1 / 27

Patterns and relationships

ALGEBRA. Patterns and relationships. What are the 2 missing shapes?. What are the 2 missing letters?. M D C D M D M D C D M D C D. C D. A B A A X A B X A B A A X. A A. MAHTMATHMA MATHMAHTM. HT. VV. IVVIIIXIVVIIIXIVVIIIXI IIIX. A?B?A?C?A?D?A?E?A? A?G.

yen
Download Presentation

Patterns and relationships

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. ALGEBRA Patterns and relationships

  2. What are the 2 missing shapes?

  3. What are the 2 missing letters? M D C D M D M D C D M D C D C D A B A A X A B X A B A A X A A MAHTMATHMA MATHMAHTM HT VV IVVIIIXIVVIIIXIVVIIIXI IIIX A?B?A?C?A?D?A?E?A? A?G F?

  4. Note 1: Patterns To complete a pattern, look for a rule to get from one term to another. Examples: Find the rule for these sequences and write down the next term: 3,7,11,15,…… The rule is ‘start with 3 and add 4 each time’. The next term will be 15 + 4 = 19 1,3,9,27,…… The rule is ‘start with 1 and multiply by 3 each time’. The next term will be 27 x 3= 81

  5. Note 1: Patterns Sometimes it helps to find the rule if we look at the differences between each term. Examples: Find the next three terms in the followingsequences 1, 3, 7, 13, 21, 31,, 43,, 57,, +10 +12 +14 +2 +4 +6 +8 1, 3, 7, 15, 31, 63, 127, 255, +2+4 +8 +16 +32 +64 +128

  6. Note 1: Patterns A car salesman has said he wants to sell 10 cars in his first month of business. Every month after that, he aims to sell two more cars than the previous month. Calculate how many cars he aims to sell each month for the first 5 months of business. 5th month = 16 + 2 1st month = 10 2nd month = 10 + 2 = 18 = 12 3rd month = 12 + 2 = 14 4th month = 14 + 2 Alpha IWB Ex 12.03pg 312 = 16

  7. Note 2: Finding terms from patterns Using the rule for the pattern, substitute values in for n using 1, 2, 3, 4,…..etc until we have the required terms e.g. Find the first four terms in each of the following rules 2n n = 1 (term 1) 2 x (1) = 2 n = 2 (term 2) 2 x (2) = 4 2 x (3) = 6 n = 3 (term 3) 2 x (4) = 8 n = 4 (term 4) Terms are: 2, 4, 6, 8, ……..

  8. Note 2: Finding terms from patterns Using the rule for the pattern, substitute values in for n using 1, 2, 3, 4,…..etc until we have the required terms e.g. Find the first four terms in each of the following rules n + 2 n = 1 (term 1) 1 + 2 = 3 n = 2 (term 2) 2 + 2 = 4 3 + 2 = 5 n = 3 (term 3) 4 + 2 = 6 n = 4 (term 4) Terms are: 3, 4, 5, 6, ……..

  9. Note 2: Finding terms from patterns Using the rule for the pattern, substitute values in for n using 1, 2, 3, 4,…..etc until we have the required terms e.g. Find the first four terms in each of the following rules n = 1 (term 1) 2(1 + 2) = 6 2(n + 2) n = 2 (term 2) 2(2 + 2) = 8 2(3 + 2) = 10 n = 3 (term 3) 2(4 + 2) = 12 n = 4 (term 4) Terms are: 6, 8, 10, 12 ……..

  10. Note 2: Finding terms from patterns Using the rule for the pattern, substitute values in for n using 1, 2, 3, 4,…..etc until we have the required terms e.g. Find the first four terms in each of the following rules n = 1 (term 1) 2(1 + 2) = 6 2(n + 2) n = 2 (term 2) 2(2 + 2) = 8 2(3 + 2) = 10 n = 3 (term 3) 2(4 + 2) = 12 n = 4 (term 4) Terms are: 6, 8, 10, 12 ……..

  11. Note 2: Finding terms from patterns Using the rule for the pattern, substitute values in for n using 1, 2, 3, 4,…..etc until we have the required terms e.g. Find the first four terms in each of the following rules 3n - 1 n = 1 (term 1) 3(1)− 1 = 2 n = 2 (term 2) 3(2)− 1= 5 n = 3 (term 3) 3(3)− 1= 8 3(4)− 1 = 11 n = 4 (term 4) Terms are: 2, 5, 8, 11, ……..

