Haii... masih semangat belajarnya? yuk hari ini kita belajar tentang kesebangunan...
Kalian bisa pelajari materi ini di channel youtube ajar hitung. Silahkan klik link video berikut ini:
Kalian bisa pelajari materi ini di channel youtube ajar hitung. Silahkan klik link video berikut ini:
1. Pasangan bangun berikut yang pasti sebangun adalah...
a. Dua lingkaran
b. Dua belah ketupat
c. Dua segitiga sama kaki
d. Dua persegi panjang
Pembahasan:
Mari kita bahas masing-masing opsi di atas:
a. Lingkaran, Pasti sebangun karena ukuran yang dibandingkan hanya jari-jari / diameter saja.
b. Belah ketupat, Belum tentu sebangun karena meskipun sisi yang bersesuaian sama, namun sudutnya belum tentu sama.
c. Segitiga sama kaki, belum tentu sebangun karena perbandingan sisi dan sudutnya belum tentu sama.
d. Persegi panjang, belum tentu sebangun karena perbandingan sisi yang bersesuaian belum tentu sama.
Jadi, jawaban yang tepat adalah A.
2. Perhatikan gambar!
![](data:image/png;base64,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)
Perbandingan sisi pada ∆ABC dan ∆ABD yang sebangun adalah...
![](data:image/png;base64,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)
Pembahasan:
a. Lingkaran, Pasti sebangun karena ukuran yang dibandingkan hanya jari-jari / diameter saja.
b. Belah ketupat, Belum tentu sebangun karena meskipun sisi yang bersesuaian sama, namun sudutnya belum tentu sama.
c. Segitiga sama kaki, belum tentu sebangun karena perbandingan sisi dan sudutnya belum tentu sama.
d. Persegi panjang, belum tentu sebangun karena perbandingan sisi yang bersesuaian belum tentu sama.
Jadi, jawaban yang tepat adalah A.
2. Perhatikan gambar!
Perbandingan sisi pada ∆ABC dan ∆ABD yang sebangun adalah...
Pembahasan:
Perhatikan gambar, sisi yang bersesuaian adalah:
AB ~ AD
BC ~ BD
AB ~ AC
Jadi jawaban yang tepat adalah A.
3. Diketahui segitiga ABC yang panjang sisinya 6 cm, 8 cm, dan 10 cm sebangun dengan segitiga PQR yang panjang sisinya 15 cm, 20 cm, dan 25 cm. Perbandingan panjang sisi segitiga ABC dan segitiga PQR adalah...
a. 1 : 5
b. 2 : 5
c. 5 : 2
d. 5 : 1
Pembahasan:
AB ~ AD
BC ~ BD
AB ~ AC
Jadi jawaban yang tepat adalah A.
3. Diketahui segitiga ABC yang panjang sisinya 6 cm, 8 cm, dan 10 cm sebangun dengan segitiga PQR yang panjang sisinya 15 cm, 20 cm, dan 25 cm. Perbandingan panjang sisi segitiga ABC dan segitiga PQR adalah...
a. 1 : 5
b. 2 : 5
c. 5 : 2
d. 5 : 1
Pembahasan:
Untuk menentukan perbandingan sisi-sisinya, kita harus membandingkan sisi yang bersesuaian. Jadi pada segitiga ABC dan PQR, sisi yang bersesuaian adalah:
6 ~ 15 (6 sisi paling kecil dari ABC, dan 15 sisi paling kecil dari PQR)
10 ~ 25 ( 10 sisi paling panjang dari ABC, dan 25 sisi paling panjang dari PQR)
8 ~ 20 (sisi yang ditengah)
Perbandingan = 6 : 15 atau 10 : 25 atau 8 : 20 = 2 : 5
Jadi, jawaban yang tepat adalah B.
4. Diketahui ∆ABC yang panjang sisinya 9 cm, 12 cm, dan 15 cm, sebangun dengan ∆PQR yang panjang sisinya 24 cm, 30 cm, dan 18 cm. Perbandingan panjang sisi segitiga ABC dan PQR adalah...
a. 1 : 4
b. 1 : 2
c. 2 : 1
d. 4 : 1
Pembahasan:
6 ~ 15 (6 sisi paling kecil dari ABC, dan 15 sisi paling kecil dari PQR)
10 ~ 25 ( 10 sisi paling panjang dari ABC, dan 25 sisi paling panjang dari PQR)
8 ~ 20 (sisi yang ditengah)
Perbandingan = 6 : 15 atau 10 : 25 atau 8 : 20 = 2 : 5
Jadi, jawaban yang tepat adalah B.
4. Diketahui ∆ABC yang panjang sisinya 9 cm, 12 cm, dan 15 cm, sebangun dengan ∆PQR yang panjang sisinya 24 cm, 30 cm, dan 18 cm. Perbandingan panjang sisi segitiga ABC dan PQR adalah...
a. 1 : 4
b. 1 : 2
c. 2 : 1
d. 4 : 1
Pembahasan:
Untuk menentukan perbandingan sisi-sisinya, kita harus membandingkan sisi yang bersesuaian. Jadi pada segitiga ABC dan PQR, sisi yang bersesuaian adalah:
9 ~ 18 (9 sisi paling kecil dari ABC, dan 18 sisi paling kecil dari PQR)
15 ~ 30 ( 15 sisi paling panjang dari ABC, dan 30 sisi paling panjang dari PQR)
12 ~ 24 (sisi yang ditengah)
Perbandingan = 9 : 18 atau 15 : 30 atau 12 : 24 = 1 : 2
Jadi, jawaban yang tepat adalah B.
5. Diketahui ∆KLM dan ∆PQR sebangun. Panjang sisi ML = 6 cm, KL= 12 cm, dan KM = 21 cm, sedangkan PQ = 16 cm, PR = 28 cm, dan QR = 8 cm. Perbandingan sisi-sisi pada segitiga KLM dan PQR adalah...
a. 2 : 3
b. 3 : 4
c. 3 : 2
d. 4 : 3
Pembahasan:
9 ~ 18 (9 sisi paling kecil dari ABC, dan 18 sisi paling kecil dari PQR)
15 ~ 30 ( 15 sisi paling panjang dari ABC, dan 30 sisi paling panjang dari PQR)
12 ~ 24 (sisi yang ditengah)
Perbandingan = 9 : 18 atau 15 : 30 atau 12 : 24 = 1 : 2
Jadi, jawaban yang tepat adalah B.
5. Diketahui ∆KLM dan ∆PQR sebangun. Panjang sisi ML = 6 cm, KL= 12 cm, dan KM = 21 cm, sedangkan PQ = 16 cm, PR = 28 cm, dan QR = 8 cm. Perbandingan sisi-sisi pada segitiga KLM dan PQR adalah...
a. 2 : 3
b. 3 : 4
c. 3 : 2
d. 4 : 3
Pembahasan:
6 ~ 8 (6 sisi paling kecil dari KLM, dan 8 sisi paling kecil dari PQR)
21 ~ 28 ( 21 sisi paling panjang dari KLM, dan 28 sisi paling panjang dari PQR)
12 ~ 16 (sisi yang ditengah)
Perbandingan = 6 : 8 atau 21 : 28 atau 12 : 16 = 3 : 4
Jadi, jawaban yang tepat adalah B.
