Define `f(x)={{:(x^2+bx+c,","xlt1),(x,","xge1):} }`.If f(x) is differentiable at `x=1`, then `(b-c)=`

Define f(x) = {{:(x^(2)+bx+c , ",",x lt 1),(x,",",x ge 1):} . If f(x) is differentiable at x = 1, then (b - c) =

If f(x) = a/x +bx has minimum at (2,1) then (a,b) =

If f is given by f(x)={{:(k^(2)x-k,"if "xge1),(2,"if "xlt1):} is a continuous function on R, then find k .

Suppose f(x)={{:(a+bx",",xlt1),(4",",x=1),(b-ax",",xgt1):} and if lim_(xrarr1)f(x)=f(1) what are possible values of a and b?

Let f: R rarrR be defined by f(x)={{:(x+2, (xle-1)),(x^(2), (-1lexle1)),(2-x), (xge1)):} . Then the value of f(-1.75)+f(0.5)+f(1.5) is

Let f(x)={{:(x+2",",xlt-1),(x^(2)",",-1lexlt1),((x-2)^(2)",",xge1):} Then number of times f(x) changes its sign in (-oo,oo) is

If [x] denotes the greatest integer not exceeding the number x, then f(x) defined by f(x)={{:([x],"if "xlt2),([x]-1,"if "xge2):} is continuous in the interval.