The document contains instructions for calculating percentages and proportions of numbers. It asks the reader to calculate three quarters of 100, 5% of 60, 28% of 25, 21% of 49, and provides the answers in a correction section at the end.
The document contains instructions for calculating percentages and proportions. It asks the reader to calculate three quarters of 100, 5% of 60, percentages to complete statements such as 28% of 25, 3/7 of 15, and 12/4 of 7. The answers are provided in a correction section.
The document contains instructions for calculating percentages and proportions of numbers. It asks the reader to calculate three quarters of 100, 5% of 60, 28% of 25, 21% of 49, and provides the answers in a correction section at the end.
The document contains instructions for solving 5 math word problems: calculating three quarters of 20, 5% of 40, percentages equal to 3/25, 5/10 of 12, and 20/4*3. The solutions provided are: three quarters of 20 is 15, 5% of 40 is 2, 3/25 is 12%, 5/10 of 12 is 24, and 20/4*3 is 15.
This document contains a math worksheet with 5 word problems involving proportions and percentages. The first problem asks to calculate two thirds of 90. The second asks to calculate 5% of 70. The third asks to identify the percentage that 9 is of 25. The fourth asks to complete the fraction 3/21 as a decimal. The fifth asks to complete the fraction 20/57 as a decimal. The answers are provided in the correction section.
This document contains a math worksheet with 5 word problems on calculating proportions. The first problem asks to calculate two thirds of 90. The second asks to calculate 5% of 70. The third asks to complete the proportion 9/25 = x/100. The fourth asks to complete the proportion 3/21 = x/7. And the fifth asks to complete the proportion 20/5 = x/7. The answers are provided in the correction section.
This document contains a series of math word problems asking the reader to calculate percentages and fractions. It provides the questions on slides 1 through 5, then shows the answers on the correction slides. The questions involve calculating two thirds of 90, 5% of 70, percentages such as 9/25 and 20/57, and fractions like 3/7.
This document contains a math worksheet with 5 problems on calculating proportions. The first problem asks to calculate two thirds of 60, which is 40. The second asks to calculate 5% of 80, which is 4. The third asks to identify the percentage that 10 is of 25, which is 40%. The fourth asks to calculate 3/5 as a fraction of 18, which is 30. The fifth asks to calculate 3/15 as a fraction of 35, which is 7.
This document contains a math worksheet with 5 problems on calculating proportions. The first problem asks to calculate two thirds of 60, which is 40. The second asks to calculate 5% of 80, which is 4. The third asks to identify the percentage that 10 is of 25, which is 40%. The fourth asks to calculate 3/5 as a fraction of 18, which is 30. The fifth asks to calculate 3/15 as a fraction of 35, which is 7.
The document contains instructions for calculating percentages and proportions. It asks the reader to calculate three quarters of 100, 5% of 60, percentages to complete statements such as 28% of 25, 3/7 of 15, and 12/4 of 7. The answers are provided in a correction section.
The document contains instructions for calculating percentages and proportions of numbers. It asks the reader to calculate three quarters of 100, 5% of 60, 28% of 25, 21% of 49, and provides the answers in a correction section at the end.
The document contains instructions for solving 5 math word problems: calculating three quarters of 20, 5% of 40, percentages equal to 3/25, 5/10 of 12, and 20/4*3. The solutions provided are: three quarters of 20 is 15, 5% of 40 is 2, 3/25 is 12%, 5/10 of 12 is 24, and 20/4*3 is 15.
This document contains a math worksheet with 5 word problems involving proportions and percentages. The first problem asks to calculate two thirds of 90. The second asks to calculate 5% of 70. The third asks to identify the percentage that 9 is of 25. The fourth asks to complete the fraction 3/21 as a decimal. The fifth asks to complete the fraction 20/57 as a decimal. The answers are provided in the correction section.
