MCQ
Let $f(x) = \cos px + \sin x$ be periodic, then $p$ must be
- ✓Rational
- BIrrational
- CPositive real number
- DNone of these
then $\sin \,(x + \lambda ) + \cos p\,(x + \lambda ) = \sin x + \cos px,\,\,\forall \,\,x \in R$
Putting $x = 0$ and replace $\lambda $ by $ - \lambda $, we have
$\sin \lambda + \cos p\lambda = 1$ and $ - \sin \lambda + \cos p\lambda = 1$
Solving these, we get $\sin \lambda = 0$ so $\lambda = n\pi $ and
$\cos p\lambda = 1$ so $p\lambda = 2m\pi .$
As $\lambda \ne 0,\,\,m$ and $n$ are non-zero integers.
Hence $p = \frac{{2m\pi }}{\lambda },$ which is rational.
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