Elementary Teacher Preparation Policy

**Mathematics Test Requirements:**
Connecticut requires all teacher candidates to pass the Praxis Elementary Education: Multiple Subjects (5001) test, which includes a separately scored math subtest.**Mathematics Preparation Standards:** Connecticut does not have articulated teaching standards that its approved teacher preparation programs must use to frame instruction in elementary mathematics content such as; mathematics foundations and areas such as algebra, geometry and statistics. Instead, the state relies on 2018 Council for the Accreditation of Educator Preparation (CAEP) K-6 Elementary Teacher Preparation Standards, which address content in mathematics foundations and pedagogy.

**Ensure that teacher preparation programs require mathematics content geared towards the needs of elementary teachers. **Connecticut should require teacher preparation programs to train candidates in key areas of mathematics, including specific coursework in foundations, algebra and geometry, with some statistics coursework. Doing so helps ensure that all teachers are well prepared in mathematics instruction before entering the classroom. Additionally, articulated math preparation standards help ensure that any subsequent test adoptions are aligned with Connecticut's expectations for what candidates should know and be able to do.

Connecticut recognized the factual accuracy of this analysis.

- Program Entry
- Teacher Shortages and Surpluses
- Program Performance Measures
- Program Reporting Requirements
- Student Teaching/Clinical Practice

- Middle School Content Knowledge
- Middle School Licensure Deficiencies
- Secondary Content Knowledge
- Secondary Licensure Deficiencies

**2B: Teaching Elementary Mathematics **

**Content Knowledge:**The state should require:- All elementary teacher candidates to pass a rigorous elementary math content exam in order to attain licensure.
- Teacher preparation programs to deliver elementary math content coursework of the appropriate breadth and depth to all elementary teacher candidates. This coursework should build a strong conceptual foundation in elementary math topics and should align with recommendations of professional associations such as the Conference Board of the Mathematical Sciences and the National Council of Teachers of Mathematics.

**Full Credit:**The state will earn full credit if it requires new elementary teachers to pass a math content test or separately scored math subtest prior to obtaining licensure.**Three-quarters credit:**The state will earn three-quarters of a point if it requires elementary teachers to pass a math content test or separately scored math subtest prior to obtaining licensure. but also allows exceptions, or delays passage of tests for any reason.**One-half credit:**The state will earn one-half of a point if it requires elementary teachers to pass a math content test or separately scored math subtest prior to obtaining licensure, but also offers multiple elementary licenses with differing requirements.**One-quarter credit:**If the state does not require a math content test, but adequate math teacher preparation standards exist, it is eligible for one-quarter of a point.

Required math coursework should be tailored in both design and delivery to the unique needs of the elementary teacher. Aspiring elementary teachers must acquire a deep conceptual knowledge of the mathematics that they will teach, moving well beyond mere procedural understanding.^{[1]} Their training should focus on the critical areas of numbers and operations; algebra; geometry; and, to a lesser degree, data analysis and probability.

To ensure that elementary teachers are well trained to teach the essential subject of mathematics, states must require teacher preparation programs to cover these four areas in coursework that is specially designed for prospective elementary teachers.^{[2]} Leading mathematicians and math educators have found that elementary teachers are not well served by courses designed for a general audience and that methods courses also do not provide sufficient preparation.^{[3]} According to Dr. Roger Howe, a mathematician at Yale University: "Future teachers do not need so much to learn more mathematics, as to reshape what they already know."

States' policies should require preparation in mathematics of appropriate breadth and depth and specific to the needs of the elementary teacher. Reports by NCTQ on teacher preparation, beginning with *No Common Denominator: The Preparation of Elementary Teachers in Mathematics by America's Education Schools* (2008) and continuing through the *Teacher Prep Review,* have consistently found few elementary teacher preparation programs across the country providing high-quality preparation in mathematics.^{[4]} Whether through standards or coursework requirements, states must ensure that their preparation programs graduate only teacher candidates who are well prepared to teach mathematics.

Many state tests offer no assurance that teachers are prepared to teach mathematics. An increasing number of states require passage of a mathematics subtest as a condition of licensure, but many states still rely on subject-matter tests that include some items (or even a whole section) on mathematics instruction. However, since subject-specific passing scores are not required, one need not know much mathematics in order to pass. In fact, in some cases one could answer every mathematics question incorrectly and still pass.^{[5]} States need to ensure that it is not possible to pass a licensure test that purportedly covers mathematics without knowing the critical material.

The content of these tests poses another issue: these tests should properly test elementary content but not at an elementary level. Instead, problems should challenge the teacher candidate's understanding of underlying concepts and apply knowledge in nonroutine, multistep procedures.^{[6]} The MTEL test required by both Massachusetts and North Carolina remains the standard bearer for a high quality, rigorous assessment for elementary teachers entirely and solely focused on mathematics.