Let `f (x) = {{:(min (x"," x ^(2)), x ge 0),( max (2x "," x-1), x lt 0):},` then which of the following is not true ?

Let f(x)= {{:(1+ sin x, x lt 0 ),(x^2-x+1, x ge 0 ):}

Number of points where f (x)= {{:(max(|x ^(2)- x-2|","x ^(2) -3x),,, x ge0),( max (ln (-x)"," e ^(x)),,, x lt 0):} is non-differentiable will be:

Let f(x)={{:(x^(2)-4x+3",", x lt 3),(x-4",", x ge 3):} and g(x)={{:(x-3",", x lt 4),(x^(2)+2x+2",", x ge 4):} , which one of the following is/are true?

Let f(x)= {{:((x)/(1+|x|)",", |x| ge1), ((x)/(1-|x|)",", |x| lt 1):}, then domain of f'(x) is:

if f(x) ={{:( x-1, xlt 0),( x^(2) - 2x , x ge 0):} , then

Let f (x) be a continous function in [-1,1] such that f (x)= [{:((ln (ax ^(2)+ bx +c))/(x ^(2)),,, -1 le x lt 0),(1 ,,, x =0),((sin (e ^(x ^(2))-1))/(x ^(2)),,, 0 lt x le 1):} Then which of the following is/are corrent

Let f(x)= {:{ (x + a , x ge 1 ) , ( ax^(2) + 1, x lt 1) :} then f(x) is derivable at x =1 , if

If f(x)={{:(2+x",", x ge0),(4-x",", x lt 0):}, then f (f(x)) is given by :

If f(x)={(x^(2)",","for "x ge0),(x",","for "x lt 0):} , then fof(x) is given by

Let f(x){:{(1+sinx", "xlt0),(x^(2)-x+1ge0):} Then