Presentation is loading. Please wait.

Presentation is loading. Please wait.

Translating Between Words and Expressions Return to table of contents.

Similar presentations


Presentation on theme: "Translating Between Words and Expressions Return to table of contents."— Presentation transcript:

1 Translating Between Words and Expressions Return to table of contents

2 List words that indicate addition

3 List words that indicate subtraction

4 List words that indicate multiplication

5 List words that indicate division

6 List words that indicate equals

7 Be aware of the difference between "less" and "less than". For example: "Eight less three" and "Three less than Eight" are equivalent expressions. So what is the difference in wording? Eight less three: 8 - 3 Three less than eight: 8 - 3 When you see "less than", you need to switch the order of the numbers.

8 As a rule of thumb, if you see the words "than" or "from" it means you have to reverse the order of the two items on either side of the word. Examples: ·8 less than b means b - 8 ·3 more than x means x + 3 ·x less than 2 means 2 - x _______________ click to reveal _______________

9 The many ways to represent multiplication... How do you represent "three times a"? (3)(a)3(a) 3  a3a The preferred representation is 3a When a variable is being multiplied by a number, the number (coefficient) is always written in front of the variable. The following are not allowed: 3xa... The multiplication sign looks like another variable a3... The number is always written in front of the variable

10 Representation of division... How do you represent "b divided by 12"? b ÷ 12 b ∕ 12 b 12

11 When choosing a variable, there are some that are often avoided: l, i, t, o, O, s, S Why might these be avoided? It is best to avoid using letters that might be confused for numbers or operations. In the case above (1, +, 0, 5)

12 Three times j Eight divided by j j less than 7 5 more than j 4 less than j 1 2 3 4 5 6 7 8 9 0 + - ÷ TRANSLATE THE WORDS INTO AN ALGEBRAIC EXPRESSION j    ÷ ÷ ÷ - - - ++

13 23 + m The sum of twenty-three and m Write the expression for each statement. Then check your answer.

14 d - 24 Twenty-four less than d Write the expression for each statement. Then check your answer.

15 4(8-j) Write the expression for each statement. Remember, sometimes you need to use parentheses for a quantity. Four times the difference of eight and j

16 7w 12 The product of seven and w, divided by 12 Write the expression for each statement. Then check your answer.

17 (6+p) 2 Write the expression for each statement. Then check your answer. The square of the sum of six and p

18 100The quotient of 200 and the quantity of p times 7 A200 7p B200 - (7p) C200 ÷ 7p D7p 200

19 101 35 multiplied by the quantity r less 45 A35r - 45 B35(45) - r C35(45 - r) D35(r - 45)

20 102Mary had 5 jellybeans for each of 4 friends. A5 + 4 B5 - 4 C5 x 4 D5 ÷ 4

21 103If n + 4 represents an odd integer, the next larger odd integer is represented by An + 2 Bn + 3 Cn + 5 Dn + 6 From the New York State Education Department. Office of Assessment Policy, Development and Administration. Internet. Available from www.nysedregents.org/IntegratedAlgebra; accessed 17, June, 2011.

22 104 a less than 27 A27 - a B a 27 Ca - 27 D27 + a

23 105If h represents a number, which equation is a correct translation of: “Sixty more than 9 times a number is 375”? A9h = 375 B9h + 60 = 375 C9h - 60 = 375 D60h + 9 = 375 From the New York State Education Department. Office of Assessment Policy, Development and Administration. Internet. Available from www.nysedregents.org/IntegratedAlgebra; accessed 17, June, 2011.

24 Using Numerical and Algebraic Expressions and Equations Return to table of contents

25 We can use our algebraic translating skills to solve other problems. We can use a variable to show an unknown. A constant will be any fixed amount. If there are two separate unknowns, relate one to the other.

26 The school cafeteria sold 225 chicken meals today. They sold twice the number of grilled chicken sandwiches than chicken tenders. How many of each were sold? 2c + c = 225 chicken sandwiche s chicke n tender s total meals c + 2c = 225 3c = 225 3 3 c = 75 The cafeteria sold 150 grilled chicken sandwiches and 75 tenders.

27 Julie is matting a picture in a frame. Her frame is 9 inches wide and her picture is 7 inches wide. How much matting should she put on either side? 2m + 7 = 9 -7 -7 2m = 2 2 2 m = 1 Julie needs 1 inches on each side. 1414 1212 1212 1414 9 both sides of the mat size of picture size of frame 1212 1212

28 Many times with equations there will be one number that will be the same no matter what (constant) and one that can be changed based on the problem (variable and coefficient). Example: George is buying video games online. The cost of the video is $30.00 per game and shipping is a flat fee of $7.00. He spent a total of $127.00. How many games did he buy in all?

29 George is buying video games online. The cost of the video is $30.00 per game and shipping is a flat fee of $7.00. He spent a total of $127.00. How many games did he buy in all? Notice that the video games are "per game" so that means there could be many different amounts of games and therefore many different prices. This is shown by writing the amount for one game next to a variable to indicate any number of games. 30g cost of one video game number of games

30 George is buying video games online. The cost of the video is $30.00 per game and shipping is a flat fee of $7.00. He spent a total of $127.00. How many games did he buy in all? Notice also that there is a specific amount that is charged no matter what, the flat fee. This will not change so it is the constant and it will be added (or subtracted) from the other part of the problem. 30g + 7 cost of one video game number of games the cost of the shipping

31 George is buying video games online. The cost of the video is $30.00 per game and shipping is a flat fee of $7.00. He spent a total of $127.00. How many games did he buy in all? "Total" means equal so here is how to write the rest of the equation. 30g + 7 = 127 cost of one video game number of games the total amount the cost of the shipping

32 George is buying video games online. The cost of the video is $30.00 per game and shipping is a flat fee of $7.00. He spent a total of $127.00. How many games did he buy in all? Now we can solve it. 30g + 7 = 127 -7 30g = 120 30 30 g = 4George bought 4 video games.

33 106Lorena has a garden and wants to put a gate to her fence directly in the middle of one side. The whole length of the fence is 24 feet. If the gate is 4 feet, how many feet should be on either side of the fence? 1212

34 107Lewis wants to go to the amusement park with his family. The cost is $12.00 for parking plus $27.00 per person to enter the park. Lewis and his family spent $147. Which equation shows this problem? A12p + 27 = 147 B12p + 27p = 147 C27p + 12 = 147 D39p = 147

35 108Lewis wants to go to the amusement park with his family. The cost is $12.00 for parking plus $27.00 per person to enter the park. Lewis and his family spent $147. How many people went to the amusement park WITH Lewis?

36 109Mary is saving up for a new bicycle that is $239. She has $68.00 already saved. If she wants to put away $9.00 per week, how many weeks will it take to save enough for her bicycle? Which equation represents the situation? A9 + 68 = 239 B9d + 68 = 239 C68d + 9 = 239 D77d = 239

37 110Mary is saving up for a new bicycle that is $239. She has $68.00 already saved. If she wants to put away $9.00 per week, how many weeks will it take to save enough for her bicycle?

38 111 You are selling t-shirts for $15 each as a fundraiser. You sold 17 less today then you did yesterday. Altogether you have raised $675. Write and solve an equation to determine the number of t-shirts you sold today. Be prepared to show your equation!

39


Download ppt "Translating Between Words and Expressions Return to table of contents."

Similar presentations


Ads by Google