(+50) KuMat - Kuis Matematika Materi: Trigonometri Buktikan bahwa [tex]\begin{aligned}\cos\left(\frac{\pi }{7}\right)-\cos\left(\frac{2\pi}{7}\right)+\cos\left(\frac{3\pi}{7}\right)=\bf\frac{1}{2}\end{aligned}[/tex]

Berikut ini adalah pertanyaan dari henriyulianto pada mata pelajaran Matematika untuk jenjang Sekolah Menengah Atas

(+50) KuMat - Kuis MatematikaMateri: Trigonometri

Buktikan bahwa
$\begin{aligned}\cos\left(\frac{\pi }{7}\right)-\cos\left(\frac{2\pi}{7}\right)+\cos\left(\frac{3\pi}{7}\right)=\bf\frac{1}{2}\end{aligned}$

Jawaban dan Penjelasan

Berikut ini adalah pilihan jawaban terbaik dari pertanyaan diatas.

Jawab: cos(π/7) – cos (2π/7) + cos (3π/7) = ½ terbukti.
 

PEMBUKTIAN

Metode 1

Kita ingat identitas trigonometri:

2sin(α)cos(α) = sin(2α)
2sin(α)cos(β) = sin(α+β) + sin(α–β)
sin(–α) = –sin(α)
cos(π–α) = –cos(α)
sin(π–α) = sin(α)

Misalkan x = cos(π/7) – cos (2π/7) + cos (3π/7). Maka,
x = cos(π/7) + cos(π – 2π/7) + cos(3π/7)
⇒ x = cos(π/7) + cos(3π/7) + cos(5π/7)

Kemudian, kita kalikan kedua ruas dengan 2sin(π/7).
x · 2sin(π/7) = 2sin(π/7)cos(π/7) + 2sin(π/7)cos(3π/7) + 2sin(π/7)cos(5π/7)
⇒ 2x·sin(π/7) = sin(2π/7) + sin(4π/7) + sin(–2π/7) + sin(6π/7) + sin(–4π/7)
⇒ 2x·sin(π/7) = sin(2π/7) + sin(4π/7) – sin(2π/7) + sin(6π/7) – sin(4π/7)
⇒ 2x·sin(π/7) = sin(2π/7) – sin(2π/7) + sin(4π/7) – sin(4π/7) + sin(6π/7)
⇒ 2x·sin(π/7) = sin(6π/7)
⇒ 2x·sin(π/7) = sin(π – π/7)
⇒ 2x·sin(π/7) = sin(π/7)
⇒ 2x = sin(π/7)/sin(π/7)
⇒ 2x = 1
⇒ x = ½
⇒ cos(π/7) – cos (2π/7) + cos (3π/7) = ½

∴ Terbukti bahwa cos(π/7) – cos (2π/7) + cos (3π/7) = ½.

__________________

Metode 2

Selain identitas trigonometri di atas, kita ingat pula identitas:

cos(2α) = cos²(α) – sin²(α)
cos(α+β) = cos(α)cos(β) – sin(α)sin(β)

Misalkan x = cos(π/7) – cos (2π/7) + cos (3π/7).
Misalkan pula a = sin(π/7)danb = cos(π/7).

cos(2π/7) = b²–a²
cos(3π/7) = b(b²–a²) – a(2ab)

Maka,
x = b – (b²–a²) + b(b²–a²) – a(2ab)
⇒ x = b – b² + a² + b³ + b² – a²b – 2a²b
⇒ x = b – b² + b³ + a²(1–3b)

Karena sin²(α) = 1 – cos²(α), maka a² = 1 – b².
⇒ x = b – b² + b³ + (1–b²)(1–3b)
⇒ x = b – b² + b³ + 1 – b² – 3b + 3b³
⇒ x = 4b³ – 2b² – 2b + 1

Karena x = ½, maka:
½ = 4b³ – 2b² – 2b + 1
⇒ 1 = 8b³ – 4b² – 4b + 2
⇒ 8b³ – 4b² – 4b + 1 = 0 ....(i)

Dengan menunjukkan bahwa 8b³ – 4b² – 4b + 1 = 0, x = ½ terbukti.

Sekarang, perhatikan bahwa cos(4π/7) = –cos(3π/7).

Jika dinyatakan dalam a dan b:

cos(4π/7) = cos²(2π/7) – sin²(2π/7)
⇒ cos(4π/7) = (b²–a²)² – (2ab)²
⇒ cos(4π/7) = (b²–1+b²)² – 4a²b²
⇒ cos(4π/7) = (2b²–1)² – 4(1–b²)b²
⇒ cos(4π/7) = 4b⁴ – 4b² + 1 – 4b² + 4b⁴
⇒ cos(4π/7) = 8b⁴ – 8b² + 1
cos(3π/7) = b(b²–a²) – a(2ab)
⇒ cos(3π/7) = b³ – a²b – 2a²b
⇒ cos(3π/7) = b³ – 3a²b
⇒ cos(3π/7) = b³ – 3(1–b²)b
⇒ cos(3π/7) = b³ – 3b + 3b³
⇒ cos(3π/7) = 4b³ – 3b

cos(4π/7) = –cos(3π/7)
⇒ 8b^4 – 8b² + 1 = 3b – 4b³
⇒ 8b^4 + 4b³ – 8b² – 3b + 1 = 0
⇒ (b+1)(8b³ – 4b² – 4b + 1) = 0

Sudah pasti b = cos(π/7) ≠ 1, jadi 8b³ – 4b² – 4b + 1 = 0, sesuai dengan persamaan (i) di atas. Hal ini membuktikan bahwa x = ½.

