Congruence of triangles class 7 pdf worksheet This worksheet is for Grade 7 maths, comprising the topic of Congruence of Triangles It will help students develop a better understanding of Congruence of Triangles
The document provides information about sets and set operations including:
1) It defines the complement of a set as the elements in the universal set that are not in the given set.
2) It provides examples of finding the complement of sets and using Venn diagrams to represent complements.
3) It solves a word problem about selecting a student who is not a sophomore by finding the complement of the set of sophomores.
3. Worksheet for Subtraction
3.1 Simple subtractions
3.2 Subtractions without borrowing
3.3 Subtractions with borrowing
3.4 Finding missing numbers using subtraction
3.5 Relation between Subtraction and Addition
Story Problems
Mix Story problems of Addition and Subtraction
Integers can represent positive and negative values and are useful for modeling real-world situations involving amounts that can be above or below a given level.
Some examples of using integers to model real situations include:
1) Using positive integers to represent amounts of money deposited in a bank account and negative integers to represent withdrawals, allowing addition and subtraction of integers to track the account balance.
2) Using positive integers for distances gained in sports like football and negative integers for distances lost, allowing integer operations to calculate total gains or losses.
3) Representing floors of a building as integers where positive numbers are above ground level and negative are below, so integer addition and subtraction can track elevator movement between floors.
The document defines and provides examples of different types of functions including:
- Domain, codomain, and range of a function
- Injective, surjective, and bijective functions
- Into, one-to-one into, many-to-one, and many-to-one onto functions
It also discusses recurrence relations and recursively defined functions, providing examples of how functions can be defined recursively by building on previous terms.
Lesson plan on Linear inequalities in two variablesLorie Jane Letada
This document contains a semi-detailed lesson plan for a math class on linear inequalities in two variables. The lesson plan outlines intended learning outcomes, learning content including subject matter and reference materials, learning experiences including sample math word problems and explanations of key concepts, an evaluation through an online quiz, and an assignment for students to create a budget proposal applying their understanding of linear inequalities.
1. The document outlines the rules for a quiz game being played between teams A-F. It details the round structure, scoring system, and rules for different rounds.
2. The last round, called the Quizzer Round, involves one team member being the quiz master who asks 5 questions to their partner in 60 seconds. The partner can have two attempts to answer each question correctly for 4 points each.
3. Hints or clues can be provided by the quiz master but they cannot read or say parts of the answers shown on the slides. Getting all 5 questions right earns a 5 point bonus for a total of 25 points at stake in the round.
This document discusses different types of fractions including proper fractions, improper fractions, and mixed fractions. It explains how to convert between improper fractions and mixed numbers, and how to reduce fractions to their lowest terms. The document also covers factoring numbers to find common factors and greatest common factors, finding multiples and common multiples, and operations involving fractions such as addition, subtraction, multiplication, and complex fractions.
This document contains lesson materials on operations with fractions, including examples of addition, subtraction, multiplication, and division of fractions. It provides steps for solving each type of operation, such as multiplying the numerators and denominators for multiplication, or applying cross multiplication for division. It then includes practice problems for students to work through, covering adding and subtracting similar and dissimilar fractions, as well as multiplying and dividing fractions. The document aims to teach students the key steps and methods for performing different mathematical operations with fractions.
The document provides information about sets and set operations including:
1) It defines the complement of a set as the elements in the universal set that are not in the given set.
2) It provides examples of finding the complement of sets and using Venn diagrams to represent complements.
3) It solves a word problem about selecting a student who is not a sophomore by finding the complement of the set of sophomores.
3. Worksheet for Subtraction
3.1 Simple subtractions
3.2 Subtractions without borrowing
3.3 Subtractions with borrowing
3.4 Finding missing numbers using subtraction
3.5 Relation between Subtraction and Addition
Story Problems
Mix Story problems of Addition and Subtraction
Integers can represent positive and negative values and are useful for modeling real-world situations involving amounts that can be above or below a given level.
Some examples of using integers to model real situations include:
1) Using positive integers to represent amounts of money deposited in a bank account and negative integers to represent withdrawals, allowing addition and subtraction of integers to track the account balance.
2) Using positive integers for distances gained in sports like football and negative integers for distances lost, allowing integer operations to calculate total gains or losses.