6. Perhatikan gambar berikut!
Perbandingan sisi-sisi yang benar adalah..
Pembahasan: Pada gambar di atas, sisi yang bersesuaian adalah:
AB ≈ DE
AC ≈ CE
BC ≈ CD
Jadi, jawaban yang tepat adalah A.
7. Perhatikan gambar!
Perbandingan sisi yang benar adalah...
Pembahasan: Pada gambar di atas, sisi yang bersesuaian adalah:
AD ≈ BC
DE ≈ EB
CE ≈ AE
Jadi, jawaban yang tepat adalah A.
8. Perhatikan gambar!
Pernyataan yang benar adalah...
Pembahasan: Pada gambar di atas, sisi yang bersesuaian adalah:
AB ≈ CD
BE ≈ ED
AE ≈ EC
Jadi, jawaban yang tepat adalah A.
9. Perhatikan gambar berikut!
Segitiga ABC dan DEF kongruen. Pasangan garis yang tidak samapanjang adalah...
a. BC dan DE
b. AB dan DF
c. AC dan EF
d. AB dan DE
Pembahasan:
Pada soal di atas sisi-sisi yang bersesuaian adalah: (coba perhatikan tanda sudut yang bersesuaian)
AC ≈ EF
BC ≈ DE
AB ≈ DF
Jadi sisi yang tidak sama panjang adalah AB dan DE
Jadi, jawaban yang tepat adalah D.
10. Perhatikan gambar!
Segitiga ABC kongruen dengan segitiga POT. Pasangan sudut yang sama besar adalah...
a. <BAC = <POT
b. <BAC = <PTO
c. <ABC = <POT
d. <ABC = <PTO
Pembahasan:
AB = PO dan AC = PT, maka <BAC = <TPO
AC = PT dan BC = TO, maka <ACB = <PTO
AB = PO dan BC = TO, maka <ABC = <POT
Jadi, jawaban yang tepat adalah C.
AC ≈ EF
BC ≈ DE
AB ≈ DF
Jadi sisi yang tidak sama panjang adalah AB dan DE
Jadi, jawaban yang tepat adalah D.
10. Perhatikan gambar!
Segitiga ABC kongruen dengan segitiga POT. Pasangan sudut yang sama besar adalah...
a. <BAC = <POT
b. <BAC = <PTO
c. <ABC = <POT
d. <ABC = <PTO
Pembahasan:
AB = PO dan AC = PT, maka <BAC = <TPO
AC = PT dan BC = TO, maka <ACB = <PTO
AB = PO dan BC = TO, maka <ABC = <POT
Jadi, jawaban yang tepat adalah C.
11. Segitiga ABC dan segitiga DEF kongruen. Bila besar <A = <F dan besar <B = <E, pasangan sisi yang sama panjang adalah...
a. AC = EF
b. AB = DE
c. BC = EF
d. BC = DE
Pembahasan:
a. AC = EF
b. AB = DE
c. BC = EF
d. BC = DE
Pembahasan:
Untuk menjawabnya kita perlu mengilustrasikan soal tersebut dalam gambar, perhatikan gambar di bawah ini:
![](data:image/png;base64,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)
Berdasarkan gambar di atas, maka:
AB = EF
BC = DE
AC = DF
Jadi, jawaban yang tepat adalah D.
12. Diketahui segitiga KLM kongruen dengan segitiga PQR. Besar <M = 80 derajat, <L = 60 derajat, <Q = 40 derajat, dan <R = 60 derajat. Pasangan sisi yang sama panjang adalah...
a. KM = PR
b. KL = PQ
c. LM = QR
d. KL = QR
Pembahasan:
Berdasarkan gambar di atas, maka:
AB = EF
BC = DE
AC = DF
Jadi, jawaban yang tepat adalah D.
12. Diketahui segitiga KLM kongruen dengan segitiga PQR. Besar <M = 80 derajat, <L = 60 derajat, <Q = 40 derajat, dan <R = 60 derajat. Pasangan sisi yang sama panjang adalah...
a. KM = PR
b. KL = PQ
c. LM = QR
d. KL = QR
Pembahasan:
Untuk menjawabnya kita perlu mengilustrasikan soal tersebut dalam gambar, perhatikan gambar di bawah ini:
![](data:image/png;base64,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)
![](data:image/png;base64,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)
Berdasarkan gambar di atas maka:
LM = PR
KM = PQ
KL = QR
Jadi, jawaban yang tepat adalah D.
13. Segitiga ABC kongruen dengan segitiga PQR, besar <BAC = <PQR = 65 derajat dan <ABC = <QPR = 80 derajat. Sisi-sisi yang sama panjang adalah...
a. AB = PR
b. AC = PQ
c. AB = PQ
d. BC = QR
Pembahasan:
![](data:image/png;base64,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)
Berdasarkan gambar di atas, maka sisi yang bersesuaian adalah:
AB = PQ
BC = PR
AC = QR
Jadi, jawaban yang tepat adalah C.
14.
Pada gambar di atas, ∆ABC dan ∆DEF sama dan sebangun. Pernyatan berikut yang benar adalah...
![](data:image/png;base64,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)
Pembahasan:
AB = DE = 9 cm
AC = EF = 8 cm
<A = <E = 400
<B = <D = 650
![](data:image/png;base64,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)
Jadi, jawaban yang tepat adalah A.
