#include #include #include #include #include #define _MAX 100 #define _SIZE 26 int id=0; struct node { char data; unsigned int freq; struct node *next; }*input,*input1; struct hfnode { char info; unsigned int prob; struct hfnode *l, *r; }; struct min_tree { unsigned int length; unsigned int hfm_cp; struct hfnode **nodes; }; void min_tree_construct(struct min_tree* min_tree, int node_id) { int minimum = node_id,l,r; struct hfnode* t; l
Creations, like most things in life, are improvable. Ideas and theories are always evolving into different ideas or more sophisticated ones. Discourse communities is a term that has been debated over the years. Three of those debaters are James Paul Gee, James P. Porter, and John Swales. In this essay I will analyze what each of these writers see as the definition of a discourse community while comparing specific points that each of them have regarding their personal view on the subject. It is also
moderate and severely disabled students in a self-contained classroom. Weekly, she takes her students to a local grocery store and lets them practice purchasing and price comparison to gain budgeting skills as well as independence. Since there is a limitation of real setting opportunities for the students to practice their price comparisons, she has to find another strategy to teach them. This article is to help her find a way to teach her students multi-digit number comparison, included in comparing prices
Pre-Assessment Analysis Before starting my math unit on multiplying and dividing fractions, I had the students complete a short pre-assessment to determine their level of understanding and prior knowledge with the concept of fractions. This assessment consisted of twelve individual questions that ranged from understanding concepts to using mathematical processes. The first four questions determine the student’s understanding of the concept of what fractions represent compared to a whole, how to
mark on our hands and our hearts and our self, being reduced to the value of a
Grade Level: 5th Grade Math TEKS: (5.2) Number and operations. The student applies mathematical process standards to represent, compare, and order positive rational numbers and understand relationships as related to place value. The student is expected to (A) represent the value of the digit in decimals through the thousandths using expanded notation and numerals; Supporting Standard (B) compare and order two decimals to thousandths and represent comparisons using the symbols >, <, or =; Readiness
Identity is usually thought of as an individual characteristic. It pertains to ones self image, self-esteem, personal qualities, and behaviors. The “self” is an integration of where one comes from, where one lives, what one does, who or what one associates with, and one’s self-perception. However, it’s easy to underestimate the relationship that identity has with the perspective of others. Others opinions can have profound effects on people and their lives. This essay will explore the concept of
The nature of heroism in “Judith” melds the heroic qualities of the pre-Christian Anglo Saxons and the Judeo-Christian heroic qualities. The Anglo Saxon qualities are the skills in battle, bravery, and strong bonds between a chieftain and the thanes. This social bond requires, on the part of the leader, the ability to inspire, and form workable relationships with subordinates. These qualities, while seen obviously in the heroine and her people, may definitely be contrasted by the notable absence
Decimals Round to Whole Number: Example: Round to whole number: a. 3.7658 b. 6.2413 If the first decimal number is ≥ 5, round off by adding 1 to the whole number and drop all the numbers after the decimal point. If the first decimal place is ≤ 4, leave the whole number and drop all the numbers after the decimal point. 3.7658 = 4 6.2413 = 6 Round to 1st decimal: Example: Round to whole number: a. 3.7658
compute mathematical operations but explain their reasoning and justify why using certain visual strategies such as number lines, number bonds and tape diagrams, aid in the computation of problems. When encountering mixed numbers, students may choose to use number bonds to decompose the mixed number into two proper fractions. This requires conceptual understanding that a mixed number is a fraction greater than one and can be decomposed into smaller parts. At the beginning of the lesson, students are
1. One of the key things that I learned from Developing Fraction Concepts is how important it is for students to learn and fully comprehend fractions. In this chapter, the author talked about how fractions are important for students to understand more advanced mathematics and how fractions are used across various professions. As I was reading this, I thought about all the nurses who use fractions when calculating dosages and how important it is for them to get the dosages correct. If a nurse messed
Date: 04.03.15 Practicing Out Math Analysis of Learning: Amelia, Erin, and Taz are gaining skill in one to one counting as we count the number of scoops it takes to fill the tube. They are also being exposed to simple math words like, full, half full, and empty as we measure where the sand is up to in the container. Lastly, they are given the opportunity to make comparisons between the tubes and ascertain which tube make the sand come out faster – the broken tube. Observation: Erin, Taz, and
combined with reasoning (Knaus, 2013, p.22). The pattern is explained by Macmillan (as cited in Knaus, 2013, p.22) as the search for order that may have a repetition in arrangement of object spaces, numbers and design.
because of the Egyption number line. Since the number line is similar to roman numerals, it makes multiplication and division much more difficult (O’Connor & Robertson “An Overview of...” 5). Another reason is that ancient fractions must first be converted to unit fractions, for example, two fifths would equal one-tenth plus one-twentieth (Allen “Counting and Arithmetic” 20).However, as time progressed and ancient math began to become more advanced and the ancient Egyption number line became easier to
Year eight student, Sandra, completed the ‘Fractions and Decimals Interview’ on Monday, March 21. Sandra was required to complete a series of questions, which covered a range of concepts relating to rationale numbers. She submitted her answers in various different forms, including, orally, written, and, physically. The interview ranges from AusVELS Levels 5-8, and focus’ on assisting the student in developing and adjusting strategies, through mental calculations, and visual and written representations
Latin alphabet. Therefore, if an ancient Roman were alive today and asked to write down a number,
Identity is our sense of self, and it defines how we see and position ourselves in the world (Jackson, 2014). Through one’s developmental process, our identity which encompasses various aspects, e.g. racial, cultural, gender etc. varies. In this context, the bodily expressions and performance refer to the non-verbal attributes and behaviours of our body that we present to the outside world. Humans often use non-verbal signs to reveal who they are and it was suggested that our bodily expressions and
to divide each of the denominators by 2 to get 6.5 and 11.5 respectively. As we can see 7 is greater than 6.5, this means that 7/13 will be to the right of ½ on a number line. 11 is less than 11.5 meaning 11/23 will be to the left of ½ on a number line. We know that the number furthest to the right on a number line is the larger number, so 7/13 is the greater
in barcode numbers. The majority of products that you can buy have a 13-digit number on them, which is scanned to get all the product details, such as the price. This 13-digit number is referred to as the ‘GTIN-13’ where ‘GTIN’ stands for Global Trade Item Number. Error control is used in barcodes because without it, there would be so many errors and people would end up being charged for the wrong products. Sometimes when a barcode is being scanned, the scanner won’t read the number and therefore
Interpret products of whole numbers, e.g., interpret 5 × 7 as the total number of objects in 5 groups of 7 objects each. For example, describe a context in which a total number of objects can be expressed as 5 × 7. Children start working with equal groups as a whole instead of counting it individual objects. Students start understanding that are able to group number is according to get a product. Students can solve duplication by understand the relationship between the two number. In third grade it is