3) Representing floors of a building as integers where positive numbers are above ground level and negative are below, so integer addition and subtraction can track elevator movement between floors.
The document defines and provides examples of different types of functions including:
- Domain, codomain, and range of a function
- Injective, surjective, and bijective functions
- Into, one-to-one into, many-to-one, and many-to-one onto functions
It also discusses recurrence relations and recursively defined functions, providing examples of how functions can be defined recursively by building on previous terms.
Lesson plan on Linear inequalities in two variablesLorie Jane Letada
This document contains a semi-detailed lesson plan for a math class on linear inequalities in two variables. The lesson plan outlines intended learning outcomes, learning content including subject matter and reference materials, learning experiences including sample math word problems and explanations of key concepts, an evaluation through an online quiz, and an assignment for students to create a budget proposal applying their understanding of linear inequalities.
1. The document outlines the rules for a quiz game being played between teams A-F. It details the round structure, scoring system, and rules for different rounds.
2. The last round, called the Quizzer Round, involves one team member being the quiz master who asks 5 questions to their partner in 60 seconds. The partner can have two attempts to answer each question correctly for 4 points each.
3. Hints or clues can be provided by the quiz master but they cannot read or say parts of the answers shown on the slides. Getting all 5 questions right earns a 5 point bonus for a total of 25 points at stake in the round.
This document discusses different types of fractions including proper fractions, improper fractions, and mixed fractions. It explains how to convert between improper fractions and mixed numbers, and how to reduce fractions to their lowest terms. The document also covers factoring numbers to find common factors and greatest common factors, finding multiples and common multiples, and operations involving fractions such as addition, subtraction, multiplication, and complex fractions.
This document contains lesson materials on operations with fractions, including examples of addition, subtraction, multiplication, and division of fractions. It provides steps for solving each type of operation, such as multiplying the numerators and denominators for multiplication, or applying cross multiplication for division. It then includes practice problems for students to work through, covering adding and subtracting similar and dissimilar fractions, as well as multiplying and dividing fractions. The document aims to teach students the key steps and methods for performing different mathematical operations with fractions.
The document is a slope lesson plan that includes the following:
- The objective is for students to calculate slope given points or a line on a graph.
- The lesson plan uses examples of a girl catching bugs on her tongue to engage students in understanding slope.
- Students are presented the definition of slope as "rise over run" and the formula is derived step-by-step using examples.
- Students practice calculating slope on sample problems and their understanding is evaluated through a worksheet.
Rubrics evaluation of the performance taskJONATHAN DIZON
This document outlines a rubric to evaluate written mathematical work across four categories: mathematical computation, answer, neatness and attractiveness, and use of labels/explanations. For each category, criteria are provided to assess work as fantastic, good, fair, poor, or no score. Mathematical computation is evaluated on correctness and showing of steps. The answer is assessed for accuracy and proper labeling. Neatness is judged on design, layout, and messiness. Labels/explanations are rated based on use and clarity.
The document summarizes the contributions of several important ancient and modern mathematicians from India and other parts of the world. Some of the mathematicians mentioned include Aryabhata from ancient India, who made contributions to place value system, approximation of pi, and trigonometry. Srinivasa Ramanujan, an Indian mathematician, made significant contributions to number theory, hypergeometric series, and more. Euclid is described as the "Father of Geometry" and made foundational contributions to geometry and number theory. Archimedes, another important ancient mathematician, discovered principles of buoyancy and methods to calculate areas under curves.
Mathemagic is inspired from Vedic Mathematics and Smart Maths to develope a passion for quantitative section of various entrance exams especially for those who belongs to non mathematic streams.
1. The document provides definitions and properties for set operations including unions, intersections, complements, differences, and Cartesian products.
2. It gives examples of calculating unions, intersections, complements, differences, and Cartesian products of sets.
3. The last part presents a quiz involving true/false questions and problems to build sets using the defined operations on sets like unions, intersections, complements and differences.
Grade 8 Learning Module in Math - CompleteR Borres
This document provides an instructional module for grade 8 mathematics covering special products and factoring. It includes 19 pre-assessment questions to evaluate students' existing knowledge on these topics. The module is divided into two lessons: Lesson 1 on special products covers identifying polynomials that are special products through pattern recognition and applying special products to solve geometric problems. Lesson 2 on factoring teaches how to factor different types of polynomials and use factors to solve problems involving polynomials. Each lesson includes multiple practice activities for students.
