f(X) = max {x/n, `|sin pi x|`}, `n in N.` has maximum points of non-differentiabilitity for `x in (0,4)` then n connot be

f(x) = max{x/n, |sinpix|}, n in N . has maximum points of non-differentiability for x in (0, 4) , Then n cannot be (A) 4 (B) 2 (C) 5 (D) 6

If f(x) = [2 + 5|n| sin x] , where n in I has exactly 9 points of non-derivability in (0, pi) , then possible values of n are (where [x] dentoes greatest integer function)

If f(x) = sgn(sin^2x-sinx-1) has exactly four points of discontinuity for x in (0, npi), n in N , then

The total number of points of non-differentiability of f(x)=max{sin^2 x,cos^2 x,3/4} in [0,10 pi], is

A function f (x)= max (sin x, cos x,1- cos x) is non-derivable for n values of x in [0, 2pi]. Then the vaue of n is:

Let f(x)=(x-1)^4(x-2)^n ,n in Ndot Then f(x) has (a) a maximum at x=1 if n is odd (b) a maximum at x=1 if n is even (c) a minimum at x=1 if n is even (d) a minima at x=2 if n is even

Let f(x)=(sin 2n x)/(1+cos^(2)nx), n in N has (pi)/(6) as its fundamental period , then n=

Let f(x)=(x-2)^2x^n, n in N Then f(x) has a minimum at

Let f _(n) x+ f _(n) (y ) = (x ^(n)+y ^(n))/(x ^(n) y ^(n))AA x, y in R-{0}. where n in N and g (x) = max { f_(2) (x), f _(3) (x),(1)/(2)} AA x in R - {0} The number of values of x for which g(x) is non-differentiable (x in R - {0}):

Let f(x) = [ n + p sin x], x in (0,pi), n in Z , p is a prime number and [x] = the greatest integer less than or equal to x. The number of points at which f(x) is not not differentiable is :