# Solving Multi-Step Equations: Question Preview (ID: 32803)

### Below is a preview of the questions contained within the game titled SOLVING MULTI-STEP EQUATIONS: Solve Multi-step Equations In One Variable .To play games using this data set, follow the directions below. Good luck and have fun. Enjoy! [print these questions]

**Play games to reveal the correct answers. Click here to play a game and get the answers.**

6k - 25 = 7- 2k |
||||

a) k = 4 | b) k = -4 | c) k = 6 | d) k = -6 | |

8(2f -3) = 4(4f -8) |
||||

a) f= 2 | b) f =-2 | c) No solution | d) f = 0 | |

4s-12 = -5s +51 |
||||

a) s= 39 | b) s=7 | c) s=-4 | d) no solution | |

2(6- 4d) = 25-9d |
||||

a) d=13 | b) d=5 | c) d=2 | d) no solution | |

3(n-1) = 5n +3 -2n |
||||

a) n= 0 | b) many solutions | c) n= 1 | d) no solution | |

7x-8 = 3x+12 |
||||

a) x= 2 | b) x = -5 | c) x= 5 | d) x= -2 | |

8z - 7 =3z -7 +5z |
||||

a) no solution | b) many solutions | c) z = 14 | d) z= -14 | |

6t = 3(t+4) - t |
||||

a) t= 1 | b) t=3 | c) t=-1 | d) t=-3 | |

3d +8 = 2d - 7 |
||||

a) d= -3 | b) d= 3 | c) d=15 | d) d= -15 | |

2(4-2r) = -2(r+5) |
||||

a) r = 9 | b) r = -4 | c) r = 1 | d) r = -1 | |

7-2n=n-14 |
||||

a) n = -7 | b) n = 14 | c) n = 7 | d) no solution | |

3v - 9 = 7 + 2v - v |
||||

a) v = -8 | b) v = 16 | c) v = 8 | d) many solutions | |

4(b-1) = -4 +4b |
||||

a) no solution | b) many solution | c) b = 1 | d) b = 0 | |

6-4x = 16 -9x |
||||

a) x = 2 | b) x = 1 | c) x = -1 | d) no solution | |

Play Games with the Questions above at ReviewGameZone.com

To play games using the questions from the data set above, visit ReviewGameZone.com and enter game ID number: 32803 in the upper right hand corner at ReviewGameZone.com or simply click on the link above this text.

To play games using the questions from the data set above, visit ReviewGameZone.com and enter game ID number: 32803 in the upper right hand corner at ReviewGameZone.com or simply click on the link above this text.

TEACHERS / EDUCATORS

Log In | Sign Up / Register

Log In | Sign Up / Register