This document provides an overview of triangles, including definitions, types, properties, secondary parts, congruency, and area calculations. It defines a triangle as a 3-sided polygon with three angles and vertices. Triangles are classified by side lengths as equilateral, isosceles, or scalene, and by angle measures as acute, obtuse, or right. Key properties discussed include the angle sum theorem, exterior angle theorem, and Pythagorean theorem. Secondary parts like medians, altitudes, perpendicular bisectors, and angle bisectors are also defined. Tests for triangle congruency such as SSS, SAS, ASA, and RHS are outlined. Formulas are provided for calculating the areas of
This was the last part of my presentation in National Meet ,NCERT,New Delhi on 22nd Dec,2012 celebration of National Mathematics Year.This slide show will give idea to teachers about the use of Technology in Teaching Mathematics.
Pratima Nayak,KV,Fort William,Kolkata
pnpratima@gmail.com.
The document describes the format and syllabus for sample test papers for various grades and subjects. It provides details about:
- The number of questions and time duration of the tests
- The sections included and number of questions in each section
- The syllabus topics covered in each section, such as mental ability, logical reasoning, science, computers, and more.
Fractions with pattern blocks (worksheet 9 a).pptxUgyenTshering51
This document discusses using pattern blocks to teach fractions concepts. It provides examples of questions and activities students can do involving comparing the relative areas of different pattern block shapes, finding equivalent fractions, and operations like addition, subtraction, multiplication and division of fractions. Some key areas covered include fractional relationships, probability, symmetry, and proportional reasoning. Sample problems are presented that involve covering shapes with different pattern blocks to represent fractions.
This document provides an overview of integers and operations on integers. It defines integers as natural numbers, 0, and negatives of counting numbers. It then discusses the properties of addition, subtraction, multiplication and division of integers, including:
- Adding two integers of the same sign by adding their values, and of opposite signs by taking the difference of their absolute values.
- Subtracting integers by adding the number to the negative of the number being subtracted.
- Multiplying integers of the same sign by multiplying their values, and of opposite signs by multiplying their values and assigning a negative sign to the product.
- Dividing integers of the same sign by dividing their values, and of opposite signs by dividing their values
The document differentiates between equations and inequalities. It defines an equation as a mathematical sentence indicating two expressions are equal, represented by the equal sign "=". An inequality is a sentence where two expressions are not equal, represented by relation symbols like <, >, ≤, ≥, ≠. Examples are provided of equations and inequalities, and readers are asked to identify which is which.
This document is a worksheet practicing dividing numbers by 10. It contains 16 division problems where the numbers 30 through 120 are divided by 10. The student is to find the quotients of each division problem by dividing the first number by 10.
A Venn diagram is a visual representation of sets and their relationships using overlapping circles. It shows all possible logical relations between different sets. The document provides examples of basic formulas for Venn diagrams of two and three elements and worked through an example problem involving students selecting tea and/or coffee. It also demonstrates how to use a Venn diagram to solve word problems involving two or more classifications and determining values that are not explicitly provided.
Fractions represent parts of a whole. They are made up of a numerator above a denominator, where the numerator indicates the number of equal parts being considered and the denominator indicates the total number of equal parts the whole was divided into. There are three main types of fractions: proper fractions where the numerator is smaller than the denominator, improper fractions where the numerator is larger, and mixed numbers which are a whole number and a fraction combined. Fractions are used to represent parts of measuring tools like rulers and cups as well as in other mathematical concepts.
This is an abbreviated version of the presentation "Math is Storytelling: Bringing Play and a Sense of Narrative to Problem Solving" from the 2011 NAEYC annual conference in Orlando, FL. For more information, please see www.mathexchanges.wordpress.com
Review Of Slope And The Slope Intercept Formulataco40
The document reviews slope and the slope-intercept formula y=mx+b. It provides examples of finding the slope and y-intercept of various lines given their graphs or two points on the line. It also demonstrates how to write the equation of a line given two points and how to find the x- and y-intercepts of a line given its equation.
The document is a grade 10 daily lesson plan on measures of position, specifically quartiles of ungrouped data. It contains the following key points:
1. The objectives are to illustrate and calculate quartiles and appreciate their use in real life.
2. Activities include demonstrating quartiles using students' heights and BMI data, calculating quartiles of tourist age data, and practice questions.