15. Perhatikan gambar!
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAXAAAACsCAIAAADt8GCIAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAABb6SURBVHhe7Z1PjFVFFsYf40JNTGRjIhuUpB1ESZCV2izQhVF6NODCQVdooo24AYwGSSYRkkkUWdhtYhRciCvBheICGmOisLB1Y5TEUTOQCCt7Y9SYqNEF82uLuTxev7637q26davqfW8xcZr6c+o7Vd+tOnXqnCUXLlzo6ScEhIAQ8IHA33w0ojaEgBAQAvMIiFA0D4SAEPCGgAjFG5RqSAgIARGK5oAQEALeEBCheINSDQkBISBC0RwQAkLAGwIiFG9QqiEhIAREKJoDQiBzBGa2Lrn02zrT6mhFKK3Cq8aFQLcIzJPJRO84/qvmd7w3sW76bHsyLZGnbHvgqmUh0C0C0MnEV1NnPtk+FkoOEUoopNWPEAiNwDyfsDs5sCFcxzryhMNaPQmBoAic/e9XvfFbbgrapwglKNzqTAjkjYAIJW/9anQjjMDY31f3Zr8+ExQB2VCCwq3OhEBIBMIbUZrsUC671p6/4G75ajukBtSXEMgIgQ3PTo0fnOhfoGen17W6XpsQyjzgk30325OI3OrddkYa1lCEQEgExrZ/cuHM1FcThWPbTV//q9VbnyZHnoX7qPDX3SGVor6EgBCwRKDpDuXy5ud3VrPvHGvRAc9yOComBIRAlwj4IZReF/bkLmFT30JACAxDwBOhCFwhIASEgLeYsl345El9QkAIxIaAnx3KzP4ds+P//EewF0ixoSh5hIAQ+AsBD4Qyf8VzcHzqrXAvGqU7ISAE4kSgKaHgevL/3/z76AsBH0jHCaSkEgJCoNdr4oci3ISAEBACQxFoukMRnEJACAiBBQiIUDQphIAQ8IaACMUblGpICAgBV0K59dZb9+zZ89NPPwlKISAEUkHgjTfeuPnmm9uQ1pVQ9u/f/+abb65cuXLbtm3nzp1rQ0S1KQSEgBcEfv/996mpqWXLlr300kuPP/64lzYHGnEllImJiSNHjsB2t9xyy9133/3ggw+ePHmyDUHVphAQAo0R4AzBSWLFihXnz59/6qmn7r///meeeaZxayUVXQmFpu+4447du3d/9NFH33zzzZYtW/bu3bt27dpDhw61Ia7aFAJCoBYCc3NzO3fuXLVqFbVYoRs3bpydnX3hhRdqNVKjcJEByPE/3n777Ycfftg08sUXXzz66KPXX389cv/444+OLau6EBACDRD47rvvzDJ8+eWXf/vtN1rgL3z+v//++watWVbpWZazKYYxhQEUJZH7ueeeYzxPPvkk1GjTgsoIASHgjgBf9E2bNt14440syaI1OOWuu+769NNP3dsvacEnodANWxJIpL8/hvHaa69hZLnvvvtmZmZaHYwaFwIjjsDHH38Ma9x2223vvffeABR87Pv5pSWg/LveY/vhxGX+t/934sSJ6elpboJ27drF4eiqq66qcTBTUSEgBEoROHr0KObLpUuXPv/883DKQFkudzDHcvZpHcU2iKqECzn78K9sxhh2q2e5NsalNoVAhAiw72BBccbhpDNUPLYtnA+MGaXtn+cjTyFu+f4KKoFQQIFiMq+0rWO1nyUCEAQ7DmyULCKsrYuNMYAhtr/rtgiF0UKZ5UYTykCuMq9kOd01qPYQ4OaU7zFUsmPHjvJtfhhDbAhCoQ8Gw0aL7VYlsvAOJWEWzLdhNmaVIqmAEIgQAegDEoFKIBQbh4wwhthAhEI3jBn70GJHuwGFcfbhghmwuCeSeSXC2SyROkTAGB/7nUoqheFABPtUFvNboK0jTyElnIIvjb2hhPLcPZuToSUT+UVErQmBqBDAcwTrAfv3Wpe+IQ2x4XYopifMQuxTSuxGQ/UHfFynU3HhjXpU+pYwQqAlBDAFMP/5HtddAoENsaEJxXAK7GBz6hvQDURrfP5kXmlp1qrZCBHgIQvrxdIEOSB/eENsB4RCl5xfoNsGnGL4SOaVCOe9RPKLgLn35POJ52fj8354Q2w/CB5eG1v63sG4GEeIb0BQBssqRTGzQ8EQc+211/KU+ZFHHvnss8/qNqLyQiBaBAgvgDMrb4JPnTrFrtzsUBpISyM4y8IpDer6qeKXYitb41jIEcbxbhi4OVjy4z8qe1QBIRAzAoWTZ6VTSeUoMN9yCHBcXJW9lBdo/ZZnYff9gQ5cpAc+doZsXrgea3aSculddYWAIwIc5CER8wzFfQJDTGxqOve36IBQUMNAoAMXxRRaQTd1L5Jc+lVdIdAYgeJFWxGppHFTpmK3hthubCj9JzTOeIShJc6b+7HN7FCwYN1www3EoJR5xR1StdAeAtj+MCPyW79+vfkWenl2T0y2zZs3YwRoT3LLlv2HL7DsmGKLBTqwb2FhycOHDxMkgb9v376dA5FLU6orBDwiQPiOffv2cSNB+A7MiB5bfv3110+fPs2thcc2mzfluNdyrN7SFZcxrygGpaN2VN0LAi5OJZUCxGCI7ReyGxtKvwQtcQpd9MeglHmlcmqqgF8ETKxCR6eScpEiMcTGRSg2gQ5cNF3olX2mzdNnl75UVwiAgHmPBpXgjdnelyweQ2xchGJs1M28jGtNXx5EmHCbtR5Z1epChUccAbMphkoCvJiHrdgBxQZ490ceg0itQAcuICrFhwt6qrsYAuZ1CFQSJnUMVEJ3EaojFkIxnFIr0IELmkrx4YKe6vYjYD5RId+vxmaIje7IUwjULNBB4/mtFB+NoVNFEDBP4QMfoiM0xMZLKEjWONCByxQvYlBiXun2KYTLKFQ3GALGHhc+WE+chtioCQXhXAIduEwppfhwQW9E6pq4X13dGMZpiI2dUJCvw1OiUnyMCDXUGmbhfNBhZNJoDbEJEAoiegl0UGvS9BdWio/G0GVWMYxTSSVoHX5iK2VLg1CQ0legg1qIDBRWig8X9JKuG9KppByoyA2xyRAKgnoMdOAyuZXiwwW95OoGdiopxyeM26cvHYULAdns/aLHQAfNBDC1TBKyIgblY4899uWXX1o2SGHLkirWOQKoFX0RB2PNmjWoG4dXIip2KxVRPu69996F+c+7lWrR3n0xU6vtENKKX6td1GrcPsUHN1ZcCtRqXIU7QcAksgnsVFI50kh26JVyFgUi8pQtF7q9R8n2YA2UtEnxERsVNh5sxhVxKsFFmy1AeSru8AikYohNyYbSL2uEnIJ45Sk+mKZ64hx+KVr2yPefwyxOJSxdyyrBimGIhebae6zc0kCS2aEw/rYDHbhAXGRQJbBTMTv5Iydwl2ZVtw0EmEiEDeX1DZ8o+yS5bUiyWJtpGWL7R9FlCMgGViUi6BGPkyB60dqo+mNQMsD333+fy+8GI1WVNhAw6W/eeustdiUECYVT2ujFvU1ixBIjmYiz7k2