ExamPlay Dark Logo
Đăng nhập

JEE Advance - Physics (2020 - Paper 2 Offline - No. 3)

A hot air balloon is carrying some passengers, and a few sandbags of mass 1 kg each so that its total mass is 480 kg. Its effective volume giving the balloon its buoyancy is V. The balloon is floating at an equilibrium height of 100 m. When N number of sandbags are thrown out, the balloon rises to a new equilibrium height close to 150 m with its volume V remaining unchanged. If the variation of the density of air with height h from the ground is
$$\rho \left( h \right) = {\rho _0}{e^{ - {h \over {{h_0}}}}}$$, where $$\rho $$0 = 1.25 kg m−3 and h0 = 6000 m, the value of N is _________.
Trả lời
4

Giải thích

Weight = Upthrust

$$mg = {F_u} \Rightarrow 480 \times 10 = \rho Vg$$

$$480 \times 10 = {\rho _0}{e^{ - {h \over {{h_0}}}}} \Rightarrow 480 \times 10 = {\rho _0}{e^{ - {{100} \over {6000}}}}Vg$$ .... (i)

$$(480 - N \times 1)10 = \rho 'Vg$$

$$(480 - N)10 = {\rho _0}{e^{ - {{150} \over {6000}}}}Vg$$ .... (ii)

Dividing Eq. (i) by Eq. (ii), we get

$${{480} \over {480 - N}} = {e^{\left( {{{150 - 100} \over {6000}}} \right)}}$$

$${{480} \over {480 - N}} = {e^{{{50} \over {6000}}}} \Rightarrow {{480} \over {480 - N}} = {e^{{1 \over {120}}}}$$

N = 4

Bình luận (0)

Đăng nhập để bình luận
Quảng cáo
BrainBehindX Inc Logo
©2026; Được cung cấp bởi BrainBehindX Inc