Let `f(x)=|x^(2)-3x-4|,-1lexle4.` Then

Let f(x)=|x^(2)-3x-4|,-1<=x<=4 Then f(x) is monotonically increasing in [-1,(3)/(2)]f(x) monotonically decreasing in ((3)/(2),4) the maximum value of f(x) is (25)/(4) the minimum value of f(x) is 0

Find the range of f(x)=x^(2)-3x+2,0lexle4

Find the range of f(x)=x^(2)-3x+2,0lexle4

Suppose f(x)=(1)/(2)x^(2)-8 for -4lexle4 . Then the maximum value of the graph of |f(x)| is

Let f(x)=x^(4)-4x^(3)+6x^(2)-4x+1 Then ,

Let f(x)=int_(1)^(x)t(t^(2)-3t+2)dt,1lexle4 . Then the range of f (x) is

If f(x)=-1+|x-2|, 0lexle4 g(x)=2-|x|, -1lexle3 Then, fog(x) is continuous for x belonging to

If f(x)=-1+|x-2|,0lexle4 g(x)=2-|x|,-1lexle3 Then find fog(x) and gof(x) . Also draw their rough sketch.