De sinusregel in \(\triangle A\kern{-.8pt}B\kern{-.8pt}C\) geeft \({A\kern{-.8pt}B \over \sin(\angle C)} = {B\kern{-.8pt}C \over \sin(\angle A)} = {A\kern{-.8pt}C \over \sin(\angle B)} \text{.}\)

Dus \(B\kern{-.8pt}C = {A\kern{-.8pt}B ⋅ \sin(\angle A) \over \sin(\angle C)} = {25 ⋅ \sin(64\degree) \over \sin(52\degree)} \text{.}\)

\(B\kern{-.8pt}C ≈ 28{,}5 \text{.}\)

De sinusregel in \(\triangle A\kern{-.8pt}B\kern{-.8pt}C\) geeft \({B\kern{-.8pt}C \over \sin(\angle A)} = {A\kern{-.8pt}C \over \sin(\angle B)} = {A\kern{-.8pt}B \over \sin(\angle C)} \text{.}\)

Dus \(A\kern{-.8pt}C = {B\kern{-.8pt}C ⋅ \sin(\angle B) \over \sin(\angle A)} = {30 ⋅ \sin(106\degree) \over \sin(29\degree)} \text{.}\)

\(A\kern{-.8pt}C ≈ 59{,}5 \text{.}\)

De sinusregel in \(\triangle A\kern{-.8pt}B\kern{-.8pt}C\) geeft \({A\kern{-.8pt}B \over \sin(\angle C)} = {B\kern{-.8pt}C \over \sin(\angle A)} = {A\kern{-.8pt}C \over \sin(\angle B)} \text{.}\)

Daaruit volgt \(\sin(\angle A) = {B\kern{-.8pt}C ⋅ \sin(\angle C) \over A\kern{-.8pt}B} = {28 ⋅ \sin(30\degree) \over 17} = 0{,}823... \text{.}\)

Dit geeft \(\angle A ≈ 55{,}4\degree\) of \(\angle A ≈ 124{,}6\degree \text{.}\)
Uit de afbeelding volgt dat \(\angle A\) een scherpe hoek is, dus \(\angle A ≈ 55{,}4\degree \text{.}\)

De sinusregel in \(\triangle K\kern{-.8pt}L\kern{-.8pt}M\) geeft \({K\kern{-.8pt}L \over \sin(\angle M)} = {L\kern{-.8pt}M \over \sin(\angle K)} = {K\kern{-.8pt}M \over \sin(\angle L)} \text{.}\)

Daaruit volgt \(\sin(\angle K) = {L\kern{-.8pt}M ⋅ \sin(\angle M) \over K\kern{-.8pt}L} = {25 ⋅ \sin(26\degree) \over 15} = 0{,}730... \text{.}\)

Dit geeft \(\angle K ≈ 46{,}9\degree\) of \(\angle K ≈ 133{,}1\degree \text{.}\)
Uit de afbeelding volgt dat \(\angle K\) een stompe hoek is, dus \(\angle K ≈ 133{,}1\degree \text{.}\)

Uit \(\angle A + \angle B + \angle C = 180\degree\) volgt \(\angle B = 180\degree - \angle A - \angle C = 180\degree - 44\degree - 52\degree = 84\degree \text{.}\)

De sinusregel in \(\triangle A\kern{-.8pt}B\kern{-.8pt}C\) geeft \({B\kern{-.8pt}C \over \sin(\angle A)} = {A\kern{-.8pt}C \over \sin(\angle B)} = {A\kern{-.8pt}B \over \sin(\angle C)} \text{.}\)

Dus \(B\kern{-.8pt}C = {A\kern{-.8pt}C ⋅ \sin(\angle A) \over \sin(\angle B)} = {31 ⋅ \sin(44\degree) \over \sin(84\degree)} \text{.}\)

\(B\kern{-.8pt}C ≈ 21{,}7 \text{.}\)

Uit \(\angle A + \angle B + \angle C = 180\degree\) volgt \(\angle B = 180\degree - \angle A - \angle C = 180\degree - 49\degree - 40\degree = 91\degree \text{.}\)

