Let `f(x) = { x^3+x^2-10x, -1 <= x <= 0, sinx, 0 <=x < pi/2, 1+ cosx, pi/2 <= x <= pi` then `f(x) has

Let f(x) = {{:( x^(3) + x^(2) - 10 x ,, -1 le x lt 0) , (sin x ,, 0 le x lt x//2) , (1 + cos x ,, pi //2 le x le x ):} then f(x) has

Let f(x) = {{:( x^(3) + x^(2) - 10 x ,, -1 le x lt 0) , (sin x ,, 0 le x lt x//2) , (1 + cos x ,, pi //2 le x le x ):} then f(x) has

Let f(x)={x^(3)-x^(2)+10x-5,x 1 The set of values of x=1, is given by

Let f(x) = {(x^(3) - x^(2) + 10x - 5",", x le 1),(-2x + log_(2)(b^(2) - 2)",",x gt 1):} find the values of b for which f(x) has the greatest value at x = 1.

Let f(x)={{:(3x^2-2x+10, x lt 1),(-2,x gt 1):} The set of values of b for which f(x) has greatest value at x=1 is

Let f(x)={x^3-x^2+10 x-5,xlt=1, \ -2x+(log)_2(b^2-2),x >1 Find the values of b for which f(x) has the greatest value at x=1.

Let f(x)={x^3-x^2+10 x-5,xlt=1-2x+(log)_2(b^2-2),x >1 Find the values of b for which f(x) has the greatest value at x=1.

Let f(x)={x^3-x^2+10 x-5,xlt=1, \ -2x+(log)_2(b^2-2),x >1 Find the values of b for which f(x) has the greatest value at x=1.