If f(x) is continuous and `f(9/2)=2/9` , then : `lim_(x to 0) f((1-cos 3x)/(x^2))`=

If f(x) is continuous and f(9/2) = 2/9, then find lim_(xrarr0)9f((1-cos3x)/x^2) .

if f(x) is continuous and f((9)/(2))=(2)/(9) then the value if lim_(x rarr0)f((1-cos3x)/(x^(2))) is

If f(x) is continuous at x=0 and f(0)=2, then lim_(x to 0) int_(0)^(x)f(u)du)to is

f((9)/(2))=(2)/(9), thenthevalueof lim_(x rarr0)f((1-cos3x)/(x^(2)))

Let f(x) = {{:((cos x-e^(x^(2)//2))/(x^(3))",",x ne 0),(0",",x = 0):} , then Statement I f(x) is continuous at x = 0. Statement II lim_(x to 0 )(cos x-e^(x^(2)//2))/(x^(3)) = - (1)/(12)

Let f(x) = {{:((cos x-e^(x^(2)//2))/(x^(3))",",x ne 0),(0",",x = 0):} , then Statement I f(x) is continuous at x = 0. Statement II lim_(x to 0 )(cos x-e^(x^(2)//2))/(x^(3)) = - (1)/(12)

Let f'(x) be continuous at x=0 and f'(0)=4 then value of lim_(x rarr0)(2f(x)-3f(2x)+f(4x))/(x^(2))

Let f''(x) be continuous at x = 0 and f"(0) = 4 then value of lim_(x->0)(2f(x)-3f(2x)+f(4x))/(x^2)