SOAL PREDIKSI UJIAN NASIONAL
FISIKA 2014
A. 2,97 mm
B. 2,47 mm
C. 2,03 mm
D. 1,97 mm
E. 1,47 mm
Cartesius seperti pada gambar. Resultan R=S1+ S2 adalah ….
A. 7+ 10√3
B. 7+ 10
C. 3+ 7√3
D. 3+ 10
E. 3+ 7
3.
Sebuah benda bergerak melingkar
beraturan dengan jari-jari 6 meter. Jika dalam 2 menit benda itu melakukan 16
kali putaran, maka kecepatan linear benda tersebut adalah ....
A.
0,8 m.s-1
B.
1,0 m.s-1
C.
1,2 m.s-1
D.
1,4 m.s-1
E.
1,6 m.s-1
4.
Perhatikan gambar di samping!
Massa
balok masing-masing m1 = 6 kg dan m2 = 4 kg serta massa
katrol diabaikan. Jika permukaan bidang licin, dan g = 10 m.s-2,
maka percepatan sistem adalah ....
A. 0,5 m.s-2 D. 4,0 m.s-2
B. 2,0 m.s-2 E. 5,0 m.s-2
C. 2,5 m.s-2
A. 0,5 m.s-2 D. 4,0 m.s-2
B. 2,0 m.s-2 E. 5,0 m.s-2
C. 2,5 m.s-2
5.
Sebuah bola yang diletakkan di permukaan
bumi yang berjari-jari R memiliki berat sebesar 180 N. Jika bola tersebut
diletakkan pada ketinggian 2 R dari permukaan bumi, maka berat bola tersebut
menjadi ....
A.
20 N![](data:image/png;base64,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)
B.
45 N
C.
60 N
D.
90 N
E.
360 N
6.
Grafik di
samping merupakan grafik sebuah benda yang bergerak lurus. Jarak yang ditempuh
benda antara 0 sampai dengan 8s adalah ....
A. 72 m ![](data:image/png;base64,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)
B. 64 m
C. 48 m
D. 24 m
E.
12 m
7.
Momen inersia suatu benda tegar
bergantung pada :
1)
Massa benda
2)
Jari-jari benda
3)
Letak sumbu putar
4)
Bentuk benda
Pernyataan
uang benar adalah...
A.
1 dan 2 saja
B.
1 dan 3 saja
C.
1 dan 4 saja
D.
1, 2 dan 3 saja
E.
1, 2, 3 dan 4
8.
Benda A dan B bermassa sama. Benda A
jatuh dari ketinggian h meter dan benda B jatuh dari 2h meter. Jika A jatuh
mengenai tanah dengan kecepatan v, maka benda B akan menyentuh tanah dengan
energi kinetik sebesar...
A.
2 mv2
B.
mv2
C.
mv2
![](file:///C:%5CDOCUME%7E1%5CUSER%5CLOCALS%7E1%5CTemp%5Cmsohtmlclip1%5C01%5Cclip_image012.gif)
D.
mv2
![](file:///C:%5CDOCUME%7E1%5CUSER%5CLOCALS%7E1%5CTemp%5Cmsohtmlclip1%5C01%5Cclip_image014.gif)
E.
mv2
![](file:///C:%5CDOCUME%7E1%5CUSER%5CLOCALS%7E1%5CTemp%5Cmsohtmlclip1%5C01%5Cclip_image016.gif)
9.
Untuk meregangkan sebuah pegas sejauh 5
cm diperlukan gaya sebesar 20 N. Energi potensial pegas ketika meregang sejauh
10 cm adalah ....
A. 2 joule D. 50 joule
B. 4 joule E. 100 joule
C. 20 joule
A. 2 joule D. 50 joule
B. 4 joule E. 100 joule
C. 20 joule
10. Sebuah
katrol dari benda pejal dengan tali yang dililitkan pada sisi luarnya
ditampilkan seperti gambar. Gesekan katrol diabaikan. Jika momen inersia katrol I = dan tali ditarik dengan gaya tetap F, maka nilai F
setara dengan ....
A. F = . . R
B. F = . 2 . R
C. F = . (. R)-1
D. F = . . (R)-1
E. F = R . (. .)-1
A. F = . . R
B. F = . 2 . R
C. F = . (. R)-1
D. F = . . (R)-1
E. F = R . (. .)-1
11. Bola
bermassa 20 gram dilempar dengan kecepatan v1 = 4 m.s−1 ke
kiri. Setelah membentur tembok memantul dengan kecepatan v2 = 2 m.s−1
ke kanan. Besar impuls yang dihasilkan adalah ....
A. 0,24 N.s
B. 0,12 N.s
C. 0,08 N.s
D. 0,06 N.s
E. 0,04 N.s
A. 0,24 N.s
B. 0,12 N.s
C. 0,08 N.s
D. 0,06 N.s
E. 0,04 N.s
12. Air
sebanyak 60 gram bersuhu 90°C (kalor jenis air = 1 kal.g−1.°C−1) dicampur 40
gram air sejenis bersuhu 25°C. Jika tidak ada faktor lain yang mempengaruhi proses
ini, maka suhu akhir campuran adalah ....
A. 15,4 °C
B. 23,0 °C
C. 46,0 °C
D. 64,0 °C
E. 77,0 °C
13. Sayap
pesawat terbang dirancang agar memiliki gaya angkat ke atas maksimal seperti
gambar. Jika v adalah kecepatan aliran udara dan P adalah tekanan udara, maka
sesuai dengan azas Bernoulli rancangan tersebut dibuat agar ....
A. vA > vB
sehingga PA > PB ![](data:image/png;base64,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)
B. vA >
vB sehingga PA < PB
C. vA <
vB sehingga PA < PB
D. vA <
vB sehingga PA > PB
E. vA >
vB sehingga PA = PB
14. Perhatikan
gambar!
Jika
diameter penampang besar dua kali diameter penampang kecil, kecepatan aliran
fluida
pada pipa yang
kecil adalah ....
A. 1 m.s−1
B. 4 m.s−1
C. 8 m.s−1![](data:image/png;base64,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)
D. 16 m.s−1
E. 20 m.s−1
15. Gas
dalam ruang tertutup memiliki energi kinetik Ek. Jika gas tersebut dipanaskan
maka energi kinetik gas tersebut berubah. Faktor yang mempengaruhi perubahan
energi kinetik gas tersebut adalah...
A.
Tekanan
B.
Jenis gas
C.
Volume
D.
Suhu mutlak
E.
