Câu hỏi của Bùi Thị Phương Anh

Question

So sánh $\dfrac{2016\cdot2018}{1999+2016\cdot2017}$     với 1

Nguyên · Accepted Answer

Giải.

Ta có : $\dfrac{2016.2018}{1999+2016.2017}=\dfrac{2016\left(2017+1\right)}{1999+2016.2017}$

$=\dfrac{2016.2017+2016}{1999+2016.2017}$

Do $2016>1999$

$\Rightarrow2016.2017+2016>1999+2016.2017$

$\dfrac{2016.2017+2016}{1999+2016.2017}>1$

Vậy...

tik mik nha !!!Câu trả lời: Giải.

Ta có : $\dfrac{2016.2018}{1999+2016.2017}=\dfrac{2016\left(2017+1\right)}{1999+2016.2017}$

$=\dfrac{2016.2017+2016}{1999+2016.2017}$

Do $2016>1999$

$\Rightarrow2016.2017+2016>1999+2016.2017$

$\dfrac{2016.2017+2016}{1999+2016.2017}>1$

Vậy...

tik mik nha !!!

Trần Minh An · Answer

Ta có:

$\dfrac{2016.2018}{1999+2016.2017}$= $\dfrac{2016\left(1+2017\right)}{1999+2016.2017}$= $\dfrac{2016+2016.2017}{1999+2016.2017}$

Vì $2016>1999$ nên $2016+2016.2017>1999+2016.2017$

Do đó, $\dfrac{2016+2016.2017}{1999+2016.2017}$ > 1

Vậy $\dfrac{2016.2018}{1999+2016.2017}$ > 1Câu trả lời: Ta có:

$\dfrac{2016.2018}{1999+2016.2017}$= $\dfrac{2016\left(1+2017\right)}{1999+2016.2017}$= $\dfrac{2016+2016.2017}{1999+2016.2017}$

Vì $2016>1999$ nên $2016+2016.2017>1999+2016.2017$

Do đó, $\dfrac{2016+2016.2017}{1999+2016.2017}$ > 1

Vậy $\dfrac{2016.2018}{1999+2016.2017}$ > 1

Ôn tập toán 6