93
punti
Livello 0
ΑΒ = c ; ΒC = a ; ΑC = b = 12
SIN(γ) = SIN(pi - (α + β))----> SIN(γ) = SIN(α + β)
SIN(α + β) = SIN(α)·COS(β) + SIN(β)·COS(α)
α = pi/3
β = pi/4
SIN(pi/3)·COS(pi/4) + SIN(pi/4)·COS(pi/3)
SIN(γ) = √6/4 + √2/4
Th SENI:
c/SIN(γ) = b/SIN(β)---> c = b·SIN(γ)/SIN(β)
c = 12·(√6/4 + √2/4)/SIN(pi/4)
c = (3·√6 + 3·√2)/SIN(pi/4)
c = (3·√6 + 3·√2)/(√2/2)
c = 6·√3 + 6
c = 6·(√3 + 1)
100669
punti
Genius III
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Angolo $\small \beta= 60°;$
angolo $\small \gamma= 45°;$
angolo incognito $\small \widehat{ACB}= \alpha= 180°-\beta-\alpha= 180-60-45 = 75°;$
lato $\small \overline{AC}= 12;$
quindi calcola il lato $\small \overline{AB}:$
$\small \overline{AB}= \dfrac{\overline{AC}·\sin(\alpha)}{\sin(\gamma)}$
$\small \overline{AB}= \dfrac{12·\sin(75°)}{\sin(45°)} = 6+6\sqrt3 →\, = 6(\sqrt3 +1).$
61021
punti
Genius I