The set of all values of 'b' for which the function `f(x)=(b^(2)-3b+2)(cos^(2)x-sin ^(2)x)+(b-1)x+sin2` does not possess stationary points is

The set of all values of a for which the function f(x)=(a^2-3a+2)(cos^2\ x/4-sin^2\ x/4)+(a-1)x+sin1 does not possess critical points is (A) [1,oo) (B) (0,1) uu (1,4) (C) (-2,4) (D) (1,3) uu (3,5)

The integral value of 'b' for which the function f(x) = (b^2 - 3b + 2) (cos^2x – sin^2x) + (b- 1)x + sin(b^2 + b + 1) does not possesses any stationary point is

The set of values of x for which the function f(x)=(1)/(x)+2^(sin^(-1)x)+(1)/(sqrt(x-2)) exists is

The set of all values a for which f(x) = (a^(2) - 3a+2)(cosx/2)+(a-1)x + sin 1 does not posses critical point, is

The value of a for which the function f(x)=(4a-3)(x+log5)+2(a-7)cot(x/2)sin^2(x/2) does not possess critical points is (a) (-oo,-4/3) (b) (-oo,-1) (c) [1,oo) (d) (2,oo)

The set of value(s) of a for which the function f(x)=(a x^3)/3+(a+2)x^2+(a-1)x+2 possesses a negative point of inflection is (a) (-oo,-2)uu(0,oo) (b) {-4/5} (c) (-2,0) (d) empty set

The exhaustive set of value of 'a' for which the function f(x)=a/3(x^3+(a+2)x^2+(a-1)x+2 possess a negative point of minima is (q,oo) . The value of q is

Find the set of all values of the parameter 'a' for which the function, f(x) = sin 2x - 8(a + b)sin x + (4a^2 + 8a - 14)x increases for all x in R and has no critical points for all a in R.

The value of b for which the function f(x)={5x-4,0xlt=1 , 4x^2+3b x ,1< x <2 and continuous at x=1

The values of a and b for which all the extrema of the function, f(x)=a^(2)x^(3)-0.5ax^(2)-2x-b, is positive and the minima is at the point x_(0)=(1)/(3), are