If `f(x)=x^3+7x-1,` then `f(x)` has a zero between `x=0a n dx=1` . The theorem that best describes this is mean value theorem maximum-minimum value theorem intermediate value theorem none of these

If f(x)=x^3+7x-1, then f(x) has a zero between x=0a n dx=1 . The theorem that best describes this is a. mean value theorem b. maximum-minimum value theorem c. intermediate value theorem none of these

If f(x)=x^(3)+7x-1, then f(x) has a zero between x=0 and x=1. The theorem that best describes this is mean value theorem maximum-minimum value theorem intermediate value theorem none of these

If f(x)=x^3+7x-1, then f(x) has a zero between x=0a n dx=1 . The theorem that best describes this is (a) mean value theorem (b) maximum-minimum value theorem (c) intermediate value theorem (d) none of these

If f(x)=x^3+7x-1, then f(x) has a zero between x=0a n dx=1 . The theorem that best describes this is (a). mean value theorem (b). maximum-minimum value theorem (c). intermediate value theorem (d). none of these

If f(x)=x^3+7x-1, then f(x) has a zero between x=0a n dx=1 . The theorem that best describes this is (a). mean value theorem (b). maximum-minimum value theorem (c). intermediate value theorem (d). none of these

Let f(x) = e^(x), x in [0,1] , then a number c of the Lagrange's mean value theorem is

Let f(x) =e^(x), x in [0,1] , then a number c of the Largrange's mean value theorem is

Let f(x)=e^(x), x in [0,1] , then the number c of Lagrange's mean value theorem is -

Let f(x) =e^(x), x in [0,1] , then a number c of the Largrange's mean value theorem is

For f(x)=(x-1)^(2/3) ,the mean value theorem is applicable to f(x) in the interval