类别 全部 - equations - triangles - interest - ratios

作者:LaShundra Bell 14 年以前

279

Finished chapter 6 & 7 notes

The notes cover various mathematical concepts and their applications, particularly focusing on percentages, proportions, ratios, and rates. The application of percentages includes solving problems using both proportions and equations, emphasizing the identification of key terms like "

Finished chapter 6 & 7 notes

chapter 6 & 7 notes

Congruent and Similar Triangles(6.5)

Two triangles are congruent when they have the same shape and the same size.

Square Root and The Pythagorean Theorem(6.4)

The square root of a positive number (a) is the positive number (b) whose square is (a). if b2 = a
example: a square root of 25 is 5 because 5.5 = 25

Proportions and Problem Solving(6.3)

Writing proportions is a powerful tool for solving problems in almost every field, including business,chemistry, biology, health sciences, and engineering, as well as in daily life.
example: 5miles over 2 inches = x miles over 7inches cross multiply and 5.7=2.x , 35 =2x, divided both by 2, and x = 17.5

Percent and problem solving: interest (7.6)

Interest is money charged for using other people's money. When you loan or invest money, you earn interest. The money borrowed, loaned, or invested is called the principal amount, or simply principal. Interest is normally stated in terms of a percent of the principal for a given period of time. The interest rate is the percent used in computing the interest. Unless stated otherwise, the rate is understood to be per year. When the interest is computed on the original principal, it is called simple interest.
I = P.R.T

Percent and problem solving: sales tax, commission, and discount (7.5)

Subtopic

Applications of percent (7.4)

Example: what number is 4% of 2174? x = 4% . 2174 x = 0.04. 2174 x = 86.96 x = 87

Solving percent problems with proportions (7.3)

When we translate percent problems to proportions, the percent, p, can be identified by looking for the symbol % or the word percent. The base, b, usually follows the word of. The amount, a, is the part compared to the whole.
amount/base = percent/100 or a/b = p/100

Solving percent problems with equations (7.2)

Recognizing key words in a percent problem is helpful in writing the problem as an equation. Three key words in the statement of a percent problem and their meanings are as follows: of means multiplication (.) is means equal (=) what (or some equivalent) means the unknown number.
example: 5 is what percent of 20? 5 = x . 20 = x = 0.25

Percents, Decimals, and Fractions (7.1)

Writing a precent as a fraction. Replace the symbol with its fraction equivalent, 1/100; then multiply. Don't forget to simplify the fraction if possible.
example: 40% = 40 . 1/100 = 40/1 . 1/100 = 40/100 = 2/5
Writing percent as a decimal. Replace the percent symbol with its decimal equivalent, 0.01; then multiply.
example: 43% = 43(0.01) = 0.43
percent comes from the Latin phrase pre centum, which means "per 100. The "%" symbol is used to denote percent.
example: 7% = 7/100

Proportions (6.2)

A proportion is a statement that two ratios or rates are equal.
example(2/24=1/12)

Ratios and Rates (6.1)

Rates are used to compare different kinds of quantities.
example 32 miles/12gallons
A ratio is the quotient of two quantities.
example( a: b)