3. Quartiles (Q1, Q2, Q3) divide a data set into four equal parts, with formulas given to find their positions.
Five year plans in India Goals and Achievements – CBSE Class 12.pdfTakshila Learning
Five-year plans in India Goals and Achievements: The Five-Year Plans were national economic programmes that were centralized and integrated. Joseph Stalin implemented the first such plan in the Soviet Union in 1928.
The document is a slope lesson plan that includes the following:
- The objective is for students to calculate slope given points or a line on a graph.
- The lesson plan uses examples of a girl catching bugs on her tongue to engage students in understanding slope.
- Students are presented the definition of slope as "rise over run" and the formula is derived step-by-step using examples.
- Students practice calculating slope on sample problems and their understanding is evaluated through a worksheet.
Rubrics evaluation of the performance taskJONATHAN DIZON
This document outlines a rubric to evaluate written mathematical work across four categories: mathematical computation, answer, neatness and attractiveness, and use of labels/explanations. For each category, criteria are provided to assess work as fantastic, good, fair, poor, or no score. Mathematical computation is evaluated on correctness and showing of steps. The answer is assessed for accuracy and proper labeling. Neatness is judged on design, layout, and messiness. Labels/explanations are rated based on use and clarity.
The document summarizes the contributions of several important ancient and modern mathematicians from India and other parts of the world. Some of the mathematicians mentioned include Aryabhata from ancient India, who made contributions to place value system, approximation of pi, and trigonometry. Srinivasa Ramanujan, an Indian mathematician, made significant contributions to number theory, hypergeometric series, and more. Euclid is described as the "Father of Geometry" and made foundational contributions to geometry and number theory. Archimedes, another important ancient mathematician, discovered principles of buoyancy and methods to calculate areas under curves.
Mathemagic is inspired from Vedic Mathematics and Smart Maths to develope a passion for quantitative section of various entrance exams especially for those who belongs to non mathematic streams.
1. The document provides definitions and properties for set operations including unions, intersections, complements, differences, and Cartesian products.
2. It gives examples of calculating unions, intersections, complements, differences, and Cartesian products of sets.
3. The last part presents a quiz involving true/false questions and problems to build sets using the defined operations on sets like unions, intersections, complements and differences.
Grade 8 Learning Module in Math - CompleteR Borres
This document provides an instructional module for grade 8 mathematics covering special products and factoring. It includes 19 pre-assessment questions to evaluate students' existing knowledge on these topics. The module is divided into two lessons: Lesson 1 on special products covers identifying polynomials that are special products through pattern recognition and applying special products to solve geometric problems. Lesson 2 on factoring teaches how to factor different types of polynomials and use factors to solve problems involving polynomials. Each lesson includes multiple practice activities for students.
This document provides an overview of triangles, including definitions, types, properties, secondary parts, congruency, and area calculations. It defines a triangle as a 3-sided polygon with three angles and vertices. Triangles are classified by side lengths as equilateral, isosceles, or scalene, and by angle measures as acute, obtuse, or right. Key properties discussed include the angle sum theorem, exterior angle theorem, and Pythagorean theorem. Secondary parts like medians, altitudes, perpendicular bisectors, and angle bisectors are also defined. Tests for triangle congruency such as SSS, SAS, ASA, and RHS are outlined. Formulas are provided for calculating the areas of
This was the last part of my presentation in National Meet ,NCERT,New Delhi on 22nd Dec,2012 celebration of National Mathematics Year.This slide show will give idea to teachers about the use of Technology in Teaching Mathematics.
Pratima Nayak,KV,Fort William,Kolkata
pnpratima@gmail.com.
The document describes the format and syllabus for sample test papers for various grades and subjects. It provides details about:
- The number of questions and time duration of the tests
- The sections included and number of questions in each section
- The syllabus topics covered in each section, such as mental ability, logical reasoning, science, computers, and more.
Fractions with pattern blocks (worksheet 9 a).pptxUgyenTshering51
This document discusses using pattern blocks to teach fractions concepts. It provides examples of questions and activities students can do involving comparing the relative areas of different pattern block shapes, finding equivalent fractions, and operations like addition, subtraction, multiplication and division of fractions. Some key areas covered include fractional relationships, probability, symmetry, and proportional reasoning. Sample problems are presented that involve covering shapes with different pattern blocks to represent fractions.
