A function is defined as follows :
`f(x) = {((x^(2))/(2),"when " 0 le x lt 1),(2x^(2) - 3x + (3)/(2),"when " 1 le x le 2):}`
Discuss the existence of f'(1).

A function y= f(x) is defined as follows : y=f(x)= {(x^(2) " when " 0 le x le 1 ), ( sqrt(x) " when " x ge 1 ) :} Then the area ( in square unit ) above the x- axis included between the curve y= f(x) and the line x = 4 is-

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

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

A function f (x) is defined as follows: f(x)={{:(x+2,"when "xlt2),(x^(2)-1,"when "xge2):} Show that f (x) is discontinuous at x = 2 and the jump of the function at this point is -1 .

A function f(x) is defined as follows : f(x)=x," when "x lt1 =x+1," when "x gt1 =3/2," when "x=1 Draw the graph of f(x) and examine its continuity at x=(1)/(2)and x=1.

If f(x)={{:(2x^(2)+3" when " x le 2,),(2x+1 " when "2 lt x le 3,),((1)/(2x-1) " when "x gt 3,):} then f( e) =

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 -

A function F(x) is defined as follows: F(x)={:{(1+2x,"when "xle1),(3-2x,"when "x gt1):} Determine F(0), F(-1.5),F(1), F(2.6) and F(x+2).

A function f (x) is defined as follwos : f(x){:(=2x+1," when "xle 1),(= 3-x," when "xgt1):} Examine whether underset(xrarr1)"lim"f(x) exists or not.

Given f(x) is a periodic function with period 2 and it is defined as " "f(x) = {{:([cos""(pix)/(2)]+1",",,0lt x lt 1), (2-x",",,1 le x lt 2):} Here [*] represents the greatest integer le x . If f(0)=1 , then draw the graph of the function for x in [-2, 2] .