Cara Mencari Tinggi Segitiga Jika Dikenali Alas Dan Sisi Miring

Rumus Luas Segitiga dan Rumus Keliling SegitigaContoh Soal Luas dan Keliling Segitiga Maka dalam panduan segitiga kali ini, kita akan konsentrasi bagaimana mencari tinggi suatu segitiga jikalau dimengerti bantalan dan sisi miring. Mencari Tinggi Segititiga Jika Diketahui Alas dan Sisi Miring Coba amati gambar segitiga dibawah ini :

Gambar segitiga di atas yaitu segitiga siku-siku yang memiliki :

“a” merupakan alas segitiga

“b” merupakan tinggi segitiga

“c” ialah sisi miring atau yang diketahui dengan hipotenusa

Apabila terdapat segitiga siku-siku maka kita dapat menggunakan Dalil Pythagoras yang menyatakan bahwa :

c² = a² + b²

Sehingga kita dapat menjabarkan lagi rumus tersebut untuk mencari tingginya dimana :

b² = c² – a²

Keterangan

a = alas segitiga
b = tinggi segitiga
c = sisi miring (hipotenusa)

Contoh Soal No.1 Sebuah segigita siku-siku memiliki alas 4 cm dan sisi miring 5 cm. Hitunglah tinggi segitiga tersebut ? Pembahasan a (alas) = 4 cm
c (sisi miring) = 5 cm

b² = c² – a²
b² = 5² – 3²
b² = 25 – 9
b² = 16
b = 4 cm

Kaprikornus tinggi segitiga tersebut yaitu 4 cm

Contoh Soal 2 Jika dimengerti ganjal 8 cm,dan sisi miring 5 cm. Berapa tinggi pada segitiga sama kaki ? Pembahasan Segitiga sama kaki ialah segitiga yang kedua kakinya sama besar. Kaki pada segitiga sama kaki merupakan segi miring. Agar kita mampu menerapkan dalil pythagoras, maka segitiga sama kaki kita bagi dua mirip gambar di bawah ini :

Sehingga kini kita peroleh :
alas = 4 cm
segi miring = 5 cm

Dengan demikian tinggi segitiga sama kaki yakni :
b² = c² – a²
b² = 5² – 3²
b² = 25 – 9
b² = 16
b = 4 cm

Jadi tinggi segitiga tersebut yakni 4 cm

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