Answer the following by appropriately matching the lists based on the information given in the paragraph.
Let `f(x) = sin(picosx)` and `g(x)=cos(2pi sinx)` be two functions defined for `x gt0`. Define the following sets whose elements are written in the increasing order:
`X={x:f(x)=0}, Y={x:f^(')(x)=0}, Z={x:g(x)=0}, W={x:g^(')(x)=0}`
List-I contains the sets `X,Y,Z` and W. List-II contains such some information regarding these sets:

Which of the following is the only CORRECT combinations?

Let f(x)= sin(picosx) and g(x)= cos(1pisinx) e two function defined for x gt 0 define the following sets whose elements are written in increasing order. X={x:f(x)=0},Y={x:f'(x)=0} Z={x:g(x)=0},W={x:g'(x)=0} {:("List I","List II"),((I)" "X,(P)" "supe{(pi)/(2),(3pi)/(2),4pi,7pi}),((II)" "Y,(Q)" an arithmetic progression"),((III)" "Z,(R)" not an arithmetic progression"),((IV)" W",(S)" "supe{(pi)/(6),(7pi)/(6),(13pi)/(6)}),(,(T)" "supe{(pi)/(3),(2pi)/(3),pi}),(,(U)" "supe{(pi)/(6),(3pi)/(4)}):} Q.

Let f'(sin x) 0AA x in(0,(pi)/(2)) and g(x)=f(sin x)+f(cos x), then

Let f(x)= sin((pi)/x) and D={x:f(x)gt0) , then D contains

A function f is defined by f(x)=x^(x) sin x in [0,pi] . Which of the following is not correct?

Let f(x)= sin(picosx) and g(x)= cos(1pisinx) e two function defined for x gt 0 define the following sets whose elements are written in increasing order. X={x:f(x)=0},Y={x:f'(x)=0} Z={x:g(x)=0},W={x:g'(x)=0} {:("List I","List II"),((I)" "X,(P)" "supe{(pi)/(2),(3pi)/(2),4pi,7pi}),((II)" "Y,(Q)" an arithmetic progression"),((III)" "Z,(R)" not an arithmetic progression"),((IV)" W",(S)" "supe{(pi)/(6),(7pi)/(6),(13pi)/(6)}),(,(T)" "supe{(pi)/(3),(2pi)/(3),pi}),(,(U)" "supe{(pi)/(6),(3pi)/(4)}):} Q. Which of th following is the only correct combination

let f(x)=sqrt(x) and g(x)=x be function defined over the set of non negative real numbers. find (f+g)(x),(f-g)(x),(fg)(x) and (f/g)(x)

Let f''(x) gt 0 AA x in R and g(x)=f(2-x)+f(4+x). Then g(x) is increasing in

Let f(x)=sqrt(x) and g(x)" "=" "x be two functions defined over the set of nonnegative real numbers. Find (f" "+" "g)" "(x) , (f" "" "g)" "(x) , (fg)" "(x) and (f/g)(x) .