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40 votes
40 votes
Help me please. Your the best if you help.

Help me please. Your the best if you help.-example-1
User Emfurry
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1 Answer

12 votes
12 votes

Answer:


x= \boxed{25}\;\; \sf meters


y= \boxed{15}\;\; \sf meters


z= \boxed{58}\;\; \sf degrees

Explanation:

Similar Triangles

  • Corresponding sides are always in the same ratio.
  • Corresponding angles are the same size.

If ΔWXY ~ ΔQRS then:

  • WX : QR = XY : RS = WY : QS

Therefore:


\implies \sf WX : QR = XY : RS = WY : QS


\implies (15+x) : 30 = 20 : y = 32 : 24


\implies (15+x)/(30)=(20)/(y)=(32)/(24)

Solving for x:


\implies (15+x)/(30)=(32)/(24)


\implies 15+x=(30 \cdot 32)/(24)


\implies x=(30 \cdot 32)/(24)-15


\implies x=25

Solving for y:


\implies (20)/(y)=(32)/(24)


\implies 20 \cdot 24=32y


\implies y=(20 \cdot 24)/(32)


\implies y=15

If ΔWXY ~ ΔQRS then:

  • m∠W = m∠Q
  • m∠X = m∠R
  • m∠Y = m∠S

Therefore, solving for z:


\implies m \angle W = m \angle Q


\implies 40^(\circ) = z-18^(\circ)


\implies z=40^(\circ) +18^(\circ)


\implies z=58^(\circ)

User Guidouil
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3.0k points