Math 20 Math 25 Student Resources davidvs.net |

Reflections

This assignment helps ensure you have read the syllabus. You may turn in your answers on paper or you may copy-and-paste the questions into an e-mail and type your answers.

- Our class content include three broad categories: health decisions, personal finance decisions, and business decisions. Which do you expect to be most useful to you in real life?
- What letter grade are you aiming for? Are you aiming for a +, −, or plain letter grade? How many achievements are needed to reach those goals?
- Our class allows you to use carefully prepared notes on quizzes and the final exam. How will you condense your class notes, thoughts, homework, and favorite example problems? What do you imagine your carefully prepared notes will look like?
- For which problems from the Math 20 final exam do you need the most review?
- When is the deadline for a tuition refund?
- When is the last day for schedule changes, including grade options?
- When and where is our final exam? What always allows an LCC student to ask for a final exam to be rescheduled?
- Which one of the LCC resources might be important, but you did not already know about it?
- What is the MRC CRN and why does it exist?
- After reading the syllabus section entitled Truth, Wisdom, and Encouragement, write a mentoring letter to a friend (real or imaginary) summarizing its key points. One or two paragraphs are probably sufficient.
- Which one the Student Responsibilities is most helpful for you to do better?
- Which one the Instructor Responsibilities would have been most helpful for past (or present) math instructors to have done better?

This assignment helps ensure you have read the Study Skills. You may turn in your answers on paper or you may copy-and-paste the questions into an e-mail and type your answers.

- What will you do before the term begins to begin the term with some forward momentum?
- What will you do during the term to help with time management?
- What will you do to become the main character in your math class story?
- Will study groups be a part of your math class story?
- Does the explanation of "two brain patterns" provide anything useful for focusing or reducing stress?
- What do you need to work on for writing step-by-step answers nicely?
- What do you need to work on for writing notes nicely?
- How are critical thinking skills a part of our math class?
- What scaffolding has been helpful so far in your math class story? What other scaffolding would be helpful in the future?
- How does learning math relate to dignity?
- Were any of the calculator use tips new to you?
- What non-fiction book are you looking forward to reading (or finishing if you have already started it)?

A reflection at the end of the term can be uplifting. You have learned a lot of math—more than most people know!

Also, LCC is really working as a college on understanding what challenges students face. You can click to see an example of the college's analysis. Writing about which challenges you faced and how you overcame them not only provides you personally with a pause to be proud of accomplishments, but might also guide the college in how to support other students.

You may turn in your answers on paper or you may copy-and-paste the questions into an e-mail and type your answers.

- Did the topics taught in this class match your expectations?
- Did you start the class with hopeful or fearful expectations? Did those hopes or fears materialize?
- Did your expectations change about which topics would be useful in real life?
- The way this class is graded is unusual. How did that work for you?
- Did you achieve the grade you were originally aiming for in this class? Why or why not? Also, if you changed which grade you were aiming for, what prompted that change?
- What was the biggest academic challenge you faced while in this class?
- What was the biggest non-academic challenge you faced while in this class?
- Did this class live up to its hype about being an especially real math class? How did that work for you?
- Which LCC resources were important for you to use this term?
- Give an example of one of your academic successes from the past term or two. How were you hoping this class might provide a similar opportunity? How did your actual successes in this class compare?
- Give an example of some math baggage you are carrying because of the past. Did this class help you deal with it?
- If you were allowed to rewrite the class catalog description and/or syllabus, how would you make changes?

Lane Community College emphasizes the core learning outcomes it wants students to acquire.

These core learning outcomes ensure

allLCC classes are worthy educational opportunities. Even a "remedial" college classs shouldnotbe remedial as an overall learning opportunity.Below is a listing of all the core learning outcomes, with an example of how each might relate to our math class to help you get started thinking.

An LCC student who has never thought about the core learning outcomes might feel like

"I am a homework-machine, turning in one assignment after another because the college is doing things to me."An LCC student who has spent some time thinking about the core learning outcomes can instead feel like

"I am a scholar, acquiring one skill after another because I am doing things at the college."

Your taskis to pickfourof the 27 criteria from the core learning outcomes. Elaborate with examples and explanations about how those four happen in our math class. (You cannot use the provided example ways. Think of your own!) What do those four cores mean to you? How do they help you transition from homework-machine to scholar?You may turn in your answers on paper or you may copy-and-paste the questions into an e-mail and type your answers.

Definition:Critical thinking is an evaluation process that involves questioning, gathering, and analyzing opinions and information relevant to the topic or problem under consideration. Critical thinking can be applied to all subject areas and modes of analysis (historical, mathematical, social, psychological, scientific, aesthetic, literary, etc.).

A crucial skill learned in Math 20 and Math 25 is how to sort word problems by the best approach to solve them. Does the problem contain two numbers and is asking for a unit rate (use division)? Does it contain three numbers in two parallel situations, and is asking for a fourth number (use a proporton)? Does it contain two numbers and a percent, and is asking for a third number (use a percent sentence)? Or is it a wild card problem that requires a special approach?

Our class offers advice about how to avoid common traps in word problems. Do units of time match? In a percent sentence do the numeric value and percentage come from the *same* part of the whole?

Many word problems require an extra final step because of their particular situation. Does a proportion problem ask for how much a numeric value changed (requiring a final subtraction step)? Does an interest problem ask for the total amount owed (requiring a final addition step)?

Most math problems in our class have more than one method for finding a solution. This can be frustrating! The math topics would indeed be simpler if there was only one *best* method. But even if we adopt our favorite method for each topic, being able to understand when an instructor uses a variant method on the board or a classmate uses a variant method in a study group aids comprehension and collaboration.

