f(x)={[(sin^(2)ax)/(x^(2)),x!=0],[1,x=0]

Consider the function f(x)={((sin^2ax)/x^2,x!=0),(1,x=0):} Redefine the function in such a way that it becomes continuous at x=0.

Prove that f(x)={(sin^(2)ax)/(1),x!=01 and 1,x=0 is not continuous at x=0

Find the value of a for which f(x)={(sin^2(ax)/(x^2), "" xne0),(1, x=0 ""):} is continuous at x = 0

Value of a so that f(x) = (sin^(2)ax)/(x^(2)), x != 0 and f(0) = 1 is continuous at x = 0 is

For the function f(x)={((sin^(2)ax)/(x^(2))",","where " x ne 0),(1",", "when " x =0):} which one is a true statement

For the function f(x)={((sin^(2)ax)/(x^(2))",","where " x ne 0),(1",", "when " x =0):} which one is a true statement

f(x)={(e^(x)-1+ax)/(x^(2)),x>0 and b,x=0 and (sin((x)/(2)))/(x),x<0

If f(x)=(sin^(2)ax)/(x^(2))" for "x ne 0, f(0)=1 is continuous at x=0 then a=

Let f(x)={(sin ax^(2))/(x^(2));x!=0 and (3)/(4)+(1)/(4a);x=0 For what value of a,f(x) is continuous at x=0?

If the function f(x) = {((sin^(2)ax)/(x^(2))","," when "x != 0),(" k,"," when " x = 0):} is continuous at x = 0 then k = ?