[" 14.If "f_(1)(x)" and "f_(2)(x)" are defined on domains "D_(1)" and "D_(2)],[" respectively,then "f_(1)(x)+f_(2)(x)" is defined on "D_(1)nn D_(2).]

If f_(1) ,(x) and f_(2)(x) are defined on a domain D_(1) , and D_(2) , respectively, then domain of f_(1)(x) + f_(2) (x) is :

TRUE/FALSE:If f_1(x) and f_2(x) are defined on domains D_1 and D_2 ,respectively, then f_1 (x) + f_2(x) is defined on D_1 nn D_2 .

Assertion (A) : If f : R to R defined by f(x) =sin^(-1)(x/2) + log_(10)^(x) , then the domain of the function is (0,2]. Reason (R) : If D_(1) and D_2 are domains of f_(1) and f_2 , then the domain of f_(1) + f_(2) is D_(1) cap D_(2)

If f(x) is defined on [0,1], then the domain of f(3x^(2)) , is

If f(x) is defined on [0,1], then the domain of f(3x^(2)) , is

A function f(x)=sqrt(1-2x)+x is defined from D_(1rarr)D_(2) and is onto lf the set D_(1) is its complete domain then the set D_(2) is

If f(x)=((x)/(1-|x|)) then D_(f) is

If (f(x))^(2)+f((1-x)/(1+x))=64x AA in D_(f) then

If (f(x))^(2)xxf((1-x)/(1+x))=64x AAx in D_(f), then The domain of f(x) is