A ship A is moving eastwards with a speed of 20km/h and a ship B ,50km south of A is moving northwards with a speed of 20km/h. Then find the shortest distance between the ships.
A
20√5km
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B
25√2km
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C
10√3km
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D
5√2km
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Solution
The correct option is B25√2km −→vA=20^ikm/h −→vB=20^jkm/h
velocity of A w.r.t B is, −−→vAB=−→vA−−→vB −−→vAB=(20^i−20^j)km/h ∴tanθ=|−20|20=1 ⇒θ=45∘
∵ velocity of A w.r.t B is directed along direction AP, so the minimum distance (dmin) occurs where relative velocity of A w.r.t B i.e −−→vAB is ⊥ to B. ⇒ From ΔAPB, α=90∘−θ=45∘
Hence, shortest distance between ships is BP, sinα=BPAB ⇒1√2=BP50 ∴BP=50√2=25√2km