De sinusregel in \(\triangle A\kern{-.8pt}B\kern{-.8pt}C\) geeft \({B\kern{-.8pt}C \over \sin(\angle A)} = {A\kern{-.8pt}C \over \sin(\angle B)} = {A\kern{-.8pt}B \over \sin(\angle C)} \text{.}\)

Dus \(B\kern{-.8pt}C = {A\kern{-.8pt}C ⋅ \sin(\angle A) \over \sin(\angle B)} = {29 ⋅ \sin(49\degree) \over \sin(91\degree)} \text{.}\)

\(B\kern{-.8pt}C ≈ 21{,}9 \text{.}\)

De cosinusregel in \(\triangle A\kern{-.8pt}B\kern{-.8pt}C\) geeft \(B\kern{-.8pt}C^{2} = A\kern{-.8pt}C^{2} + A\kern{-.8pt}B^{2} - 2 ⋅ A\kern{-.8pt}C ⋅ A\kern{-.8pt}B ⋅ \cos(\angle A) \text{.}\)

Dus \(B\kern{-.8pt}C^{2} = 27^{2} + 20^{2} - 2 ⋅ 27 ⋅ 20 ⋅ \cos(77\degree) = 886{,}052... \text{.}\)

\(B\kern{-.8pt}C = \sqrt{886{,}052...} ≈ 29{,}8 \text{.}\)

De cosinusregel in \(\triangle P\kern{-.8pt}Q\kern{-.8pt}R\) geeft \(P\kern{-.8pt}Q^{2} = Q\kern{-.8pt}R^{2} + P\kern{-.8pt}R^{2} - 2 ⋅ Q\kern{-.8pt}R ⋅ P\kern{-.8pt}R ⋅ \cos(\angle R) \text{.}\)

Dus \(P\kern{-.8pt}Q^{2} = 12^{2} + 15^{2} - 2 ⋅ 12 ⋅ 15 ⋅ \cos(113\degree) = 509{,}663... \text{.}\)

\(P\kern{-.8pt}Q = \sqrt{509{,}663...} ≈ 22{,}6 \text{.}\)

De cosinusregel in \(\triangle K\kern{-.8pt}L\kern{-.8pt}M\) geeft \(L\kern{-.8pt}M^{2} = K\kern{-.8pt}M^{2} + K\kern{-.8pt}L^{2} - 2 ⋅ K\kern{-.8pt}M ⋅ K\kern{-.8pt}L ⋅ \cos(\angle K) \text{.}\)

Invullen geeft \(28^{2} = 19^{2} + 23^{2} - 2 ⋅ 19 ⋅ 23 ⋅ \cos(\angle K)\)
dus \(784 = 890 - 874 ⋅ \cos(\angle K) \text{.}\)

Balansmethode geeft \(\cos(\angle K) = {784 - 890 \over -874} = 0{,}121...\)

Hieruit volgt \(\angle K = \cos^{-1}(0{,}121...) ≈ 83{,}0\degree \text{.}\)

De cosinusregel in \(\triangle P\kern{-.8pt}Q\kern{-.8pt}R\) geeft \(P\kern{-.8pt}R^{2} = P\kern{-.8pt}Q^{2} + Q\kern{-.8pt}R^{2} - 2 ⋅ P\kern{-.8pt}Q ⋅ Q\kern{-.8pt}R ⋅ \cos(\angle Q) \text{.}\)

Invullen geeft \(47^{2} = 27^{2} + 37^{2} - 2 ⋅ 27 ⋅ 37 ⋅ \cos(\angle Q)\)
dus \(2\,209 = 2\,098 - 1\,998 ⋅ \cos(\angle Q) \text{.}\)

Balansmethode geeft \(\cos(\angle Q) = {2\,209 - 2\,098 \over -1\,998} = -0{,}055...\)

Hieruit volgt \(\angle Q = \cos^{-1}(-0{,}055...) ≈ 93{,}2\degree \text{.}\)