" 24."g(x)=(x)/(2)+(2)/(x),x!=0

If f(x)=(1)/(x),g(x)=(1)/(x^(2)), and h(x)=x^(2), then f(g(x))=x^(2),x!=0,h(g(x))=(1)/(x^(2))h(g(x))=(1)/(x^(2)),x!=0, fog (x)=x^(2) fog(x) =x^(2),x!=0,h(g(x))=(g(x))^(2),x!=0 none of these

If f(x)=1/x ,g(x)=1/(x^2), and h(x)=x^2 , then (A) f(g(x))=x^2,x!=0,h(g(x))=1/(x^2) (B) h(g(x))=1/(x^2),x!=0,fog(x)=x^2 (C) fog(x)=x^2,x!=0,h(g(x))=(g(x))^2,x!=0 (D) none of these

If f(x)=1/x ,g(x)=1/(x^2), and h(x)=x^2 , then (A) f(g(x))=x^2,x!=0,h(g(x))=1/(x^2) (B) h(g(x))=1/(x^2),x!=0,fog(x)=x^2 (C) fog(x)=x^2,x!=0,h(g(x))=(g(x))^2,x!=0 (D) none of these

If f(x)=1/x ,g(x)=1/(x^2), and h(x)=x^2 , then (A) f(g(x))=x^2,x!=0,h(g(x))=1/(x^2) (B) h(g(x))=1/(x^2),x!=0,fog(x)=x^2 (C) fog(x)=x^2,x!=0,h(g(x))=(g(x))^2,x!=0 (D) none of these

Let g(x)=2f(x/2)+f(2-x) and f''(x)<0 , AA x in (0,2) .Then g(x) increasing in

Let g(x)=2f((x)/(2))+f(1-x) and f'(x)<0 in 0<=x<=1 then g(x)

((2x) / (x-5)) ^ (2) +5 ((2x) / (x-5))-24 = 0

If the function g(x) is defined by g(x)= (x^(200))/(200) + (x^(199))/(199)+ …..+ (x^(2))/(2)+ x + 5 , then g'(0)=________

A function g(x) is defined g(x)=2f(x^2/2)+f(6-x^2),AA x in R such f''(x)> 0, AA x in R , then m g(x) has

If g(x)=(1-a^(x)+xa^(x)log a)/(x^(2)*a^(x)),x 0 (where a >0) then find a and g(0) so that g(x) is continuous at x=0.