1.

Let f(x) be a continuous function and I = int_(1)^(9) sqrt(x)f(x) dx, then

Answer»

There exists some `c in (1,9 )` such that `I = 8sqrt(c)F(c)`
There exists some `p,q in (1,3)` such that `I = 2[p^(2)f(p^(2))+q^(2)f(q^(2))]`
There exists some `ALPHA in (1,9)` such that `I = 9sqrt(X)f(alpha)`
If `f(x) ge 0 AA x in [1,9] RARR I gt 0`

Solution :N//A


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