Analka 4 Angka.docx
This document was uploaded by user and they confirmed that they have the permission to share it. If you are author or own the copyright of this book, please report to us by using this DMCA report form. Report DMCA
Overview
Download & View Analka 4 Angka.docx as PDF for free.
More details
- Words: 500
- Pages: 5
4. u = ( k+1,k+1,1 ) dan v = (–k–1, –k–1, k ) karena θ = 180 berarti u berlawanan arah dengan v dan cos θ = -1 sehingga : u.v = - |u|.|v| |u| = √((k+1)^2+(k+1)^2+1^2) = √(k^2+2k+1+(k^2+2k+1)+1) = √(2k^2+4k+3) |v| = √((-k-1)^2+(-k-1)^2+k^2) = √(k^2+2k+1)+(k^2+2k+1)+k^2) = √(3k^2+4k+2)
u.v = - |u|.|v| ( k+1,k+1,1 ).(–k–1, –k–1, k ) = - |u|.|v| ((-k^2-2k-1)+ (-k^2-2k-1) + k) = -√(2k^2+4k+3).√(3k^2+4k+2) (-2k^2-3k-2) = -√(6k^4+8k^3+4k^2+12k^3+16k^2+8k+9k^2+12... (-2k^2-3k-2) = -√(6k^4+20k^3+29k^2+20k+6) (-2k^2-3k-2)^2 = (-√(6k^4+20k^3+29k^2+20k+6))^2 4k^4 + 6k^3 + 4k^2 +6k^3+9k^2+6k +4k^2+6k +4 = (6k^4+20k^3+29k^2+20k+6) 4k^4 + 12k^3 +17k^2+12k +4 = (6k^4+20k^3+29k^2+20k+6) 2k^4 + 8k^3 + 12k^2 + 8k + 2 = 0 --------------------------------------... x 1/2 k^4 + 4k^3 + 6k^2 + 4k + 1 = 0 (k +1)(k+1)(k+1)(k+1)= 0 k+1=0 k = -1
u.v = IuI IvI cos buat misal a = k+1 , k= a-1 maka -a= -k-1
IuI = = IvI = = cos 180 = -1 . = . . (-1) a(-a)+ a(-a)+ 1.k = . . (-1) -2 + a-1 = . . (-1) 2-a+1 = . kuadratkan ruas kiri , kuadratkan ruas kanan = (2) () 4 = 2+ 3 + 1
a(=0 shgga a = 0 atau ( = 0 ambil a= 0 sedangkan k=a-1 =0-1 =-1
Simak lebih lanjut di Brainly.co.id - https://brainly.co.id/tugas/1122992#readmore
AB = (-2,2,1) - (1,2,3) = (-3, 0, -2) AC = (3,1,3) - (1,2,3) = (2, -1, 0) Luas = ½ |AB x AC| Luas = ½ |(-3, 0, -2) x (2, -1, 0)| Luas = ½ |(-2, -4, 3)| Luas = ½ √29
7u=axc u = (1,2,1) x (1,3,2) u = (1, -1, 1) yang lainnya bisa dicari sendiri...