This document provides an overview of integers and operations on integers. It defines integers as natural numbers, 0, and negatives of counting numbers. It then discusses the properties of addition, subtraction, multiplication and division of integers, including:
- Adding two integers of the same sign by adding their values, and of opposite signs by taking the difference of their absolute values.
- Subtracting integers by adding the number to the negative of the number being subtracted.
- Multiplying integers of the same sign by multiplying their values, and of opposite signs by multiplying their values and assigning a negative sign to the product.
- Dividing integers of the same sign by dividing their values, and of opposite signs by dividing their values
The document differentiates between equations and inequalities. It defines an equation as a mathematical sentence indicating two expressions are equal, represented by the equal sign "=". An inequality is a sentence where two expressions are not equal, represented by relation symbols like <, >, ≤, ≥, ≠. Examples are provided of equations and inequalities, and readers are asked to identify which is which.
This document is a worksheet practicing dividing numbers by 10. It contains 16 division problems where the numbers 30 through 120 are divided by 10. The student is to find the quotients of each division problem by dividing the first number by 10.
A Venn diagram is a visual representation of sets and their relationships using overlapping circles. It shows all possible logical relations between different sets. The document provides examples of basic formulas for Venn diagrams of two and three elements and worked through an example problem involving students selecting tea and/or coffee. It also demonstrates how to use a Venn diagram to solve word problems involving two or more classifications and determining values that are not explicitly provided.
Fractions represent parts of a whole. They are made up of a numerator above a denominator, where the numerator indicates the number of equal parts being considered and the denominator indicates the total number of equal parts the whole was divided into. There are three main types of fractions: proper fractions where the numerator is smaller than the denominator, improper fractions where the numerator is larger, and mixed numbers which are a whole number and a fraction combined. Fractions are used to represent parts of measuring tools like rulers and cups as well as in other mathematical concepts.
This is an abbreviated version of the presentation "Math is Storytelling: Bringing Play and a Sense of Narrative to Problem Solving" from the 2011 NAEYC annual conference in Orlando, FL. For more information, please see www.mathexchanges.wordpress.com
Review Of Slope And The Slope Intercept Formulataco40
The document reviews slope and the slope-intercept formula y=mx+b. It provides examples of finding the slope and y-intercept of various lines given their graphs or two points on the line. It also demonstrates how to write the equation of a line given two points and how to find the x- and y-intercepts of a line given its equation.
The document is a grade 10 daily lesson plan on measures of position, specifically quartiles of ungrouped data. It contains the following key points:
1. The objectives are to illustrate and calculate quartiles and appreciate their use in real life.
2. Activities include demonstrating quartiles using students' heights and BMI data, calculating quartiles of tourist age data, and practice questions.
3. Quartiles (Q1, Q2, Q3) divide a data set into four equal parts, with formulas given to find their positions.
Five year plans in India Goals and Achievements – CBSE Class 12.pdfTakshila Learning
Five-year plans in India Goals and Achievements: The Five-Year Plans were national economic programmes that were centralized and integrated. Joseph Stalin implemented the first such plan in the Soviet Union in 1928.
General Knowledge Questions for Kids – Our Earth.pdfTakshila Learning
Some of the important General Knowledge gk questions from Our Earth for class 5 Students which will help them to prepare for various school level entrance tests
Inside Our Earth _ Interior of the Earth – Class 7 Geography(Social Science)Takshila Learning
Interior of the Earth In this article, we will study the interior of the earth diagram, three layers of the earth Crust, Mantle, and Core chapter 2 of Class 7 Social science Geography Inside our earth class 7 notes
Cell The fundamental unit of life Class 9 Science Notes.pdfTakshila Learning
The fundamental unit of life notes A cell is a structural and fundamental unit of life A cell is capable of independent existence and can carry out all the functions which are necessary for a living being, Such as nutrition, respiration, excretion, transportation,
NCERT CBSE Class 5 Science Animal Organs for breathing in animals.pdfTakshila Learning
NCERT CBSE Class 5 Science Animal Every animal has unique characteristics and features They will have distinct ears, eyes, and skin Some might have horns, some long tails, some with a short bushy
CBSE NCERT For Solutions Class 5 Science Diseases.pdfTakshila Learning
CBSE NCERT For Solutions Class 5 Science Diseases Learn What is a disease, Causes of Diseases Like Malaria, Chickenpox Plague, Noncommunicable or deficiency Diseases
This worksheet is for Class 2 Science, comprising the topic of the Human Body Parts It will help students develop a better understanding of the Human Body
This document provides an English grammar practice worksheet on pronouns for class 1 students. It contains exercises for students to choose the correct pronouns to fill in blanks in sentences. It also contains exercises for students to rewrite sentences using pronouns instead of repeated nouns. The document advertises the website takshilalearning.com and provides links to download additional English worksheets for class 1 students on topics like prepositions, verbs, and more.
