a positive number “T” satisfying equation in “1” and it is independent of “x”, then f(x) is periodic. Otherwise, function, “f(x)” is aperiodic.
The least value of “T” is the period of the periodic function.
Answer:
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