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MTH 115W - Mathematics for Elementary Teachers ICredits: 3 Instructional Contact Hours: 3
Includes numeration systems, sets and their properties, classification of number systems (whole numbers through real number), operations and their properties, arithmetical algorithms, and problem solving. Uses a variety of learning styles, manipulatives, and calculator and computer applications. The National Council of Teachers of Mathematics Standards are incorporated.
Prerequisite(s): MTH 119AW or MTH 119W with a "C" or better or MATH LEVEL 6. Corequisite(s): None Lecture Hours: 45 Lab Hours: 0 Meets MTA Requirement: None Pass/NoCredit: Yes
Outcomes and Objectives
- Develop problem-solving skills.
- Give a general definition of problem solving in mathematics and distinguish between exercises and problems.
- Explain, illustrate and use Polya's 4-step problem solving process:
- understand the problem;
- devise a plan;
- carry out the plan;
- look back.
- Explain, illustrate, and apply strategies that include but are not limited to:
- guess and test;
- use a variable;
- draw a picture;
- look for a pattern;
- make a list;
- solve a simpler problem.
- Use technology appropriately to do mathematics.
- Use and review software packages established for use in the elementary classroom for mathematics.
- Demonstrate understanding of whole numbers.
- Define a set by using:
- the roster or list method.
- set builder notation
- Use the concept of matching sets to formalize the meaning of whole numbers.
- Describe and compare the concepts of cardinal, ordinal, and identification numbers.
- Describe the difference between a whole number, the name of a whole number, and the numeral of the whole number.
- Describe the relations of less than and greater than for whole numbers using sets.
- Demonstrate computational skill.
- Add, subtract, multiply and divide whole numbers.
- Add, subtract, multiply, and divide fractions.
- Add, subtract, multiply, and divide decimals.
- Add, subtract, multiply, and divide with percents.
- Add, subtract, multiply, and divide real numbers.
- Set-up and simplify ratios and rates.
- Solve proportions.
- Carry out fraction, decimal, and percent conversions.
- Solve percent equations.
- Simplify numerical expressions using the order of operations.
- Add, subtract, multiply, and divide integers.Add, subtract, multiply, and divide real numbers.
- Demonstrate understanding of mathematical ideas or operations with concrete models.
- Represent addition, subtraction, multiplication, and division of whole numbers (fractions, and decimals) using a set model and a measurement model.
- Give examples of real world addition, subtraction, multiplication and division problems involving set and measurement models.
- Explain and illustrate the comparison model of subtraction.
- Represent fractions, decimals, and percents using area models, measurements models, set models, and towers of bars.
- Represent integers with the chip (or charged ion) model.
- Use manipulative to illustrate basic arithmetic operations.
- Demonstrate understanding of computational algorithms.
- Explain, illustrate and use a)intermediate algorithm, b) standard algorithm, c) the lattice method for addition and multiplication.
- Explain, illustrate and use long division algorithms that lead to the standard division algorithm (scaffolding, intermediate).
- Find the GCF and LCM of a given pair of numbers using a) the set intersection method, (factor list method), b) the prime factorization method and c) the Euclidean Algorithm.
- Demonstrate ability to make estimations.
- Use, identify, and apply various mental computation and estimation strategies including:
- rounding strategy
- compatible numbers strategy
- using properties
- equal additions method
- Demonstrate understanding of thinking strategies associated with numeracy.
- Explain, illustrate, and use the following thinking strategies for learning basic addition facts:
- commutativity
- adding zero
- counting on by 1 and 2
- combinations to 10
- doubles
- adding 10
- associativity
- Explain, illustrate, and use the following thinking strategies for learning basic multiplication facts:
- commutativity
- multiplication by 0
- multiplication by 1
- multiplication by 2
- multiplication by 5
- multiplication by 9
- associativity
- distributivity
- Demonstrate understanding of number theory.
- Define, compare, and contrast the following terms: prime, composite, divides, factor (divisor), factor trees, multiple, is divisible by, common factor (divisor), common multiple, greatest common factor (GCF), least common multiple (LCM).
- Use the sieve of Eratosthenes to find prime numbers.
- State and apply the fundamental theorem of arithmetic.
- State and apply tests for divisibility by 2, 3, 4, 5, 6, 8, 9, 10, 12.
- Find the prime factorization of a given composite number.
- Use the exponents in the prime factorization of a number to count its factors.
- Relate the GCF and LCM of any two numbers to the product of the numbers.
- State and use the Prime Number Test.
- Communicate effectively about mathematics.
- Perform writing tasks to promote learning.
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