This document contains a math worksheet with 5 word problems on calculating proportions. The first problem asks to calculate two thirds of 90. The second asks to calculate 5% of 70. The third asks to complete the proportion 9/25 = x/100. The fourth asks to complete the proportion 3/21 = x/7. And the fifth asks to complete the proportion 20/5 = x/7. The answers are provided in the correction section.
This document contains a series of math word problems asking the reader to calculate percentages and fractions. It provides the questions on slides 1 through 5, then shows the answers on the correction slides. The questions involve calculating two thirds of 90, 5% of 70, percentages such as 9/25 and 20/57, and fractions like 3/7.
This document contains a math worksheet with 5 problems on calculating proportions. The first problem asks to calculate two thirds of 60, which is 40. The second asks to calculate 5% of 80, which is 4. The third asks to identify the percentage that 10 is of 25, which is 40%. The fourth asks to calculate 3/5 as a fraction of 18, which is 30. The fifth asks to calculate 3/15 as a fraction of 35, which is 7.
This document contains a math worksheet with 5 problems on calculating proportions. The first problem asks to calculate two thirds of 60, which is 40. The second asks to calculate 5% of 80, which is 4. The third asks to identify the percentage that 10 is of 25, which is 40%. The fourth asks to calculate 3/5 as a fraction of 18, which is 30. The fifth asks to calculate 3/15 as a fraction of 35, which is 7.
The document contains instructions for solving 5 math word problems: calculating three quarters of 20, 5% of 40, percentages equal to 3/25, 5/10 of 12, and 20/4*3. The solutions provided are: three quarters of 20 is 15, 5% of 40 is 2, 3/25 is 12%, 5/10 of 12 is 24, and 20/4*3 is 15.
This document contains a series of math word problems and their solutions. The first problem asks to calculate three quarters of 20, which is solved as 15. The second problem asks to calculate 5% of 40, which is solved as 2. The remaining problems ask to fill in percentages or fractions based on partial calculations, with the solutions provided.
This document contains 5 math problems involving relative numbers. The first problem is -5 + 5 x 3, the second is - 8 : 5, the third is ? x 10 = - 38, the fourth is ? x 5 = 13, and the fifth is -36 : ?= -4. The corrections are provided with the solutions shown as 10, -1.6, -3.8, 2.6, and 9 respectively.
This document provides the solutions to 5 math problems presented as slides. The first problem is 17 + 13 - 15, which equals 15. The second is 25 - 15 + 9 - 8, which equals 11. The third is 3 × 2 + 7, which equals 13. The fourth is 3 × 5 : 2, which equals 7.5. The fifth is (2 + 3) × 4, which equals 20.
The document is a series of math problems involving calculating powers. It contains 5 word problems that ask the user to calculate various numbers raised to different powers, such as 3^3, 4*10^10, 0.5^1, -2^5, and -3^10. The answers are provided in a correction section at the end.
This document contains a series of math problems involving relative numbers. The problems include subtracting 7 from 7 multiplied by 2, dividing -9 by 5, multiplying -9.8 by 10 and 4.6 by 5, and dividing 32 by -8. The corrections provided show the step-by-step work and solutions to each problem.
This document contains a series of math word problems involving relative numbers. The problems are presented across 5 slides and include operations like addition, multiplication, and division. The solutions to each problem are then shown, such as 5 + 5 x 3 equals 20, -4.8 x 10 equals -48, and 35:(-5) equals -7.
This document provides examples for solving two-step linear equations and inequalities. It begins with examples of solving two-step inequalities by using the reverse order of operations to isolate the variable. It then discusses multiplying or dividing both sides of an inequality by a negative number. Additional examples include solving inequalities containing fractions and a word problem about a school club selling bumper stickers.
This document contains a math worksheet on relative numbers with 5 problems: 7-7x2 = -7, -9:5 = -1.8, -98/10 = -9.8, 23/5 = 4.6, and 32:-8 = -4. The document provides the problems, spaces for solutions, and then the corrected answers.
