Giải pt dạng |A|=B và |A|=|B|

1. |x²-1|=1-4x

2. |4x+1|=x²+2x-4

3. |3x-5|=2x²+x-3

4. x²-2x+8=|x²-1|

5. x²+5x-|3x-2|-5=0

6. x²-5|x-1|-1=0

7. |3x²-2|=|6-x²|

Giải pt

\(1)4x^2+\sqrt{3x+1}+5=13x\)

\(2)7x^2-13x+8=2x^2.\sqrt[3]{x\left(1+3x-3x^2\right)}\)

\(3)x^3-4x^2-5x+6=\sqrt[3]{7x^2+9x-4}\)

\(4)x^3-5x^2+4x-5=\left(1-2x\right)\sqrt[3]{6x^2-2x+7}\)

\(5)8x^2-13x+7=\left(1+\dfrac{1}{x}\right)\sqrt[3]{3x^2-2}\)

Giải các pt sau

|2x-2|=x²-5x+6

|X-2|=3x²-x-2

|2x²-5x+5|=|x²+6x+5|

X²-2|x-2|-4=0

4x²+|2x-1|=4x+11

|X²-1|+4x=1

|2x²-5x+4|=2x-1

3x²+x-4|x+2|+8=0

giải pt

x^2+4x-3|x+2|+4=0

4x^2+1/x^2+|2x-1/x|-6=0

2x/(3x^2-5x+2)+13x/(3x2+x+2)=6

2(x+1)/3x^2+x+13(x+1)/3x^2+7x+16=6

\(a,2x^2-9x+3+\sqrt{3x^2-7x+1}=0\)

b)\(\sqrt{x+2}+\sqrt{3-x}=x^3+x^2-4x-1\)

c)\(\text{4x^3-9x^2+7x-(3x-1)\sqrt{3x-2}=0}\)

d)\(2\sqrt{x-1}+\sqrt{5x-1}=x^2+1\)

e)\(\sqrt{x+2}+\sqrt{5x+6}+2\sqrt{8x+9}=4x^2\)

f)\(3x^2-x+3=\sqrt{3x+1}+\sqrt{5x+4}\)

1, √x^2-5x+8<=3x-10

2, x^2-4x+3/3-2x<1-x

3, |x^2+x-2|+3x^2-3>0

4, |x+3|>=2(1+x^2)

5, |x^2-1|>x^2+2x-3

6, |2x-1|<x+2

7, 3/2-x<=1

8, 2+3x-x^2<=√4+3x-x^2

9, √x^2-5x+6<5-x

10, x^2-6>5(x+√x^2-5x)

11, |x^2-x|<=x^2-x

1, √x^2-5x+8<=3x-10

2, x^2-4x+3/3-2x<1-x

3, |x^2+x-2|+3x^2-3>0

4, |x+3|>=2(1+x^2)

5, |x^2-1|>x^2+2x-3

6, |2x-1|<x+2

7, 3/2-x<=1

8, 2+3x-x^2<=√4+3x-x^2

9, √x^2-5x+6<5-x

10, x^2-6>5(x+√x^2-5x)

11, |x^2-x|<=x^2-x

1, √x^2-5x+8<=3x-10

2, x^2-4x+3/3-2x<1-x

3, |x^2+x-2|+3x^2-3>0

4, |x+3|>=2(1+x^2)

5, |x^2-1|>x^2+2x-3

6, |2x-1|<x+2

7, 3/2-x<=1

8, 2+3x-x^2<=√4+3x-x^2

9, √x^2-5x+6<5-x

10, x^2-6>5(x+√x^2-5x)

11, |x^2-x|<=x^2-x