Weitere Aufgaben 1

F1

Werte den Term aus:

  1. 5a5a for a=15a=-15
  2. x34\frac{x}{3}-4 for x=33x=33
  3. a(2x3a)a(2x-3a) for a=3a=3, x=4x=4
  4. (x+y)-(x+y) for x=1x=1, y=13y=13
  5. 3y4ax3y-4ax for a=2a=2, x=3x=3, y=5y=-5
  6. (x+1)2(x+1)^2 for x=6x=-6
  7. x2+1x^2+1 wenn x=6x=-6
  8. 5x(3zy)25x-(3z-y)^2 for x=2x=2, y=1y=-1, z=4z=4
  9. 7x(x+3)(yx)7x-(x+3)(y-x) for x=5x=-5, y=2y=2
F2

Vereinfache den Term:

  1. 30x+(5x2y)30x + (5x-2y)
  2. (2a2b)+(3a+4b)+(5a6b)(2a-2b)+(3a+4b)+(5a-6b)
  3. 6a2b+5c(7b+4c)6a-2b+5c-(-7b+4c)
  4. 16a(3b+8c5a)(b3c)16a-(3b+8c-5a)-(b-3c)
  5. 25a[36b(19a11b)12a]25a-[36b-(19a-11b)-12a]
F3

Multipliziere aus und vereinfache so weit wie möglich:

  1. 4(a+b)4(a+b)
  2. 4a(3b5c)4a(3b-5c)
  3. (a+bc)(34)(a+b-c)\cdot (-\frac{3}{4})
  4. (mn)(x+y)(m-n)(x+y)
  5. (a5m)(a+3n)(a-5m)(a+3n)
  6. (8x+5y)(2x3y)(-8x+5y)(2x-3y)
  7. (2x+y)(3m+n)+(2x+y)(m3n)(2x+y)(3m+n)+(2x+y)(m-3n)
  8. (a+b)(4x5y)(ab)(5x+3y)(a+b)(4x-5y)-(a-b)(5x+3y)
  9. (4y+6x)(3a5b)(2x6y)(2a+3b)(4y+6x)(3a-5b)-(2x-6y)(2a+3b)
  10. (2a6c)(4b2d)(a+c)(5b3d)(3x)(2a-6c)(4b-2d) -(a+c)(5b-3d)(-3x)
  11. (7x+5)2(7x+5)^2
  12. (x1)2(x-1)^2
  13. (n+2n)2(n+\frac{2}{n})^2
  14. (a1)(a+1)(a-1)(a+1)
  15. (x+y1)(xy+1)(x+y-1)(x-y+1)
  16. (2a)2(a+2)(2a)+(a+2)2(2-a)^2-(a+2)(2-a)+(a+2)^2
  17. 6ax(6dc)(4b+4y)3n6ax(6d-c)(4b+4y)3n
F4

Zerlege in möglichst viele Faktoren und vereinfache jeden Faktor soweit wie möglich:

  1. ab+ac+adaeab+ac+ad-ae
  2. 2(x3)+y(x3)2(x-3)+y(x-3)
  3. (5m+2n)(xy)+(3m+2n)(xy)(5m+2n)(x-y)+(3m+2n)(x-y)
  4. a(x+y)xya(x+y)-x-y
  5. c22cd+d2c^2-2cd+d^2
  6. 25x270x+4925x^2-70x+49
  7. 36a2b249c236a^2b^2-49c^2
  8. 0.49bc281bd20.49bc^2-81bd^2
  9. (a22)2(a+1)2(a^2-2)^2-(a+1)^2
  10. x26x+9y2x^2-6x+9-y^2
Show

