If `|ax^(2)+bx+c|le1` for all x in `[0,1]` then

If |ax^2 + bx+c|<=1 for all x is [0, 1] ,then

Let f(x) = x^(3) - x^(2) + x + 1 and g(x) = {{:(max f(t)",", 0 le t le x,"for",0 le x le 1),(3-x",",1 lt x le 2,,):} Then, g(x) in [0, 2] is a. continuous for x in [0, 2] - {1} b. continuous for x in [0, 2] c. differentiable for all x in [0, 2] d. differentiable for all x in [0, 2] - {1}

Let f(x) = a x^2 + bx + c , where a, b, c in R, a!=0 . Suppose |f(x)| leq1, x in [0,1] , then

If ax^(2)+bx+c=0, a,b, c in R , then find the condition that this equation would have atleast one root in (0, 1).

If f (x)= [{:((sin [x^(2)]pi)/(x ^(2)-3x+8)+ax ^(3)+b,,, 0 le x le 1),( 2 cos pix + tan ^(-1)x ,,, 1 lt x le 2):} is differentiable in [0,2] then: ([.] denotes greatest integer function)

Let f(x) = {:{(|x| for 0<|x|le1), (1 for x = 0):} then

If x^2+ax+1 is a factor of ax^3+ bx + c , then which of the following conditions is valid: a. a^2+c=0 b. b-a=ac c. c^3+c+b^2=0 d. 2c+a=b

The least value of alpha in R for which 4ax^2+(1)/(x)ge1 , for all xgt 0 , is

Fill in the blanks: If y = 2 tan^-1 x + sin^-1 ((2x)/(1+x^2)) for all x, then ………… le y le …….

Let f(x) satisfy the requirements of Lagrange's mean value theorem in [0,1], f(0) = 0 and f'(x)le1-x, AA x in (0,1) then