If f is continuous functions , then :

Let f:RtoR and g:R toR be continuous functions. Then the value of int_(-pi//2)^(pi//2)(f(x)+f(-x))(g(x)-g(-x))dx is

Find the value of a such that the function f(x) defined by f(x)={(ax+3,ifxle2),(a^2x-1,ifx>2):} is continuous function at x=2 .

If a continuous function f on [0,a] satisfies f(x)f(a-x)=1,agt0 , then find the value of int_(0)^(a)(dx)/(1+f(x)) .

Find the value of k such that the function f(x) defined by f(x)={(kx-1,ifxlepi/2),(sinx,ifx>pi/2):} is continuous function at x=pi/2 .

Let f(x)={{:(cx^(2)+2x",","if ",xlt2),(2x+4",","if ",xgt2):} If the function f is continuous on (-oo,oo) , then the value of c is equal to

Consider f(x)={(2x,if,x 2):} f(x) is continuous . If not so, how can you make it continuous.

If f(x) is continuous and increasing function such that domain of g(x) = sqrt(f(x)-x) be R and h(x) = 1/(1-x) then the domain of phi(x)=sqrt(f(f(f(x)))-h(h(h(x)))) is A)R B) {0,1} C) R -{0,1} D) R-(0,1)