Consider the function f(x) `=|x-1|-2|x+2|+|x+3|`

Consider the function f(x)=1+2x+3x^2+4x^3 Let the sum of all distinct real roots of f (x) and let t= |s| The function f(x) is

Consider the function f(x)={{:(x-[x]-(1)/(2),x !in),(0, "x inI):} where [.] denotes the fractional integral function and I is the set of integers. Then find g(x)max.[x^(2),f(x),|x|},-2lexle2.

Redefine the function f(x)= |x-2| + |2 + x|, -3 le x le 3

Consider the function f(x)=f(x)={{:(x-1",",-1lexle0),(x^(2)",", 0lexle1):} and " "g(x)=sinx. If h_(1)(x)=f(|g(x)|) " and "h_(2)(x)=|f(g(x))|. Which of the following is not true about h_(2)(x) ?

Prove that the function f(x)=2|x-1|+3|x-4| is decreasing in the intrerval (2, 4).

The range of the function f(x)=(x^2+x+2)/(x^2+x+1),x in R , is (1,oo) (b) (1,(11)/7) (1,7/3] (d) (1,7/5)

The interval on which the function f(x)=2x^(3)+9x^(2)+12x-1 is decreasing is :

Verify mean value theorem for each of the functions: f(x)= x^(3)-2x^(2)-x + 3, x in [0, 1]

The set of points where the function f given by f(x)= |2x-1| sin x is differentiable is x in ……….

Consider the curve f(x)=x^(1/3) , then