В решении.
Объяснение:
1) 5а³ - 125аb² = 5a(a² - 25b²) = 5a(a - 5)(a + 5);
2) a² - b² - 5a + 5b =
= (a² - b²) - (5a - 5b) =
= (a - b)(a + b) - 5(a - b) =
= (a - b)(a + b - 5);
3) а²- 2ав + в² - ас + вс =
= (а²- 2ав + в²) - (ас - вс) =
= (a - b)² - c(a - b) =
= (a - b)(a - b - c);
4) 25a² + 70ab + 49b² =
= (5a + 7b)² =
= (5a + 7b)(5a + 7b);
5) a² - 2ab + b² - 3a + 3b =
= (a² - 2ab + b²) - (3a - 3b) =
= (a - b)² - 3(a - b) =
= (a - b)(a - b - 3);
6) 63ab³ - 7a²b =
= 7ab(9b² - a);
7) (b - c)(b + c) - b(b + c) =
= (b + c)(b - c - b) =
= -c(b + c);
8) m² + 6mn + 9n² - m - 3n =
= (m² + 6mn + 9n²) - (m + 3n) =
= (m + 3n)² - (m + 3n) =
= (m + 3n)(m + 3n - 1);
9) a² - 9b² + a - 3b =
= (a² - 9b²) + (a - 3b) =
= (a - 3b)(a + 3b) + (a - 3b) =
= (a - 3b)(a + 3b + 1).
(x-4)(x+5)=0
x-4=0 или x+5=0
x=4 x=-5
#2
(3a-2)(2a+5)=0
3a-2=0 или 2a+5=0
3a=2 2a=-5
a=-2.5
#3
y(4y-1)=0
y=0 или 4y-1=0
4y=1
y=0.25
#4
x(5x+4)=0
x=0 или 5x+4=0
5x=-4
x=-0.8
#5
(z+2)(8z-5)=0
z+2=0 или 8z-5=0
z=-2 8z=5
z=0.625
#6
(b-0.3)(4b-2.6)(3b+1.5)=0
b-0.3=0 или 4b-2.6=0 или 3b+1.5=0
b=0.3 4b=2.6 3b=-1.5
b=0.65 b=-0.5
#7
(0.8-4x)(5x+3.5)(5.2x-15.6)=0
0.8-4x=0 или 5x+3.5=0 или 5.2x-15.6=0
-4x=-0.8 или 5x=-3.5 или 5.2x=15.6
x=0.2 x=-0.7 x=3
#8
y(0.3y-7.8)(6+4y)(2y-3.4)=0
y=0 или 0.3y-7.8=0 или 6+4y=0 или 2y-3.4=0
0.3y=7.8 4y=-6 2y=3.4
y=26 y=-1.5 y=1.7
#9
z(2.4z-0.72)(3z+33.6)(4.2-6z)=0
z=0 или 2.4z-0.72=0 или 3z+33.6=0 или 4.2-6z=0
2.4z=0.72 3z=-33.6 -6z=-4.2
z=0.3 z=-11.2 z=0.7
#10
-x(3.2x-0.64)(5x+20.5)(2.8-7x)=0
-x=0 или 3.2x-0.64=0 или 5x+20.5=0 или 2.8-7x=0
корней нет 3.2x=0.64 5x=-20.5 -7x=-2.8
x=0.2 x=-4.1 x=0.4