Let of a real-valued function defined on the interval`(0,oo)` by f(x)=In `x+int_(0)^(x) sqrt(1+sint)dt`. Then which of the following statement(s) is(are) true?

Let f be a real-valued function defined on interval (0,oo),by f(x)=lnx+int_0^xsqrt(1+sint).dt. Then which of the following statement(s) is (are) true? (A). f"(x) exists for all in (0,oo)." " (B). f'(x) exists for all x in (0,oo) and f' is continuous on (0,oo), but not differentiable on (0,oo)." " (C). there exists alpha>1 such that |f'(x)|<|f(x)| for all x in (alpha,oo)." " (D). there exists beta>1 such that |f(x)|+|f'(x)|<=beta for all x in (0,oo).

Let f(x) be a differentiable function in the interval (0,2) then the value of int_(0)^(2)f(x) is

If f(x)=int_(0)^(1)(dt)/(1+|x-t|),x epsilonR Which of the following is not true about f(x) ?

Let f:[0,oo)rarrR be a continuous function such that f(x)=1-2x+int_(0)^(x)e^(x-t)f(t)dt" for all "x in [0, oo). Then, which of the following statements(s) is (are)) TRUE?

Let f(x) be diferentiable function on the interval (-oo,0) such that f(1)=5 and lim_(a to x)(af(x)-xf(a))/(a-x)=2, for all x in R. Then which of the following alternative(s) is/are correct?