Bài 5 : Tìm x
1. 4xx-5-x-14x-3=5 2. 8x3 – 50x = 0 3. (2x-1)2 – 25 = 0 4. (x + 3)2 = 9(2x – 1)2 5. (2x + 1)(4x2 – 2x +1) – 8x(x2 + 2) = 17 | 6. 8x3 – 12x2 + 6x – 1 = 0 7. 2(x+3) – x2 -3x = 0 8. (4x – 3)2 - 3x(3 – 4x) = 0 9. x3 + 27 + (x+3)(x-9) = 0 10. x3 – 4x2 – 9x + 36 = 0 |
Bài 1:a. (x+3)2−(x−4)(x+8)=1⇔x2+6x+9−x2−4x+32=1⇔2x=−40⇔x=20Vậy S={20}b. 4x−20+3x−15=0⇔7x=35⇔x=5Vậy S={5}c. x3−5x2+25x+5x2−25x+125−x3=5x⇔5x=125⇔x=25Vậy S={25}d. 4x2+4x+1−4x2+9=22⇔4x=12⇔x=3Vậy S={3}e. 3x−3−1+x=0⇔4x=4⇔x=1Vậy S={1}f. x2(x+3)−5(x+3)=0⇔(x+3)(x2−5)=0⇔x=−3; x=±√5Vậy S={−3; ±√5}Bài 2:a. x2−6x+9=0⇔(x−3)2=0⇔x=3Vậy S={3}b. 8x3−12x2+6x−1=0⇔(2x−1)3=0⇔x=12Vậy S={12}c. x3+4x2+4x=0⇔x(x2+4x+4)=0⇔x(x+2)2=0⇔x=0; x=−2Vậy S={−2;0}d. 4x3−36x=0⇔4x(x2−9)=0⇔x=0; x=±3Vậy S={0;±3}e. x3+5x2−4x−20=0⇔(x−2)(x+2)(x+5)=0⇔x=±2; x=−5Vậy S={±2;−5}f. 2x2+16x+32−x2+4=0⇔x2+16x+36=0⇔(x+8)2=28⇔x=−8±2√7Vậy S={−8±2√7}g.x3−27+4x−x3=0⇔4x=27⇔x=274Vậy S={274}h. x2+5x−14=0⇔(x−2)(x+7)=0⇔x=2; x=−7Vậy S={2;−7}