# more on solving equations section 4. solve: 7x + x – 2x + 9 = 15 answer: 7x + x – 2x + 9 = 15 6x...

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• Slide 1
• More on Solving Equations Section 4
• Slide 2
• Solve: 7x + x 2x + 9 = 15 Answer: 7x + x 2x + 9 = 15 6x + 9 = 15 -9 -9 ___________ 6x = 6 x = 1
• Slide 3
• Grouping Symbols You might have to distribute before you combine like terms.
• Slide 4
• Solve: 2(x + 3) = x + 7 Answer: 2(x + 3) = x + 7 2x + 6 = x + 7 -x -x ____________ x + 6 = 7 -6 -6 _____________ x = 1
• Slide 5
• Solve: 2(2x + 3) = 18 Answer: 2(2x + 3) = 18 4x + 6 = 18 -6 -6 ____________ 4x = 12 x = 3
• Slide 6
• Solve 4(2x) + 5 3x = x + 13 Answer: 4(2x) + 5 3x = x + 13 8x + 5 3x = x + 13 5x + 5 = x + 13 -x -x ________________ 4x + 5 = 13 -5 -5 ________________ 4x = 8 x = 2
• Slide 7
• Solve: 2(x+5)= 3(x + 2) + x Answer: 2x + 10 = 3(x + 2) + x 2x + 10 = 3x + 6 + x 2x + 10 = 4x + 6 -4x -4x __________________ -2x + 10 = 6 -10 -10 __________________ -2x = -4 x = 2
• Slide 8
• Solve: 2(3x + 2) = 2(x+8) Answer: 2(3x + 2) = 2x + 16 6x + 4 = 2x + 16 -2x -2x ________________ 4x + 4 = 16 -4 -4 _________________ 4x = 12 x = 3
• Slide 9
• Word Problems Section 5
• Slide 10
• Words that tell you to add. Plus Increased By Sum More Than
• Slide 11
• Words that tell you to subtract Minus Decreased By Difference Less Than
• Slide 12
• Multiply and Divide Words.. Multiply 1. Product 2. times Divide 1. Quotient 2. Ratio of
• Slide 13
• Write the mathematical statement for the following.. 9 increased by 2 5 decreased by m Sum of 4 and 2x 7 less than 12 7 increased by 5 times a number 8 decreased by 3 times a number The sum of twice a number and 5 9 + 2 5 m 4 + 2x 12 7 7 + 5n 8 3x 2y + 5
• Slide 14
• You Try.. The sum of 7 and 3 times a number 4 times Harrys age increased by 2 8 pounds less than twice wandas weight 7 + 3n 4h + 2 2w - 8
• Slide 15
• Word Problems The \$500 selling price of a TV is \$70 less than 3 times the cost. Find the profit Lets define the variables first: Let C = Cost Let P = Profit Let SP = Selling Price
• Slide 16
• The \$500 selling price of a TV is \$70 less than 3 times the cost. Find the profit. Think: Cost + Profit = Selling Price C + P = SP We know the selling price and are looking for the profit. Somehow we need to find the cost first: 3C 70 = \$500 3C = \$570 Cost = \$190. We are still looking for the profit.
• Slide 17
• The \$500 selling price of a TV is \$70 less than 3 times the cost. Find the profit. We know that the cost = 190. Cost + Profit = Selling Price. 190 + P = 500 P = 500 190 Profit = \$310 (This is the answer)
• Slide 18
• You Try The \$140 selling price of a game is \$60 less than twice the cost. Find the profit.
• Slide 19
• The \$140 selling price of a game is \$60 less than twice the cost. Find the profit. 1 st find the cost: 2C 60 = 140 2C = 140 + 60 2C = 200 C = \$100 2 nd find the profit: C + P = SP 100 + P = 140 P = 140 100 Profit = \$40
• Slide 20
• Example Mr. Daniels family rented a car when they flew to Hawaii for a 3-day vacation. They paid \$42 per day and \$0.07 for each mile driven. How much did it cost to rent the car for 3 days and drive 200 miles?
• Slide 21
• Answer.. Mr. Daniels family rented a car when they flew to Hawaii for a 3- day vacation. They paid \$42 per day and \$0.07 for each mile driven. How much did it cost to rent the car for 3 days and drive 200 miles? Total Cost = (Cost Per Day)(# of Days) + (Cost Per Mile)(# of Miles) Cost = (42)(3) + (200)(0.07) Cost = \$126 + \$14 Cost = \$140
• Slide 22
• Example A car repair shop charged Mr. Jacobs \$96 for an automotive part plus \$72 per hour that a mechanic worked to install the part. The total charge was \$388. For about how long did the mechanic work to install the part on Mr. Jacobs car?
• Slide 23
• Answer A car repair shop charged Mr. Jacobs \$96 for an automotive part plus \$72 per hour that a mechanic worked to install the part. The total charge was \$388. For about how long did the mechanic work to install the part on Mr. Jacobs car? Total Cost = Base fee + (Charge Per Hour)(# of hours) \$388 = \$96 + \$72(hours) 388 = 96 + 72H 388 96 = 72H 292 = 72H H = 4.06 or 4 Hours
• Slide 24
• Example The length of a rectangle is 5 and the area is 35. Find the perimeter of the rectangle.
• Slide 25
• Answer The length of a rectangle is 5 and the area is 35. Find the perimeter of the rectangle. 1 st : Find the width by using the area formula of a rectangle. A = length x width 35 = 5 x width width = 7
• Slide 26
• Remember the width = 7. The length of a rectangle is 5 and the area is 35. Find the perimeter of the rectangle. 2 nd : Plug into the formula to find the perimeter. P = 2l + 2w P = 2(5) + 2(7) P = 10 + 14 P = 24
• Slide 27
• Example The perimeter of a rectangle is 20 and the width is 4. Find the area of the rectangle.
• Slide 28
• Answer.. The perimeter of a rectangle is 20 and the width is 4. Find the area of the rectangle. 1 st : Find the length using the perimeter formula. P = 2w + 2l 20 = 2(4) + 2l 20 = 8 + 2l 12 = 2l l = 6
• Slide 29
• Remember the length = 6.. The perimeter of a rectangle is 20 and the width is 4. Find the area of the rectangle. 2nd: Find the area. A = l x w A = 6 x 4 A = 24

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