Lösungen

A1
  1. 75-75
  2. 77
  3. 3-3
  4. 14-14
  5. 39-39
  6. 2525
  7. 3737
  8. 159-159
  9. 21-21
A2
  1. 30x+(5x2y)=35x2y30x + (5x-2y) = \underline{35x-2y}
  2. (2a2b)+(3a+4b)+(5a6b)=10a4b(2a-2b)+(3a+4b)+(5a-6b) = \underline{10a-4b}
  3. 6a2b+5c(7b+4c)=6a2b+5c+7b4c=6a+5b+c6a-2b+5c-(-7b+4c)= 6a-2b+5c+7b-4c = \underline{6a+5b+c}
  4. 16a(3b+8c5a)(b3c)=16a3b8c+5ab+3c=21a4b5c16a-(3b+8c-5a)-(b-3c) = 16a-3b-8c+5a-b+3c = \underline{21a-4b-5c}
  5. 25a[36b(19a11b)12a]=25a36b+(19a11b)+12a=56a47b25a-[36b-(19a-11b)-12a]=25a-36b+(19a-11b)+12a =\underline{56a-47b}
A3
  1. 4(a+b)=4a+4b4(a+b) = \underline{4a + 4b}
  2. 4a(3b5c)=12ab20ac4a(3b-5c) = \underline{12ab-20ac}
  3. (a+bc)(34)=34a34b+34c(a+b-c)\cdot (-\frac{3}{4}) = \underline{-\frac{3}{4}a-\frac{3}{4}b+\frac{3}{4}c}
  4. (mn)(x+y)=mx+mynxny(m-n)(x+y) = \underline{mx+my-nx-ny}
  5. (a5m)(a+3n)=a2+3an5am15mn(a-5m)(a+3n)= \underline{a^2+3an-5am-15mn}
  6. (8x+5y)(2x3y)=16x2+24xy+10xy15y2=16x2+34xy15y2(-8x+5y)(2x-3y) = -16x^2+24xy+10xy-15y^2 = \underline{-16x^2+34xy-15y^2}
  7. (2x+y)(3m+n)+(2x+y)(m3n)=8mx4nx+4my2ny(2x+y)(3m+n)+(2x+y)(m-3n)=\underline{8mx-4nx+4my-2ny}
  8. (a+b)(4x5y)(ab)(5x+3y)=ax8ay+9bx2by(a+b)(4x-5y)-(a-b)(5x+3y)=\underline{-ax-8ay+9bx-2by}
  9. (4y+6x)(3a5b)(2x6y)(2a+3b)=24ay2by+14ax36bx(4y+6x)(3a-5b)-(2x-6y)(2a+3b)= \underline{24ay-2by+14ax-36bx}
  10. (2a6c)(4b2d)(a+c)(5b3d)(3x)=8ab4ad24bc+12cd+15abx9adx+15bcx9cdx(2a-6c)(4b-2d) -(a+c)(5b-3d)(-3x) = \underline{8ab-4ad-24bc+12cd + 15abx-9adx+15bcx-9cdx}
  11. (7x+5)2=49x2+70x+25(7x+5)^2 = \underline{49x^2+70x+25}
  12. (x1)2=x22x+1(x-1)^2= \underline{x^2-2x+1}
  13. (n+2n)2=n2+2n2n+(2n)2=n2+4+4n2(n+\frac{2}{n})^2 =n^2+2n\frac{2}{n}+\left(\frac{2}{n}\right)^2= \underline{n^2+4+\frac{4}{n^2}}
  14. (a1)(a+1)=a21(a-1)(a+1) = \underline{a^2-1}
  15. (x+y1)(xy+1)=x2y2+2y1(x+y-1)(x-y+1)= \underline{x^2 - y^2 + 2y -1}
  16. (2a)2(a+2)(2a)+(a+2)2=3a2+4(2-a)^2-(a+2)(2-a)+(a+2)^2 = \underline{3a^2+4}
  17. 6ax(6dc)(4b+4y)3n=432abdnx+432adnxy72abcnx72acnxy6ax(6d-c)(4b+4y)3n = \underline{432a b d n x + 432 a d n x y-72 a b c n x -72 a c n x y}
A4
  1. ab+ac+adae=a(b+c+de)ab+ac+ad-ae = \underline{a(b+c+d-e)}
  2. 2(x3)+y(x3)=(2+y)(x3)2(x-3)+y(x-3)= \underline{(2+y)(x-3)}
  3. (5m+2n)(xy)+(3m+2n)(xy)=(5m+2n+3m+2n)(xy)=(8m+4n)(xy)=4(2m+n)(xy)(5m+2n)(x-y)+(3m+2n)(x-y) = (5m+2n+3m+2n)(x-y)= (8m+4n)(x-y) = \underline{4(2m+n)(x-y)}
  4. a(x+y)xy=a(x+y)(x+y)=(a1)(x+y)a(x+y)-x-y= a(x+y) - (x+y)= \underline{(a-1)(x+y)}
  5. c22cd+d2=(cd)2c^2-2cd+d^2 = \underline{(c-d)^2}
  6. 25x270x+49=(5x7)225x^2-70x+49 = \underline{(5x-7)^2}
  7. 36a2b249c2=(6ab)2(7c)2=(6ab+7c)(6ab7c)36a^2b^2-49c^2= (6ab)^2-(7c)^2 = \underline{(6ab+7c)(6ab-7c)}
  8. 0.49bc281bd2=b[(0.7c)2(9d)2]=b(0.7c+9d)(0.7c9d)0.49bc^2-81bd^2 = b[(0.7c)^2-(9d)^2]= \underline{b(0.7c+9d)(0.7c-9d)}
  9. (a22)2(a+1)2=(a22+a+1)(a22a1)=(a2+a1)(a2a3)(a^2-2)^2-(a+1)^2 = (a^2-2+a+1)(a^2-2-a-1) = \underline{(a^2+a-1)(a^2-a-3)}
  10. x26x+9y2=(x3)2y2=(x3+y)(x3y)x^2-6x+9-y^2= (x-3)^2-y^2 = \underline{(x-3+y)(x-3-y)}