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Division

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Pre-Algebra

Definition

Division is a fundamental mathematical operation that involves partitioning a quantity into equal parts or groups. It represents the inverse of multiplication, allowing us to find how many times one number is contained within another. This key term is essential in understanding various mathematical concepts, from whole numbers to exponents and scientific notation.

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5 Must Know Facts For Your Next Test

  1. Division is used to find the number of equal groups or shares when a quantity is partitioned.
  2. The division of whole numbers can result in a whole number, a fraction, or a decimal, depending on the relationship between the dividend and divisor.
  3. Division is an essential operation in evaluating and simplifying algebraic expressions, as it allows for the isolation of variables.
  4. Factors, which are the numbers that divide evenly into a given number, are closely related to division.
  5. The properties of exponents, including division, are crucial for working with scientific notation and performing calculations involving very large or very small numbers.

Review Questions

  • Explain how division is used in the context of whole numbers and how it relates to the concept of factors.
    • Division of whole numbers is used to determine how many equal groups or shares a quantity can be divided into. For example, if you have 12 apples and you want to divide them equally among 3 people, you would use division to find that each person gets 4 apples. The divisor (3) represents the number of equal groups, and the quotient (4) is the number of items in each group. This concept of division is closely related to the idea of factors, which are the numbers that divide evenly into a given number. In the example of 12 apples, the factors of 12 include 1, 2, 3, 4, 6, and 12, all of which can be used as divisors in a division operation.
  • Describe how division is used in the context of evaluating and simplifying algebraic expressions, and explain its relationship to the concept of exponents.
    • Division is an essential operation in evaluating and simplifying algebraic expressions, as it allows for the isolation of variables. For example, in the expression $\frac{3x^2}{6x}$, division is used to simplify the expression by canceling out the variable $x$ in the numerator and denominator, resulting in $\frac{1}{2}$. This relationship between division and exponents is further explored in the topic of using multiplication properties of exponents, where division can be used to simplify expressions involving powers of the same base. Additionally, division is a crucial operation in working with scientific notation, where very large or very small numbers are represented using integer exponents.
  • Analyze how division is used in the context of decimals and fractions, and explain its connection to the broader understanding of rational numbers.
    • Division is a fundamental operation that connects the concepts of whole numbers, decimals, and fractions. When dividing a whole number by another whole number, the result can be a whole number, a fraction, or a decimal, depending on the relationship between the dividend and divisor. For example, dividing 10 by 3 results in the decimal 3.33, whereas dividing 10 by 2 results in the whole number 5. This understanding of division, and its relationship to the representation of rational numbers, is crucial in the broader context of working with decimals and fractions. Division allows us to convert between these different forms of rational numbers, which is an essential skill in various mathematical applications, from problem-solving to more advanced topics in algebra and beyond.
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