BAHAN UJIAN HARIAN 1 (ONLINE)
SMP WR SUPRATMAN 2 MEDAN
KELAS :
VIII – SMP
SEMESTER : GANJIL
2020 – 2021
Pilihan
Berganda
1. Dalam
satuan sistem Internasional
Energi adalah …
A. Erg
B. Kalori
C. Kilo
Kalori
D. Joule
2. Energi
cahaya adalah energi yang
dihasilkan oleh ..
A. Muatan
Listrik yang bergerak
B. Muatan
listrik yang dinetralkan
C. Radiasi
gelombang
elektromagnetik
D. Peristiwa
kemagnetan
3. Alat
yang dapat mengubah energi
gerak menjadi energi listrik adalah …
A. Aki
dan Baterai
B. Dinamo
dan Generator
C. Aki
dan Generator
D. Baterai
dan Dinamo
4. Energi
kinetik adalah energi yang
terdapat pada …
A. Benda
yang bergerak
B. Benda
yang diam
C. Benda
yang terletak di atas
benda lain
D. Setiap
benda cair
5. Jika
kelajuan mobil menjadi dua
kali semula, maka energi kinetik
nya menjadi …
A. Seperempat
kali semula
B. Setengah
kali semula
C. Dua
kali semula
D. Empat
kali semula
6. Sebuah
bola bermassa 2 kg
ditendang sehingga menggelinding
dengan kecepatan 8 m/s.
Energi Kinetik yang dimiliki bola
adalah …
A. 256
J
B. 128
J
C. 64 J
D. 32
J
7. Benda
A dan B yang bermassa
sama, masing–masing bergerak
dengan kelajuan 2 m/s dan
4 m/s. Perbandingan energi
kinetik benda A dengan B
adalah …
A. 1
: 2
B. 1
: 3
C. 1
: 4
D. 2
: 5
8. Dua
benda yang sedang bergerak
masing – masing bermassa sama
mA dan mB.
Perbandingan mA : mB
= 2 : 1 dan perbandingan energi
kinetik A dan B adalah 1 : 8.
Jika kelajuan A adalah 1,0 m/s,
maka kelajuan
benda B sebesar …
A. 2,0
m/s
B. 4,0
m/s
C. 8,0
m/s
D. 16,0
m/s
9. Dari
keempat benda pada gambar
berikut, yang memiliki energi kinetik
paling besar
adalah …
![SOAL ONLINE FISIKA KELAS VIII SMP SEMESTER GANJIL TP 2020 - 2021](data:image/png;base64,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)
10. Jika benda bermassa 3 kg
dinaikkan setinggi 4,0
meter
dari permukaan
tanah, besar
energi potensial
benda tersebut
adalah …
![SOAL ONLINE FISIKA KELAS VIII SMP SEMESTER GANJIL TP 2020 - 2021](data:image/png;base64,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)
A.120
J
B. 40
J
C. 30
J
D. 12
J
11. Sebuah bola bermassa 0,5 kg
ditendang melambung ke atas
dan mencapai titik tertinggi
7,0 m. Maka energi
potensial
di titik tertinggi adalah…
A.1,75
J
B.3,50
J
C.17,5
J
D. 35,0
J
12. Empat buah bola digantung
seperti gambar di bawah ini.
Benda yang memiliki energi
potensial yang paling besar
adalah …
![](data:image/png;base64,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)
A. Benda
1
B. Benda
2
C. Benda
3
D. Benda
4
13. Sebuah buku berada dalam
rak yang tingginya 3,0 m dan
memiliki energi potensial 15J.
Energi potensial buku tersebut
jika diturunkan hingga 2,0 m.
A. 5,0
J
B. 7,5
J
C. 10
J
D. 30
J
14. Perhatikan gambar di bawah ini
Pada
peristiwa ini terjadi perubahan
bentuk energi ….
A. Litrik
menjadi cahaya
B. Kimia,
listrik, menjadi cahaya
C. Baterai
menjadi cahaya
D. Kimia
menjadi listrik
15. Perubahan energi pada aki yang
dihubungkan dengan lampu ..
A. Listrik
– cahaya – kimia
B. Kimia
– listrik – cahaya
C. Listrik
– kimia – cahaya
D. Kalor
– listrik – cahaya
16. Motor listrik mengubah …
A. Energi
litrik menjadi energi kinetik
B. Energi
kinetik menjadi energi litrik
C. Energi
listrik menjadi energi potensial
D. Energi
potensial menjai energi listrik
17. Pernyataan berikut yang tidak
benar
adalah …
A. Energi
tidak apat diciptakan
B. Energi
dapat dimusnahkan
C. Energi
dapat berubah dari bentuk yang
atau ke bentuk yang lain
D. Energi
bermanfaat pada saat terjadi
perubahan bentuk
18. Perhatikan gambar di bawah ini
Untuk
menaikkan benda bermassa
3 kg setinggi 5 meter pada kelajuan
tetap diperlukan energi 200 J
( g = 10 m/s2 ). Besar energi untuk
mengatasi gaya gesek adalah
… Joule.
A. 50
B. 150
C. 185
D. 200
19. Gaya horizontal 30N mendorong
benda bermassa 75 kg di atas
lantai sehingga bergerak sejauh
15 meter. Besar
usaha yang
terjadi adalah …
A. 150
J
B. 450
J
C. 775
J
D. 2
250 J
20. Sebuah gaya melakukan usaha
60 J
pada suatu benda. Sehingga
benda berpindah sejauh 5 meter
searah gaya. Maka
besar gaya
tersebut adalah …
A. 6
N
B.12
N
C. 30
N
D. 300
N
21. Perhatikan gambar di bawah ini
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![SOAL ONLINE FISIKA KELAS VIII SMP SEMESTER GANJIL TP 2020 - 2021](data:image/png;base64,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)
22. Usaha yang dilakukan untuk
mengangkat benda sehingga
ketinggiannya bertambah,
akan mengakibatkan
…. benda.
A. Energi
potensial gravitasi
B. Energi
kinetik
C. Energi
kalor
D. Energi
kimia
23. Sebuah lift yang beratnya beserta
isinya 2 000 N bergerak vertikal
sejauh 0,5 m dalam waktu 0,1
detik. Daya
keluaran mesin lift
tersebut adalah …
A. 0,0001
watt
B. 10
000 watt
C. 0,0004
watt
D. 40
000 watt
24. Motor sebuah lift mampu
mengangkat lift dan muatannya
seberat 6 000 N setinggi 20 meter
dalam waktu 10
detik.Daya motor
tersebut adalah …
A.1,2
kW
B.3,0
kW
C.12
kW
D. 24
kW
25. Tinggi maksimum yang dapat
dicapai
sebuah lift 600 watt dalam waktu 7,5
detik, untuk mengangkat beban
900
N adalah …
A. 2,3
meter
B. 5,0
meter
C. 140
meter
D. 1 100 meter
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