Math Blog # 11 Probability

PROBABILITY 

This week we discussed probability as a measurement of likelihood. This measurement can be expressed as qualitative, or quantitative data! The idea is to learn to determine a theoretical probability, and possible likely outcomes. In class we had a gallery of activities presented to us one was using the clues to find the missing variables, or make connections accordingly. I really enjoyed this lesson as there were several different options to choose form and each person in the group had a chance to provide their input. It was very engaging and, hands on! When students engage in practising prediction, and determining outcomes they begin with concrete activities such as the ones above. Keeping this in mind they will be able to better deal with more abstract concepts and theoretical situations later on. Student could take interest in topics such as probability in math that leads them to take interest in jobs like forecasting, weather, sports anchor etc. 

In our daily life I use probability to make better decisions, choices, and my intuition plays a huge role in my metacognition about topics. I think that learning this at an early age and really getting the concept of mathematically probability can really effect students precise uses of it and, they can being to make connections in their everyday lives. 

Reference: 

http://www.mitaoe.ac.in/the-vast-use-of-probability-in-real-life

Math Blog # 10: Mean, Median, and Mode!

 DATA MANAGEMENT, AND PROBABILITY 

It's important to understand mean, median, and mode when interpreting data and probability for the purpose of reading and collecting data! The mean is the way to find the average between a set of data the indicates the result of putting all the data together and describing it evenly. The median is another kind of average used to describe a set of data with a single value. The median is valuable when there are one or two extreme pieces of information. The mode is another measurement used to describe a set of data's most frequent value. If there are many pieces of data the best way to determine the data is is to write all the values and look for the longest set of matching numbers!  

I enjoyed the video that was linked to our form however I felt that the content targeted a younger audience than the grades that I teach in my placement, as I teach grade 8! I thought the rendition of the video I posted above provides more engaging content. It also provides real life examples that can be used as part of an examplar to have them check their understand of the mean, median, and mode concept. 

Over all, I believe that the actives that we engage our students in should support their ideas that graphs, data, and the process of collecting and describing them should be used to solve real life problems. The Making Math Meaningful text suggests that initially students should be asked yes and no questions because it becomes much easier to collect data when there are only two obligated responses. Once comfortable students can build on these types of activities to include more choices, and options in their data! 

Reference: 

https://www.youtube.com/watch?v=IHginNwss5c 

Blog # 9 Measurement: Length, and Area

MEASUREMENT

 LENGTH AND AREA! 

Taking a look at the materials, and presentations presented on area and measurement I came across a couple terms that I wanted to clarify for myself so I could relate the ideas better with my students!

This video outlines the idea of square roots. The square root is the number value that when multiplied by itself equals the original number! Its commonly used in Pythagorean Theorem a formula introduced in the intermediate level.  It looks at both the length, and the area of an object. For example A'2+B'2=C'2, and C is the longest side of the triangle the square root of the hypotenuse is equal to the sum of the squares of the other two sides. The longest side of the triangle is called the hypotenuse. 3'2+ 4= 5'2  the calculation becomes 9+16 =25.

The third concept that I wanted to introduce is PI throughout our lesson it was suggested that before teaching students how to find the circumference of a circle its a good idea to refresh, or introduce them to the idea of PI. PI comes from the Greek Alphabet originating from the word Perimeter. It is is considered a magical number because no matter how you do the formula to calculate the circumference of a circle large, or small PI will always be the same. Here is a diagram the better articulate the idea.

I think that these would be great tools to incorporate into the minds on portion of a lesson! I would have students try out both theories to check their understanding, and provide feedback accordingly! 

Reference:

http://britton.disted.camosun.bc.ca/pi/piorigin/piorigin.html

https://www.khanacademy.org/math/pre-algebra/exponents-radicals/radical-radicals/v/understanding-square-roots

Math Blog 8: Geometry and Spatial Sense

                         


Today I am going to discuss symmetry in relation to 2D and 3D shapes. There are two different types of symmetry mirror symmetry, and rotational symmetry. Mirror images shapes have reflective symmetry. Rotational symmetry determines the amount of time a 2D shape can fit over itself when its rotated.  I believe the following videos will be a great way to introduce symmetry into the classroom and provide an aspect of reliability to the environment.






I learn't this week that modelling shapes allows students to understanding them. By representing certain shapes with manipulative, or through replication students will begin to visualize properties of a specific shape. IE. Using blocks to make 6 sides of a Hexagon. To the left is an example used in Eva's lesson plan where we were instructed to use the Mira Tool to complete the symmetrical drawing.

I believe her use of creativity with this lesson plan made it really effective. She used Super Mario a popular video game played among the junior - intermediate grades. In adapting this exercise into a novice level based activity I feel that students are more inclined to learn. The time constraints were even looped into the musical theme of the game by instructing that students had until the music stopped to complete their symmetric axis drawings.

She connected the idea of the chapter of thinking visually, and observing basic mathematical conventions by physically drawing the other half of the objects.

Finally, the conclusion was left open and the students felt accomplished as she linked completing the activity to completing level 1 of the Super Mario activity. Igniting a desire to want to learn advanced levels of geometry and advancing to level 2.

Math Blog 7: Patterning and Algebraic Thinking

What is Algebra?

Algebra involves a generalized thinking about relationships and number change. According to our understanding this becomes a natural process when students are ready to move from pattering to algebra. In general is said to be more about determining any terms or variables.

What is a variable?

The idea is that we teach our students to represent the mathematical relationships, and analyze the change thats occurred within them. Symbols are used to represent the unknown as specified in the video above, and students must learn to interpret expressions, and formulas. A formula is a special algebraic equation that shows a relationship between two, or more different quantities.
IE 3n+7n=10n

How to approach teaching these sorts of questions came up in the classroom and a set of helpful hints were given:

•  Use soft language:  Find two fractions that are almost but not quite equal to each other 
• Ask true or false questions: Mike says 1/3 is halfway between 1/4 and 1/2 because 3 is halfway between 2 and 4 is Mike right? 
• Ask effective questions
• Make them real
• Use open ended questions 
• Set the stage ( orient students to understand and provide the opportunity to reveal their ideas. Orient them to deal with the process and the math context 
• Encourage collaborative work by not providing all the anwsers 
• Collaborating what they've learn't, and how they got the results 

I enjoyed learning about setting up proposed questions I think this layout will be useful throughout my teaching block. Open ended questions push students further to explore the proposed problem and understand the experience further. In most cases they can begin at a level they feel comfortable addressing the variables they believe they need to solve the equation given.

With this in mind I enjoyed Adri's math lesson as it provided multi outlets for understanding the basic principles of algebra. If the student didn't quite graph the ideas of using the letter variables like "n," they also had to opportunity to recreate the pattern with the Q-tips provided. This tactical element is really useful when working with students who exhibit learning disabilities, or are visual learners.

The link below is also a great resource I used to further explain algebraic thinking. I enjoy it because it addresses all grade levels, and its very visual for those visual learners. 

http://thinkmath.edc.org/resource/algebraic-thinking