Let f(x) be a function defined as
`f(x)={{:(sin(x^2-3x)", "xle0),(6x+5x^2", "xgt0):}`
Then at x=0,f(x)

Let f(x) be a function defined as follows : f(x)=sin(x^(2)-3x),xle0,and at 6x+5x^(2),xgt0 then at x=0,f(x)

Let f(x) be a function defined as follows: f(x)=sin(x^2-3x),xlt=0; a n d6x+5x^2,x >0 Then at x=0,f(x) has a local maximum has a local minimum is discontinuous (d) none of these

Let f(x) be a function defined as below : f(x)=sin(x^(2)-3x) ,x le 0 =6x+5x^(2), x gt 0 then at x=0 ,f(x)

Let f(x) be a function defined as follows: f(x)=sin(x^2-3x),xlt=0; and 6x+5x^2,x >0 Then at x=0,f(x) (a) has a local maximum (b) has a local minimum (c) is discontinuous (d) none of these

If f(x)={(sin(x^(2)-3x),xle0 .^x+5x^(2),xgt0

If f(x)={(sin(x^(2)-3x),xle0 6x+5x^(2),xgt0 then at x=0, f(x) is?

Let f:RrarrR be function defined by f(x)={(sin(x^2)/2, ifx!=0),(0,if x=0):} Then, at x=0, f is

For what value of lamda the function defined by f(x)={{:(lamda(x^(2)+2)", if "xle0),(4x+6", if "xgt0):} is continuous x=0 ? Hence check the differentiablity of f(x) at x=0.