Show that
`f(x)={{:((cos ax-cosbx)/(x^(2)),if x ne 0),(1/2 (b^(2)-a^(2)),if x =0):}` where a and b are real constants is continuous at x = 0.

Show that f(x)={{:((cosax-cosbx)/(x^(2))," if " xne0),((1)/(2)(b^(2)-a^(2))," if "x=0):}"is continuous at 0"

Show that Lt_(xto0)(cosax-cosbx)/x^(2)=(b^(2)-a^(2))/2

If f: R to R" is defined by f(x)"={{:(,(cos 3x-cosx)/(x^(2)),"for "x ne 0),(,lambda,"for "x=0):} and if f is continuous at x=0, then lambda=

If f: R to R is defined by f(x) = {:{((2 sin x - sin 2x)/( 2 x cosx) , " if x ne 0), (a, if x ne 0):} then the value of 'a' so that f is continuous at 0 is

If f : R to R is defined by f(x) = {:{ ((cos 3x - cos x)/(x^(2) ), " for " x ne 0), (lamda , " for " x =0):} and if f is continuous at x =0 , then lamda is equal to

Show that f(x) = (cos3x - cos4x)/(xsin 2x), x ne 0 , f(0) = (7)/(4) is continuous at x = 0 .

If f(x)=g(x)(x-a)^(2) , where g(a)ne0 , and g is continuous at x=a , then

If f R to R is defined by f (x) = {{:(( 2 sin x - sin 2x)/(2x cos x ) " if " x ne 0) , ( alpha " for " x =0 ):} then the value of alpha so that f is continuous at 0 is