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PEMFAKTORAN ax + ay = a(x +y)

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  • ( 5 š‘„ + 2 š‘¦ + 3 ) + ( 4 š‘„ āˆ’ š‘¦ + 7 ) =
    9x+y+10
  • 10m(nāˆ’5)=
    10 š‘š š‘› āˆ’ 50 š‘š
  • ( 7 š‘„ + 3 š‘¦ ) āˆ’ ( 2 š‘„ + 5 š‘¦ ) =
    5 š‘„ āˆ’ 2 š‘¦
  • ( 10 š‘ + 8 ) āˆ’ ( 3 š‘ āˆ’ 6 ) =
    7p+14
  • 9 š‘ ( 4 + š‘Ÿ ) =
    36 š‘ + 9 š‘ š‘Ÿ
  • 2 š‘„ ( 3 š‘¦ + 7 š‘§ ) =
    6 š‘„ š‘¦ + 14 š‘„ š‘§
  • ( 4 š‘„ + 7 ) + ( 3 š‘„ āˆ’ 5 ) =
    7 š‘„ + 2
  • ( 2 š‘Ž + 5 š‘ + 1 ) + ( 6 š‘Ž āˆ’ 3 š‘ + 4 ) =
    8a+2b+5
  • (8p+9qāˆ’2)+(2pāˆ’3q+4)=
    10p+6q+2
  • (3x + 4y)+ (5x - 2y)
    8x + 2y
  • 3 š‘„ ( 2 š‘¦ + 5 ) =
    6 š‘„ š‘¦ + 15 š‘„
  • ( 7 š‘Ž + 3 š‘ + 2 ) + ( 4 š‘Ž āˆ’ 5 š‘ + 6 ) =
    11 š‘Ž āˆ’ 2 š‘ + 8
  • ( 9 š‘„ + 2 š‘¦ ) āˆ’ ( 4 š‘„ āˆ’ 3 š‘¦ ) =
    5 š‘„ + 5 š‘¦
  • ( 2 š‘Ž + 5 ) ( 3 š‘Ž āˆ’ 4 ) =
    6 š‘Ž 2 + 7 š‘Ž āˆ’ 20
  • ( 6 š‘„ + 4 š‘¦ ) āˆ’ ( 3 š‘„ + 2 š‘¦ ) =
    3x+2y
  • ( 8 š‘Ž āˆ’ 3 š‘ + 5 ) āˆ’ ( 2 š‘Ž + 5 š‘ āˆ’ 4 ) =
    6 š‘Ž āˆ’ 8 š‘ + 9
  • ( š‘„ + 3 ) ( š‘„ + 2 ) =
    š‘„ 2 + 5 š‘„ + 6
  • ( 5 š‘Ž āˆ’ 8 š‘ + 6 ) āˆ’ ( 2 š‘Ž + 4 š‘ āˆ’ 1 ) =
    3 š‘Ž āˆ’ 12 š‘ + 7
  • 4 š‘Ž ( š‘ + 6 ) =
    4ab+24a
  • 8 š‘„ ( 2 š‘¦ āˆ’ 3 ) =
    16 š‘„ š‘¦ āˆ’ 24 š‘„
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