FbiEk73rpK1igAxdpTQzKa665hqDZ7hkSXCRRXYMAJ4giZ0XnuSbKlZKcITZVG0ohd8hABy4L8rrrrnviiSf4DCrFhwuMjnUxQ5jwAknkb0rREJs8oRhTKKeemE1WxYUx9GdO7P3mFcdFouoGAZi6ZAOICkwquFQekSdqiM2BUAyn4DUQ7YFi4YWxMqh650HjPLIw4kThVJJQstp0DbGZEArD6CrQgc3CWOzCWCk+bNCzLzPwBjdap5LKEbHbYidbWSzyAildGw+FMs4zZ+WFsVJ8eFwYZinG7FRSOdikDbH57FDMSLoNdDB0rli+k1aKj8qVVlnAOJVcffXV99xzT5xOJZVDiPOjWCn20AKxPw60uUXnFE1i16je4H3wwQc86KoUnry2JnXLli1b9u7du3bt2kOHDlXWUgGDAE4lZLNdsWLF+fPnyRn8yy+/pIjM3NwcXifsULwkOe4egWY8FGGtoZtGjh7sh8NLC8c1cHZQig9LTRmnElLNYvkurPLwMu5qli1EUiwPQ2xuR55iPKRE4b158X+ZYbyGYJVGMnssxVCKjxKgjFMJVMIxJ4Nw4nkYYrMlFAZWXNbCI8Gy/FgyRa1iSvExABcKZQNinEpqIRlt4WwMsTkTCmPjC/b0009za9vg0BHh5FOKD5xKTA5ZroQjVFAzkcwHL4NN1sDwk782XqhOiH/58uWvvvpqM03HWWs0U3zAIPBIfiEgsPswrpj9vBuvghxuefot2y+++OKpU6dOnz794YcfnjhxonujtycJCNsBUXK/SHt33nknV1rffvutp7aHNHN2et2Sy35bZ9rrbFjL3HZxfcOzYEZtdihh+2+3N17Mm9cY7XbTSeuNqSjCilzBFkbZ/OznBeABUnycmRrvjU+dCa5j41SCzZVza5YfcBDNzxCbpw2FZ2B4YfePrTLQAQXgoHTPsca80kaa7vCEgi4wqEMlrLfUjV+19lMUDs7bLXaYjw1l6CwsCXRg3itnEJ+xPAZls7kTklCGOpU0EzvyWrkaYvPcoSw2mYYGOjCvCpNzUSlZMEUMSi+5MucJpe83ebyVpZqZU0k5RhkbYkeLUBjtQKADY+TL9Yhun+KjZAG0vUPJz6mkknHz2A5XDjOfI0/5UItABzzbw+4QbRSVSoVZFrBJ8dEJoWD3yc+ppFIpeRtiR26HYgbMnevY2NhDDz2UrhW2cuIOFOg3r9TakbWxQ4HKcb6AzTOwW9VShOXT81ptRls4Nz+Ukqv3I0eOrF69+s8//+zker6TTs0FkMmgSnpNImbzKjewJCQqME4lJADgOGZ2KIFl6LA7cptOT08z8A5lCNp1tFTnUTC2JFwqm3BYI/W5GMDQPgblgFG212tili2C6WbsVCJD7AAC+dtQmNZss/tji2b5KMuef00MylajwHMTjFOJCfefulOJPbALS46IIXa0bCh8Hhce2gcCHbhMmkTrYlIxeWr8pvgomu2PVJIoRJZi25zgMvNeK0Em/x3KYoNXGnOQ8Zjio3i+mEekEks2WazYyJ6sR5dQmApxZl93nMrNqhfmlQbRRjhDEanEPF9s1ntmtUbBI3YxlY00oYhTBqYF1GDioXEktHHVMVc2xPXIKVKJI7uNiEesCGU4AlwA8XVlYThOo5yq26T4GFmnkkpFcwMwytNp1HcozI+MAx1Uzv6SAkNTfJjICSatak4voVyA6q9L9Aw2d75aS7GdJQgd1O8lys5IyGBi3uDKGaWAXQp19OhRXLN++OEH3AJNBhlzJdylTFH2DVBEhOL0F6V0gYQaIU/ZEkSXLl3KPNi2bVurYdACqdR3N5hI+EEoxMH79ddfV65cCVy+O0m+PWYOmZU4CSY/ErcBiFAu4sciYTbAKefOnXODNJ/aQAEgRJzEc/8/f/3glJ9//nnVqlVtx6BMC0R2uDxr4JuUSbIuF/RTPKe1J/NAoIP2Ooq8ZZNybLFYcAFiUEaOz4B4I26I7UdDRtnBqVsEOkhrTvuS1sQ9wJZk41SiFB/ALkOsCKVi9eWUvNqeaNixY3DlV9epZDRTfBhgwSq5/Kf2U6JBSe1QhoPGt5eJMiKRU0yQN8brEqmkeBDIWQmKaTAXk6vCMMFtRCaJpXZEKIsClf1zjMLTxEsYWoPj6JhXRtwjdrFlI0IpY95cAx2YiNbYXMkiUiuSm+VnimLtpfiwl6HVkjLEDoVX18ZlV2R8unG72L17t8s9WlR15+bmGM7atWu5/cVURDy3llzUzHrjDMVNM+Ha6JSuo4LCRRiGs379esbo0kiWdUUoFWrFhn/llVfu2bMndfX3O5Vwk8UOhUeAbQ+qPwYlLIb3CiER2+607fbxiMWNjYnRdkdJtt/qtjCbxpMOdFDuVBJSR15SfIQUeGFfMsSW4y8biu38TJFTajmV2ALhXM4xxYdz/80bkCG2EjsRSiVEFwukFeigsVOJLRzO5Rqn+HDuuXkDMsRWYidCqYToUoEkAh1wrCB4mqNTSQ1Q3IoW903EQ8BI7NZYu7XlEWuDrwjFBqVLZVgAcSZFhuwIv4ARNFG/MvsUH/UU5qm0PGItgRShWAJ1GafwnD8eZ1A4rshZ0ZJTSW2MmlYIkOKjgWjoGo3bxMRs0HhmVUQoTRTKuo0h3Tre7iYVBoSSU/qbllJ8NNH0X4kBovp+NBtFsFoilIZQOwY64CoXFjCP8fhxTqllQaB3E16AY06uX06PKT4a6vivalij6r6WdOku9boKAdncewgfrZ07dzLb7COY4V1GOEU8o6iycePGIkcUfz9w4AB/xKRa7m9Gp/v27SNFMXyEIXMUIvocPnwY0NDT1q1bodEShZ04ccIkbz516lRJMRDGAboowAM/o0EIesBv2Dg0ZuDW2HyW16wpQqkJ2OXFmb54YeNjXrmwoQxCBJ48eXL79u189IY6vLMeTBjBof9KXagEB/Zdu3ZBJU5yJ1gZqOFcIAJAniD1kziYgBsp2SHo22+/ncGVZ/OjfH+sTx4HEHKNWujIxOujcW6IN2/erBixtWdK6luszuWvDHSAdcMcT2xCFg21/7EJ4hjPIhnl/AxG0QtTfHB45JqcR0kewwhw2jp27JgMsQ0Wl2woDUAbrLJYoAOmOE9m6qbUw5GUz6NZHoVTSS0Li4chxd1EEXgBoJYvX+7diiRDbGP9i1AaQ3dZxYWBDthNQCV4QzWY7q+88sr4+Hi6TiV+MLVo5YEHHhgbG7MMWGnR3sUiMsTaYzVQUoTSGLrBimxGoA/zV2wcfDwbeIUUTiXLli179913vQmXaUNQCUce8/rRPoNqORhYu/llCljrwxKh+IS4mIsNvEIGnEpGOeG2vUogkQLqwrzi4issj1h78IeWFKE4AjhYvcGjZONUwtoYcCrBaY2/eJYvr+awmw5Yl1xiUMoj1n12iFDcMWzOKWxDzBXy0Asg1gb/1GCz439IsbbI0RKL+FDp6qb4kCHWi5JFKF5gvKwRm0AHXOVwDYwJoNwLkx0K+xT/IubSYqW9wz7FhwyxXiaFCMULjIONlAQ6gEHgEdjEJmeFNinl6mGLB5iVKqxM8VFJTJVdqIBBQITS1kxYGOiAcw1HGL6ELAP7XrVJKccKSC1v0xYzr8gQaz8bK0uKUCohal7AHMt5fQMpYHPF8mo59fu7ZBngz9JciNxr4oZf14G4P8UH2pFHrMc5orc8tR8r1KrA2xDeof3xxx+1aqlwMASuuOKKzz//fM2aNcF6zLsjEUre+tXohEBQBJSXJyjc6kwI5I2ACCVv/Wp0QiAoAiKUoHCrMyGQNwIilLz1q9EJgaAIiFCCwq3OhEDeCIhQ8tavRicEgiIgQgkKtzoTAnkjIEKx1u/M1iX8ts5YV1BBITByCIhQbFU+c/Tg5ORk7+BRMYotZFGWOzu9bv7DUPz0hfCqJhGKHZxnp/99cHLTgWenxsUodojFXGp86szF5yvHJw9OrJs+G7OwackmQrHS19lj78xObtrQG/vHP8UoVoglUmjDpsne7NdnEpE2ATFFKDZK+j+f9Ayj/FufNBvUEigzv/HszX8p9POEgAjFAshLfGIYZfadY9okW+AWbZHZHTcZG8pNO2bHp54Vn/jTlAilGst5PukdnLhoxmMO9sQo1ajFXOKSDeXC8dWQiwyz3rQlQqmEcmb/jtnJ430xaM5MaY9SiVoqBTZgZ9fVnT9tiVCqsOS6eOCUrVNPFWb695FFQIRSofqFfHLRjrJjvxxSMlg28/tPmVH8KVIR2/xhqZZSQADHtnkzWPHDnvLJ9rEUJE9CRhFKEmqSkEIgDQR05ElDT5JSCCSBgAglCTVJSCGQBgIilDT0JCmFQBIIiFCSUJOEFAJpICBCSUNPklIIJIGACCUJNUlIIZAGAiKUNPQkKYVAEgiIUJJQk4QUAmkgIEJJQ0+SUggkgYAIJQk1SUghkAYCIpQ09CQphUASCIhQklCThBQCaSAgQklDT5JSCCSBgAglCTVJSCGQBgIilDT0JCmFQBIIiFCSUJOEFAJpICBCSUNPklIIJIHA/wCBXcDH0eqq2QAAAABJRU5ErkJggg==)
Banyak pasangan segitiga yang kongruen adalah...
a. 1
b. 2
c. 3
d. 4
Pembahasan:
Berdasarkan gambar di atas maka:
LM = PR
KM = PQ
KL = QR
Jadi, jawaban yang tepat adalah D.
13. Segitiga ABC kongruen dengan segitiga PQR, besar <BAC = <PQR = 65 derajat dan <ABC = <QPR = 80 derajat. Sisi-sisi yang sama panjang adalah...
a. AB = PR
b. AC = PQ
c. AB = PQ
d. BC = QR
Pembahasan:
Berdasarkan gambar di atas, maka sisi yang bersesuaian adalah:
AB = PQ
BC = PR
AC = QR
Jadi, jawaban yang tepat adalah C.
14.
Pada gambar di atas, ∆ABC dan ∆DEF sama dan sebangun. Pernyatan berikut yang benar adalah...
Pembahasan:
AB = DE = 9 cm
AC = EF = 8 cm
<A = <E = 400
<B = <D = 650
Jadi, jawaban yang tepat adalah A.
15. Perhatikan gambar!
Banyak pasangan segitiga yang kongruen adalah...
a. 1
b. 2
c. 3
d. 4
Pembahasan:
∆ABD = ∆BAC
∆AED = ∆BEC
Jadi, jawaban yang tepat adalah 2 pasang (B).
16. Perhatikan gambar!
![](data:image/png;base64,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)
Banyaknya pasangan segitiga yang kongruen adalah...
a. 4
b. 3
c. 2
d. 1
Pembahasan:
∆AED = ∆BEC
∆DAC = ∆BCD
∆ABD = ∆ABC
Jadi, jawaban yang tepat adalah B.
17. Perhatikan gambar!
![](data:image/png;base64,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)
Banyaknya pasangan segitiga yang kongruen adalah...
a. 2
b. 3
c. 4
d. 5
Pembahasan:
∆ABE = ∆ADE
∆CED = ∆CEB
∆ADC = ∆ABC
Jadi, jawaban yang tepat ada 3 (B).
18. Perhatikan gambar jajar genjang berikut!
![](data:image/png;base64,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)
Banyaknya pasangan segitiga yang kongruen adalah...
a. 4
b. 5
c. 6
d. 7
Pembahasan:
∆AOD = ∆BOC
∆COD = ∆AOB
∆ADC = ∆ABC
∆ABD = ∆BCD
Jadi, jawaban yang tepat ada 4 pasang (A).
∆AED = ∆BEC
Jadi, jawaban yang tepat adalah 2 pasang (B).
16. Perhatikan gambar!
Banyaknya pasangan segitiga yang kongruen adalah...
a. 4
b. 3
c. 2
d. 1
Pembahasan:
∆AED = ∆BEC
∆DAC = ∆BCD
∆ABD = ∆ABC
Jadi, jawaban yang tepat adalah B.
17. Perhatikan gambar!
Banyaknya pasangan segitiga yang kongruen adalah...
a. 2
b. 3
c. 4
d. 5
Pembahasan:
∆ABE = ∆ADE
∆CED = ∆CEB
∆ADC = ∆ABC
Jadi, jawaban yang tepat ada 3 (B).
18. Perhatikan gambar jajar genjang berikut!
Banyaknya pasangan segitiga yang kongruen adalah...
a. 4
b. 5
c. 6
d. 7
Pembahasan:
∆AOD = ∆BOC
∆COD = ∆AOB
∆ADC = ∆ABC
∆ABD = ∆BCD
Jadi, jawaban yang tepat ada 4 pasang (A).
19.
Pada gambar di atas, ∆PQR dan ∆ABC sebangun. Panjang PQ = ...
