Nov 21, 2024  
2019-2020 Undergraduate Bulletin 
    
2019-2020 Undergraduate Bulletin [ARCHIVED CATALOG]

Mathematics, Adolescence Education: Mathematics, B.A.


Requirements are the same as for the B.A. degree except that MATH 330 , MATH 335 , and either MATH 341  or MATH 361  are required to fulfill requirement B. In addition, students must take MATH 390  as one of their 300-level electives. Students must also complete the certification requirements set forth in the School of Education program description. See education.geneseo.edu for more information.  

Program Learning Outcomes, Adolescence Mathematics (NCTM)


1)  Content Knowledge:Candidates demonstrate and apply knowledge of major mathematics concepts, algorithms, procedures, connections and applications within and among mathematical content domains.

2)  Mathematical Practices:Candidates solve problems, represent mathematical ideas, reason, prove, use mathematical models, attend to precision, identify elements of structure, generalize, engage in mathematical communication, and make connections as essential mathematical practices. They understand that these practices intersect with mathematical content and that understanding relies on the ability to demonstrate these practices within and among mathematical domains and in their teaching.

3)  Content Pedagogy:Effective teachers of secondary mathematics apply knowledge of curriculum standards for mathematics and their relationship to student learning within and across mathematical domains. They incorporate research-based mathematical experiences and include multiple instructional strategies and mathematics-specific technological tools in their teaching to develop all students’ mathematical understanding and proficiency. They provide students with opportunities to do mathematics - talking about it and connecting it to both theoretical and real-world contexts.They plan, select, implement, interpret, and use formative and summative assessments for monitoring student learning, measuring student mathematical understanding, and informing practice.

4)  Mathematical Learning Environment:Candidates exhibit knowledge of adolescent learning, development and behavior. They use this knowledge to plan and create sequential learning opportunities grounded in mathematics education research where students are actively engaged in the mathematics they are learning and building from prior knowledge and skills. They demonstrate a positive disposition toward mathematical practices and learning, include culturally relevant perspectives in teaching, and demonstrate equitable and ethical treatment of and high expectations for all students. They use instructional tools such as manipulatives, digital tools, and virtual resources to enhance learning while recognizing the possible limitations of such tools. 

5)  Impact on Student Learning:Candidates provide evidence demostrating that as a result of their instruction, secondary students’  conceptual understanding, procedural fluency, strategic competence, adaptive reasoning and application of major mathematics concepts in varied contexts have increased. These teachers support the continual development of a productive disposition toward mathematics. They show that new student mathematical knowledge has been created as a consequence of their ability to engage students in mathematical experiences that are developmentally appropriate, require active engagement, and include mathematics-specific technology in building new knowledge. 

6)  Professional Knowledge and Skills:Candidates are lifelong learners and recognize that learning is often collaborative. They participate in professional development experiences specific to mathematics and mathematics education, draw upon mathematics education research to inform practice, continuously reflect on their practice and utilize resources from professional mathematics organizations.

7)  Secondary Mathematics Field Experiences and Clinical Practices:Candidates engage in a planned sequence of field experiences and clinical practice under the supervision of experienced and highly qualified mathematics teachers. They develop a broad experiential base of knowledge, skills, effective approaches to mathematics teaching and learning, and professional behaviors across both middle and high school settings that involve a diverse range and varied groupings of students. Candidates experience a full-time student teaching/internship in secondary mathematics directed by university or college faculty with secondary mathematics teaching experience or equivalent knowledge base.  

Minimum Competence Requirement


A grade of C- or better is required for ALL courses submitted in fulfillment of the major in Mathematics. Students may not enroll in any course having prerequisites unless the minimum grade of C- has been earned in the prerequisites or unless special permission has been granted in writing by the course instructor. Prerequisite courses may not be taken after successful completion of any subsequent course

Department Writing Requirement


MATH 239  and MATH 324  are two required courses in which mathematical writing is emphasized and taught. Writing opportunities (homework, quizzes, exams) will be graded for clear, precise exposition as well as for mathematical content. The department’s writing requirement is satisfied by successfully completing both of these courses.

Outline/Advising Guide


First Year


Fall (15 Credit Hours)


Spring (16 Credit Hours)


Second Year


Fall (14 Credit Hours)


Spring (15 Credit Hours)


Third Year


Fall (14 Credit Hours)


Spring (15 Credit Hours)


Fourth Year


Spring (16 Credit Hours)


Total Credit Hours: 120


Footnotes


Note: Where no prerequisites apply, some variation in the order or semester in which courses are taken is possible. Students should consult their academic advisors for additional information.