![](https://rs.olm.vn/images/avt/0.png?1311)
Hãy nhập câu hỏi của bạn vào đây, nếu là tài khoản VIP, bạn sẽ được ưu tiên trả lời.
![](https://rs.olm.vn/images/avt/0.png?1311)
![](https://rs.olm.vn/images/avt/0.png?1311)
A, 1125 - ( 347 + 1125 ) + ( -65 +347 )
= 1125 - 347 -1125 + ( -65 ) +347
= ( 1125 -1125 )+( 347 - 347 ) + ( -65 )
= 0 + 0 + ( -65 )
= -65
b, -23 . 63 + 23 . 21 - 58
= -23 . ( - 1 ) . 63 + 23 . 21 - 58
= 23 . ( -63 ) + 23 . 21 - 58
= 23 . ( -63 ) + 23 . ( -37 )
= 23 . [ ( -63 ) + ( -37 ) ]
= 23 . ( -100 )
= - 2300.
c, - 2003 + ( -21 + 75 + 2003 )
= 2003 + ( -21 ) + 75 + 2003
= 2003 . 2 + [ ( -21 ) + 75 ]
= 4006 + 54
= 4060
Tick mình nha bạn yêu
![](https://rs.olm.vn/images/avt/0.png?1311)
a,a, Ta có : 1.4.7.10.....581.4.7.10.....58 có 11 số tròn chục là 1010 nên dãy tích này có tận cùng là : 00
Lại có : 3.12.30.....1743.12.30.....174 có 11 số tròn chục là : 3030 nên dãy tích này có tận cùng là 0.0.
⇒A⇒A có tận cùng là : 0+0=00+0=0
Vậy , AA có tận cùng là : 00
b,b, Ta có : 13.58=75413.58=754 ⋮ 377⇒1.4.7.10.....58377⇒1.4.7.10.....58 ⋮ 377377
Lại có : 13.29=37713.29=377 ⋮ 377⇒3.12.30.....174377⇒3.12.30.....174 ⋮ 377377
⇒(1.4.7.10.....58)+(3.12.30.....174)⇒(1.4.7.10.....58)+(3.12.30.....174) ⋮ 377
giải nhanh đi ko mik tiêu mất giải đúng cho 2 like
tính tổng
S=1+2+3-4-5-6+7+8+9-...+55+56+57-58-59-60
![](https://rs.olm.vn/images/avt/0.png?1311)
![](https://rs.olm.vn/images/avt/0.png?1311)
=23 x (58-30) + 28 x 77
=23 x 28 +28 x 77
=28 x (23+77)
=28 x 100
=2800
học tốt bạn nhé
bài này là dạng nâng cao về toán tính nhanh, mik nghĩ là ẽ ít bạn trả lời đc
![](https://rs.olm.vn/images/avt/0.png?1311)
(135-35).(-37)+37.(-42-58)
= 135-35.0.(-42)-58
=100.0.100
=0
(vì số nào nhân với 0 vẫn bằng 0)
CHÚC BẠN HỌC GIỎI.NĂM MỚI VUI VẺ , HẠNH PHÚC
TK MÌNH NHÉ
![](https://rs.olm.vn/images/avt/0.png?1311)
13 x 58 x 4 + 32 x 26 x 2 + 52 x 10
= 13 x 4 x 58 + 32 x 52 + 52 x 10
= 52 x 58 + 32 x 52 + 52 x 10
= 52 x ( 58 + 32 + 10 )
= 52 x 100
= 5200
![](https://rs.olm.vn/images/avt/0.png?1311)
179 - 58 + 15 + 58 - 75
= 121 + 15 + 58 - 75
= 136 + 58 - 75
= 194 - 75
= 119
( -5 ) * 9 * 2 * 15
= ( -45 ) * 2 *15
= ( -90 ) * 15
= -1350
159 * ( -13 ) - ( -13 ) * 59
= ( -13 ) * ( 159 - 59 )
= ( -13 ) * 100
= -1300
( -109 ) - ( -2 )^3 * ( 6 - 7 )
= ( -109 ) - ( -8 ) * ( -1 )
= ( -109 ) - 8
= -117
![](https://rs.olm.vn/images/avt/0.png?1311)
42.(58 - 11) - 58.(11 + 42)
= 42.58 - 42.11 - 58.11 - 58.42
= 42.58 - 58.42 - 42.11 - 58.11
= -11.(42 + 58)
= -11. 100
= -1100
![](https://rs.olm.vn/images/avt/0.png?1311)
13 . 58 . 4 +32.26.2+52.10
=(13.4).58 + 32.(26.2) +52.10
=52.58 + 32. 58 + 52.10
=(32+58+10).52
=100.52
=5200
347.58+625.58+58
=58.(347+625+1)
=58.973
=56434
Chúc hk tốt nha!!!
347.58+625.58+58
=347.58+625.58+58.1
=58.(347+625+1)
=58.973
=56434
Vậy kết quả là 56434
Học tốt nhé![Kết quả hình ảnh cho mặt cười](data:image/jpeg;base64,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)