English Grammar Worksheet - A preposition is a term that shows how a noun is related to the other words in a sentence Download the free Preposition Worksheet for practice.
English Grammar for Class 5 - Common and Proper Nouns.pdfTakshila Learning
Common and Proper nouns worksheets with answers Proper nouns are the words that refer to a unique person, animal, or thing The easiest way to spot a proper noun is they always begin with a capital letter
Cyber security refers to the practice of protecting computer systems and networks from malicious outside interference Download Practice Grade 4 Computer Worksheet
NCERT & CBSE For Class 6 Science Parts of a plant Chapter – 7.pdfTakshila Learning
NCERT CBSE For Class 6 Science Parts of a plant Chapter 7 - Root, Features of a root, Type of root, Features of Stem, Parts of a Leaf, Parts of a flower. A typical plant has different parts in its body viz, Roots, stem, leaves, flowers and fruits. The part which is present under ground is known as roots
A keyboard is one of the most used input devices for entering text into a computer or any other electronic device. This worksheet is for Class 4 Computers, comprising the topic of keyboards. It will help students develop a better understanding of the keyboard and how and why it gets used.
Soil – Process of soil formation Class 7 Science.pdfTakshila Learning
The document discusses soil formation and types of soil. It explains that soil is formed through processes like physical weathering, chemical weathering, and biological weathering which break down rocks. There are three main types of soil - sandy soil which is light and drains quickly, clayey soil which is dense and retains water, and loamy soil which is a mix and balances the properties. Soil has various uses including in agriculture, pottery, medicine, and building.
Sentences and Their Types With Examples | Class 5 English WorksheetTakshila Learning
Sentences types worksheet A sentence is a set of words that completes a thought or an idea It starts with a capital letter and ends with a full stop. Download PDF
🔥🔥🔥🔥🔥🔥🔥🔥🔥
إضغ بين إيديكم من أقوى الملازم التي صممتها
ملزمة تشريح الجهاز الهيكلي (نظري 3)
💀💀💀💀💀💀💀💀💀💀
تتميز هذهِ الملزمة بعِدة مُميزات :
1- مُترجمة ترجمة تُناسب جميع المستويات
2- تحتوي على 78 رسم توضيحي لكل كلمة موجودة بالملزمة (لكل كلمة !!!!)
#فهم_ماكو_درخ
3- دقة الكتابة والصور عالية جداً جداً جداً
4- هُنالك بعض المعلومات تم توضيحها بشكل تفصيلي جداً (تُعتبر لدى الطالب أو الطالبة بإنها معلومات مُبهمة ومع ذلك تم توضيح هذهِ المعلومات المُبهمة بشكل تفصيلي جداً
5- الملزمة تشرح نفسها ب نفسها بس تكلك تعال اقراني
6- تحتوي الملزمة في اول سلايد على خارطة تتضمن جميع تفرُعات معلومات الجهاز الهيكلي المذكورة في هذهِ الملزمة
واخيراً هذهِ الملزمة حلالٌ عليكم وإتمنى منكم إن تدعولي بالخير والصحة والعافية فقط
كل التوفيق زملائي وزميلاتي ، زميلكم محمد الذهبي 💊💊
🔥🔥🔥🔥🔥🔥🔥🔥🔥
A Visual Guide to 1 Samuel | A Tale of Two HeartsSteve Thomason
These slides walk through the story of 1 Samuel. Samuel is the last judge of Israel. The people reject God and want a king. Saul is anointed as the first king, but he is not a good king. David, the shepherd boy is anointed and Saul is envious of him. David shows honor while Saul continues to self destruct.