Konstanta gas
16. Suatu gas ideal
mengalami proses tertutup A → B → C → A. Dalam suatu siklus gas tersebut
melakukan usaha sebesar .... ![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAPUAAAB9CAIAAAD1MLKHAAAgAElEQVR4nO1d53MjOXb3P2f7m88f7mxfbZWrruy6Kte5zq7a9dbt7c7M7k5SzjlniQpUorIoiUqjTCUqU5Q0yoFUZGw0/OEdca+B7maTojSze/s+sNho4OGFHx7QABr9d/QX+oV+vvR3n1qAX+gXekL6C77lZyFCCCGES9SqnYTp6eX6ixhG7PCc5vqFYqMnwbcRIKriFVJEGYzgO47oN9iWnrPJ/UKPoQj4JoSwRsCV0fIxEUgOA1e8xTJwfxhnMWdEfWJAXsy9hJGgoKVRtNJ+ho0qNrsxMOhkEPEWg2yyQXyz/0CQWZIkSZJEKbn2AHnAkdx/xhPSjVBErWLDd8wUA76xfX7q+BZjn8FScjRt4zGDi8j4lpVDGRy5GUxVmUIbCIVC+PL29tZms21tbYmZGWfckJ4H37H5SY4J31zxnzS+YyOGbwiRYgZO06eK30yO/f392dnZmZmZubm5+/t7SDw4ODg4OJCUBEIHAgGn0+l0OiHl6upqbGxsf3+fENLf319dXX18fAzVu93upaWlxcXFpaWlm5sbWZaZzufn59vb25TSUCikE+DlcBeh73v9DI+JENFWp9rpxUw6YmtFH63MUUnF0MmIY6XDjWUAzzKDEGVPblwYTFyoMoTvo6OjFy9etLe3d3V1JSQkXFxcnJ2dWSwWj8fD4i4G4uXlZWJioslkopTe3983NDRMT0+XlZWdn5/PzMwUFRVtbm4C/6urq1evXlmt1q6urrS0tMvLSybJ3d1df3//5uYmGEIf35BBRwWcXydbbDYV6W8E30TZjWuZV7Uuhm92CX6UIzlCvwHEgm9JktLT03d2doLB4B//+MeFhYW2tjaHwxEMBsfGxnZ2dm5vb6enp71eL2vKra2tDQ0NlNLJycnq6mpKaVdXV29vL6V0fn7eYrEA80AgkJaWtr+/HwgEvvzyy+Xl5Y8fP05MTOzu7sqyfHFxUVxcfHt7qwVuhm8t0IiZ9a2mkyEqig3frFS0UNNKjwrfYmbMmbMhwzf7xQX1+0MMaNxCQqEQ4PsxpIdvdoNzTygUSkpK6uvrs9lsL1++dDqdmZmZl5eXoVCopKSksLBwaWmpt7fX7/czEVtbW81mM6W0paWlo6ODUjo0NFRQUDA4OFhWVrazswN1BwKB9PT0kZGRgYGBH374YWVlpbq6en19PS8v7/r6OhQK5eTkrK2tiQNxTFwYYJeyEt+4E+AMze5COlccj75wCrMPzsA4swwsPysLdTFksODHJA+FQsFgEEvLyYBHg1rDAzEnS+HEZtjCVYiXQEwk0fhRoRAq5UaeRhokRikVSDWzIn5z7pdlORQKvX//vqSkZGBgYH9///j4OCUl5eHhQZZlv9+fmppaWVkJ2cAxsiy3tLTA+KS5ubmxsRHwXVFRcXp6enx8HAgEQLdgMJiZmdnc3Gy1Wl0u1+3t7eLi4ujo6KtXr87Pz2VZrqysHBoaYviWBGJogP/BYFAH35wnOEixu8CEORj+4Awc3Flm7GMuM0YSSMv+gFMZ7jFDphcTBjPBiY/EtygkGypwcGfVEdRWjSObwY6g+M0kfwy+dTL/HRtGE9RTYH0yMjI2Nzch29HRUUZGBuA7FAoNDQ0lJydfXl4yqFFKzWYzwHp6ehoGKu3t7X19fVALRHrwUG5u7tbWFnC+vLzs6OjY3d1NS0tj+B4ZGRFlw+EEcMDFG86p3H9sUEkZCNklQ6GEpjJFT3MFmWXFuzhdDrcuLCqDFAONhFpXMBhkauIMmLmM+hwdfHNlxRStZgCNn2NuCNEC7FTxzTlIB7KygG/Vggp8g7gMOkyr4+Pjr776ampqCmS6u7vLycm5uLjw+Xytra1Op9NsNicnJ9/c3EDxQCBQVFRUUFAQCAQuLy8LCgrm5+cLCwuPj48lFKUkSTo/P//mm29GR0dB1pWVlS+//HJ4ePjFixcjIyOBQKCwsNDlcjHpRdkYMpjdZRSYuR6QU56gwR/jxjHH+BYhyxHR6DRkFM6ZSBIaqLC6ZBTIZfRowekrcuNUw5nFerFqXINngmF8YwNy9jECSqKcZeZKYQtz6nOAjoHUxye4dUqSdHBwYLVanU4nG34MDAyMj4/7fL6xsbHb29uDg4PW1tazszMQ7vb2dnx8fHR09ObmhhCytbVlNpsdDoeEOlzgf3x8bLPZVlZWwLW3t7d9fX2Li4vT09O7u7vHx8dlZWWBQAA7KQZ8SxrPLj8hfLOcOOTr4JtTKmZ8izjm9DWCb6o2i8WYcH2v9HT4JgLJsgy4gQpY6PV6vWazmUVWVpyhClIAVfAHVGKPTXI4ErCuA19SSv1+/8jIiMPhIISwUthJ2FUYyiLmWJMQQcAJI+Jb/MP+czWCoTjmzFVEaB5iW+VkkNH4REKDRmYuTgVGqsz1iTMIFgnjgY0JOXfoYIuDJm5LmBtn2+fAN7MRpzOY+PLy8uTkBDuPsw5BT34sBQaRBA2aOR8w5a+vr/f390Ex5uZAmKAsCS8nwQMrh0KgYDDo9/s58DEcYMICi3ZgHDB6WHtmhpJRuBLVx77k0iWEb1EwloiBgnnq6CUJgVYkxpMjDmpcXSHdh0sO31AWI5UqSZ+P1l190sO3hMIt1z/KyjURTm1mF+Z1ZiaGBpzIuYoRFon5SUI9GpTFIxMRBGIvrErYnUQ5zMCYk5UhkyvCbMosowpBZkDVYSFB/aFqZhFwJBK+DaIhoqiipjrg04/fOvm5UnHGt2o+gpq4QdYcLo2XktEamKr/YiCDTFRNKbYxUeCoJInZW6rcuPaGRTXSsA3WIusuTD4GgvEiVRmM4jsGIkoyXkp+Anw/hohAn1AYHTIep6OlnxW+tUjWiBayRnSUJIlSurGxsb6+Tg1vlHsifBt0gGpd8YW1cVMY5MZ8B1Nbqhm0isfmFNVajPB5UoqMb3HcpkNEbcqJoGEMLPTk5+cnJib6fD7WEmC+j0kQbXQHimHkZ5C/zviECM9bYrZoa8RkUGBcS8xtj6qtsDyG4hWDjPvOyDA9anwT5diOzSFwhoY/Z2dn//Vf//WrX/1qcXGR1f3w8BAIBLBdVEOm6oORaq8iUsxe18e3FH7gVi0b7ZOGSPqBFtuc1RJzpXHH9+Pps8C3agjH8ZsBS5Kk8vLyf/iHf/j7v//7N2/e+P1+GU04yBrrsdhzOAMNz68z5qquZUpyVXB3jfuVKKducEHGWYunfhsTHUmVQ0RZOU7DoYRTjROJCAGesy2Q6DWORBWYbbmKSFwfmmMjVbg/Ft/cJaabm5uWlpasrKykpKSGhoazszOiAW4RBMBQFrzIhpg6ZRkHfKnq9YjulNGalKxsVFh3Wbk3SPS9vrScAFpN1+fzQb+nJTYRNv0R5dCR+4M7Xs6zbPqVQYRd4urY7L6WF56TnhvfsHI5NTXV3NxMKVVd6dDyOoMLl01CGxUY5ogacLlaRK9jebg1LCwJXG5tbe3u7hIURCXlGiFB+ObUlNDSoyQ8eBAloEW2LDO3EMYhle0GE9dEQ8pdXBJaE8XOwgTPTh6PZ2lpaXNz0+12syEltiq3tB4XmBon/fGJCr6ZfdmKiaSxVsf2sgFxC4rsD6W0v78fNsqqtg3xCZUZPaRcGZZlORTecsiRKoyYIpzwDBDwn+1kZKuqYvOTZTklJaWoqIiGdxyEwvuztXQJhimENrKyoMiI05dTAYMb2000GpNTzMM5DjPnMmPcU0rn5+erq6sHBgZ6enqSk5NPTk5AGC0xng64BrNRbVLBtxgDODMFEfn9frxCjvHd19fX2Ngoqy2Gc4DDxsJMsFfYxnHMAeObBTPMHzhg37Aq/H4//Bd32JLwCHhjYyM/P//FixdnZ2cyWreSUT/D6cIMEkJvKjAxGIn45qCMs3GQFRuhjBbM2a4hDEdmDdXGwKqglF5eXv7f//3fysoKAKipqQn2MHOtAvN5LKi1gWswWxT45tq6iG/sBkm5kwT/oZQODAzA+EQL35zzCOorGZJwRdgTYjYZ7b8LofjNbqniGysrCfG7q6vL5XJlZmbC/nXGShbwHUJbYnDwpmjzGfYQxjcHdAwaEd+QkwpPewxzISHG4+LAVgffIyMjX3/9tdfrBYbX19fX19c4z08S3xyatVAuEn4hhWEL/Gqz2err66nyNXiGTvHRTTSfjDposWlJyp0tsgBigub1MPThFkzGS8o9LZjOz8/z8vIGBweLioqSk5PZZl2uCk4q3LRY/BZxIOIbN5JQeIegpAwx3BwlswAX2kV5sPHFSMwqopR2dna+efOGVSqjqMFczFVB4jf+5tAZVbb44Ju7BHxjzUn4+XJwcLCurg7bgsO3CGtsdOwJhg/OcxKKoAw3GE/BYDAQCBBljwH/fT4fAw2HP2AyPj4+MzPjdrvPz89fvnwJXbaWKZhSEL9ZLfr45iwTQvFbx/6MCcY3M4joR9YqcIMh6BmdGZ9SOjs7+z//8z93d3cADK/XCyt0uEFyZAS4BnN+YnxL4Zd0QmgUzjkYLimlVqu1oaFB9CXHE8cPCQVIbFMt2XBZOfwaKCcqni1hhmZaMBkkZRy6uLjIzs6GF/MkSUpISEhOTr67u5OVCyvsPycnhwB9fOM8DAdMQQ4iRIjfWoQLMgTgu9wl/Pp8vuzs7Nra2vPz84ODg4GBgaurK1k5FlJlHhd6WnxHJM6FEM8YgIAVCT9fWq3WlpYWzByDUvQ69q6stqDAWVYkIgRFrfxc7aIwd3d3Lpfr6upKkiSv13t4eOh0OuHF04geVVVNUpsfjKiRFn+saQgN58RsUdUCPr2/v6+vr6+srGxubt7e3o4vgjFFxHHEgnHGN4M4pfTq6mpubu7k5IRh/ejoaH5+/vr6GiobGhqC94uZgTiIi3Lr4FtLVexCTlQ57LCIFhThTpSHLbKmGxsiISKoyhwzvrHW8cK3jCzm9XoDgQANv4H1FPTc+CbaIwFJOSLc3d0tLy8fHR11u92Ab4/HU1dXNzw83NjYCHbp7+9va2ujypVn7AwMIzFa4xQjOuu7k3EzWJxjFZE55yfOqiIixY5LRtiShMEMEYYl+FK0akRYcxnwpYQmiLQ4GIcmecQCvsEqVI2vGb+JEAgx1gkhNzc3b9++tdlsUBbQPDAw0NnZSSnNycnZ2NgAfHd1dbHIJ6FVXxltvBTbn3jJZSbKqIx9AImiUcTWwiGeIU8VH1rVqUrOElXRI4cRiRkyjTwez8XFBVcLB0TVNsPE4BqSQayr1mWEIuZ/fnzjRD5+y7qRDB4cP3z48Mc//rG+vr66uhoOP5FlubKy0mq1UkpramoGBgYopTabramp6fb21uPxwBj9+vr6/PycXd7f37vdbo/HA1PRd3d3Ho/n5uYGegmv1/vw8MBmOfx+v9frZQfBwSWb4wuhhVXsVDnSkVRciGVjLbARbpNgJQ7xcSSv1zs8PPztt9/Oz8/HnXlspN8ksAF1wPdZ4NtgfSBrVVVVVVWV1+tNTk5m5wmWl5fDcVO1tbVwLo/NZvv2229LS0sLCgr29vZ8Pl9TU1NWVhZcPjw8NDQ0ZGZm5ubmOp1OuJudnV1aWvrx48dgMNjS0lJYWFhaWrq3txcIBLq6ugoLC/Pz83d3d0OhUFNTU05OTklJyfr6eigU6uvrKyoqKiwstNvtoVBoaGiotLS0uLh4dnaWEGK1WjMzM/Py8ux2uyRJg4ODxcXFubm5s7OzkiR1dnbm5ubm5+fPz88TQmw2W3FxcV5e3sLCAiFkeHj47du3r169SklJyc7Ozs7OzsvLy8/Pz83NzcjISElJSUtLS0pKSkxMTEtLS09PT09Pz8jIKCoqyszMzMrKyszMBMHy8/MLCwtLSkqqqqqqq6vLysqqqqpqa2tramqqqqoqKiq++uqrX/3qV//yL/+SnZ1dXV1dW1tbVlZWWlra2NhYU1NTXl5eXV1dXl5eUVFRUFBQVlZWUVFRWlpaVlZWXFxcWlpaXl5eVVVVVlYGPGtraxsbG1taWmpqakwmExwqVl9f39bW1tTU1NDQ0NjYaDabW1tbW1paWlpampubW1paIKWtra25uXl+fl4Snom5S4L23sSRWAPjLjkywiQWfDc1NbW3t1NKu7u7W1tbgYPFYoFFvtzcXBifdHV1NTU13d3dud3u+/v7QCBwe3t7fX3tdrthI/hlmHw+nyRJbrf77OwMDg8KBoPn5+cnJyeHh4d3d3fBYPDs7Gxvb29vb+/29jYUCh0fH7tcLpfLBfH+9PR0b2/P5XJ5PB5Jkk5OTnZ2dra2to6OjoLB4OHh4erq6sbGxvn5OWTe3d1dX18/PT0NBoN7e3vr6+tra2vHx8ehUOjg4GBlZcVut8OxzkNDQz/++OMf/vCHL774Ii8v78OHD2tra0tLSx8+fBgfHx8cHLTZbENDQ729vVardWRkZHBwsK+vr7+/v7u7u7Ozs6urq6+vr6urq7W1tbW1taOjAwzV1tbW0dEBBjSbzSaT6Ztvvvn1r3/9xRdfmEwmyNnR0WE2myFne3s7IA/Q2dnZ2dHRYTKZmpuba2pqGhoa4DS8pqam+vr6urq66urqhoaGhoaG2trauro6aC2VlZWVlZXl5eXQcqqrq6GRwC9EhIKCgoqKirS0tMTERNhrxWI5xjf3HB9f+pT4lmXZ6XQmJSUtLS1VV1dvbGxUV1fbbLajo6Pa2tqpqanS0lK/308pHRwchPM15fDuCCwZQWNoPEig4QVtbFkJnY4C3LCe3F18Kd7lysLkgGpmoMXFRbvd7vP5pqamsrKysrKyRkZGTk9PtYweMwUCgQ8fPnzzzTd2uz3uzKOlk5OToqIiv98vjlFltFwaUlv3fTyBDNylSEaYqJ9fhZWR1RZo2EHJkiR1dHQUFhaGQqH19fXu7u6PHz8Cz5GREbPZzODLPaTK4elCtk6EuzytJRIJLfWF0Go2488m49nJJ5Iw784Nx0Noc4FIFxcXJycnoJEkSWtraxUVFe/evSsrK1teXoZna4JWH9lhKfhhgJmRycydAAPqU0o9Hg9MuWJrE+F4I6Kc/8ba4YKi4qAIy8ZVBJkppUdHR7CehdNZ7ZJyye+ROBaRqoVd1fxUN8zzz5eq+JaUm+wk5VlTo6Oj29vbXMSllPb39zc3N2N8c6bEuMTwktTmKDnCHmI7ATmGsJWPoMVnGY0jOaCoNm9ugysJPyqdn5/39vYmJCSkpaX19fWxw/k5MZimHL5FeLG2AX6CeuXwxDlBG6EkYU0qpDaBi+GI/8vK99MkNBWInXt4eJiZmen1eolyyoGDO3nc+Fs/EqviPkZ8s8iHYa3jFWbHQCAA+8vYVAaLE52dnTD/jY3CWV9GnR2uEXuUbeHC4tHwSWUM35y/SXg3n1ZgxkrhejmfbW1tra+vs7vQ1YDR7u7uPnz4kJGR8fr1a5PJtLW1FUIbBkVukvLUY5YHt1gOixjfIjfsCxF/Mlo3xTxlNCHI+UUK77La39+HQ1KZFthEUeGbaHxdA5NYCqerAtcg/XV/LOtrGICwCWThmGr2B6CGN/GAShaLBea/scUxxJlpOHyzRBHf2EkY3yHlWIXlwa9r4KbF1MTNjN3CPpudnf3w4QMNxzy82Z1