Nov 8, 2022
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Soal dan Penyelesaian Persamaan Nilai Mutlak Kelas X SMA Semester 1
Ini soal matematika bab persamaan nilai mutlak.
Tentukan HP dari persamaan:
|x +5| = 3
|2x-3| = 5
|x+1| + 2x = 7
|3x+4| = x-8
|5- 2/3x| – 9 = 8
|x-7| + |2x-4|=5
|2x+4| – |3-x|= -1
|5x+10| = -|x2+2x|
Penyelesaian:
Penyelesaiannya ada 2 cara.. Terserah mau memakai cara yang mana hehe
Caranya Tika contohkan untuk nomor 1 saja ya! Selanjutnya Tika akan menggunakan cara yang Tika suka. Hehe
Cara pertama:
|x+5| = 3
Kedua ruas dikuadratkan karena mutlaknya bisa bernilai positif atau negatif, menjadi
<=> (x+5)2 = 32
<=> x2+10x+25 = 9
<=> x2+10x+25-9 = 0
<=> x2+10x+16 = 0
<=> (x+8) = 0 V (x+2) = 0
<=> x = -8 V x = -2
Dicek:
Untuk x = -8, ruas kiri = |x+5| = |-8+5| = |-3| = 3 = Ruas kanan
Jadi, x = -8 memenuhi
Untuk x = -2, ruas kiri = |x+5| = |-2+5| = |3| = 3 = ruas kanan
Jadi, x = -2 memenuhi
Jadi, HP = {-2, -8}
Cara kedua:
Untuk mutlak bernilai positif:
(x+5) = 3
<=> x = 3-5
<=> x = -2
Untuk mutlak bernilai negatif:
-(x+5) = 3
<=> -x-5 = 3
<=> -x = 3 + 5
<=> -x = 8
<=> x = -8
Dicek:
Untuk x = -8, ruas kiri = |x+5| = |-8+5| = |-3| = 3 = Ruas kanan
Jadi, x = -8 memenuhi
Untuk x = -2, ruas kiri = |x+5| = |-2+5| = |3| = 3 = ruas kanan
Jadi, x = -2 memenuhi
Jadi, HP = {-2, -8}
Hehe… sama, kan??
|2x-3| = 5
Untuk mutlak bernilai positif:
(2x-3) = 5
<=> 2x = 5 + 3
<=> 2x = 8
<=> x = 4
Untuk mutlak bernilai negatif:
-(2x-3) = 5
<=> -2x+3 = 5
<=> -2x = 5-3
<=> -2x = 2
<=> x = -1
Dicek:
Untuk x = 4, ruas kiri = |2x-3| = |2.4 – 3| = |8 – 3| = |5| = 5 = ruas kanan
Jadi, x = 4 memenuhi
Untuk x = -1, ruas kiri = |2x-3| = |2.(-1) – 3| = |(-2)-3| = |-5| = 5 = ruas kanan
Jadi, x = -1 memenuhi
Jadi, HP = {-1, 4}
|x+1| + 2x = 7
Untuk mutlak bernilai positif:
(x+1) + 2x = 7
<=> 3x = 6
<=> x = 2
Untuk mutlak bernilai negatif:
-(x+1) + 2x = 7
<=> -x-1+2x = 7
<=> x = 8
Dicek:
Untuk x = 2, ruas kiri = |x+1| + 2x = |2+1| + 2.2 = |3| + 4 = 3 + 4 = 7 = ruas kanan
Jadi, x = 2 memenuhi
Untuk x = 8, ruas kiri = |x+1| + 2x = |8+1| + 2.8 = |9| + 16 = 9 + 16 = 25 tdk sama dengan ruas kanan
Jadi, x = 8 tidak memenuhi
Jadi, HP = {2}
|3x+4| = x-8
Untuk mutlak bernilai positif:
(3x+4) = x-8
<=> 2x = -12
<=> x = -6
Untuk mutlak nilai negatif:
-(3x+4) = x-8
<=> -3x-4 = x-8
<=> -4x = -4
<=> x = 1
Dicek:
|3x+4| = x-8
ó |3x+4| – x = -8
Untuk x = -6, ruas kiri = |3x+4| – x = |3.(-6) + 4| – (-6) = |-14| + 6 = 14 + 6 = 20 tdk sama dengan ruas kanan
Jadi, x = -6 tidak memenuhi
Untuk x = 1, ruas kiri = |3x+4| – x = |3.1 + 4| – 1 = |7| – 1 = 7 – 1 = 6 tdk sama dengan ruas kanan
Jadi, x = 1 tidak memenuhi
Jadi, HP = {}
|5- 2/3x| – 9 = 8
Untuk mutlak bernilai positif:
(5- 2/3x) – 9 = 8 |x3
<=> (15 – 2x) – 27 = 24
<=> -2x = 36
<=> x = -18
