Bonjour,
L'idée est d'identifier un facteur commun (en gras)
A = (3x - 1) ( x - 2) - 3x (2 - x)
A = (3x - 1) ( x - 2) + 3x (x - 2)
A = (3x - 1 + 3x) (x - 2)
A = (6x - 1) (x - 2)
B = (2x - 1) (3 - x) + (x - 3) (3x - 5)
B = (2x - 1) (3 - x) - (3 - x) (3x - 5)
B = (3 - x) (2x - 1 - 3x + 5)
B = (3 - x) (-x + 4)
B = (x - 3) (x - 4)
C = (4x - 8) (1 - 2x) - (9x - 18) (5 - x)
C = (4x - 8) (1 - 2x) - (9x - 18) (5 - x)
C = 4 (x - 2) (1 - 2x) - 9 (x - 2) (5 - x)
C = (x - 2) ( 4 - 8x) - (x - 2) (45 - 9x)
C = (x - 2) ( 4 - 8x - 45 + 9x)
C = (x - 2) (x - 41)
E = (3x - 5) ( 4x + 9) + 9x² - 25
E = (3x - 5) ( 4x + 9) + (3x)² - 5²
E = (3x - 5) ( 4x + 9) + (3x - 5) (3x + 5)
E = (3x - 5) (4x + 9 + 3x + 5)
E = (3x - 5) (7x + 14)
E = 7 (3x - 5) (x + 2)
F = 49x² - 36 + (7x - 1) ( 6 - 7x)
F = (7x)² - 6² - (7x - 1) (7x - 6)
F = (7x - 6) (7x + 6) - (7x - 1) (7x - 6)
F = (7x - 6) (7x + 6 - 7x + 1)
F = 7 (7x - 6)
G = (x + 1) (x - 1) + (x + 1) (x - 1) + (x - 1) (x -1)
G = (x - 1) ( x + 1 + x + 1 + x - 1)
G = (x - 1) (3x + 1)
H = (2x - 5) (4 - 2x) - 16 + 16x - 4x²
H = (2x - 5) (4 - 2x) - (4² - 2 × 4 × 2x 16x + (2x)²)
H = (2x - 5) (4 - 2x) - (4 - 2x)²
H = (2x - 5) (4 - 2x) - (4 - 2x) (4 - 2x)
H = (2x - 5 - 4 + 2x) (4 - 2x)
H = (4x - 9) (4 - 2x)
I = (2x √2 - 3) (3x - 2√2) + 8x² - 9
I = (2x √2 - 3) (3x - 2√2) + (2x √2)² - 3²
I = (2x √2 - 3) (3x - 2√2) + (2x √2 - 3) (2x√2 + 3)
I = (2x √2 - 3) (3x - 2√2 + 2x√2 + 3)
I = (2x √2 - 3) ((3 + 2√2)x + 3 - 2√2)
J = 25 - 3x² + (4√3 - 25x) (3x √3 - 15)
J = 5² - (x√3)² + (4√3 - 25x) (3x √3 - 15)
J = (5 - x√3) (5 + x√3) + 3 (4√3 - 25x) (x√3 - 5)
J = (5 - x√3) (5 + x√3) - 3 (4√3 - 25x) (5 - x√3)
J = (5 - x√3) (5 + x√3 - 12√3 + 75x)
J = (5 - x√3) ((75 + √3)x + 5 - 12√3)
K = (2x - 3) (x + 5) + (2x)² - 3²
K = (2x - 3) (x + 5) + (2x - 3) (2x + 3)
K = (2x - 3) (x + 5 + 2x + 3)
K = (2x - 3) (3x + 8)
