Let f:(0,\ pi)->R be a twice different...

Let `f:(0,\ pi)->R` be a twice differentiable function such that `(lim)_(t->x)(f(t)sinx-f(x)sint)/(t-x)=-sin^2x` for all `x in (0,\ pi)` . If `f(pi/6)=-pi/(12)` , then which of the following statement(s) is (are) TRUE? `f(pi/4)=pi/(4sqrt(2))` (b) `f(x)<(x^4)/6-x^2` for all `x in (0,\ pi)` (c) There exists `alpha in (0,\ pi)` such that `f^(prime)(alpha)=0` (d) `f''(pi/2)+f(pi/2)=0`

Similar Questions

Explore conceptually related problems

Let f:R rarr R be a twice differentiable function such that f(x+pi)=f(x) and f'(x)+f(x)>=0 for all x in R. show that f(x)>=0 for all x in R .

Let f(x)=sin[(pi)/(6)sin((pi)/(2)sin x)] for all x in R

For tha function f(x)=(pi-x)(cos x)/(|sin x|);x!=pi and f(pi)=1 which of the following statement is/are true:

Let f(x) be a differentiable function such that f'(x)=sinx+sin4xcosx. Then f'(2x^(2)+(pi)/(2))"at "x=sqrt((pi)/(2)) is equal to

Let f:[-pi/2,pi/2] to R be a continuous function such that f(0)=1 and int_0^(pi/3)f(t)dt=0 Then which of the following statement is(are) TRUE?

Find the differentiable function which satisfies the equation f(x)=-int_(0)^(x)f(t)tan tdt+int_(0)^(x)tan(t-x)dt where x in(-(pi)/(2),(pi)/(2))

If f(x) is twice differentiable in x in[0,pi] such that f(0)=f(pi)=0 and int_(0)^((pi)/(2))(f(2x)+f'(2x))sin x cos xdx=k pi ,then k is

Let f:R rarr R be a differentiable function such that f(0),f((pi)/(2))=3 and f'(0)=1. If g(x)=int_(x)^((pi)/(2))[f'(t)csc t-cot t csc tf(t)]dt for x in(0,(pi)/(2)] then lim_(x rarr0)g(x)=

Let f:R rarr R be a differentiable function such that f(0)=0,f(((pi)/(2)))=3 and f'(0)=1 If g(x)=int_(x)^((pi)/(2))[f'(t)cos ect-cot t cos ectf(t)]dt for x in(0,(pi)/(2)] then lim_(x rarr0)g(x)=

Similar Questions

Recommended Questions