Giúp tôi cách trình bày kiểu của lớp 4
- - hai số tự nhiên liên tiếp có tổng là 1001. tìm hai số đó
- - bốn số tự nhiên liên tiếp có tổng của số thứ nhất và số thứ tư là 1203. tìm bốn số đó
- - bốn số tự nhiên liên tiếp có tổng là 406. tìm bốn số đó
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Bài 1:
Hai số tự nhiên liên tiếp có khoảng cách là 1
Số bé là:
(1001-1):2=500
Số lớn là:
500+1=501
Đáp số:................
tổng của số 1 và số 4 là 1203
nên tổng của số 2 và 3 cx thế.
tổng của 4 số là 2406.
liên tiếp nên khoảng cánh là 1.
khoảng cánh giữa số thứ 1 và 4 là 4-1=3.
hiệu giữa số 1 và 4 là 3,tổng là 1203
số 1 là (1203-3):2=600.
4 số đó là 600,601,602,603.
Học tốt
tổng của số 1 và số 4 là 1203
nên tổng của số 2 và 3 cx thế.
tổng của 4 số là 2406.
liên tiếp nên khoảng cánh là 1.
khoảng cánh giữa số thứ 1 và 4 là 4-1=3.
hiệu giữa số 1 và 4 là 3,tổng là 1203
số 1 là (1203-3):2=600.
4 số đó là 600,601,602,603.
hiệu số thứ nhất và số thứ tư là:4 - 1 = 3
số thứ nhất là : (1203-3):2=600
3 số còn lại lần lượt là : 601,602,603
a, 105 = 3 x 5 x 7
Vậy ba số tự nhiên liên tiếp có tích bằng 105 lần lượt là:
3; 5; 7
b, 240 = 24 x 3 x 5 = 15 x 16
Vậy hai số tự nhiên liên tiếp thỏa mãn đề bài là:
15; 16
c, 360 = 3.4.5.6
Vậy bốn số tự nhiên liên tiếp có tích bằng 360 lần lượt là:
3; 4; 5; 6
Vậy số cần tìm là 6
\(\sqrt[4]{570024}\)=27,.......
=> 27 nằm giữa. Ta xét 27x28x29x30 (không thoả)
26x27x28x29 = 570024
Tổng là 26+27+28+29= 110
de lam cho
dau tien phan h 570024 ra thua so nguyen to ta dc 2mũ 3 nhân 3 mũ 3 nhân 7 nhân 13 va nhân 29
ta de 29 o do
2 mũ 3 =8; 3 mũ 3 =27 nhan 7 ,13 va 29
ta cong 8,7 va 13 lai dc 28 vay da co 3 so lien tiep 27,28,29
--- đây là dạng toán tổng và hiệu . vì là các số tn liên tiếp nên hiệu của chúng = 1
số thứ nhất là : (1001+1):2=501
số thứ 2 là : 1001-501=500
--- hiệu số thứ nhất và số thứ tư là:3
số thứ nhất là : (1203-3):2=600
3 số còn lại lần lượt là : 601,602,603
---- gọi 4 số tự nhiên liên tiếp là : a,a+1,a+2,a+3
ta có a+a+1+a+2+a+3=406
hay :4.a +6 =406
=>a=100
4 số cần tìm là : 100,101,102,103
hai số tự nhiên liên tiếp hơn kém nhau 1 đơn vị
Số bé là :
(1001-1):2=500
Số lớn là :
500+1= 501![](data:image/jpeg;base64,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)