Untuk mutlak bernilai negatif:
-(5- 2/3x) – 9 = 8 |x3
<=> -(15 – 2x) – 27 = 24
<=> -15+2x-27 = 24
<=> 2x = 66
<=> x = 33
Dicek:
Untuk x = -18, ruas kiri = |5 -2/3x| – 9 = |5.(-18)| – 9 = |5+12| – 9 = |17| – 9 = 17 – 9 = 8 = ruas kanan
Jadi, x = -18 memenuhi
Untuk x = 33, ruas kiri = |5 -2/3x| – 9 = |5.(33)| – 9 = | 5-22| – 9 = |-17| – 9 = 17 – 9 = 8 = ruas kanan
Jadi, x = 33 memenuhi
Jadi, HP = {-18, 33}
|x-7| + |2x-4|= 5
Untuk mutlak nilai positif:
(x-7) + (2x-4) = 5
<=> 3x = 16
<=> x = 16/3
Untuk mutlak nilai negatif:
-(x-7) + (-(2x-4)) = 5
<=> -x+7-2x+4 = 5
<=> -3x = -6
<=> x = 2
Dicek:
Untuk x = 16/3, ruas kiri = |x-7| + |2x-4| = |16/3 – 7| + |2.16/3 – 4| = |-5/3| + |20/3| = 5/3 + 20/3 = 25/3 tdk sama dengan ruas kanan
Jadi, x = 16/3 tidak memenuhi
Untuk x = 2, ruas kiri = |x-7| + |2x-4| = |2-7| + |2.2-4| = |-5| + |0| = 5 + 0 = 5 = ruas kanan
Jadi, x = 2 memenuhi
Jadi, HP = {2}
|2x+4| – |3-x|= -1
Untuk mutlak bernilai positif:
(2x+4) – (3-x)= -1
<=> 2x+4-3+x = -1
<=> 3x = -2
<=> x = -2/3
Untuk mutlak bernilai negatif:
-(2x+4) – (-(3-x)) = -1
<=> -2x-4+3-x = -1
<=> -3x = 0
<=> x = 0
Dicek:
Untuk x = -2/3, ruas kiri = |2x+4| – |3-x| = |2.(-2/3)+4| – |3-(-2/3)| = |8/3| – |11/3| = 8/3 – 11/3 = -3/3 = -1 = ruas kanan
Jadi, x = -2/3 memenuhi
Untuk x = 0, ruas kiri = |2x+4| – |3-x| = |2.0 + 4| – |3 – 0| = |4| – |3| = 4 – 3 = 1 tdk sama dengan ruas kanan
Jadi, x = 0 tidak memenuhi
Jadi, HP = {-2/3}
|5x+10| = -|x2+2x|
<=> |5x+10| + |x2+2x| = 0
Untuk mutlak bernilai positif:
(5x+10) + (x2+2x) = 0
<=> x2 + 7x + 10 = 0
<=> (x+5) = 0 V (x+2) = 0
<=> x = -5 V x = -2
Untuk mutlak bernilai negatif:
-(5x+10) + (-(x2+2x)) = 0
<=> -5x-10- x2-2x = 0
<=> – x2 -7x-10 = 0 |x(-1)
<=> x2 +7x+10 = 0
<=> (x+5) = 0 V (x+2) = 0
<=> x = -5 V x = -2
Dicek:
Untuk x = -5, ruas kiri = |5x+10| + |x2+2x|= |5.(-5)+10| + |(-5)2 + 2.(-5)| = |-15| + |15| = 15 + 15 = 30 tdk sama dengan ruas kanan
Jadi, x = -5 tidak memenuhi
Untuk x = -2, ruas kiri = |5x+10| + |x2+2x|= |5.(-2)+10| + |(-2)2 + 2.(-2)| = |0| + |0| = 0+0 = 0 = ruas kanan
Jadi, x = -2 memenuhi
Jadi, HP = {-2}
Semoga membantu Jika ada yang tidak paham tanya saja yaaa
English Debate Competition Team from @smait_ruhuljadid ~ . . Alhamdulillah.. All praises be to Allah, because of Allah's help, they can speech well. . . They battled Penabur High School students. The score between Ruhul Jadid and Penabur is 51:38. I think, it is not bad.., because it is the first time they join English Debate Competition. Moreover, we only practiced last night.✊ . . Our spirit is in Qs. Al Imran: 139. ("Dont feel weak and dont be sad because you are in the highest level if you have faith to Allah"). . . Next year, Ruhul Jadid team must be better than today, fighting! ALLAHU AKBAR! ✊✊✊ #englishdebate #competition #SMAITRuhulJadid #Kelas10