`36^{4}.16^{2}`

`=6^{8}.2^{8}`

`=(6.2)^8`

`=12^8`

`4^{6}.27^{4}`

`=2^{12}.3^{12}`

`=(2.3)^12`

`=6^12`

2 câu này không rõ đề

\(36^4\cdot16^2=1296^2\cdot16^2=429981696\)

\(4^6\cdot27^4=2^{12}\cdot3^{12}=2176782336\)

\(=2^{162}.3^{54}.3^{72}.2^{54}.2^{10}\\ =2^{226}.3^{126}\\ =2^{3.63+37}.3^{2.63}\\ =8^{63}.9^{63}.2^{37}\\ =72^{63}.2^{37}\)

Dễ thấy

Lời giải:
a)

Ta có:

\(1991\equiv 1\pmod {10}\Rightarrow 1991^{1997}\equiv 1^{1997}\equiv 1\pmod {10}(1)\)

\(1997\equiv 7\pmod {10}\Rightarrow 1997^{1996}\equiv 7^{1996}\pmod {10}(2)\)

Mà \(7^2\equiv -1\pmod {10}\Rightarrow 7^{1996}\equiv (-1)^{998}\equiv 1\pmod {10}(3)\)

Từ \((1);(2);(3)\Rightarrow 1991^{1997}-1997^{1996}\equiv 1-1\equiv 0\pmod {10}\) (đpcm)

b)

\(2^9+2^{99}=2^9(1+2^{90})\)

Ta thấy $2^{10}=1024\equiv -1\pmod {25}$
$\Rightarrow 2^{90}\equiv (-1)^9\equiv -1\pmod {25}$

$\Rightarrow 1+2^{90}\equiv 0\pmod {25}$ hay $1+2^{90}\vdots 25$

Mà $2^9\vdots 4$

Do đó:

$2^9+2^{99}=2^9(1+2^{90})\vdots 100$ (đpcm)

\(24^{54}.54^{24}.2^{10}=3^{54}.2^{162}.2^{24}.3^{72}.2^{10}=3^{126}.2^{196}\)

ta có: \(72^{63}=9^{63}.8^{63}=\left(3^2\right)^{63}.\left(2^3\right)^{63}=3^{72}.2^{108}\)

ta có: \(\frac{3^{126}.2^{196}}{3^{72}.2^{108}}=3^{54}.2^{88}\)

suy ra \(3^{126}.2^{196}\) chia hết cho \(3^{72}.2^{108}\)

suy ra \(24^{54}.54^{24}.2^{10}\) chia hết cho \(72^{63}\)