a. 2 cm
b. 3 cm
c. 4 cm
d. 6 cm
Pembahasan:
untuk menghitung PQ kita harus menggunakan perbandingan sisi-sisi yang bersesuaian:
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAKcAAABHCAIAAADtMMA5AAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAAbsSURBVHhe7V09dtswDKZ7FrtDXk7gnsDpkimrN3uMl24Zs3VxxnjLmilL7BPUJ/DrUPsuKcEfCZRJipIIWbLIKbUoAMQngCAIsqOvry+W2sA08G1g403DBQ0k1If4HSTUE+pYA6eXH6O8/Xg5oYfo2XIXR20udj4x4nAeIhUezbnadsGm6yM8Pa6nbLFV/fjPTP/LeOAhFfLIwe7L/F1JFEIw9XFpwOPhT/8O7Pb7GExh/P2WHf4Jaz+9PG+45l9nwkTQg6YmY2fHGZpiNGWT3gcNOA0CmTH8abN6/m5uiA0ty87OcDNIjIbMhv66G3XhyFXL3GpR8dApc/2NdGllJz+rMykaMUov8wyNZ1K34GnO4xGNz/X5ZL/HjCAGD7wLdZeSETo4qmuqRxc7l99vym/g79tRB2VDsznv3OVGC6dd7MzfJeM488nAUR/VysPzRfTk/eH451FE+Kn1TQP1UGdstxzdbZTtqVVc34Y+YHnroj5glV3B0Cny8GYSFaV14U8ztXsFGuzjEJKt9xG1pjLbUec2WYlwrZAw59Ayu0pDu8rOdg9fdWFjqqayh2/G7ipxoR1U8vC0+u0mdYporpsjTVLlGkioD/FrSKgn1LEGijEZLpXCz2IvwIE2oukTY4iAxRlzUAWVKKHSmy1iT0RtgmwX0bZgpCCcODRZuCUbKtyIuLVbdd1wVf3dVRUCAK39lmrXBMstLtKT38G5GFcFQuuD8VdQZe7EKJWk2uzUm+n8E8tZ6N1WIQoV59bVfmGG7mju+HevbWy72NzJaR1KF6c3kziTSzG3M1/dbtX+nSrN5D2sYlDwHxJNJ+q7j8304afcP5/cyCIL2VTdbFwtnV7mqz3b3MEGDd/C3f89SvpuMeLyHxY1F+qoHpntfq/2ysChEnrzoQ4+7Jax4nfAnGURHHLqDjGGhRHBaK0zjDGZsix61yH1+XTfaJ7SNVly1kZlUz4xGnEc+sspD09gSZ0nmXJznYeIQMCEOoFSO08yod55iAgEdKPe8klmPTZefJu3WMekCRTXa5Ju1MePT+gkM1v91gfVOS4Tnk9RafODyt/E0wJKwqea63hqxZS6c5KZZnyJqk0DHg//+b5f3Itj6uLMukzUneDXJ9IzL/vVRPr4WDmghPyZBpwJi5ZPMp/JkXZV6XJJvjx8vsVlHGjL8/Dy3opf8tqK2G3882GapeNjEx84PV8eXvl3rCGch98tJ6vo3p6Hiipwh7mEaHtv4Jjz4Xvz8C2dZEYy4HklbDe9ZsGHawJpeWKhYFd+gYjd1sePfwQStpXT7FXukEzXbwRBHVDXLWTdBpNM4+gScgQtho7U7Ga/1tNsY9Tq1+rl5mAtr0LtyyZSxJJCLjRSyzQAIZEX9nqoM5bZZIhBkgESae6HwbR4AwM9O6MMwqL9uqj7gKx8zq32V8HLqxylPSKxq/wQSvLa/XihGDsTp5QIvLjc5eO1Oj6sDtHBxY4/sorq5lLUdDa82f1CXxBYLUtTGwqmowJroBjTplxVfHCRxoGX5oAf4op5vlF11ls+Lc2Nq1E9gwwlsrmbszdVb6LLCxFZs0zI6xl9otq4wCJKVSCpoNBQrmfZa7f1wk0Dpf+s/4WIN0vpZx1MRmDqZ+2TQ862mcfmn2CmC7CAsFaBSB7VOg1s//6Jb+F1ieAT1cJFfPOqtPEsuQGljnnJaZFjz04yl2K2X63EdTmoIa8pr9IpbQ2InBkYh/K4ZjLJXBr5hooquMDkrb+nigEOxbzemoc3a3cFmLBhB4XceobjXvNuY158XAp6HCI5G6WP4/qQiWWToZaoaiUFm6CGe3dHPMCaAvVytUbqIb52XUOd05y9CuvKLEtn+GBtH8w5CpFgbrpjFVGhaDw/GWZGDOD9Pa3XqItCfdvsxa1LGfz48U3719GcPanbE4PQiEIEReUQevkSW1VF5d/lw7vanhSBD5pAwNR9eQy6jZ02KA/4dll8yFQdAs22y8rUEmbrBP/3g83cIJgxI54svHEEQqVZqCCr7m0ntDuFfXp5xjLAIgs3BodtigTQRV3keQd+hNk4wJhtrPj2E6LdUF9N4g70LhwSqXAC1XOSWY/LcBekOi44psLBdYqvrQPYXUKEAA+PvSg+bEjtF/EZN+DlTjpQS3J19ANQhwzrlonTppD1iplSvTp19mRAIajzkOrjXjqi481zeYYp0tCL/5MQyQnqSLL2jEwA6uBpsXdtzdPy1bjKOJYHpT1T+6XFDQkmcLBIFFPhyqn8JpKcMRHbkNFfYZ90kvnSZncJ/gEe/hJiJZ6kGkiok6q3o8QT6h0FhlSshDqpejtKPKHeUWBIxUqok6q3o8QT6h0FhlSshDqpejtK/D9SBDwTA3dT6gAAAABJRU5ErkJggg==)
PQ . 10 = 8 . 5
10PQ = 40
PQ = 40 : 10
PQ = 4cm
Jadi, jawaban yang tepat adalah C.
20. Perhatikan gambar berikut!
![](data:image/png;base64,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)
Diketahui panjang AB = 9 cm dan AD = 5 cm. Panjang BC adalah...
a. 4 cm
b. 5 cm
c. 6 cm
d. 8 cm
Pembahasan:
Pertama kita cari panjang CD dengan rumus:
![](data:image/png;base64,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)
= 5 x 4
= 20
CD = √20
Sedangkan, panjang BC kita hitung dengan rumus phytagoras:
![](data:image/png;base64,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)
= 16 + 20
= 36
BD = √36
= 6 cm
Jadi, jawaban yang tepat BD = 6 cm (C)
PQ . 10 = 8 . 5
10PQ = 40
PQ = 40 : 10
PQ = 4cm
Jadi, jawaban yang tepat adalah C.
20. Perhatikan gambar berikut!
Diketahui panjang AB = 9 cm dan AD = 5 cm. Panjang BC adalah...
a. 4 cm
b. 5 cm
c. 6 cm
d. 8 cm
Pembahasan:
Pertama kita cari panjang CD dengan rumus:
= 5 x 4
= 20
CD = √20
Sedangkan, panjang BC kita hitung dengan rumus phytagoras:
= 16 + 20
= 36
BD = √36
= 6 cm
Jadi, jawaban yang tepat BD = 6 cm (C)
21.
Pada gambar di atas, ∆ABC siku-siku di A. Panjang BD = 16 cm dan DC = 4 cm. Panjang AD = ...
a. √11
b. √16
c. √44
d. √64
Pembahasan:
= 16 x 4
= 64
AD = √64
Jadi, jawaban yang tepat adalah D.
22.
Pada gambar di atas, panjang DE = ...
a. 8 cm
b. 12 cm
c. 13 cm
d. 15 cm
Pembahasan:
Untuk mencari panjang DE, gunakan perbandingan sisi-sisi yang bersesuaian pada segitiga ABC dan CDE.
![](data:image/png;base64,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)
DE . 6 = 12 . 4
6DE = 48
DE = 48 : 6
= 8 cm
Jadi, DE = 8 cm. Jawaban yang tepat adalah A.
23. Perhatikan gambar!
![](data:image/png;base64,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)
Jika PQRS persegi, panjang RT adalah...