  12. Task: Find the first four terms in each of the following rules by substituting1, 2, 3 & 4 in the following rules. 3n 3, 6, 9, 12, … n +5 6, 7, 8, 9, … n - 1 0, 1, 2, 3, … 4n + 1 5, 9, 13, 17, … -2 + 7n 5, 3, 1, −1, … 5(n+2) 15, 20, 25, 30, … n2 1, 4, 9, 16, … Alpha IWB Ex 12.03pg 313-314 PUZZLE pg 315 Ex 12.04pg 319-323 n2 + 4 5, 8, 13, 20, … n2 +n 2, 6, 12, 20, …

  13. Finding General Rules for number patterns Think of an integer, multiply it by 3, and subtract 2. You may have thought of many different numbers: e.g. 3 × 4 – 2 = 10 3 × 2 – 2 = 4 3 ×−7 − 2 = −23 3 × 9 − 2 = 25 What is the same about each sentence? What is the different about each sentence? How could you write a sentence that describes all possible sentences? How could you write that sentence in maths language? 3 × n − 2 3n − 2

  14. Note 3: Finding General Rules for number patterns A variable is a letter or symbol that is used to describe infinitely many numbers. We write rules in the form of y = dn ± x d andx are numbers that we calculate To do this: 1.) Find the common difference between the terms. This number is d. 2.) Subtract the first term from the common difference. This number is x. e.g. What is the rule for 3, 5, 7, 9, ….

  15. Note 3: Finding General Rules for number patterns y = dn ± xd = common difference x= Term 1 − common difference e.g. What is the rule for 3, 5, 7, 9, …. 2 2 Common Difference 2 x= Term 1 − Common Difference d = 2 = 3 − 2 y = dn ± x = 1 The equation is y = 2n + 1

  16. Note 3: Finding General Rules for number patterns y = dn ± xd = common difference x= Term 1 − common difference e.g. What is the rule for 10, 14, 18, 22 …. 4 4 Common Difference 4 x= Term 1 − Common Difference d= 4 = 10 − 4 y = dn ± x = 6 The equation is y = 4n + 6

  17. Note 3: Finding General Rules for number patterns y = dn ± xd = common difference x= Term 1 − common difference e.g. What is the rule for 35, 30, 25, 20 …. -5 -5 Common Difference -5 x= Term 1 − Common Difference d= -5 =35−−5 y = dn ± x = 35+5 The equation is y = -5n+40 = 40

  18. Note 3: Finding General Rules for number patterns y = dn ± xd = common difference x= Term 1 − common difference e.g. What is the rule for 4, 1, -2, -5, …. -3 -3 Common Difference -3 x= Term 1 − Common Difference d= -3 =4−−3 y = dn± x = 4+3 The equation is y = -3n+7 = 7

  19. Now its your turn! Find d and xfirst e.g. What is the rule for : 2, 4, 6, 8, … 17, 12, 7, 2, … 18, 27, 36, 45, … 37, 29, 21, 13, … Write rules in the form of y = dn± x d= 2, x = 0 y = 2n + 0 d= −5, x = 22 y = −5n + 22 d= 9, x = 9 y = 9n + 27 d= −8, x = 45 y = -8n + 45 Alpha IWB Ex 12.04pg 319-323

  20. Spatial Patterns

  21. Spatial Patterns 4 7 10 How many matches are there in each pattern? How many matches will there be in a pattern with 4 squares? 10 + 3 = 13

  22. Spatial Patterns 7 4 10 13 d = 3 s = Term 1 − Common Difference = 4 − 3 y = dq ± s = 1 The equation is y = 3q+ 1

  23. Spatial Patterns 3 9 6 Draw the next 2 shapes in this pattern d = 3 s = Term 1 − Common Difference = 3 − 3 y = dt ± s = 0 The equation is y = 3t + 0

  24. y = dh ± x Spatial Patterns 6 11 16 Draw the next 2 shapes in this pattern d = 5 x= Term 1 − Common Difference = 6 − 5 y = dh ± x = 1 The equation is y = 5h + 1

  25. Note 4: Finding Rules for spatial patterns Alpha IWB Ex 12.04pg 319-323

  26. Note 4: Using rules, tables & graphs Sarah babysits on the weekend. She is paid $5.00 each time, plus $6 per hour that she is there. Complete the table to show her earnings for 1-5 hours at a time. $11 $17 $23 $29 $35 Plot the coordinates from the table to a graph Rule: 5 + 6h

  27. Note 4: Using rules, tables & graphs

More Related