ấn mt là ra mà bẹn

ấn máy tính bà nội ơi

\(=2022\times\left(1+1+1+1+1+5-7\right)\)

= 2022 x 3

= 6066

\(2022A=2022+2022^2+2022^3+2022^4+...+2022^{2018}\)

\(2021A=2022A-A=2022^{2018}-1\Rightarrow A=\dfrac{2022^{2018}-1}{2021}\)

\(\Rightarrow A< B\)

sửa rồi đó ạ

Đặt a/b=c/d=k

=>a=bk; c=dk

\(\dfrac{a^{2022}+b^{2022}}{c^{2022}+d^{2022}}=\dfrac{b^2k^{2022}+b^{2022}}{d^{2022}k^{2022}+d^{2022}}=\left(\dfrac{b}{d}\right)^{2022}\)

\(\dfrac{\left(a+b\right)^{2022}}{\left(c+d\right)^{2022}}=\dfrac{\left(bk+b\right)^{2022}}{\left(dk+d\right)^{2022}}=\left(\dfrac{b}{d}\right)^{2022}\)

=>\(\dfrac{a^{2022}+b^{2022}}{c^{2022}+d^{2022}}=\dfrac{\left(a+b\right)^{2022}}{\left(c+d\right)^{2022}}\)

Lời giải:

Ta sẽ đi CM đẳng thức tổng quát:

\((C^1_{2n})^2-(C^2_{2n})^2+(C^3_{2n})^2-....+(C^{2n-1}_{2n})^2-(C^{2n}_{2n})^2=C^n_{2n}+1\) với $n$ lẻ.

Theo nhị thức Newton ta có:

\((x^2-1)^{2n}=C^0_{2n}-C^1_{2n}x^2+C^2_{2n}x^4-....-C^n_{2n}x^{2n}+...+C^{2n}_{2n}x^{4n}\). Trong này, hệ số của $x^{2n}$ là $-C^n_{2n}$

Tiếp tục sử dụng nhị thức Newton:

\((x^2-1)^{2n}=(x+1)^{2n}(x-1)^{2n}=(C^0_{2n}+C^1_{2n}+C^2_{2n}x^2+...+C^{2n}_{2n}x^{2n})(C^0_{2n}x^{2n}-C^1_{2n}x^{2n-1}+C^2_{2n}x^{2n-2}-...+C^{2n}_{2n})\). Trong này, hệ số của $x^{2n}$ là

\((C^0_{2n})^2-(C^1_{2n})^2+(C^2_{2n})^2-.....+(C^{2n}_{2n})^2\)

Do đó:

\(-C^n_{2n}=(C^0_{2n})^2-(C^1_{2n})^2+(C^2_{2n})^2-.....+(C^{2n}_{2n})^2\)

\(\Leftrightarrow -C^n_{2n}=1-(C^1_{2n})^2+(C^2_{2n})^2-.....+(C^{2n}_{2n})^2\)

\(\Leftrightarrow (C^1_{2n})^2-(C^2_{2n})^2+...-(C^2_{2n})^2=1+C^n_{2n}\) 

Thay $n=1011$ ta có đpcm.

dcvdx

Trước hết ta phải chứng minh \(\dfrac{a}{b}< \dfrac{a+1}{b+1}\) (a, b ϵ N; a < b).

Thật vậy, \(\dfrac{a}{b}=\dfrac{a\left(b+1\right)}{b\left(b+1\right)}=\dfrac{a+ab}{b^2+b}\) và \(\dfrac{a+1}{b+1}=\dfrac{\left(a+1\right)b}{\left(b+1\right)b}=\dfrac{ab+b}{b^2+b}\).

Mà theo giả thuyết là a < b nên \(\dfrac{a+ab}{b^2+b}< \dfrac{ab+b}{b^2+b}\), suy ra \(\dfrac{a}{b}< \dfrac{a+1}{b+1}\) (a, b ϵ N; a < b).

Từ đây ta có:

\(B=\dfrac{2022^{2022}+1}{2022^{2023}+1}=\dfrac{2022^{2023}+2022}{2022^{2024}+2022}=\dfrac{2022^{2023}+2021+1}{2022^{2024}+2021+1}\)

Đặt \(A_1=\dfrac{2022^{2023}+2}{2022^{2024}+2}=\dfrac{2022^{2023}+1+1}{2022^{2024}+1+1}\), rõ ràng \(A_1>A\).

Đặt \(A_2=\dfrac{2022^{2023}+3}{2022^{2024}+3}=\dfrac{2022^{2023}+2+1}{2022^{2024}+2+1}\), rõ ràng \(A_2>A_1\).

...

Đặt \(A_{2020}=\dfrac{2022^{2023}+2021}{2022^{2024}+2021}=\dfrac{2022^{2023}+2020+1}{2022^{2024}+2020+1}\), rõ ràng \(A_{2020}>A_{2019}\) và \(B>A_{2020}\).

Suy ra \(B>A_{2020}>A_{2019}>...>A_2>A_1>A\). Vậy A < B.

Ta có A = \(\dfrac{2022^{2023}}{2022^{2024}}=\dfrac{1}{2022}\) ; B = \(\dfrac{2022^{2022}}{2022^{2023}}=\dfrac{1}{2022}\)

Mà \(\dfrac{1}{2022}=\dfrac{1}{2022}\)

Vậy A = B

Lời giải:

$b^2=ac\Rightarrow \frac{b}{a}=\frac{c}{b}$

Đặt $\frac{b}{a}=\frac{c}{b}=k\Rightarrow b=ak; c=bk$

Khi đó:
$\frac{a^{2022}+b^{2022}}{b^{2022}+c^{2022}}=\frac{a^{2022}+(ak)^{2022}}{b^{2022}+(bk)^{2022}}$

$=\frac{a^{2022}(1+k^{2022})}{b^{2022}(1+k^{2022})}=\frac{a^{2022}}{b^{2022}} (1)$

Và:

$(\frac{a+b}{b+c})^{2022}=(\frac{a+ak}{b+bk})^{2022}$

$=[\frac{a(k+1)}{b(1+k)}]^{2022}=(\frac{a}{b})^{2022}=\frac{a^{2022}}{b^{2022}}(2)$

Từ $(1); (2)$ ta có đpcm.

`2022+2022:1/3+2022+2022:1/5`

`=2022+2022xx3+2022+2022xx5`

`=2022xx(1+3+1+5)`

`=2022xx10=20220`

20220