For what values of x, the function `f(x) = x^(5)-5x^(4)+5x(3)-1` is maximum or minimum? Prove that at x = 0, the function is neither maximum nor minimum.
Correct Answer - D
`(d)` `AnnBsubB`
`P(AnnB) le P(B)`……….`(i)`
`P(AnnB) ,e (5)/(8)`
Now `P(AuuB) =P(A)+P(B)-P(AnnB)`
`P(AuuB) le 1`
`impliesP(A)+P(B)-P(AnnB) le 1`
`impliesP(AnnB) ge (3)/(4)+(5)/(8)-1`
i.e., `P(AnnB) ge (3)/(8)`……`(ii)`
From `(i)` and...
As per kinetic theory of gases, for an ideal gas, there are no forces between the molecules of a gas. Hence, gases neither have a definite volume nor shape.