1 Answer

John Humphreys · Answer 1 · 2021-11-03T08:16:45+0000

Answer:

$v = (16)/(3) \: \: and \: \: u = (20)/(3)$

Explanation:

In triangle WYZ ,

${u}^(2) = {4}^(2) + {v}^(2) = 16 + {v}^(2)$

In traingle WXZ ,

${(3 + v)}^(2) = {5}^(2) + {u}^(2)$

Putting the value of U^2 in above eqn.

$= > {(3 + v)}^(2) = 25 + (16 + {v}^(2) )$

$= > {v}^(2) + 6v + 9 = 41 + {v}^(2)$

$= > {v}^(2) - {v}^(2) + 6v = 41 - 9$

= > 6v = 32

= > v = (32)/(6) = (16)/(3)

Putting the value of V in eqn. below :-

${u}^(2) = 16 + { ((16)/(3) )}^(2)$

$= > {u}^(2) = (256)/(9) + 16$

$= > {u}^(2) = (256 + 144)/(9) = (400)/(9)$

$= > u = \sqrt{ (400)/(9) } = (20)/(3)$

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