If `f(x)={{:("0, when x is an integer ,"),("2, when x is not an integer,"):}` then `f(pi)` =

The polynomial f(x) is defined by f(x)={{:("0 when x is an integer ,"),("1 when x is not an integer ,"):} Then compute : (a)f(-2),(b)f(sqrt3) .

A function f(x) is defined as follows: f(x)={:{(1",","when x is an integer"),(0",","when x is not an integer"):} Draw the graph of the function and from the graph find its points of discontinuity (if any).

If f(x) = 0 when x is an integer. = 2 when x is not an integer, then find - (a) f(0), (b) f(sqrt2) .

If f(x)={{:("2x+3, when x is an rational ,"),(x^(2)+1", when x is irrational,"):} then f(0) =

A function phi(x) is defined as follows : phi(x)=2," when x is an integer" =0," when x is not an integer" Draw the graphs of the function and from the graph find the points of discontinuity of phi(x).

If f (x) ={{:(x",", "when " 0 lt x lt 1),(2-x",", "when" 1 lt x le 2):} then f'(1) is equal to-

If f(x)={(x,"when "0le x le 1),(2x-1,"when "x gt 1):} then -

If f(x) = 2x + 3, then x is rational. =x^(2)+1 , when x is irrational. then find - (a) f(0), (b) f(pi) .

Let f(x) = Ax^2+Bx+C where A,B,C are real numbers. Prove that if f(x) is an integer whenever x is an integer, then the number 2A, A+B and C are all integers. Conversely, prove that if the numbers 2A, A+B and C are all integer then f(x) is an integer whenever x is an integer.

Let f(x)=Ax^2+Bx+C where A, B, C are three real constants, if f(x) is integer for integral values of x, then prove that each of 2A, (A+B) and C is an integer. Conversely, if each of 2A, (A+B) , C is an integer then f(x) will be integer for integral values of x.