Let `f : R -> R` be a continuous onto function satisfying `f(x) + f(-x)=0 AA x in R`,. If `f(-3) = 2` and `f(5) = 4` in `[-5, 5]` , then the equation `f(x) = 0` has

Let f:R rarr R be a continuous onto function satisfying f(x)+f(-x)=0AA x in R, If f(-3)=2 and f(5)=4 in [-5,5], then the equation f(x)=0 has

Let f:R rarr R be a continuous onto function satisfying f(x)+f(-x)=0AA x in R. If f(-3)=2 and f(5)=4 in [-5,5], then the minimum number of roots of the equation f(x)=0 is

Let f : R to R be a continuous onto function satisfying f(x)+f(-x) = 0, forall x in R . If f(-3) = 2 and f(5) = 4 in [-5, 5], then what is the minimum number of roots of the equation f(x) = 0?

Let f: R->R be a continuous onto function satisfying f(x)+f(-x)=0AAx in Rdot If f(-3)=2a n df(5)=4in[-5,5], then the minimum number of roots of the equation f(x)=0 is

Let f: R->R be a continuous onto function satisfying f(x)+f(-x)=0AAx in R . If f(-3)=2 \ a n d \ f(5)=4 \ i n \ [-5,5], then the minimum number of roots of the equation f(x)=0 is

Let f: R->R be a continuous onto function satisfying f(x)+f(-x)=0AAx in R . If f(-3)=2 \ a n d \ f(5)=4 \ i n \ [-5,5], then the minimum number of roots of the equation f(x)=0 is

Let f: R->R be a continuous onto function satisfying f(x)+f(-x)=0AAx in R . If f(-3)=2 \ a n d \ f(5)=4 \ i n \ [-5,5], then the minimum number of roots of the equation f(x)=0 is

f:R rarr R;f(x) is continuous function satisfying f(x)+f(x^(2))=2AA x in R, then f(x) is

f:R rarr R;f(x) is continuous function satisfying f(x)+f(x^(2))=2AA x in R, then f(x) is