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Triangle P Q R is shown. Angle Q R P is a right angle. Angle R P Q is 30 degrees and angle P Q R is 60 degrees. Given right triangle PQR, which represents the value of sin(P)? StartFraction R P Over R Q EndFraction StartFraction R P Over P Q EndFraction StartFraction R Q Over P Q EndFraction StartFraction R Q Over P R EndFraction

Respuesta :

Answer:

The correct option is option (c).

[tex]Sin \ P= \frac {RQ}{PQ}[/tex]

Step-by-step explanation:

Right angled triangle:

  • One angle must be 90° and other two angles are acute angle.
  • The hypotenuses is the longest side of the triangle and opposite right angle.
  • It follows the Pythagorean Theorem.

Given that,

∠QRP= 90°, ∠RPQ= 30°, ∠PQR = 60°

we know that,

[tex]sin \theta =\frac{Opposite }{Hypotenuse}[/tex]

for sin P , the opposite is QR.

The hypotenuse is PQ.

Therefore,

[tex]Sin \ P= \frac {RQ}{PQ}[/tex]

Mollie0705

Answer:

(c)

Step-by-step explanation:

the person above is right! it is C :D

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