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This lesson focuses on understanding proportions, determining their accuracy, and solving for unknowns using properties of proportions. We will delve into the geometric mean, defined as the central number in a geometric progression, and demonstrate how to find the geometric mean of given numbers. The session includes problem-solving exercises involving ratios and the geometric mean of two numbers, such as 10 and 15, and 35 and 175. Get ready to enhance your mathematical skills and tackle related homework problems efficiently!
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8.2 Problems with Proportions Use Properties of Proportions
True or Not These proportions are true State if the following Proportions are correct.
True or Not These proportions are true State if the following Proportions are correct.
Find LQ Solve for x first
Find LQ Solve for x first
Find LQ Solve for x first
Find LQ Solve for x first
Geometer mean of a number Definition of geometer mean : The central number in a geometric progression (e.g., 9 in 3, 9, 27), also calculable as the nth root of a product of n numbers. How to find the geometer mean of 10 and 15. Let x be the geometer mean
Find the Geometric mean of 35 and 175 Set up the fraction or the square root.
Find the Geometric mean of 35 and 175 Set up the fraction or the square root.
Homework Page 468 – 471 # 10 – 28 even 32 – 35, 38, 44, 47 - 50
