Consider `f(x)=(x)/(x^(2)-1)`
Statement I Graph of `f(x)` is concave up for `xgt1.`
Statement II If `f(x)` is concave up then `f''(x)gt0`

Consider f(x)=(x)/(x^(2)-1)and g(x)=f''(x) Statement I Graph of g(x) is cancave up for xgt1 . Statement II (d^(n))/(dx^(n))f(x)=((-1)^(n)n!)/(2){(1)/((x-1)^(n+1))+(1)/((x+1)^(n+1))}n"inN

Let f(x)=ln(2+x)-(2x+2)/(x) . Statement I The function f(x) =0 has a unique solution in the domain of f(x). Statement II f(x) is continuous in [a, b] and is strictly monotonic in (a, b), then f has a unique root in (a, b).

If f(x) = (x+2)/(3x-1) then f (f(x)) is

consider the function f(x)=(x^(2))/(x^(2)-1) If f is defined from R-(-1,1)rarrR then f is

Statement I f(x) = sin x + [x] is discontinuous at x = 0. Statement II If g(x) is continuous and f(x) is discontinuous, then g(x) + f(x) will necessarily be discontinuous at x = a.

Let f(x) = sin^(-1)((2x)/(1+x^(2))) Statement I f'(2) = - 2/5 and Statement II sin^(-1)((2x)/(1 +x^(2))) = pi - 2 tan^(-1) x, AA x gt 1

Let f(x) = {{:((cos x-e^(x^(2)//2))/(x^(3))",",x ne 0),(0",",x = 0):} , then Statement I f(x) is continuous at x = 0. Statement II lim_(x to 0 )(cos x-e^(x^(2)//2))/(x^(3)) = - (1)/(12)

If f(x) = {|x|-|x-1|}^(2) , draw the graph of f(x) and discuss its continuity and differentiability of f(x)

Statement I :The function f(x)=(x^(3)+3x-4)(x^(2)+4x-5) has local extremum at x=1. Statement II :f(x) is continuos and differentiable and f'(1)=0.

Let f(x)=sin x bb"Statement I" f is not a polynominal function. bb"Statement II" nth derivative of f(x), w.r.t. x, is not a zero function for any positive integer n.