1,Phân tích đa tức thành nhân tử(đặt nhân tử chung)
a,4x^3-14x^2
b,5x^10+15x^6
c,9x^2y^2+15x^2y-21xy^2
d,9x(2y-z)-12x(2y-z)
2,Tìm x
a,x(x-1)-2(1-x)=0
b,x^3-x^5
3,Tính nhanh
a,12,6(124-24)
b,18,6(45+84)
c,15,2(14+86)
4,Tìm x
a,49^2-49=0
b,x^2-36-12=0
Đáp án:
Giải thích các bước giải:
Bài 1:
$a)4x^2-17x^2_{}$
⇔ $2x^2(2x-7)_{}$
$b)5x^{10}+15x^6_{}$
⇔ $5x^6(x^4+3)_{}$
$c)9x^2y^2+15x^2y-21xy^2_{}$
⇔ $3xy.(3xy+5x-7y)_{}$
$d)9x(2y-z)-12x(2y-z)_{}$
⇔ $18xy-9xz-24xy+12xz_{}$
⇔ $-6xy+3xz_{}$
⇔ $3x(-2y+z)_{}$
$Bài2:_{}$
$a)x(x-1)-2(1-x)=0_{}$
⇔ $x(x-1)-2(-x+1)=0_{}$
⇔ $x(x-1)+2(x-1)_{}$
⇔ $(x-1)(x+2)=0_{}$
⇔ \(\left[ \begin{array}{l}x-1=0\\x+2=0\end{array} \right.\) ⇔ \(\left[ \begin{array}{l}x=1\\x=-2\end{array} \right.\)
$Vậy_{}$ $x_{1}=1$ ;$x=-2_{2}$
$b)x^3-x^5=0_{}$
⇔ $x^3(1-x^2)=0_{}$
⇔ \(\left[ \begin{array}{l}x^3=0\\1-x^2=0\end{array} \right.\) ⇔ \(\left[ \begin{array}{l}x=0\\x=±1\end{array} \right.\)
$Vậy_{}$ $x_{1}=-1$; $x_{2}=1$; $x_{3}=0$
$Bài3:_{}$
$a)12,6(124-24)_{}$
$=12,6.100_{}$
$=126_{}$
$b)18,6(45+84)_{}$
$=18,64.129_{}$
$=2399,4_{}$
$c)15,2(14+86)_{}$
$=15,2.100_{}$
$=152_{}$
$Bài 4:_{}$
$a)49x^2-49=0_{}$
⇔ $49(x^2-1)=0_{}$
⇔ $x^2=1_{}$
⇔ $x=±1_{}$
$Vậy_{}$ $x_{1}=1$ ;$x_{2}=-1$
$b)x^2-36-12=0_{}$
⇔ $x^2-48=0_{}$
⇔ $x^2=48_{}$
⇔ $x=±4_{}$ $\sqrt{3}$
$Vậy_{}$ $x_{1}=-4$ $\sqrt{3}$ ;$x_{2}=4$ $\sqrt{3}$