For `x in (0,(5pi)/(2))` define, `f(x)= overset(x) underset(0) int sqrt(t) sin t dt` then f has

Assertion (A) : Absolute minimum of f(x)= overset(x) underset(0) int (t^(2)+2t+2) in [2,4] 32//3 Reason (R) : f(x) is incrasing in [a,b] and continuous rArr absolute minimum of f(x) in [a,b] is f(a)

If f(x)= overset(x^(2)+1) underset(x^(2)) int e^(-t^(2)) dt then the following f(x) decreases in

If f(x) = int_1^x (1)/(2 + t^4) dt ,then

If x in ( 0 , (pi)/(2)) " then " int sqrt(1 + sin x ) dx =

If f(x) = int_(0)^(x) t.e^(t) dt then f'(-1)=

If x in (0, (pi)/(2)) " then " int sqrt([(sin x - sin^(3) x)/(1 + sin^(3) x) ]) dx =

The difference between the greatest and the least values of the function f(x)=oversetxunderset0int(t^2+t+1)dt" on "[2,3] is (to be in second year)

If g(x) = int_(0)^(x) cos 4(t) dt , then g(x+pi) equals