The value of m which the function ` f(x) {{:( mx^(2), "for " xle 1 ),( 2x,"for" xgt 1 ):} `
is differentiable at `x= 1`,is

If f(x) = {{:( 1+ x ,"for " xle 2),( 5-x,"for " xgt 2):},then

A function f (x) is defined by : f(x)={(px^2+1,"for"xlt1),(x+p,"for"xgt1):} if f (x) be differentiable at x = 1 then p =

The value(s) of x for which the function f(x) = {(1-x, ",", x lt 1),((1-x)(2-x), ",", 1 le x le 2 ),(3-x, ",", x gt 2 ):} fails to be continuous is (are)

If the function g(x) = {(ksqrt(x+1) " when " 0 le x le 3),(mx + 2 " when " 3 lt x le 5):} is differentiable, then the value of (k+m) is -