We do a lot of work in a study group: during review in class, as the second portion of midterms, and hopefully outside of class for homework. When group members do not agree about a problem's answer, how does the group move forward? The ability to work as a group by sharing, comparing, analyzing, brainstorming, and tutoring is an incredibly important real life skill.

This is a more personal aspect of the previous issue. When I disagree with a group member about how to solve a problem, but am certain that my method and answer are correct, how do I defend my work within the group? Or when another student asks, "I think I might really like your method of solving that problem. Please explain it to me!" how do I clarify my reasoning?

Definition:Engaged students actively participate as citizens of local, global and digital communities. Engaging requires recognizing and evaluating one's own views and the views of others. Engaged students are alert to how views and values impact individuals, circumstances, environments and communities.

Classroom diversity happens because students work towards a common goal of mastering certain math topics despite having diverse starting points: distinct backgrounds, different foundational skills, varied assumptions, disparate emotional reactions, etc. Moreover, classroom camaraderie is the valuable enthusiasm from a sense of coming-together despite these diverse starting points. Speak up in class! It not only helps the math topics get taught, it helps the classroom environment flourish.

Students in our class have different reasons to value the math and consider it practical. Classmates whose futures include jobs involving (as examples) carpentry, baking, nursing, and computer programming will favor different methods for solving problems and prefer different ways of writing the answers.

Hm. I am not sure how this applies to Math 20 or Math 25. Help me out here.

Group discussions that focus on dialectic arguments (step-by-step reasoning) instead of rhetoric (emotional persuasion) are a vital component of democracy. Exposure to situations where group members say, "We disagree but know there is a best answer for this situation. Perhaps one of us has it. Perhaps we're all currently a bit confused. But together we can solve this!" is valuable in a society whose politics is increasingly rhetoric.

In one sense mastering the math topics in our class is like preparing to be a concert pianist or competitive sprinter: at the end of the term you must be able to perform by yourself, under the pressure of knowing that your effort will be recorded and evaluated. But getting to those last few hours "on stage" should be a group effort. Classmates are teammates.

Definition:Creative thinking is the ability and capacity to create new ideas, images and solutions, and combine and recombine existing images and solutions. In this process, students use theory, embrace ambiguity, take risks, test for validity, generate new questions, and persist with the problem when faced with resistance, obstacles, errors, and the possibility of failure.

Our syllabus concludes with a section entitled *Truth, Wisdom, and Encouragement* that challenges students to consider what "being good at math" really means, and whether they can achieve that during the few weeks we study together.

Hm. I am not sure how this applies to Math 20 or Math 25. Help me out here.

Our class website is so amazingly, potentially helpful that it can seem overwhelming. Exploring how to use the website as a resource is a vital part of class success.

Our midterms involve revising individual work to create a superior group project.

Do I really need to say anything about this criterion relating to a math class?

Each midterm involves analyzing which mistake were made and forming a study plan that includes both *which* specific math topics to work on and *how* those will be studied.

Definition:To communicate effectively, students must be able to interact with diverse individuals and groups, and in many contexts of communication, from face-to-face to digital. Elements of effective communication vary by speaker, audience, purpose, language, culture, topic, and context. Effective communicators value and practice honesty and respect for others, exerting the effort required to listen and interact productively.

My math students can ask me (and each other) questions during class, by e-mail, or over the phone. Each has its advantages and disadvantages.

Equations *are* a type of "clear language". Math has its own terms and gramar. How it is arranged on the page aids clarity and comprehension in a manner very equivalent to a spoken language's nonverbal communication.

The usual greeting at local dojo is a fist bump. This proclaims that no matter how the students are at different levels in skill, experience, and strength they will strive with each other, try their best, and provide honest feedback so all will grow better quickly. The dojo is not a place for complacent contentment (a side hug instead proclaims that everyone should be comfortable with nothing in-your-face or challenging) or inventing an imaginary opponent to strive against (a high five instead proclaims that together we overcame a common foe). A math class is also ideally a "fist bump" community. Real struggles, genuine effort, and honest feedback allow students to grow as quickly as possible. Even those students not yet ready for this type of kindly crucible become closer to ready through exposure: perhaps in their *next* math class they will be ready.

Students turn in four samples of chapter notes. These must demonstrate an appropriate blend of definitions, narrative explanation, example problems, and self-talk commentary that works together to explain a math topic and how to study it.

When students begin a new group work project, they might lack common language. Perhaps one student was absent when a relevant topic was discussed in class. Perhaps students use different methods of solving that type of problem. But that does not stop them. As students explain how *they* approach the math problems, common language is established and used.

Hm. I am not sure how this applies to Math 20 or Math 25. Help me out here. (I am picturing how some students loathe fraction arithmetic and others love it because to them canceling is fun. Surely there is something deeper.)

Definition:Applied learning occurs when students use their knowledge and skills to solve problems, often in new contexts. When students also reflect on their experiences, they deepen their learning. By applying learning, students act on their knowledge.

Recall the very first criterion, about sorting word problems by the best approach to solve them. This is amazing meta-learning! Not only do we learn *how* to do a variety of different math skills, we learn *when* to do them.

Word probems have nearly endless variety. The methods of solving them contain themes (proportions, percent sentences, unit analysis, geometrical formulas, etc.) but exactly how to apply those requires adaptability and ingenuity.

Yes.

For this criterion I would prefer to hear what students say, in their own words. Help me out here.