∴ Terbukti bahwa cos(π/7) – cos (2π/7) + cos (3π/7) = ½.

Jawab: cos(π/7) – cos (2π/7) + cos (3π/7) = ½ terbukti. PEMBUKTIANMetode 1Kita ingat identitas trigonometri:2sin(α)cos(α) = sin(2α)2sin(α)cos(β) = sin(α+β) + sin(α–β)sin(–α) = –sin(α)cos(π–α) = –cos(α)sin(π–α) = sin(α)Misalkan x = cos(π/7) – cos (2π/7) + cos (3π/7). Maka, x = cos(π/7) + cos(π – 2π/7) + cos(3π/7)⇒ x = cos(π/7) + cos(3π/7) + cos(5π/7)Kemudian, kita kalikan kedua ruas dengan 2sin(π/7).x · 2sin(π/7) = 2sin(π/7)cos(π/7) + 2sin(π/7)cos(3π/7) + 2sin(π/7)cos(5π/7)⇒ 2x·sin(π/7) = sin(2π/7) + sin(4π/7) + sin(–2π/7) + sin(6π/7) + sin(–4π/7)⇒ 2x·sin(π/7) = sin(2π/7) + sin(4π/7) – sin(2π/7) + sin(6π/7) – sin(4π/7)⇒ 2x·sin(π/7) = sin(2π/7) – sin(2π/7) + sin(4π/7) – sin(4π/7) + sin(6π/7)⇒ 2x·sin(π/7) = sin(6π/7)⇒ 2x·sin(π/7) = sin(π – π/7)⇒ 2x·sin(π/7) = sin(π/7)⇒ 2x = sin(π/7)/sin(π/7)⇒ 2x = 1⇒ x = ½⇒ cos(π/7) – cos (2π/7) + cos (3π/7) = ½∴ Terbukti bahwa cos(π/7) – cos (2π/7) + cos (3π/7) = ½.__________________Metode 2Selain identitas trigonometri di atas, kita ingat pula identitas:cos(2α) = cos²(α) – sin²(α)cos(α+β) = cos(α)cos(β) – sin(α)sin(β)Misalkan x = cos(π/7) – cos (2π/7) + cos (3π/7).Misalkan pula a = sin(π/7) dan b = cos(π/7).cos(2π/7) = b²–a²cos(3π/7) = b(b²–a²) – a(2ab)Maka,x = b – (b²–a²) + b(b²–a²) – a(2ab)⇒ x = b – b² + a² + b³ + b² – a²b – 2a²b⇒ x = b – b² + b³ + a²(1–3b)Karena sin²(α) = 1 – cos²(α), maka a² = 1 – b².⇒ x = b – b² + b³ + (1–b²)(1–3b)⇒ x = b – b² + b³ + 1 – b² – 3b + 3b³⇒ x = 4b³ – 2b² – 2b + 1Karena x = ½, maka:½ = 4b³ – 2b² – 2b + 1⇒ 1 = 8b³ – 4b² – 4b + 2⇒ 8b³ – 4b² – 4b + 1 = 0 ....(i)Dengan menunjukkan bahwa 8b³ – 4b² – 4b + 1 = 0, x = ½ terbukti.Sekarang, perhatikan bahwa cos(4π/7) = –cos(3π/7). Jika dinyatakan dalam a dan b:cos(4π/7) = cos²(2π/7) – sin²(2π/7)⇒ cos(4π/7) = (b²–a²)² – (2ab)²⇒ cos(4π/7) = (b²–1+b²)² – 4a²b²⇒ cos(4π/7) = (2b²–1)² – 4(1–b²)b²⇒ cos(4π/7) = 4b⁴ – 4b² + 1 – 4b² + 4b⁴⇒ cos(4π/7) = 8b⁴ – 8b² + 1cos(3π/7) = b(b²–a²) – a(2ab)⇒ cos(3π/7) = b³ – a²b – 2a²b⇒ cos(3π/7) = b³ – 3a²b⇒ cos(3π/7) = b³ – 3(1–b²)b⇒ cos(3π/7) = b³ – 3b + 3b³⇒ cos(3π/7) = 4b³ – 3bcos(4π/7) = –cos(3π/7)⇒ 8b^4 – 8b² + 1 = 3b – 4b³⇒ 8b^4 + 4b³ – 8b² – 3b + 1 = 0⇒ (b+1)(8b³ – 4b² – 4b + 1) = 0Sudah pasti b = cos(π/7) ≠ 1, jadi 8b³ – 4b² – 4b + 1 = 0, sesuai dengan persamaan (i) di atas. Hal ini membuktikan bahwa x = ½.∴ Terbukti bahwa cos(π/7) – cos (2π/7) + cos (3π/7) = ½.

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Last Update: Thu, 06 Oct 22

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(+50) KuMat - Kuis Matematika Materi: Trigonometri Buktikan bahwa [tex]\begin{aligned}\cos\left(\frac{\pi }{7}\right)-\cos\left(\frac{2\pi}{7}\right)+\cos\left(\frac{3\pi}{7}\right)=\bf\frac{1}{2}\end{aligned}[/tex]

Jawaban dan Penjelasan

PEMBUKTIAN

Metode 1

Metode 2

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