Представьте многочлен в виде произведения:
Объяснение: (A±B)² =A² ± 2AB+B² ; A²- B² = (A - B)(A+B) .
а) 4a²-4ab + b² — 4 =(2a -b)² - 2² =(2a -b - 2)(2a -b + 2) ;
б) 9-25x²+ 30 ху-9y² =3² - (5x -3y)² = (3 - 5x +3y)(3 + 5x -3y) ;
в) 36x²-25+60xy +25y² =( 6 x+5y)²-(5)² = (6 x+5y -5) (6 x+5y+5) ;
г) 16-24ab-16a²-9b²=(4)²-(4a+3b)²=(4-4a-3b)(4+4a+3b) ;
е) 25a²-20a+4-4b²=(5a -2)²-(2b)² =(5a -2-2b)(5a -2+2b) ;
ж) 16c²-9m²-42m-49=(4c)² - (3m +7)² = (4c -3m -7)(4c +3m +7) ;
з) 70x+25-36y²+49x² = (5 +7x)² -(6y)²=(5 +7x -6y)(5 +7x +6y) ;
!!
д) 9n²- 16m²+40m-25 = (3n)² - (4m - 5)² =(3n - 4m+5)(3n +4m+5)
2X^2 - X * ( 2X - 2 ) = 6
2X^2 - 2X^2 + 2X = 6
2X = 6
X = 3
Y = 6 - 2 = 4
ОТВЕТ ( 3 ; 4 )
( X + 2 )*( Y + 1 ) = 12
X + 2Y = 6 ; X = 6 - 2Y
( 6 - 2Y + 2 )*( Y + 1 ) = 12
( 8 - 2Y )*( Y + 1 ) = 12
8Y + 8 - 2Y^2 - 2Y = 12
- 2Y^2 + 6Y - 4 = 0
- 2 * ( Y^2 - 3Y + 2 ) = 0
D = 9 - 8 = 1 ; √ D = 1
Y1 = ( 3 + 1 ) : 2 = 2
Y2 = ( 3 - 1 ) : 2 = 1
X1 = 6 - 4 = 2
X2 = 6 - 2 = 4
ОТВЕТ ( 2 ; 2 ) ; ( 4 ; 1 )
X^2 + Y^2 = 10
XY = - 3
X = ( - 3 / Y ) ; X^2 = 9 / Y^2
( 9 / Y^2 ) + Y^2 = 10
( 9 + Y^4 ) / Y^2 = 10 ( Y ≠ 0 )
9 + Y^4 = 10Y^2
Y^4 - 10Y^2 + 9 = 0
Y^2 = A ; A > 0
A^2 - 10A + 9 = 0
D = 100 - 36 = 64 ; √ D = 8
A1 = ( 10 + 8 ) : 2 = 9
A2 = ( 10 - 8 ) : 2 = 1
Y^2 = 9 ===> Y (1 /2 ) = ( + / - ) 3
Y^2 = 1 ===> Y ( 3/4 ) = ( +/ - ) 1
X^2 = 9 / Y^2
X^2 = 9 / 9 = 1 ===> X ( 1/2 ) = ( + / - ) 1
X^2 = 9 / 1 = 9 ===> X ( 3/4 ) = ( + / - ) 3
ОТВЕТ ( 1 ; 3 ); ( - 1 ; - 3 ); ( 3 ; 1 ) ; ( - 3 ; - 1 )