ZaWNjo6Ki4uXLlxkZGR8+fGCbk0RPMwEwKLkeiZlXVp6NSJTRgYv9zDtiNJGFlWPOF5jAoTs7Ozk5OWxrmiSEAKyRNrb/kidafHPpccA3hi/2nKx8+FPFN+THzQNU6unpgQ85qOIbG8sIvkVD4z5EUnYOuOVwXlTFNy6L8U0pXVhYGB8fp8ot8uw/Npfb7bZarUlJScnJyW1tbQcHB5yfmN2YviwEsnTcmEOhEFMND71EROI/3BtYzNTi4oCExnKYIaX04OAgMzPz4eGBs5tIPw18w8ZO7GMsn6Ts7wh6wsMdKA6xlNK+vj6YPwkpB4h4/ICdh9UTqxCdKm49x/jGuoixn6BQiondZSh3Op1ra2uMJxMGawGJYEm/3+9wOHJzc7/66quioiK73Q7jGVmWYWzD6U40gqikbIpiKVlttIAV4VDI6chlwHcppScnJzD+5rLhuCAyjBcZxK6RUn/Ft4QOq+ZKivgWXcJ5i1La1dUF0+SiIzn7cpVS9IDPMdeqWlL2OTLqOqlw9IIqqWrNBl1im8RaMF2YlQkhe3t7zc3NP/zww6tXr7q6ui4uLphXVIFFUOuKC25wdVKkKItBQyk9ODjIycnx+XwijJ6B4o9v/fpU8YdJNB/gG3akMMfDLdFzXIrIn2hEHSwYdg/zq3FbaGm9u7sL78+LIZDDBCch3Lq5uZmYmMjMzHz16lVlZSX70gvV2I3I2VlVWi1dRBUYk6haC6XU6XTm5+cH1Y59ewbSRXVkO2Div5+mmlWLEfYQl41S2t3d3dPTo+VIRlp3VdnKaOQtR+M2LW76qlFKJyYm4PlSlZtBhpIkra+vV1ZWvnjxIiMjY2pqCibOZTTWxz2VQaWeiCilOzs7RUVF+KHIiLJc5hjyqwLPID718G1QDo4i4hs+exkbcx1iAw/jzDkhIzZddjk1NTUzMxObFqL1T05OWlpafvjhhx9++MFqtbLP5Mrh7uLzwXdJScnPB986YwCd9Ij4ZvtjdbTVgZqssRk1BgQQYYyk2mmIBnI4HLCdRpXtw8OD2+02Ig8etNzf34+Pj2dnZ3///fcNDQ2w4uv3+6enp4PoKy6fiiil29vbpaWlkvKh/yeMb+4ZDtethWkdNwDP/v5+eL40qKRBE3DpBgceYikMOK3ikvJtXDGbz+eDL2lFVTvUGAqFVldXq6qqXrx4kZeXNzU19ec//xlmnJhsUbGNC0G9TqczPT0dj7/18RqbF7QoYvMw0gwU+NYqxn61SKf63t5eiN9x0VmrRcVmWYOKyLJ8cXFxeXnJSqnWHlu4ZVV//Pixt7f3xx9//M1vfvNv//Zvw8PDBmV7CgJ8d3R0/Pu///v29jZV9ng6peTPH9+cxDGLCzzZ/ElsTJ6ICNq3GJEopQsLC3DEMzH8TClrRAR9eVJSUv75n//517/+9X/+53+WlpbCpDvcYlOuzwP3m5ub//3f//3Hf/zH0tJSOdbWq09GOk85yokU1VtPiO+Ojg7YfxIbkycijO+InqOUTk5Ozs7OUo1PuMRlrEwI8Xg8vb29o6Ojdrt9dXXVZDK9evUKZlpubm6eDdlA7e3t//qv//rb3/72P/7jP3Z2duSngbgcfZz+vPBtsVi6u7t/6vgeGxtj+0/EMRJeruJqMfisIiu/Bsro6uqqr68vOTkZXpI6PDzE7ny6B9BQKLSwsGCxWLKysmZnZ/f29p6iOlWARswWT3w/XoGurq5Hxu9P9YzFSJIkt9t9fX1NhLUkGa2zsnQGZbwvKuLaISaifBE7GAwuLi4WFBQkJCTU19evra3BmiJFL4PGd+wLNne5XGVlZVBRXDqoqFyphXt9QIvZnhbfFosFzteMO/NnI0mSHh4e2EvNGN/gM0ntHQKi3NwXw+wK/MEj1IuLi87Ozh9//PH9+/fDw8NXV1eiU+OlNeC7tLRU3PT2PPTTwDe8a/gY5rEFj7iMiZkAc3Nz8HzJrbwwfAc1Tu9nO8NiqBRHO4Jez7u7u5uYmEhPT3/58mVVVRUcLoU9GBfFKaVbW1tFRUVR9TxxpM8F31R7LEgpbWlp6e/vj4G5qrgGyxLhyAcj1eFsXNXj4+MLCws0fOYOx5MIp92y/3inZESZjYsK4q2trZWXl3/77be5ubnz8/O3t7dwS3UjUES2YhUbGxslJSU6+NbHVlR1xYyQT4zvtra258d3DMThmxuHfPjwYW5uTtbYERoR38TA3j2D+AY7sLEspfTy8rK3t/f169fff/+92Wxm74nSR4xbGL7Lysp0RIoLvo03bP3aOSZR4Fv/sQDKSujFRHwLjkaISls5mh6WSR7Vs0tEGThQnp+fszOMOBzrC0zQlsOY5dHXCyzg9XoXFhYKCgpevHhRUlKysrLCGgAJ72omBiabMVsYnxgfXBln/nRE1egJ8d3Y2Agn/hiU73nwrQ84otykzkbSXBUxB55oyXhcp5Tu7OxUV1e/fPkyOTl5eHj4/v6eOSiqHWmA76qqKuPj779FfMcwPok2cwz41pqxZgSQYoBYW1tbW1vjrESea6Mfd3i5lsDwB4T0eDzDw8OZmZnv3r2rqanZ3d3F4DM4yt/Z2flbwbdWOiPVXphS2tvbC/u/GXF5VIetMetmMCeWWYsPU41SOjExAftjHyOkalmxExCzMWmN4JvJTMNHtZSUlPzpT39KTk6emZlhr/1rycMI8J2dnQ2b1J8fuBxGDeZXTVTfPyhpEFESniIQ8d3f3w+nt2mJFTGUGqFoRzUx4Ju9XxxHfOO4wJlXLB4R35iYIkCHh4etra2vX7/+7rvvWlpajo+PMRpUvUMpdblcubm5Pp8vNn0fSfHHt2ogEYndZX+wYzjD9fb24t2eqp57DGhio6jwTQjZ3993uVyPFFU0r2q8iBnfmJuE1jXZxPn9/f3i4mJ+fv7XX3+dk5Ozuroqoge3DXg/TTz/5Hko/viOtnpJkuDxBcehUCgER3+AWXt6erj5E/1WpJXNuFRiXUTZd7MUGmnliHVrcMmOc9CXwaBGOI8knNGDs7HHXCOTjOKMuxReQGXG2d3dhc1bCQkJw8PDbreb68BB993d3by8PPblYm4GhgobEyKSqk9ZdSwlWmTrUOz4Pj09zcnJ+dOf/jQ0NCSFF/D8fj+chgqzxRS9P4/1eTp8cyTiGw8DZKXPZBTXObdtb2/DMiFBLRmjU1J+Dk41MHMBmKWzwy1wWZzNOL5l5Uk1TEf8HWcZPYMODAykpqZ+9913zc3N+BkUYtPe3l5paSl7SZQQcnJyMj4+/uHDh8nJyZ2dHdFrnPFlAw9FnyO+KaWDg4O9vb0TExNffvnlx48fQcqZmRmTyXR5eZmZmQlnIbD9VdgWnNeJGvr/U1AAABhRSURBVHGRjPsj2hTjlQgBm7uU0KElWCRJ4zRK9n4xQejnMrOlHFVdWBFOGJYu5sFlZd3xiapxMEPGQUaNHJweCoW2trZgSjE1NXV8fJxNKTqdTth/wvB9dXX13XffmUymubm5d+/ewdc79KGCPaUKs+fGNxVGn6rSwBekQqFQamrqwcEBmKyqqgpmuwsLC6enpyml7e3t8H4DDR/xg4MEsx2DDrsrZpaUu/sJ6isZK1wcZ8ZluYqo7tnKoPXMzMzy8rLImSsr1qsjlX5ZKpzajM/hpuHdKQbLigqKMPJ4PIODg8nJyW/evOns7Ly6utrb24P1HYpmFYuKimCq1Gw2JyYmivCln8f8IL5Ux7eWuCQ800wpnZ2d7e7uDoU/H5qfnz82NkYpLS8vh+83wNKx2WxuaWm5vLz0+/19fX11dXVms/ni4uL29ranpwe+KHBxcXF3d2e1Wi0WS09Pz+XlJXyso7W11WKxnJyc3N/fDw8P9/T09Pf3n52deb1eOFt+aGjo8PAwEAgsLCyMjo5ardaDg4NgMDg/Pz8yMjIyMrK/vx8KhVZWVuDwefgyhN1uHxgY6O/v39vbI4Q4HA6bzQaZJUlaW1sbHR0dHR3d29ujlPb09FRWVo6Pjx8eHoZCoc3NzcnJycnJyd3d3VAotL6+DpxdLhdcDg8Pj42NAautra3x8XHG2eVyzc7O2u32o6MjSZL29/dh8xbcPTw8XFpastvte3t7cDk7Ozs9Pf3x40dJkvb29ubm5ubm5qCis7OzpaWlhYWFw8NDOPx/dXV1cXERws3R0dHS0tLKyorT6ZQk6fz8fHV1dW1tzeVyBQIBj8ezubm5ubl5eHgoSZLH49ne3j44ODg+Prbb7enp6b///e+///77rKwsHOMkScrKympubrZarV9//TXEMnb3p4HviMR67aurK4vFAh/HAQ4NDQ3w2Z3CwkJ44WVwcLCkpGRjY2NxcfHu7g56w4WFheXl5dvbW5/Pt7m5uby8vLa2BpcbGxvLy8vLy8t3d3eBQGBtbW12dnZ+ft7tdvt8PrvdPj09PTs7e3V15ff77Xb75OTk1NTU2dlZMBjc2NiAgzABhYuLi6Ojo2NjYwCOjY2NiYmJ0dHRg4MDgPv4+Pjk5OTp6SkhZHNzc2xszGq1wgcbHA7HyMiIzWYD2G1vb09OTg4NDQHsAP0jIyM7OzuSJM3MzLS3t1sslo2NDULI/Pw8vNWxtbVFCFleXu7u7u7u7nY4HLIsr66u9vf3W61WeClmdXW1q6urp6dneXkZLuHEgYWFBUmSHA4HvAC1srIiy/L8/Dx86WFubo4Q4nQ6LRZLZ2fn0tISIWRjY6Ojo6OzsxPuOhwO+OoIPCBtb2+bzWaz2TwxMREIBJxOZ2dnp9lsttls0MyamprgwYlSenh4WFVVVVBQ0NPTQ5QPRbm5uR0dHVtbW3V1denp6fjFIlVsibhSzayTX7WUQbjGju+Tk5OCgoLu7u7x8fGlpaXp6emjo6P19fXm5ma3211UVATj797eXpg/YVXg/1wvwfW5qlpp3dW/jKoisezZ2Rk73pu7qzPUiXgZkZWsHGPIGkMOKgxX2DCSoqEFu8RnAbDnWoq2s3MDRRyhi4qKIHIdHx//4Q9/gP6NI328qmbWya9aSiubaqlYvk9is9m+//77pKSk169fO51O+JxzMBiED+4sLi4Cd4vFAuvzUYkl6hNRWyDVZzsuAmFn6xia5aeUTkxMgFM5I6hahpOT1Yg7eiJMhqg+7cjKZ0furoTm8lgKzskZAT+5svwSOnmZy+/3+/f29tjxi7IsX15ewjtEU1NTubm5JpMJVn9ULWnQd2K6aFixlEEgQU5D+Bb1ZzVJkmSz2WZmZuA57/r6moaDE8O3EWkiChqVbvEiSuno6Ch03LKwbVBrnoeRKmo/E9JqPOBct9ttsVjw+SeXl5cOh2NxcXFqamptbU3W7WAjOkvrbhxdHAW+OcIRwufzra2tPTw8+P1+Ga2bUEq7u7vhi5hxEfRT4XtxcXFpaYnhm824EeX8pg4T/TbwGRKlFN7nF8/3wV54CnyLFLPFosC3qrgEDddCoRCs5eIi7HzN2OQTa39+fEtocRFSGFhZ/67jACzzZ4ts0aqU0uvr65GREUm52KRaKr745mLBY4wWBb71iRvmMtY9PT1xOZ/NoO20zPFIBa+urq6ursROPNoX4zFxQ2cmJ5ftkzRpIEmSYMorYk5VCaOFe7RkpFHFDd8isBi+4xi/WUVaxtJS5DEKUkonJiampqao8A7bY94tp2oRXavFfpLA7/f7T09Pjbz8/9PAN9EgxlE1UauPJuEz7Iw8Xxr0IssWLb4fQ5TS0dFR+CC8qPgjmRtX+ZG1RMuEUnp1ddXb22tER32zx4ZsgzLrM1fBd3grRIRvtbBElpmrD1DY1dX1mPM19XEcd3xr8ZyZmYH35z9JHH08xYZvj8cDi9NGMscd3wYpIkL+im8un06Kjqy4DVBKOzo6HnO+vZZj9NNjq0vW3gB0f39/f3//+Dj6qSg2fF9fX/f39/988P3ImkQLUkrb2tpgxZ7leWQtcSRi7AGREOL1euEz7KoZns55EYkqlydFHHOyRdXpw54WSdjz+EiZCVpjYty4IQNBu4KJ8gRdrHjEWp4c3z09PXGZ/34iMuItSun8/Lzdbv+EONaiiPjmKKpATghhX7LFxaMVkqANm7ISebir5yDO8O12u+fm5qClUeFDZfoUT3yrThH29vYODg5SjWVqWQ1hXIqqQePSD3AhRIsoOr9Ki8+n6pci4lv1MqK0ALjr6+vR0dG4xG9CiNPpnJ+fv7i4kCTp6upqamrq6OiICX97e+twOHw+H5YQ/uzs7JhMps7Ozv39/a2tLRqecdevMfbxifjoSdS+agl1tLe3w0ZZvPlBUm7hZ3xoeHM2ZkJ0t2oQgbgqxCKyhte1OFNKp6amHA4HbqVi1aJlqMaUFANlVMQZVlRNlA07hWi/SqJaF6X07OwM5k9YesSJBywbp+nGxsbLly/39/dlWT47OyssLDw8PASed3d3bW1tqlu1YGVtdHR0YGDg5uamsbERPlSkqr7WKNzo/hNJOKA6IvX29sKO8J80ud1udrrf3w5dX1+Ln0kxTkdHRzabDV7GBSosLAQwHBwcwPtQ0Pamp6dhEdDlcq2trQ0PD29sbGxsbNhstoeHB0rp9vZ2XV2dLMuw6ZdrXVxzih3fhJDt7e2Wlpbm5uampiaTydTc3NzQ0NDQ0GAymVpaWpqamtra2sxmc319fXNzc3Nz88uXLxMSEuBWS0tLXV1dXV1dQ0NDbW1tXV1dTU1NRUVFQ0MDJELxtra21tZWePHHbDY3NTV1dHRACmyGbmtr6+zshJNpYf3IYrF0dHTAt1A6OzstFkt7eztszbVYLLDBuq+vb2BgoK+vD45k6e/v7+np6ejoAD4wjhoYGLBarX19fV1dXf39/bB9fHR0dHx8fGJiYmxsbGxsbGZmZmpqCr4YODc3t7CwMDs7C+8o2O325eVlu92+EKbFxcXV1dWlpaXFxUXYxLKysrK8vLy0tLS8vAz/4bUDh8MBv6urq7Ah3uFwOByO5eVlh8OxsrLicDiAD2RYXFyEjfJwCQwhkdW4srKytLQEfNbX1yEdWK2urm5sbLBbm5uba2trOzs729vbW1tbTqeTQW0nTNvb23t7ey6Xy+Vy7e/vHxwc7O7u7u7uQqLT6dzd3YWDBnZ2dlwu1+Tk5O9+9zt4Qxe+gTg7O/v+/Xufz2ez2Q4ODmh4MF1XVwfHy1gsltevXzc3N7948aKqqiorK2tgYODjx4/9/f1DQ0OEkNvb28zMzPPzcwZXBt3H4huamt1uz8vLKy0tzc/PT0tLy8vLKy4uLiwsTE9Pz8/PLysrq6qqKikpKS8vN5lMTU1Nb968SUtLM5vNtbW1NTU1NTU1dXV1JpOpvr6+rq6uuroa8A2tpaamxmQyAfTr6+tra2urq6trampKS0uLi4srKytLSkqgOhCgpKSksrKyrKyssLAwPz8/JyenqKgoPz+/uLg4Ly8vPT09IyMjPT09JSUFxMvNzc3Pz4fEjIyM7Ozs1NTUlJQU+J+VlZWWlpaZmZmRkZGSkpKYmJgWpuTk5NTUVMiWkpKSkpKSmpqamZkJnFNSUtLS0hITE+EyOTkZMqSmpiYlJaWmpiYkJCQlJb1//z4hIQEyQ4aEhAQolZKSkpSUlJKSkpycnJCQ8P79+6SkpKSkpLdv37Iq0tPT09LS3r9/D/8zMzMhBWpMT0/PycmB6iAlKSkpMTHxzZs3sI0ZOL958yYxMfHdu3fv3r1LSEh4+/btmzdvQLZXr17B3bdv375+/TolJeX9+/fACiQHUSHzjz/+mJiYCFUw3eFuVlYWWDg5OfmLL774p3/6p9/+9rcDAwOSJAWDwaysrImJib6+PpiPAioqKoLDKux2e2NjI6W0pKTk6OjI4XBUVlaen58vLCxA/ynLclJSErwrqA9X3JM84fikv7//ZzA+oWgXkYzGfLA3Gkal7DV49vVK+M8oEAj4fD6fzxcIBODS6/UGAgG/3+/1er1eL5yif39/7/P5Hh4eHh4e7u/vcXFWBcxJA2KAG84DG918Pp/X6/X5fPf398Af2N4hur+/v7m5eXh4uL29vb6+vr6+vru7u7m5cbvdHo/H4/Hc3Nzc3t5CIvyHWxcXF263Gz5rAXRzc3N9fQ0DOajR6XT+93//d0pKyuzsrNfrhfg6PT395Zdf4o8ZUUrLy8tXVlYopXNzcy0tLZTSysrKs7Ozzc1Ns9nMXACmTk1NhQ+cR41v5j8diHOXRPncww32KaXd3d3wfMk9lIjjJ1nt4YmTWKsI93DDMVdNVGWlOqrDMuON77KwgY4IhJsEVb5WY7xdqRYRE3FO1btR1WuEpz4dHx9PT0+zT6mAQa6vr7Ozs91uN/ZOZ2cnDMcHBgbKysqur6/fvXu3vb09MTFRXFwsoZf/PR5PcXExvNtuhKBqo/iOioBbZ2fnc85/x1cF6K9k5ZQtuyW2dvwWDDetxr1B8zzExZSIxIFYFqauoyJmPSwPTA5ya6KHh4dms/n+/n53d3d5edntdtvt9uPj4729PbvdDpuugdvo6Gh/f79xGZ4D3/AMHi+2OnXFXYVgMHh6enp7e0vC77Ps7OywMQmHGyl8yJEWvqXweSmqwsdLZkzR4psVuby8hOMo4BImrWMTkgjTiFS5EgmJ8GK4LMtUOOuCWe/k5MRqtd7f38sGemMgBb5jkD4id4vFEm38pk+2jSnaBmC321+9egUz30dHR2azuaurC7b8q67q64vNDgCKTZhnIOiCOjs7X7x4kZiYCGcHDA4OmkymgYEBdlBbvIipD/Z0u904rmPLgNE8Hg+MdvS54cvY8W0kNlBKu7u7ozrfXo4e30/X419eXr59+xaOs6mpqbFarZIk5ebmnp6exsBNp1U856BFn05PTxsbG/f39/Py8srLy10uV2Zm5sPDQ319PUzhxbEuPAoi6FCdiPmN3H0svo0QpbSrqwvvr5INuNMIvnHrMi55tP21z+dLTk7e2NiQZTk9PR0CeWpqKvcufVS1a10+HeFhElHbIsFIkiR4iZZS2tvb29vba7PZampqKKVDQ0PV1dX6rolhuE+FAbq+IjoZYsH3I4cKlNK2tjZu/K0axgyaRgQ0VZIogBxNgCeIZFn2+XyJiYnr6+uSJL17987pdFJKMzMzOXzHJTpoWYAoV8Vj4MwebUPoe7P4jFkmPIujd3d35eXlHo+ntbUVjm+3Wq3FxcWPx4NoqGhbRVR1RcA3UVsTiqoOi8UC84OYp6oXY8M3UVLE/BH5Y1Z+vz81NXV9fZ1Smp+fD6/QZ2RkuFwusZTBKqKluOCbAZphHT/sYnzD7/T09O7uLqV0eHi4rq4OwjnMTP988E2MHcirSiwSdHV1wf5BI/kNdk8cvtkuIqLs/eUo8U0EOj8///Of/zw5OSnL8vz8fHNzs91ur6ioYEe+GxfeeKVa2UQddbjhRFwQT1NyMzzwGwwGW1tb8/Pzh4aGent7YSB+fHxcWVkJ7TyO+GaVPhO+ueq5k4JZX68lCiuOi3R0dHDjb1USleS4yRpTzsxVeG6OGJtpZiqzInh2Twqf2TczMwNrhIODg+wDk6zlUDQDwDmMSY4Ny90KKUkroBA0qJCFrbDMULipY8LxW7U3YDkvLi4qKythv8PAwEAoFJqYmDCZTBMTE9xZ0mJxfWur2l9+9BgBc9Mize+TYOmxEVWVUfWrwffTtEyG01XrZRbn/GoE31wVHL5hxRsk594hV5VNC98sUVVZrkXpyMwZlruUH4dv2B1AhC0YcLgPrK6LCnKy6Vtbh54P36oQwdJL6K0h/KQolgKesF+Phvd/c47EbEXbcUV0BktEGEqxTRpcNk4GTjUsA+Thhq2qGJLD8VVSEpvwZuGZMWGRGDMUdcRVMw46aBAtRgTCSqlWhE2qahPGhOPM2VlLSFFabEai/ISTbPjxnWMVGd8yitZEiW9Rf2xZXEFPTw+MT0S7UzSY08c3UbYlVd1iwDcHKbH/lZRfaNACjayBbwYCPPwQ8a2FEhl9OgeLquVsbAR9fGtZkqAPjXNgwGWJMXyraiTWKDpIJ39EIgK4NfGtKmW0+O7r62Prl+QR+CbKb7yLWsWAbwY7VkTVo6J3OW5YAKLWDETmEd9rZhbgYCRr7zPD9vkc8K2jHRCHQlktnkbLTWRL9c/3YXUwCVgKZylmAoLwbbFYmpqaROay9utbOAjh/Dp6EgHfGIjYBDKCDgaBrIw6LDPTkQM3Vy/Lhi3AJJGUO09YHqr9yE5QO8EhHOvC1cXZkFONa2CqZuTq1WkkInFMiAAYOYwiHcL5caIOcdlULyOcXwXWocq5ES3i8L27u7u2tkbUmqM+vrm7WjjAXsEpRvCtyh+LJys7Fi18a1mAXariW1KOT7SU4iIl1kUUSUsSWfngpGoZsY+V0KBfn1TFiBe+9VEeH3yLvtFq5RjfrAIRBHIkfEvKsa/8BPgWgxwnnqx88NLCt6TW4RBlEMXZiFr/LmoEMkjoI2+cLlrAYikiZ53qCGrGUUVuUUItT5GY8K3jdzkqfGvprHNXv25Wh34GVVI1dAx8noFEf4syEzRAVyWOJ+dyLRuy4lTZu2I+T2c3LsAZLKUDbiOl9NOjwLd+9cYli41UI1N8q4iX/FpIxcwJGndxpnsMvkUvcBo9Kb5jo88F3xyLR2jEk47FidoT9OdGYmCWhNkY1VKPrzoqTHxupIXs2HQRW7JWa38+fOPOVD9PXKp7BuLwbbybjo1+wTfHTYs5Tnzu+K1DNModrZ+EsEGIcobkqQ31C745blrMceJTvd9gUEojaCbacwKfnEh4WcSIDUV3Psb4uJnhS5b4pP2JwQkGjvRRTjVG0lp8jDD/CeAbKDaDPjU9Et+PIX0+v+A7/viOVmGGb53JMsw5vvhWZSXWwmUTL1Wn21VJdNtjNKJopy731PtIzkaIM5T+tAGW+ZPh2/hkM9ONKmdexRUvWTC0qraysKdFRu+eaFUHpLUeoSUzu6s6C2lwdUNcGFJFuZYweLlHNIiYHtEdeH5da91HS0h9mZmP9O2jX6kc62RlxPbAzKXVSP6Cb+4VAYMmEAEnbnVgf8TuUhXfIulUR4SNfloqiHdVHSZeEuUqHedOTkKxUtXlD05gg01Uxx2q+OZ4ShqroVqGMtLOcWZiAN9cCItIccO3vp+0rCAqo49vjnNEfBOEMKKNb1WL63gOy6PjLe6PrBatWUU68VvHeozbE+Gb42aEJ9aRcZAFyGpZTDS1JOwpMqiXbAzfVNg5iMv+9f00TiAsqFiraFauLEMk48CZQPSQqoMltXcCxBqJQGIVnJW1Nk4QBDhuG4ys3H0qo05JNU5zAnPpzBNYF9H4WoAQi4vcsC+0bCUKLN6lwjMDR9gsXBhSNYtBwngV03XgLuvgW/Q6a4JYW1V7PRLfYjci4lu0rGo6VwWDDrtLBMARA/iWEWTlSPjWEYmo4VvV+KoWkz8RvnHHxXnhs8a3qD9nC1XjqjpDy50cgsWCsrJLxcDi0Ek0dtmzkMzKGseQyFlSDlip2myPEZWJgDz94qJtOafqqyDWLgkDFQmdyyr6VF9NrlKuCvZHnGwQuyZZIFwLh1QMX6I94FbHN+OOaxKr52yBGelk5kTX4awjgHgp8sHWx7IZEU/kzFURFRMdISOSVkXR6qJTO1PQSL0Ra5GVlle1nlhdRNLBN5fIpeD/ivMhfqFf6GdGv+D7F/o50/8DncMFnRnJpE8AAAAASUVORK5CYII=)
