SOAL MATEMATIKA KELAS 5 SD
Soal MATEMATIKA Kelas 5
I. BERILAH TANDA SILANG (X) PADA HURUF A, B, C ATAU D PADA JAWABAN YANG BENAR!
1 . 45 + 56 = n + 56, Maka n adalah :….
a. 45
b. 56 c.65 d.54
2. n + 498 = 754 + 498, Maka n adalah ….
a. 754 b. 498 c.239 d.894
3. Hasil dari (-20) + 5 =….
a . -4 b. 15 c. 5 d. -15
4. Sifat komulatif dari 4 X
6 =…
a. 4 X 4 b. 2
X 5 c. 5 X 2 d. 6 X 4
5. Nilai dari 22 X 5 =…
a. 120 b. 220 c. 110 d. 210
6. Sifat Asosiatif adalah …
a. pengelompokan b.
pertukaran c. penyebaran d. pembagian
7. FPB dari 42 dan 63 adalah …
a. 4 b.5
c.6 d.7
8. Hasil dari 82 =…..
a. 16 b. 64
c.46 d.19
9. 42 + 52 = n, nilai n adalah ….
a. 15 b.51 c. 14 d.
41
10. Taksiran rendah hasil dari perkalian 26 dan 53 adalah
a. 1500 b. 150
c. 1600 d.160
11. Hasiln dari 122 – 42 =…
a. 128
b.138 c.148 d.158
12. Lawan dari 45 adalah ….
a. 54
b. 45 c.-45 d.-54
13. -294 + (-100) = n, nilai
n adalah …
a.-394 b. 394 c.494
d.-494
14.
=… adalah …
![](file:///C:/Users/TIMBUL~1/AppData/Local/Temp/msohtmlclip1/01/clip_image002.gif)
a. 14
b.13 c.12 d.11
15. 4397 – 3876 =…. adalah…
a. 215
b.521 c. 512
d. 125
16. Hasil dari 12 + (-4) X 5 adalah…
a. -8
b. 8 c. 40 d. -40
17. 67,5 dibulatkan kesatuan menjadi….
a. 76
b. 66 c. 68 d. 86
18. Jumlah taksiran
penjumlahan puluhan terdekat dari
66 + 35 adalah…
a. 140
b.130 c.120
d. 110
19.
di ubah menjadi persen adalah…
![](file:///C:/Users/TIMBUL~1/AppData/Local/Temp/msohtmlclip1/01/clip_image002.gif)
a. 50 %
b. 25 % c. 20%
d. 10%
Besar sudut disamping adalah…
a a. 100 b. 500 c.
600 d.900
23. Sekarang Pukul 09:00
empat jam kemudian pukul..
a. 10:00 b.11:00 c.12:00 d.13:00
a. 10:00 b.11:00 c.12:00 d.13:00
24. 2 windu + 5 tahun adalah…….tahun, a.
21 b.22 c.23
d.24
26. Andi pergi kesekolah pukul 06:00 Wib sampai
kesekolah pukul 07:05
Wib. Berapa menit Andi
berangkat kesekolah..
a. 30 menit b. 35 menit c. 40 menit d. 45 menit
27. Bu Ima membeli 12 bungkus kue, harga satu kue
Rp 2040,-. Jika uang
Ibu Rp 30000,- berapa kira – kira
uang kembalian yang di
terima bu Ima …..
a. Rp 21000,- b. Rp 24000,- c. Rp 5000,- d. Rp 6000,-
28. Bentuk lambang bilangan
dari negatif 45 adalah…
a. + 45 b. ! 45 c. x 45 d. – 45
a. + 45 b. ! 45 c. x 45 d. – 45
29. KPK dari 4, 6 dan 8 adalah….
a. 24
b. 23 c. 22 d. 21
![](data:image/png;base64,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)
JAWABLAH
PERTANYAAN BERIKUT DENGAN BENAR
1 . 237 + 437 = 237 + n, nilai n adalah ………….
2. n X (594 + 321) = (40 X 594) + (40 X 321). n =………………
3. Lawan dari -30 adalah……….
4. Bulatkan bilangan menjadi satuan
terdekat , dari 49,6 =……….
5. Gambarkan sudut yang besarnya 900 =…………………….
No comments:
Post a Comment