![](data:image/png;base64,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)
Pembahasan: perhatikan gambar di bawah ini:
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAUAAAACcCAIAAACBeeUdAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAA8nSURBVHhe7V09bBNLF11eRYEEdFABko0gigR0wSkIHTFFQgN0QGNDZVN8EkhINEggUZBUEDdABbwqFM+mIxQxdIAUAcKRoIMO6Oj8nfU4i2PHeHY9s/Ozx0VIwuydO+fOyZ09O7N3W7vdDvghAkTATQT+cdNtek0EiECIAAnMeUAEHEaABHY4eHSdCJDAnANEwGEEVBN4fXF6W/dTbjiMC10nAk4goJbAjXK+Giy0oGy3262JW6SwE3OATjqMgFICr39eCwpnT+c6eOQqq0uzqSDTKCPnb/5j0bMQ6PufVDyK10mvsxjJ9OJ6vOvZOsMIKCVw7uBk0KzeTXPpHJK3WOsLIBYCH250lgHt1kKhVnSAEoXuugUOB9W8Aw5nmDNWDV0pgYPZpXopqBVTSyONcrGGqY9ON31ml9obyT9XuVEKmh9aVoH+N2ecc9gZZP10VC2BA1BYpL1mNd+/rNUAYNjbakUs2eN/BgW3MJ+XG50lefjBsjxqw6QYH2BeoR8B1QTeuP0NSRzUbhm/nVtfvFULSvODN+NgZr46WRcL7XpQjO6ha8Xl+c7vOmuJ7lq8XmpWL6QymKEO658L7MFFBMQM1vAJGRzd2Wmw32MyXEKXulzc1FPow/D/GfRuk6HhPygeTcfL6LPlQBT3SHPeIKAyA4fLzSiRNe5Wm5EibeYvW/eh1pZaeOtDM5g8mHTxrX483T8mrmhu6gGgxWQIqCQwHhxhLdq9fyyuLbSS354mG0zvVbiRLdZK9WEu5CcKwdpn657X5CqPQ/0gVSF/fKxpwRwCKgmMUXQ0LPGxgL2RFj2Ib+702R6igO22bDrpqNC15TQfxZmbfZnrue+R/8amxTEUUsUETjkiXb04fBDceXglNkF0dKCN3wiMBhEKlwslcRGeJAf1lDadSAA0Ow8Gm5f/JDxlk7gIYNZ189smhWWMZLcN9uJ6wfZEgAiMiUB4ixfU/7JGlLTvdgaWHCSbEQFfESCBfY0sx5UJBEjgTISZg/QVARLY18hyXJlAgATORJg5SF8RIIF9jSzHlQkESOBMhJmD9BUBPgf2NbIcVyYQYAbORJg5SG8R0Hqu6ujRo94Cp25gO3bsUGeMlkwisGfPHq2EGjSudwmNbcbcqjlyQhGlkRDZ3ODp06ePHz/+9OnT+fPny+Xy/v370/RWL8E4NWViSZRkULKtDRi7uLi4vLw8MzNz4cKFU6dOGfGQBDYC+6ZOSWDzMZD24OfPnyLl4ptKpTI/P49ls/TV6huSwOoxjWuRBI6LmJH2Kysr4O2LFy9AWqTcqakpI270dUoCm48CCWw+BsM9+P79+6NHj5aWlnBzC97iRnf79u32OEwCm48FCWw+Blt5gKXys2fP3rx5c/HixfTVKUlMSGBJoDQ2I4E1ghvfNNQp5FuwF+rUuXPnsGCObyO9K0jg9LAe1hMJbD4GQQBRCpIyqItvkG+xVDarTkliQgJLAqWxGQmsEVwJ01gkg7dQp/AoCNS1RJ2ScDxsQgJLAqWxGQmsEdxR6hSE5V27domUa5U6JYkJCSwJlMZmJLBGcIeoU8+fP8djIahTEJYPHTqUsgMKuyOBFYKZ0BQJnBC4mJd9/foVS2U8E4I6NTc3h5Qb04CNzUlg81EhgbXG4Pfv35CUQV080cVSGVnXCXVKEhMSWBIojc1IYE3gOq1OSWJCAksCpbEZCawWXGRakXKFOoUHufhGbRf2WCOBzceCBFYVAzwKgqoMdUqc7HNanZLEhASWBEpjMxJ4THAjdQovkBDblcc06NDlJLD5YJHAyWIg1CmkXBDYP3VKEhMSWBIojc1I4LjgQp0Cb7HzEXunkHLxWCiuBW/ak8DmQ0kCS8ZAHKbHezAgSomlssfqlCQmJLAkUBqbkcAjwRXqFL6CtHgPRhbUqZGYiAYksCRQGpuRwMPAFeoUsi4YmzV1SnLCkcCSQGlsRgL3gSvUKRymx9Fcccwg5Vc9agy2atMksGpE49sjgSPMolc9Qp3CYXpTr3qMH0NjV5DAxqCPOiaBI3UKmOAWl+qU/KQkgeWx0tUyywSO9k5hwyPVqQQzjAROAJriSzJIYKhTYruyUKfAXhcP0yueB4nMkcCJYFN6UaYIbLYQidK4WWGMBDYfhiwQWKhTYK/YO0V1StW0I4FVIZncjscEFuoUlsp4MkR1KvkUGX4lCawD1Xg2vSRwbyESPMtlodl4c0K6NQksDZW2hj4R2PJCJNpiaMzwP8Z6Zsd+IYCl8uzs7LFjx379+vWy88Hbp6gt6w4yM7BuhEfbdzoDW1ImdzTKnrYggc0H1kUC9xYisaFMrvkoGvKABDYEfE+3bhE4C696ND8npD0ggaWh0tbQCQJH6hRequxuIRJtMTRmmAQ2Bn3UseUEhjoVFSKxtkyu+Sga8oAENgS89UtoqFN4CYZnhUjMB1u1BySwakTj27MqA0eFSCBTYc+jZ4VI4gfH9itIYPMRsoTAQp3Cqx5xNsi5Mrnmo2jIAxLYEPDWLKH7CpE4WibXfBQNeUACGwLeAgIj2eK9U5kqRGI+2Ko9IIFVIxrfXspL6KgQydTUFN47lalCJPGDY/sVJLD5CKVDYL/L5JqPoiEPSGBDwKe4hO4tREJ1yny8lXpAAiuFM5ExTRkY6hTuclmIJFFMnLmIBDYfKuUE5qsezQc1LQ9I4LSQHt6PKgKzEIn5WKbuAQmcOuQDHY5JYBYiMR9Ccx6QwOaw3+g5MYHfvXsn9k6xEIn5KBrygAQ2BPwYKnRUiAQvrBEn+1gm13wUDXlAAhsCPhGBqU6Zj5ZlHpDA5gMycgkNdQrH+nC4j4VIzEfLMg9IYPMBGUZgqFO4vwVvcTRXnOxjmVzz0bLMAxLYfEAGCcxXPZqPiiMekMDmAxURmIVIzAfDNQ9IYPMRA4EbjQZO9kGjEofpWYjEfFQc8YAENhkoUSb3+vXr4kEuD9ObDIabfbO0ipm4iUIkJ0+eRCESeIAMLAqRNMrbtpUbvT4N/saMx+zVSgRI4FTDAnXqypUre/fuxYtaUdDgy5cvt2/fTtUDduYXAiRwGvGEOvXgwYPjx4+fOXPmyJEjb9++ffLkCYtcpwG9732QwHojjMP0ly5dOnz48Pv37+/du/fx48fLly+juIHeXmk9MwiQwFpCjcP0d+7cOXDgwNWrV0+cOIGl8v379/EOKi2d0WiGESCBFQcf6hTWyVGZ3NevX7NMrmKIaa4HARJYzXSAOoVkK9QpbHv89u0b1CnufFQDLq0MR4AEHmt2YLsyjhkIdWrfvn1CncJmjLGMrn1e/3P9+ue1oDCRH8sgL/YYgbbOD3DTad6kbbE2xkFcfMX347iyCaXWQiEICgstYXDzT+N0wmv9RIA7seL9cRZlcnFCCNRVVSa3/zDD+uJ0vtrs+lWqt5dm4/nI1hlCgASWDXZvmVzc5eJoruyVo9qNPA8MA9iPVaz9MYQUvVrJjTLM//cfARJ4RIyjQiQzMzNzc3M6CpHIEjhgMvafkHFHSBFra8QidQrblXfu3CnUKR3sjRswticCvQiQwP3zQeydwh6MV69eYe8U9mBcu3bNkb1TuHtGOu98uicixFGI8OvGb6M204s9YjdZ4SoCWrU5h1RoPLnFZinc2WK/1MOHD3/8+KEVmV7jMijVSz0TLBKpN7nYUayheXU+aN/5Vlwnftu18eeHre2kNm52pAABvY95ZKamgkGMZwJH+bA2Ro7FLmXsVR7PWJKrY6I05NFS+OtBRoak3SB1h8Fb/5DEbV5jAwLZXUJDncJJeuydQvkvqFNRBrZ+KZWr3CgFzX//61sAtz40g8mDVKatj59aBzNHYKFOQZqK1CmRgdXCqt/aAFfzE4Vg0x4u/T6wB/MIZIjAKESCw/RCnbp586ZL6hREqD+v6WiU8US4NN+/uyN3+myhWb3bfZvHpivMTzN6oAsB/wksDtPjRC60ZRymx10uNCo81NWFqA67s/9bWCtu6MvFNWy03GJ3Vq6yWi/Vus2KQZ0buHSEwjabPm/kEIVI8BUrZLy/RuHeKbVRlNnIobZHWvMGAQ8J7FyZXBLYGzqlPxB/CNxbiEQcM3DlOC4JnP6896ZHHwjseiESEtgbOqU/EIcJHJXJBWq4xXW3TC4JnP6896ZHJwkMXSoqRGKzOiU5S0hgSaDYbBABlwgsCpEsLS1BT/apEAkJTGYmRsANAoO3okwu1skQqFxRpySjQgJLAsVmjmVgoU6BvShigJdg+FrKgAQmMxMjYGMGFuoUUi6+cVqdkowKCSwJFJvZnoFXVlbE3im8mRUpNyOlDEhgMjMxAlZkYPGqR6hTuLkFb7NWJpcETjx9eaHhwwyiTG5UiOTly5csRMJJSQTkETCTgaFOId+CvTgV5LE6JRkGZmBJoNjM8D0wRKnl5WVQF9+I7cqOvCxO78whgfXi67X1lDIwXvUI3kKdwqMgUDcj6pTkzCGBJYFis7Qz8O7du5FsifvfEUCVFrwEkygRgQQI6M3ACRziJUSACMgjYFiFlneULYkAERhEgATmrCACDiNAAjscPLpOBEhgzgEi4DACJLDDwaPrRIAE5hwgAg4jQAI7HDy6TgRIYM4BIuAwAiSww8Gj60SABLZkDqwvTm8UPwr//VPLzBL/6IadCJDAFsQlJG++OlmPCkZ3ipRNL/ZVALbAU7pgGwLcC20+IigFimKCmwsOgtMdSrPEoPn4WO0BM7Dx8DSWtyj3G1b7DWrL3Wq/xn2kA7YiQAKbjsz657WgMJHvdyN3cNK0Z+zfAQRIYAeCRBeJwDAEYhMYN2w9HwotY0+tMNU2P7T67YSJmR8iMAqB2AQODZa6emlrIajmyeFRGI/4//zEFne76//92wxK87Nj2ublviOQiMAboOQqN0pbZQ/fQVM7vlzl8UKhVuz9Q9go56vNUp0StFqkfbQ2FoF9BMTEmHKV1XZ9spqP7k2KawVk5SK3c5iIhlt9jkXgRrm4xRMQtwCwxdvZpWgbB75ZXV1tt1sLa0XuybIlQJb6EXsjR7jroBYNBnfDXOdZGlq6lQUEEmXgDRGrTfZmYY5wjBYjkIjAFo+HrhGBTCFAAmcq3BysbwiQwL5FlOPJFAKxRaxMocPBEgHLEWAGtjxAdI8I/A0BEpjzgwg4jAAJ7HDw6DoRIIE5B4iAwwiQwA4Hj64Tgf8Dl0BCXHf2fMcAAAAASUVORK5CYII=)
Karena PQRS dalah persegi, maka PQ = 12 cm. Maka panjang RU dapat dicari.
RU = RQ – QU
= 12 – 5
= 7 cm
Untuk mencari panjang RT, kita menggunakan perbandingan sisi- sisi yang bersesuaian:
![](data:image/png;base64,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)
Jadi, jawaban yang tepat adalah C.
24. Perhatikan gambar berikut!
![](data:image/png;base64,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)
Trapesium ABCD sebangun dengan trapesium EFGH. Panjang EH adalah...
a. 8 cm
b. 9 cm
c. 10 cm
d. 12 cm
Pembahasan:
DE . 6 = 12 . 4
6DE = 48
DE = 48 : 6
= 8 cm
Jadi, DE = 8 cm. Jawaban yang tepat adalah A.
23. Perhatikan gambar!
Jika PQRS persegi, panjang RT adalah...
Pembahasan: perhatikan gambar di bawah ini:
Karena PQRS dalah persegi, maka PQ = 12 cm. Maka panjang RU dapat dicari.
RU = RQ – QU
= 12 – 5
= 7 cm
Untuk mencari panjang RT, kita menggunakan perbandingan sisi- sisi yang bersesuaian:
Jadi, jawaban yang tepat adalah C.
24. Perhatikan gambar berikut!
Trapesium ABCD sebangun dengan trapesium EFGH. Panjang EH adalah...
a. 8 cm
b. 9 cm
c. 10 cm
d. 12 cm
Pembahasan:
Untuk mencari panjang EH, kita gunakan perbandingan sisi-sisi yang bersesuaian:
![](data:image/png;base64,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)
EH . 12 = 18 . 8
12 EH = 144
EH = 144 : 12
= 12 cm
Jadi, jawaban yang tepat adalah D.
EH . 12 = 18 . 8
12 EH = 144
EH = 144 : 12
= 12 cm
Jadi, jawaban yang tepat adalah D.
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