A. 2,0 .
103 J
B. 5,5 .
103 J
C. 8,0 .
105 J
D. −2,0 .
106 J
E. −4,0 .
106 J
17. Sejumlah
gas ideal menjalani proses isotermik, sehingga tekanan menjadi 2 kali tekanan semula,
maka volumenya menjadi ....
A. 4 kali
semula
B. 2 kali
semula
C.
kali semula
![](file:///C:%5CDOCUME%7E1%5CUSER%5CLOCALS%7E1%5CTemp%5Cmsohtmlclip1%5C01%5Cclip_image026.gif)
D.
kali semula
![](file:///C:%5CDOCUME%7E1%5CUSER%5CLOCALS%7E1%5CTemp%5Cmsohtmlclip1%5C01%5Cclip_image028.gif)
E. tetap
18. Urutan
gelombang elektromagnetik mulai dari frekuensi kecil ke frekuensi yang besar
adalah...
A.
Sinar , sinar
ungu, inframerah, ultra ungu
B.
Sinar , ultra
ungu, inframerah, sinar X
C.
Inframerah, ultra ungu, sinar X, sinar
D.
Sinar X, sinar , ultra
ungu, inframerah
E.
Inframerah, sinar , sinar
X, ultra ungu
19. Perhatikan
diagram pembentukan bayangan pada mikroskop berikut !
Jarak
benda terhadap lensa objektif 1,1 cm, jarak fokus objektif 1 cm dan jarak fokus
okuler 5 cm maka perbesaran bayangan mikroskop tersebut adalah ....
A.
25 kali ![](data:image/png;base64,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)
B.
30 kali
C.
40 kali
D.
50 kali
E.
55 kali
20. Pemanfaatan
gelombang elektromagnetik dalam pengobatan memilki efek menyembuhkan dan dapat
merusak. Jenis gelombang elektromagnetik yang energinya paling besar sehingga
dapat merusak jaringan sel manusia adalah...
A.
Inframerah
B.
Gelombang mikro
C.
Sinar gamma
D.
Ultraviolet
E.
Cahaya tampak
21. Gelombang
elektroagnetik yang mempunyai daerah frekuensi ( 1016 – 1020
) Hz dan digunakan untuk teknologi kedokteran adalah..
A.
Gelombang radio D. Sinar
ultraviolet
B.
Sinar E. Inframerah
C.
Sinar X
22. Gambar di bawah
ini menyatakan perambatan gelombang tali !
Jika periode gelombang 2 s, maka persamaan
gelombangnya adalah ....
A.
y = 0,5 sin 2(t −
0,5x)
B.
y = 0,5 sin (t −
0,5x)
C.
y = 0,5 sin (t −
x)
D.
y = 0,5 sin 2(t −4x)
E.
y = 0,5 sin 2(t −6x)
23. Sebuah
gelombang yang merambat pada tali memenuhi persamaan:
y = 0,03
sin (2t – 0,1x), dimana y dan x dalam
meter dan t dalam sekon, maka :
1)
Panjang gelombangnya 20 m
2)
Frekuensi gelombangnya 1 Hz
3)
Cepat rambat gelombangnya 20 ms-1
4)
Amplitudo gelombangnya 3 m
Pernyataan
yang benar adalah...
A.
1, 2 dan 3
B.
1 dan 3 saja
C.
2 dan 4 saja
D.
4 saja
E.
1, 2, 3 dan 4
24. Seberkas
cahaya monokromatik dengan panjang gelombang 500 nm tegak lurus pada kisi
difraksi. Jia kisi memiliki 400 garis tiap cm dan sudut deviasi sinar 30° maka
banyaknya garis terang yang terjadi pada layar adalah...
A.
24
B.
25![](data:image/png;base64,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)
C.
26
D.
50
E.
51
25. Tiga buah pegas
dirangkai seperti gambar disamping!
Jika
konstanta pegas k1 = k2 = 3 N/m dan k3 = 6N/m, maka konstanta susunan pegas
besarnya ….
A. 1 N/m ![](data:image/png;base64,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)
B. 3 N/m
C. 7,5 N/m
D. 12 N/m
E. 15 N/m
26. Dua buah
benda bermassa sama bergerak pada satu garis lurus saling
mendekati
seperti pada gambar! Jika v2’ adalah kecepatan benda (2) setelah tumbukan ke
kanan dengan laju 5 m/s, maka besar kecepatan v1’ (1) setelah tumbukan adalah
….
A. 7 m/s D. 15 m/s ![](data:image/png;base64,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)
B. 9 m/s E. 17 m/s
C. 13 m/s
27. Seberkas
cahaya jatuh tegak lurus pada kisi yangterdiri dari 5000 goresan tiap cm. Sudut
deviasi orde ke dua adalah 30°. Panjang gelombang yang digunakan adalah...
A. 2500 Å
B. 4000 Å
C. 5000 Å
D. 6000 Å
E. 7000 Å
28. Tiga buah muatan disusun seperti pada gambar
di bawah ini.
Gaya Coulomb yang dialami muatan B sebesar .... (k =
9 ´ 109 Nm2 . C−2, 1 μC =
10−6
C)
A.
9 ´ 101 N ke
muatan C
B.
9 ´ 101 N ke
muatan A![](data:image/png;base64,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)
C.
18 ´ 101 N ke
muatan C
D.
18 ´ 101 N ke
muatan A
E.
36 ´ 101 N ke muatan
C
29. Seberkas
sinar monokromatis dengan panjang gelombang 5.000 Å (1Å = 10−10 m)
melewati celah tunggal menghasilkan pola difraksi orde terang pertama seperti
pada gambar. Lebar celahnya sebesar ....
A. 0,001 mm
B. 0,004 mm
C. 0,012 mm
D. 0,017 mm
E. 0,019 mm
30. Seberkas cahaya jatuh tegak lurus pada kisi
yang terdiri dari 5 000 goresan tiap cm. Sudut deviasi orde kedua adalah 30°. Panjang
gelombang cahaya yang digunakan adalah ….
A. 2 500 Å
B. 5 000 Å
C. 7 000 Å
D. 4 000 Å
E. 6 000 Å
31. Tabel taraf intensitas setiap satu sumber
bunyi.
