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Solution — 2023 Question 12 Normal Distribution

(a)

Let S, M and L be the masses (in grams) of randomly chosen small, medium and large candles respectively.

S∼N(0.24,0.042)M∼N(0.35,0.052)L∼N(0.6,0.082)
P(0.21<S<0.25)=0.37208=0.372∎ (to 3 s.f.)

finding \mathrm{P}\left(0.21 < S < 0.25\right)

(b)
S+M+L∼N(0.24+0.35+0.6,0.042+0.052+0.082)S+M+L∼N(1.19,0.0105)
P(S+M+L>1.25)=0.27909=0.279∎ (to 3 s.f.)

finding \mathrm{P}\left(S + M + L > 1.25\right)

(c)
S1+S2+⋯+S6∼N(6(0.24),6(0.04)2)S1+S2+⋯+S6∼N(1.44,0.0096) M1+M2+M3+M4∼N(4(0.35),4(0.05)2)M1+M2+M3+M4∼N(1.4,0.01)

Let D=(M1+⋯+M4)−(S1+⋯+S6).

D∼N(1.4−1.44,0.01+0.0096)D∼N(−0.04,0.0196)
P(M1+⋯+M4<S1+⋯+S6)=P(D<0)=0.61245=0.612∎ (to 3 s.f.)

finding \mathrm{P}\left(D < 0\right)

(d)
S1+S2+⋯+S400∼N(400(0.24),400(0.04)2)S1+S2+⋯+S400∼N(96,0.64) M1+M2+⋯+M200∼N(200(0.35),200(0.05)2)M1+M2+⋯+M200∼N(70,0.5) L1+L2+⋯+L50∼N(50(0.6),50(0.08)2)L1+L2+⋯+L50∼N(30,0.32)

Let T=S1+⋯+S400+M1+⋯+M200+L1+⋯+L50

T∼N(96+70+30,0.64+0.5+0.32)T∼N(196,1.46)

$0.02 per gram is equal to $20 per kg

20T∼N(20(196),202(1.46))20T∼N(3920,584)
P(20T<3950)=0.89277=0.893∎ (to 3 s.f.)

finding \mathrm{P}\left(20T < 3950\right)

Next 2022 Q6

Parts

  • Part (a)
  • Part (b)
  • Part (c)
  • Part (d)