1 / 32

6 th Grade Primary Mathematics

6 th Grade Primary Mathematics. October 23, 2012. Algebraic Expressions. Algebraic expression can be used to describe an existing relationship. Amelia was born when her mother was 25 years old. . 25 years. Amelia’s Age. Mother’s Age. X. 25 years. Amelia’s Age. Mother’s Age. X + 25.

anana
Download Presentation

6 th Grade Primary Mathematics

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. 6th GradePrimary Mathematics October 23, 2012

  2. Algebraic Expressions Algebraic expression can be used to describe an existing relationship. Amelia was born when her mother was 25 years old. 25 years Amelia’s Age Mother’s Age

  3. X 25 years Amelia’s Age Mother’s Age X + 25 Will Amelia’s mother always be 25 years older than Amelia?

  4. John takes all of his dollar bills to the bank to exchange them for quarters. How many quarters will he receive?

  5. Graphs of Functions Sally’s allowance is $5 per week. Her parents give her an additional $1 for each chore that she does. 10 Sally’s Allowance ($) 5 10 0 5 Number of Chores

  6. How old will Dylan be when Ellen is 10? How old will Ellen be when Dylan is 10? Ellen’s Age Dylan’s Age 1 1 + 3 = 4 22 + 3 = 5 Dylan’s Age (years) xx + 3 10 10 + 3 = 13 7 Ellen’s Age (years) Primary Mathematics Textbook 6A page 26

  7. Writing Expressions Joel has three more rabbits than turtles. If Joel has T turtles, how many rabbits does he have? If Joel has R rabbits, how many turtles does he have? T + 3 R Number of Rabbits Number of Turtles T 3 R - 3

  8. There are four times as many boys on the track team as girls. If there are G girls on the track team, how many boys are on the team? If there are B boys on the tract team, how many girls are on the team? If there are X number of athletes on the track team, how many are girls and how many are boys? G Number of Girls Number of Boys 4 x G

  9. There are four times as many boys on the track team as girls. If there are G girls on the track team, how many boys are on the team? If there are B boys on the tract team, how many girls are on the team? If there are X number of athletes on the track team, how many are girls and how many are boys? B ÷ 4 Number of Girls Number of Boys B

  10. There are four times as many boys on the track team as girls. If there are G girls on the track team, how many boys are on the team? If there are B boys on the tract team, how many girls are on the team? If there are X number of athletes on the track team, how many are girls and how many are boys? X Number of Girls X Number of Boys X

  11. Equations An equation is a mathematical statement of equality between algebraic expressions.

  12. There are four times as many boys on the track team as girls. If there are 30 athletes on the team, how many girls and boys are there? x + 4x = 30 There are 6 girls and 24 boys on the team. X 5x = 30 x = 6 Number of Girls 6 30 6 6 Number of Boys 6 6 4X

  13. Joel has three more rabbits than turtles. If he has 7 animals in all, how many rabbits does he have? Method 1 y + 3 y + 3 + y = 7 2+ 3 = 5 Number of Rabbits 2y + 3 = 7 7 2 Number of Turtles 2y = 4 y = 2 y 3 Joel had 2 turtles and 5 rabbits.

  14. Joel has three more rabbits than turtles. If he has 7 animals in all, how many rabbits does he have? Method 2 w w + w – 3 = 7 5 Number of Rabbits 2w – 3 = 7 7 5 – 3 = 2 Number of Turtles 2w = 10 w = 5 3 w - 3 Joel had 2 turtles and 5 rabbits.

  15. Morris spent $115.70 on CD’s and Video Games. If he spent $87.95 on Video Games, how much did Morris spend out CD’s? $115.70 Video Games CD’s x $87.95 87.95 + x = 115.70 x = 27.75 Morris spent $27.75 on CD’s.

  16. Use the graph to solve for y x + 4 10 y = (12) + 4 5 10 = (8) + 4 0 12 10 5

  17. Use the graph to solve for x x + 4 10 x + 4 = 7 (6) + 4 = 7 5 x + 4 = 10 0 10 (12) + 4 = 10 5 6 12

  18. Algebraic Expressions II There are x pens in a box and y pencils in a box. If Mrs. Smith purchased 5 boxes of pens and 3 boxes of pencils, how many writing implements did she buy? x x x x x Number of Pens = 5x Pens Pencils Number of Pencils = 3y y y y Mrs. Smith bought 5x + 3y writing implements in all.

  19. There are 8 pens in a box and 10 pencils in a box. If Mrs. Smith purchased s boxes of pens and t boxes of pencils, how many writing implements did she buy? s Number of pens = 8s Pens Pencils Number of pencils = 10t t Mrs. Smith purchased 8s + 10t writing implements in all.

  20. At a farm, Ben and Kathy were each given a bucket that weighed x grams. Ben picked y grams of blueberries. The blueberries Kathy picked were three times as heavy as Ben’s. x y Ben Kathy y y y x

  21. At a farm, Ben and Kathy were each given a bucket that weighed x grams. Ben picked y grams of blueberries. The blueberries Kathy picked were three times as heavy as Ben’s. What is the total weight of both buckets? x y Ben ? Kathy y y y x The total weight of both buckets is 2x + 4y

  22. At a farm, Ben and Kathy were each given a bucket that weighed x grams. Ben picked y grams of blueberries. The blueberries Kathy picked were three times as heavy as Ben’s. How much more does Kathy’s bucket weight than Ben’s bucket? ? x y Ben Kathy y y y x Kathy’s bucket weighs 2y more grams than Ben’s

  23. Darryl has $7700 in his investment account after a year. He earned 10% of it as interest. How much did he have in his account at first? 10% of the original amount Amount Darryl had at first Darryl’s money after a year $7700 11 units = $7700 1 unit = $700 10 units = $7000 Darryl had $7000 in his account at first. Primary Mathematics Workbook 6A page 73

  24. Mr. Arasim sold a bed frame for $625. The selling price was 25% more than the cost price. What is the cost price of the bed frame? 25% of the cost price Cost price of the bed frame Selling price of the bed frame $625 5 units = $625 1 unit = $125 4 units = $500 The cost price of the bed frame is $500. Primary Mathematics Workbook 6A page 74

  25. 100% ? 40% 15% 45% ? = 100 – 15 – 40 ? = 45 Primary Mathematics Textbook 6A page 77 Problem 3

  26. 4000 seats ? $120 $80 40% 15% 45% 45% = 1800 tickets 100% = 4000 tickets 10% = 400 tickets 5% = 200 tickets 40% = 4(10%) = 4(400)=1600 1800 tickets are priced at $50 Primary Mathematics Textbook 6A page 77 Problem 3

  27. The figure is made up of two rectangles. Find the area of the figure. PM 4A 30 feet Area = 10 x 8 Area = 80 square feet 8 feet Area = 20 x 20 Area = 400 square feet 20 feet 10 feet Area = 80 + 400 20 feet The area of the figure is 480 square feet.

  28. The figure is made up of two rectangles. Find the area of the figure. PM 4A 30 feet Area = 30 x 8 Area = 240 square feet 8 feet 20 feet Area = 20 x 12 Area = 240 square feet 12 feet 20 feet Area = 240 + 240 Area= 480 square feet

  29. Number of pens Number of pencils The ratio of pens to pencils is 3 : 2 Primary Mathematics Textbook 6A page 95.

  30. $ 453.60 $27 $27 $27 Cost of mileage Cost of mileage = 453.60 – 3 (27) = 372.60 Primary Mathematics Textbook 6A page 137.

  31. $ 453.60 $372.60 $27 $27 $27 x = 621 miles Primary Mathematics Textbook 6A page 137.

More Related