Sumber
bunyi
|
Taraf
Intensitas (TI)
|
Suara
kicau burung
|
80 dB
|
Sirine
mobil ambulan
|
100 dB
|
Guntur
(halilintar)
|
160 dB
|
Sebuah mesin mobil menghasilkan taraf intensitas
bunyi TI = 70 dB (Io=10−12 watt.m−2). Agar suara mesin
menghasilkan taraf intensitas yang setara dengan suara sirine ambulans, maka
diperlukan jumlah mesin mobil sebanyak ....
A. 20 mesin
B.
30.mesin
C.
100 mesin
D. 1.000
mesin
E.
3.000 mesin
32. Cahaya monokromatik dari sumber yang jauh
datang pada sebuah celah tunggal yang lebarnya 0,80 nm. Pada sebuah layar 3,00
m jauhnya, jarak terang pusat dari pola difraksi ke gelap pertama sama dengan
1,80 mm. Cahaya tersebut memiliki panjang gelombang ....
A. 320 nm
B. 480 nm
C. 550 nm
D. 600 nm
E. 900 nm
33. Seseorang bergerak dengan kecepatan 10 m/s
mendekati sumber bunyi yang diam, frekuensi sumber bunyi 680 Hz. Setelah sampai
di sumber bunyi orang tersebut menjauhi sumber bunyi dengan kecepatan yang
sama. Jika kecepatan bunyi diudara 340 m/s, maka perbandingan kedua frekuensi
yang didengar ketika bergerak mendekati sumber dengan saat menjauhi sumber adalah
....
A. 33/34
B. 33/35
C. 34/35
D. 35/33
E. 35/34
34. Pada jarak 100 meter dari suatu sumber
bunyi terdengar bunyi dengan taraf intensitas 35 dB. Pengamat yang berada pada
jarak 10 meter dari sumber bunyi akan mendengar taraf intensitas bunyi sebesar
....
A. 15 dB
B. 25 dB
C. 35 dB
D. 45 dB
E. 55dB
35. Sebuah
penghantar lurus panjang dialiri arus 2 A seperti tampak pada gambar di
samping. Besar dan arah induksi magnet di titik P adalah .... (μo = 4 . 10−7 Wb A−1 m−1)
A. 8 . 10−5
T, masuk bidang kertas
B. 6 . 10−5
T, keluar dari bidang kertas
C. 4 . 10−5
T, masuk bidang kertas
D. 2 . 10−5
T, keluar dari bidang kertas
E. 1 . 10−5
T, masuk bidang kertas
36. Energi
elektron atom hidrogen pada tingkat dasar = -13,6 eV, maka energi yang
dipancarkan elektron ketika bertransisi dari lintasan n = 2 ke tingkat n = 1
adalah ….
A.
6,82 Ev
B.
9,07 eV
C.
12,09 eV
D.
8,53 eV
E.
10,20 eV
37. Perhatikan
rangkaian listrik berikut !
Besar kuat arus yang mengalir pada hambatan 4 Ω
adalah .... ![](data:image/png;base64,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)
A.
1,0 A
B.
1,2 A
C.
1,6 A
D.
2,4 A
E.
3,2 A
38. Tiga
muatan listrik disusun seperti gambar. Agar muatan uji P bebas dari pengaruh
gaya elektrostatik muatan Q1 dan Q2, maka nilai x adalah ….
A. 4 cm
B. 5 cm
C. 6 cm![](data:image/png;base64,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)
D. 7 cm
E. 8 cm
39. Pernyataan
yang benar tentang efek fotolistrik adalah ....
A. peristiwa
dapat dijelaskan dengan menganggap cahaya sebagai gelombang
B. elektron
yang keluar dari permukaan logam akan berkurang jika frekuensi
cahayanya diperbesar
C. intensitas
cahaya tidak mempengaruhi energi elektron yang keluar dari
permukaan logam
D. efek
fotolistrik terjadi pada daerah inframerah
E. efek
fotolistrik akan terjadi, asalkan intensitas cahaya yang mengenai logam
cukup besar
40. Pernyataan
di bawah ini yang sesuai model atom Rutherford adalah ….
A. elektron
tidak dapat mengorbit di sembarang lintasan
B. atom
terdiri dari muatan positif dan negatif yang tersebar merata
C. atom
merupakan bagian terkecil dari suatu unsur
D. muatan positif dan massa atom terpusatkan pada
inti atom
E. jika
elektron berpindah lintasan, maka akan menyerap energi.
41. Perhatikan
pernyataan-pernyataan berikut :
1) Atom
terdiri dari electron yang bermuatan negatif dan inti atom yang bermuatan
positif
2) Elektron
mengorbit inti atom seperti planet mengorbit matahari
3) Elektron
mengorbit inti atom pada orbit yang stationer tanpa memancarkan energi.
Yang membedakan model atom Rutherford dengan model atom
Thomson adalah penyataan ….
A.
(1), (2), dan (3)
B.
(2) saja
C.
(1) dan (3) saja
D.
(1) saja
E.
(3) saja
42. Energi
elektron pada keadaan dasar di dalam atom hydrogen adalah -13,6 eV. Energi elektron
pada orbit dengan bilangan kuantum n = 4 adalah ….
A.
1,36 eV
B.
0,85 eV
C.
1,24 eV
D.
0,76 eV
E.
0,96 Ev
43. Perhatikan
gambar di samping. R = 300 , L =
0,9 H dan C = 2 μF dihubungkan seri dengan tegangan efektif 250 volt. Jika
kecepatan sudut = 1000 rad/s, maka kuat arus efektif yang mengalir dalam
rangkaian adalah …. ![](data:image/png;base64,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)
A.
0,5 A
B.
2,0 A
C.
1,0 A
D.
2,5 A
E.
1,5 A
44. Perhatikan
diagram rangkaian RLC berikut ini. Kuat arus maksimum dari rangkaian adalah ….
A. 1,3 A![](data:image/png;base64,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)
B.
1,5 A
C.
2,0 A
D. 2,4 A
E.
2,0√2
A
45. Arus
pada sebuah kumparan (500 mH) berubah setiap saat menurut fungsi i(t)
= 2t2 + 4t – 3. Besar GGL induksi pada saat t = 0,1 sekon
adalah …
A.
220 Volt
B.
4,4 Volt
C.
200 Volt
D.
2,2 Volt
E.
22 Volt
46. Gaya
gerak listrik induksi dapat ditimbulkan dengan beberapa cara, satu diantaranya
adalah …
A.
meletakkan kumparan kawat dalam medan
magnet
B.
menggerakkan kawat dalam medan magnet
searah garis gaya magnet
C.
memasang galvanometer pada ujung-ujung
kumparan
D.
mendekatkan batang magnet pada ujung
kumparan
E.
menggerakkan kawat dalam medan magnet
sehinggamemotong garis gaya magnet
47. Sebuah
kumparan 500 lilitan di letakkan di dalam medan magnet yang besarnya berubah
terhadap waktu. Jika kumparan mengalami perubahan flux magnet dari 0,06 T
menjadi 0,09 T dalam waktu 1 s, maka GGL induksi yang dihasilkan kumparan
adalah ….
A. 1,5 V
B.
6,0 V
C.
15 V
D. 3,0 V
E.
9,0 V
48. Pada
sebuah kumparan dengan induksi 0,8 H mengalir arus listrik dalam waktu setengah
detik berubah dari 40 mA menjadi 15 mA. Besar GGL induksi yang terjadi pada
kumparan adalah ….
A.
15 Mv
B.
25 mV
C.
48 mV
D.
20 mV
E.
40 mV
49. Dalam
pengaruh medan magnetik 2,5 x 10-3 T, sebuah partikel bergerak dengan kecepatan
3 x 106 m/s dan membentuk sudut 30° terhadap arah medan magnet. Jika muatan
partikel 1,6 x 10-19 C, gaya magnetik yang dialami partikel tersebut sebesar ….
A.
7,5 x 10-16 N
B.
3,0 x 10-16 N
C.
6,0 x 10-16 N
D.
1,5 x 10-16 N
E.
4,5 x 10-16 N
50. Radio
isotop I-131 dimanfaatkan untuk...
A.
Melakukan reaksi fotosintesis
B.Uji mutu
kerusakan bahan industri
C.Pengobatan
kanker
D.
Mendiagnosis penyakit ginjal
E. Mendeteksi
kebocoran pipa
1 komentar:
Terimakasih
Posting Komentar