This document provides an overview of wound healing, its functions, stages, mechanisms, factors affecting it, and complications.
A wound is a break in the integrity of the skin or tissues, which may be associated with disruption of the structure and function.
Healing is the body’s response to injury in an attempt to restore normal structure and functions.
Healing can occur in two ways: Regeneration and Repair
There are 4 phases of wound healing: hemostasis, inflammation, proliferation, and remodeling. This document also describes the mechanism of wound healing. Factors that affect healing include infection, uncontrolled diabetes, poor nutrition, age, anemia, the presence of foreign bodies, etc.
Complications of wound healing like infection, hyperpigmentation of scar, contractures, and keloid formation.
Elevate Your Nonprofit's Online Presence_ A Guide to Effective SEO Strategies...TechSoup
Whether you're new to SEO or looking to refine your existing strategies, this webinar will provide you with actionable insights and practical tips to elevate your nonprofit's online presence.
THE SACRIFICE HOW PRO-PALESTINE PROTESTS STUDENTS ARE SACRIFICING TO CHANGE T...indexPub
The recent surge in pro-Palestine student activism has prompted significant responses from universities, ranging from negotiations and divestment commitments to increased transparency about investments in companies supporting the war on Gaza. This activism has led to the cessation of student encampments but also highlighted the substantial sacrifices made by students, including academic disruptions and personal risks. The primary drivers of these protests are poor university administration, lack of transparency, and inadequate communication between officials and students. This study examines the profound emotional, psychological, and professional impacts on students engaged in pro-Palestine protests, focusing on Generation Z's (Gen-Z) activism dynamics. This paper explores the significant sacrifices made by these students and even the professors supporting the pro-Palestine movement, with a focus on recent global movements. Through an in-depth analysis of printed and electronic media, the study examines the impacts of these sacrifices on the academic and personal lives of those involved. The paper highlights examples from various universities, demonstrating student activism's long-term and short-term effects, including disciplinary actions, social backlash, and career implications. The researchers also explore the broader implications of student sacrifices. The findings reveal that these sacrifices are driven by a profound commitment to justice and human rights, and are influenced by the increasing availability of information, peer interactions, and personal convictions. The study also discusses the broader implications of this activism, comparing it to historical precedents and assessing its potential to influence policy and public opinion. The emotional and psychological toll on student activists is significant, but their sense of purpose and community support mitigates some of these challenges. However, the researchers call for acknowledging the broader Impact of these sacrifices on the future global movement of FreePalestine.
Philippine Edukasyong Pantahanan at Pangkabuhayan (EPP) CurriculumMJDuyan
(𝐓𝐋𝐄 𝟏𝟎𝟎) (𝐋𝐞𝐬𝐬𝐨𝐧 𝟏)-𝐏𝐫𝐞𝐥𝐢𝐦𝐬
𝐃𝐢𝐬𝐜𝐮𝐬𝐬 𝐭𝐡𝐞 𝐄𝐏𝐏 𝐂𝐮𝐫𝐫𝐢𝐜𝐮𝐥𝐮𝐦 𝐢𝐧 𝐭𝐡𝐞 𝐏𝐡𝐢𝐥𝐢𝐩𝐩𝐢𝐧𝐞𝐬:
- Understand the goals and objectives of the Edukasyong Pantahanan at Pangkabuhayan (EPP) curriculum, recognizing its importance in fostering practical life skills and values among students. Students will also be able to identify the key components and subjects covered, such as agriculture, home economics, industrial arts, and information and communication technology.
𝐄𝐱𝐩𝐥𝐚𝐢𝐧 𝐭𝐡𝐞 𝐍𝐚𝐭𝐮𝐫𝐞 𝐚𝐧𝐝 𝐒𝐜𝐨𝐩𝐞 𝐨𝐟 𝐚𝐧 𝐄𝐧𝐭𝐫𝐞𝐩𝐫𝐞𝐧𝐞𝐮𝐫:
-Define entrepreneurship, distinguishing it from general business activities by emphasizing its focus on innovation, risk-taking, and value creation. Students will describe the characteristics and traits of successful entrepreneurs, including their roles and responsibilities, and discuss the broader economic and social impacts of entrepreneurial activities on both local and global scales.