Let f(x) be a continuous function defined for `0lexle3`, if f(x) takes irrational values for all x and `f(1)=sqrt(2)`, then evaluate `f(1.5).f(2.5)`.

Let f(x) be a continuous function defined for 1<=x<=3. If f(x) takes rational values for all x and f(2)=10 then the value of f(1.5) is :

Let f(x) be a continuous function defined on [1, 3] . If f(x) takes only rational values for all x and f(2)=10 , then f(2.5)=

Let f(x) be a continuous function defined for 2020 <= x <= 2022 .If f(x) takes irrational values for all x in domain and f(2020)=pi , then the value of sin(f(2021)) is

Let f(x) be a continuous function defined for AA x in R. if f(x) take rational value AA x in R and f(2)=198, then f(2^(2))=...

Let f(x) be a continuous function defined for AA x in R , if f(x) take rational values AA x in R and f(2) = 198 , then f(2^(2)) = ……

If f(x) is a continuous function in [2,3] which takes only irrational values for all x in[2,3] and f(2.5)=sqrt(5) ,then f(2.8)=

Let f be a function defined and continuous on [2,5] .If f(x) takes rational values for all x and f(4)=8 then the value of f(3.7) is

If f(x):[1,10]rarr Q be a continuous function. If f(x) takes rational value for all x and f(2)=5, then the equation whose roots are f(3) and f(sqrt(10)) is

If f(x) is a continuous function defined on 1<=x<=3, where x in Q and f(2)=10 then find the value of f(1.8)=