vi) false , let αβ and γ the three zeroes of cubic polynomial x3+ax2–bx+c
then, product of zeroes = (−1)3 constant termcoefficient of x3
⇒ αβγ=−(+c)1
⇒ αβγ=−c
Given that, all three zeroes are positive. So, the product of all three zeroes is also positive
i.e., αβγ>0
⇒ −c>0
⇒ c<0
Now, sum of the zeroes = α+β+γ=(−1)coefficient of x2coefficient of x3
⇒ α+β+γ=−α1=−a
But αβ and γ are all positive
Thus, its sum is also positive
So, α+β+γ>0
⇒ −a>0
⇒ a<0
and sum of the product of two zeroes at a time =(−1)2 coefficient of xcoefficient of x3=−b1
⇒ α+βγ+γα=−b
∴ αβ+βγ+αγ>0
⇒ αβ+βγ++αγ>0⇒−b>0
b<0
So, the cubic polynomial x3+ax2–bx+c, has all three zeroes which are positive only when all constants a, b and c are negative.