Question: Find, separately, them mass of the balloon and the basket (incidentally, most of the balloon's mass is air)
Answer:
The mass of the balloon is 2295 kg, and the mass of the basket is 301 kg.
Explanation:
Let us call the mass of the balloon [tex]m_1[/tex] and the mass of the basket [tex]m_2[/tex], then according to newton's second law:
[tex](1). \:F = (m_1+m_2)a[/tex],
where [tex]a =0.265m/s^2[/tex] is the upward acceleration, and [tex]F = 688N[/tex] is the net propelling force (counts the gravitational force).
Also, the tension [tex]T[/tex] in the rope is 79.8 N more than the basket's weight; therefore,
[tex](2). \:T = m_2g+79.8[/tex]
and this tension must equal
[tex]T -m_2g =m_2a[/tex]
[tex](3). \:T = m_2g +m_2a[/tex]
Combining equations (2) and (3) we get:
[tex]m_2a = 79.8[/tex]
since [tex]a =0.265m/s^2[/tex], we have
[tex]\boxed{m_2 = 301.13kg}[/tex]
Putting this into equation (1) and substituting the numerical values of [tex]F[/tex] and [tex]a[/tex], we get:
[tex]688N = (m_1+301.13kg)(0.265m/s^2)[/tex]
[tex]\boxed{m_1 = 2295 kg}[/tex]
Thus, the mass of the balloon and the basket is 2295 kg and 301 kg respectively.
