If `f(x) = cos|x| - 2ax + b` is a function, which increases for all x, then the maximum value of `2a + 1` is

If the function f(x) = x^(2) - ax + 5 is strictly increasing on (1,2) , then a lies in the interval

If the function f(x) is defined for all real numbers x as the maximum value of 2x + 4 and 12 + 3x then for which one of the following values of x will f(x) actually values of x will f(x) actually equal 2x + 4 ?

Show that f(x)=x+cosx-a is an increasing function on R for all values of a .

Find the maximum value of the function f(x) =sin x + cos x .

If the function f(x)=cos|x|-2a x+b increases along the entire number scale, then (a) a=b (b) a=1/2b (c) alt=-1/2 (d) a >-3/2

Show that f(x)=x^3-15 x^2+75 x-50 is an increasing function for all x in R .

Let f(x) = x^2 + ax + b . If the maximum and the minimum values of f(x) are 3 and 2 respectively for 0 <= x <= 2 , then the possible ordered pair(s) of (a,b) is/are

If the function y= sin(f(x)) is monotonic for all values of x [ where f(x) is continuous], then the maximum value of the difference between the maximum and the minumum value of f(x) is

Let f(x) be a continuous function fiven by f(x)={(2x",", |x|le1),(x^(2)+ax+b",",|x|gt1):},"then " If f(x) is continuous for all real x then the value of a^(2)+b^(2) is

If f(x) = sin^6x+ cos^6 x and M_1 and M_2 , be the maximum and minimum values of f(x) for all values ofx then M_1-M_2 is equal to