If `f(x)={{:(kx^2" for "x le 2),(4 " for "x gt 2):}` is continuous at x=2 then the value of k si

If f(x) = {{:(kx , "for ". x le 2),(3, "for " x gt 2):} is continuous at x=2 then the value of k is ………………………. .

If f(x)={{:(kx^(2),"for",xle2),(5,"for", x gt2):} is continuous at x=2 then the value of k is …………..

Find the relationship between a and b so that the function f defined by f(x)={{:(ax+1-2," if "x le 3),(bx+3," if "x gt 3):} is continuous at x=3.

For what value of lambda is the function defined by f(x)={{:(lambda(x^(2)-2x)," if "x le 0),(4x+1," if "x gt 0):} continuous at x= 0? What about continuity at x =1?

Is the function f defined by {{:(x," if "x le 1),(5," if "x gt 1):} continuous at x= 0? At x=1? At x=2?.

The probability density function of X is given by f(x)={{:(kxe^(-2x), "for " x gt 0), (0, "for " x le 0):} Find the value of k.

If the relation f(x)={(2x-3",",x le 2),(x^(3)-a",",x ge2):} is a function, then find the value of a.

The probability density function of X is given by f(x)={{:(ke^(-x/3), "for " x gt 0), (0, "for " x le 0):} Find the value of k

Let f(x) be a continuous function fiven by f(x)={(2x",", |x|le1),(x^(2)+ax+b",",|x|gt1):},"then " If f(x) is continuous for all real x then the value of a^(2)+b^(2) is

Find the values of a and b such that the function defined by f(x)={{:(5," if "x le 2),(ax+b," if "2 lt x lt 10),(21," if "x ge 10):} is a continuous function.