Làm như vậy hả

a. 20,11 x 36 + 63 x 20,11 + 20,11

=   20,11 x 36 + 63 x 20,11 + 20,11 x 1

=   20,11 x (36 + 63 + 1)

=   20,11 x        100

=   2011

b.  a a a : 37 x  y       = a

=> 111 x a : 37 x  y  = a

=> 111 : 37 x a x  y  = a

=> 3    x a  x  y  = a

=> 3    x         y  = 1 (cùng chia 2 vế cho a)

=> y =  1 3

Ta có :

aaa : 37 .x y = a

a x 111 : 37 x y = a

a x 3 x y = a

=> 3 x y = 1

=> y = 1/3

Ta có:

aaa : 37 x y =a 

a x 111 : 37 x y = a

111 : 37 x y = a : a

3 x y =1 

y=1/3

Ta có:

aaa : 37 x y =a 

a x 111 : 37 x y = a

111 : 37 x y = a : a

3 x y =1 

y=1/3

ta có: aaa : 37.y = a

=> 111.a.1/37.y = a

=> 111.1/37.a.y = a

111/37.a.y = a

111/37.y = a:a

111/37.y = 1

y = 1 : 111/37

y = 37/111

aaa : 37 x y = a

a . 111 . \(\frac{1}{37}\). y = a

111 . 1/37 . y = a : a

111 . 1/37 . y = 1

y = 1 : 111 : 1/37

y = 1/3

ta có: aaa : 37.y = a

=> 111.a.1/37.y = a

=> 111.1/37.a.y = a

111/37.a.y = a

111/37.y = a:a

111/37.y = 1

y = 1 : 111/37

y = 37/111

PT⇔x2−2xy+y2=35xy−5x2y2−60

⇔(�−�)2=5(3−��)(��−4)⇔(x−y)2=5(3−xy)(xy−4)

Mà (�−�)2≥0∀�;�(x−y)2≥0∀x;y nên $5\left(3-xy\right)\left(xy-4\right)\ge 0\iff 3\le xy\le 4$ 

⇒\hept{�;�∈{3;4}�=�⇒\hept{x;y∈{3;4}x=y​ $\Rightarrow \left(x;y\right)\in \left\{\left(2;2\right);\left(-2;-2\right)\right\}$

\(PT\Leftrightarrow x^2-2xy+y^2=35xy-5x^2y^2-60\)

\(\Leftrightarrow\left(x-y\right)^2=5\left(3-xy\right)\left(xy-4\right)\)

Mà \(\left(x-y\right)^2\ge0\forall x;y\) nên \(5\left(3-xy\right)\left(xy-4\right)\ge0\Leftrightarrow3\le xy\le4\) 

\(\Rightarrow\hept{\begin{cases}x;y\in\left\{3;4\right\}\\x=y\end{cases}}\) \(\Rightarrow\left(x;y\right)\in\left\{\left(2;2\right);\left(-2;-2\right)\right\}\)

Vi ét à bạn?

Ta có 

PT <=> (1 + 5y²)x² - 37yx + y² + 60 = 0

Xét pt theo ẩn x ta có để pt có nghiệm thì 

∆\(\ge0\)

<=> (37y)² - 4(1 + 5y²)(y² + 60) \(\ge0\)

<=> - 20y⁴ + 165y² - 240\(\ge0\)

<=> 1 < y² < 7

=> y² = 4

=> y = (2;-2)

=> x =  (2;-2)