1 / 14

BELL-WORK

This tutorial explains how to solve multi-step equations by combining like-terms and using the distributive property. It provides examples and step-by-step instructions.

deegan
Download Presentation

BELL-WORK

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript


  1. BELL-WORK 1. Evaluate 3x + 5y2 for x = 0, y = -3 3(0) + 5(-3)2 0 + 5(9) 45

  2. BELL-WORK Solve: 2. x + 7 = 41 2 x = 34 2 x = 68

  3. BELL-WORK Solve: 3. -x = 45 5 -x = 225 x = -224 • -2x + 9 = -11 -2x = -20 x = 10

  4. Solving 2-Step Equations Solve: 23 – 2x = 49 -2x = 49 – 23 -2x = 26 x = -13

  5. Solving 2-Step Equations Solve: 14 – h = 8 -h = 8 – 14 -h = -6 -1h = -6 -1h = -6 ÷ -1 h = 6

  6. Solving 2-Step Equations Solve: 4 – x = 10 -x = 10 – 4 -x = 6 -1x = 6 -1x = 6 ÷ -1 x = -6

  7. Did you get it? On your page solve: 10 – 3x = 31 -3x = 21 x = -7 15 – x = 13 -x = -2 x = 2

  8. Solving Multi-Step Equations:Combining Like-Terms Examples: 3a + 6 + a = 90 3a + a + 6 = 90 4a + 6 = 90 4a = 84 a = 21 7p + 8p – 12 = 59 15p = 71 p = 71 15

  9. Solving Multi-Step Equations:Using The Distributive Property The distributive property states that multiplication can be distributed over a sum. a(b + c) = a●b + a●c Example: 2(4 + 6) 2●4 + 2●6 8 + 12 20

  10. The Distributive Property Simplify using the distributive property : 2(5x + 3) 2●5x + 2●3 10x + 6 6(m + 5) = 6●m + 6●5 = 6m + 30 2(h – 7t) 2●h – 2●7t 2h – 14t

  11. The Distributive Property -2(6x + 4) = = -2●6x + -2●4 = -12x + -8 = -12x – 8 Please note: 2 different signs yield a minus 2 of the same signs yield a plus + - = – – - = +

  12. The Distributive Property -3(7 + 5b) -3●7 + -3●5b -21 – 15b -15b – 21 -4(2 – 9c) -4●2 – -4●9c -8 + 36c 36c – 8

  13. The Distributive Property -(3 – 8y) -1(3 – 8y) -1●3 – -1●8y -3 + 8y 8y – 3 -(4t – 5) -1(4t – 5) -1●4t – -1●5 -4t + 5

  14. Solving Multi-Step Equations 2(x – 3) = 8 2x – 6 = 8 2x = 14 x = 7 8n – (2n – 3) = 12 8n – 1(2n – 3) = 12 8n –1∙ 2n – -1∙3 = 12 8n – 2n + 3 = 12 6n + 3 = 12 6n = 9 n = 3 2

More Related