(b). u=a-b u = (1,2,1) - (1,-1,1) u = (0, 3, 0) v=a-c v = (1,2,1) - (1,3,2) v = (0, -1, -1) luas segitiga, L = ½ |u x v| L = ½ |(0, 3, 0) x (0, -1, -1)| L = ½ |(-3, 0, 0)| L = 3/2 satuan luas Misalkan vektor yang tegak lurus tersebut adalah u = (x, y, z)
Vektor a dan u tegak lurus artinya (1)(x)+(2)(y)+(1)(z) = 0 x + 2y + z = 0
Vektor c dan u tegak lurus artinya (1)(x) + (3)(y) + (2)(z) = 0 x + 3y + 2z = 0
Diperoleh sistem persaman linear, x + 2y + z = 0 x + 3y + 2z = 0
Eliminasi kedua persamaan, x + 2y + z = 0 x + 3y + 2z = 0 ---------------------- -y - z = 0 -y = z y = -z
x = - 2y - z x = - 2(-z) - z x = 2z - z x=z
Solusi dari sistem persaman linear adalah solusi banyak dengan, z=t y = -t x=t
Sehingga vektor u = (t, -t, t) Contoh 1, pilih t = 1 u = (1, -1, 1)
Contoh 2, pilih t = 2 u = (2, -2, 2) Contoh 3, pilih t = 3 u = (3, -3, 3)
Simak lebih lanjut di Brainly.co.id - https://brainly.co.id/tugas/20863440#readmore
u.v = - |u|.|v| ( k+1,k+1,1 ).(–k–1, –k–1, k ) = - |u|.|v| ((-k^2-2k-1)+ (-k^2-2k-1) + k) = -√(2k^2+4k+3).√(3k^2+4k+2) (-2k^2-3k-2) = -√(6k^4+8k^3+4k^2+12k^3+16k^2+8k+9k^2+12... (-2k^2-3k-2) = -√(6k^4+20k^3+29k^2+20k+6) (-2k^2-3k-2)^2 = (-√(6k^4+20k^3+29k^2+20k+6))^2 4k^4 + 6k^3 + 4k^2 +6k^3+9k^2+6k +4k^2+6k +4 = (6k^4+20k^3+29k^2+20k+6) 4k^4 + 12k^3 +17k^2+12k +4 = (6k^4+20k^3+29k^2+20k+6) 2k^4 + 8k^3 + 12k^2 + 8k + 2 = 0 --------------------------------------... x 1/2 k^4 + 4k^3 + 6k^2 + 4k + 1 = 0 (k +1)(k+1)(k+1)(k+1)= 0 k+1=0 k = -1
u.v = IuI IvI cos buat misal a = k+1 , k= a-1 maka -a= -k-1
IuI = = IvI = = cos 180 = -1 . = . . (-1) a(-a)+ a(-a)+ 1.k = . . (-1) -2 + a-1 = . . (-1) 2-a+1 = . kuadratkan ruas kiri , kuadratkan ruas kanan = (2) () 4 = 2+ 3 + 1
a(=0 shgga a = 0 atau ( = 0 ambil a= 0 sedangkan k=a-1 =0-1 =-1
Simak lebih lanjut di Brainly.co.id - https://brainly.co.id/tugas/1122992#readmore
AB = (-2,2,1) - (1,2,3) = (-3, 0, -2) AC = (3,1,3) - (1,2,3) = (2, -1, 0) Luas = ½ |AB x AC| Luas = ½ |(-3, 0, -2) x (2, -1, 0)| Luas = ½ |(-2, -4, 3)| Luas = ½ √29
7u=axc u = (1,2,1) x (1,3,2) u = (1, -1, 1) yang lainnya bisa dicari sendiri...
(b). u=a-b u = (1,2,1) - (1,-1,1) u = (0, 3, 0) v=a-c v = (1,2,1) - (1,3,2) v = (0, -1, -1) luas segitiga, L = ½ |u x v| L = ½ |(0, 3, 0) x (0, -1, -1)| L = ½ |(-3, 0, 0)| L = 3/2 satuan luas Misalkan vektor yang tegak lurus tersebut adalah u = (x, y, z)
Vektor a dan u tegak lurus artinya (1)(x)+(2)(y)+(1)(z) = 0 x + 2y + z = 0
Vektor c dan u tegak lurus artinya (1)(x) + (3)(y) + (2)(z) = 0 x + 3y + 2z = 0
Diperoleh sistem persaman linear, x + 2y + z = 0 x + 3y + 2z = 0
Eliminasi kedua persamaan, x + 2y + z = 0 x + 3y + 2z = 0 ---------------------- -y - z = 0 -y = z y = -z
x = - 2y - z x = - 2(-z) - z x = 2z - z x=z
Solusi dari sistem persaman linear adalah solusi banyak dengan, z=t y = -t x=t
Sehingga vektor u = (t, -t, t) Contoh 1, pilih t = 1 u = (1, -1, 1)
Contoh 2, pilih t = 2 u = (2, -2, 2) Contoh 3, pilih t = 3 u = (3, -3, 3)
Simak lebih lanjut di Brainly.co.id - https://brainly.co.id/tugas/20863440#readmore
Related Documents
Analka 4 Angka.docx
July 2020 3
4:4
June 2020 76
4-4
December 2019 120
4
December 2019 37
4
November 2019 31
4
November 2019 44More Documents from ""
4.docx
July 2020 3
Analka 4 Angka.docx
July 2020 3
4.docx
July 2020 2
Simrs Jos Tenan.docx
July 2020 9