2016년 겨울방학이 끝나 가는 것 같습니다.
아래와 같이 강의교재로 통계해례를 문의하시는 교수님들이 계십니다.
통계해례의 저술의도와 특징을 간접적으로 전달할 수 있다고 판단되어
오갔던 메일을 공유합니다.
그리고
개인학습에도 목표가 명확하면 좀 더 효과적이라고 판단되어
제가 운영하는 시간표를 첨부합니다.
![](data:image/png;base64,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)
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안녕하십니까, 우형록입니다.
졸저에 관심 가져 주셔서 감사합니다.
1-1. 학부 2학년의 경우, 일부를 제외하면 충분히 소화가능하리라 판단됩니다.
48, 49, 50장은 다양한 연구모형을 기반으로 사회적 현상에 대한 이해를 돕고자 기술하였지만,
일반적인 학부수업에는 제외하더라도 무리가 없다고 사료됩니다.
1-2. 저술방향은 2~3개의 사례를 중심으로 통계적 '설명과 실습'에 더욱 중점을 두었습니다.
대체로 통계수업은 교수자의 oneway강의수업이 많은데
저의 경우 통계해례의 내용을 학생들이 먼저 예습하여, 수업시간에 ppt로 발표하도록 유도하고
제가 wrap-up하는 방식으로 수업을 운영하고 있습니다.
완벽하진 않더라도, 학생들이 직접 읽고 발표할 정도로 쉽게 설명되었다는 점은 통계수업운영에 큰 장점이 될 것입니다.
2. 별도의 ppt는 제공하지 않습니다만, 책에 포함된 예제파일은 엑셀파일로 인터넷사이트에 무료로 다운받으실 수 있습니다.
통계해례의 주요 내용이, 독자가 직접 산출해 보는 '데이터를 통한 실습'에 집중하였기 때문에
죄송하지만 별도의 ppt공유는 염두에 두지 못했습니다.
감사합니다.
====================================================================================
안녕하세요.
저는 OOO대학교, OOO교수입니다.
이번학기 통계 강의 교재를 찾고자 인터넷 검색 중 귀사의 책 'SPSS, 엑셀 2013으로 풀어 쓴 통계해례'를
보게 되었습니다.
몇가지 문의하고자 합니다.
1. 대학 2학년 교재로 적합한지 - 이론 보다는 사례와 설명중심의 내용 전개
2. 강의 보조자료 제공 여부 - PPT 등
회신 부탁드립니다.
감사합니다.