Đặt S= 1 + 4 + 7 + 10 + 13 + ... + 55 + 58

SSH = \(\frac{58-1}{3}+1=19+1=20.\)số hạng

Tổng S = 1/2 * (58 + 1) *20 = 590.

Vậy A = (1 + 4 + 7 + 10 + 13 + ... + 55 + 58) -410 = 590 - 410 = 180.

(1+4+7+10+13+...+55+58)-410

=(58.19:2)-410

=551-410

=141

Ta có:

1+2+3-4-5-6+7+8+9-..........+55+56+57-58-59-60

=(1+2+3-4-5-6)+(7+8+9-10-11-12)..........+(55+56+57-58-59-60)

=  -3+ (-3)+...+(-3)

---12 số------------

=(-3).12

=-36

(x + 1)/58 + (x + 2)/57 = (x + 3)/56 + (x + 4)/55

(x + 1)/58 + 1 + (x + 2)/57 + 1 = (x + 3)/56 + 1 + (x + 4)/55 + 1

(x + 59)/58 + (x + 59)/57 = (x + 59)/56 + (x + 59)/55

=> (x + 59)/58 + (x + 59)/57 - (x + 59)/56 - (x + 59)/55 = 0

=> (x + 59).(1/58 + 1/57 - 1/56 - 1/55) = 0

Do 1/56 > 1/58; 1/55 > 1/57 => 1/58 + 1/57 - 1/56 - 1/55 khác 0

=> x + 59 = 0

=> x = -59

(x + 1)/58 + (x + 2)/57 = (x + 3)/56 + (x + 4)/55

(x + 1)/58 + 1 + (x + 2)/57 + 1 = (x + 3)/56 + 1 + (x + 4)/55 + 1

(x + 59)/58 + (x + 59)/57 = (x + 59)/56 + (x + 59)/55

=> (x + 59)/58 + (x + 59)/57 - (x + 59)/56 - (x + 59)/55 = 0

=> (x + 59).(1/58 + 1/57 - 1/56 - 1/55) = 0

Do 1/56 > 1/58; 1/55 > 1/57 => 1/58 + 1/57 - 1/56 - 1/55 khác 0

=> x + 59 = 0

=> x = -59

Lại đăng nữa hả chíp chíp

tui dốt mà

nhân 2 vế cho \(\frac{1}{2^3}\)

7⁶ + 7⁵ - 7^{4 =} 7⁴  × ( 7² + 7 - 1)= 7⁴ × 55 nên chia hết cho 55 

= 5⁵ × 192 = 5⁵ × 6×32  nên chia hét ccho  6

\(a,7^6+7^5-7^4⋮55\)

\(7^4\left(7^2+7-1\right)⋮55\)

\(7^4\times55⋮55\left(dpcm\right)\)

\(8^{12}-2^{33}-2^{30}\)

\(=8^{12}-\left(2^3\right)^{11}-\left(2^3\right)^{10}\)

\(=8^{12}-8^{11}-8^{10}\)

\(=8^{10}\left(8^2-8-1\right)\)

\(=8^{10}\times55⋮55\left(dpcm\right)\)