The document contains the 12 multiplication tables from 1 × 1 to 12 × 12. Each table lists the multiplication of that number from 1 to 12. For example, the 5 × table contains the multiplications: 1 × 5 = 5, 2 × 5 = 10, up to 12 × 5 = 60. The full document provides all 12 multiplication tables in Mandarin characters.
The document is a series of math problems involving exponents. It contains 5 word problems that ask the reader to calculate various powers. The problems include calculating 4^3, 5^10, 0^4.2, (-2)^6, and (-1)^10. The answers are provided in a correction section.
This document contains step-by-step workings and solutions for factorizing and developing several mathematical expressions. It shows the factorizations of 14 × 101, 25 × 102, and 60 × 99. It also shows the developments of the expressions 9.4 × 2 + 9.4 × 8 and 37 × 18 - 37 × 8. The document provides the full calculations and solutions to these examples.
This document contains a series of math word problems involving negative numbers. The problems ask the reader to solve for the unknown variable ?, where the variable is being multiplied by a negative number on the left side of the equation. The document then provides the solutions to each problem by showing the calculations needed to solve for ?.
This document provides instructions for multiplying two-digit numbers. It explains that the place values must be lined up and then each digit of the top number is multiplied by each digit of the bottom number. When multiplying, you carry numbers to the next place value if the result is greater than 9. Several examples of multiplying two-digit numbers are shown step-by-step to demonstrate the process.
This document contains instructions and solutions for calculating powers. It includes 5 slides where students are asked to calculate expressions like 32, 310, 05, -24, and -210. The solutions provided show the step-by-step work for calculating each expression, such as 32 = 2 x 2 x 2 = 8.
Multiplication is a way of adding the same number multiple times, also known as repeated addition. It involves a multiplicand, multiplier and product. The document provides examples of multiplication number sentences and defines a multiplication table as a way to represent the product of multiplying different numbers.
The document contains a series of math problems involving powers and their calculations. For each problem shown on a slide, the correct calculation is shown on the following slide. The first problem is 4^2 which equals 16, the second is 2^10 which equals 100, the third is 0^53 which equals 1, the fourth is -2^3 which equals -9, and the fifth is -4^10 which equals -10,000.
The document is a math worksheet on relative numbers with 5 problems: 1) -5 + 5 x 3, 2) -8:5, 3) ? x 10 = - 38, 4) ? x 5 = 13, 5) -36 : ?= -4. The correction section provides the answers: for problem 1 the answer is 10, for problem 2 the answer is -1.6, for problem 3 the answer is -3.8, for problem 4 the answer is 2.6, and for problem 5 the answer is 9.
This document contains a series of multiplication problems without solutions. There are 30 problems total with missing multiplicands or multipliers to be solved. The problems range from simple single digit multiplications like 1 x __ = 8 to more complex multiplications like _____ x 10 = 100. The document is from a 5th grade math class worksheet for practicing multiplication calculations.
The document contains instructions for solving 5 math word problems: calculating three quarters of 20, 5% of 40, percentages equal to 3/25, 5/10 of 12, and 20/4*3. The solutions provided are: three quarters of 20 is 15, 5% of 40 is 2, 3/25 is 12%, 5/10 of 12 is 24, and 20/4*3 is 15.
This document contains a series of math word problems and their solutions. The first problem asks to calculate three quarters of 20, which is solved as 15. The second problem asks to calculate 5% of 40, which is solved as 2. The remaining problems ask to fill in percentages or fractions based on partial calculations, with the solutions provided.
This document contains 5 math problems involving relative numbers. The first problem is -5 + 5 x 3, the second is - 8 : 5, the third is ? x 10 = - 38, the fourth is ? x 5 = 13, and the fifth is -36 : ?= -4. The corrections are provided with the solutions shown as 10, -1.6, -3.8, 2.6, and 9 respectively.
This document provides the solutions to 5 math problems presented as slides. The first problem is 17 + 13 - 15, which equals 15. The second is 25 - 15 + 9 - 8, which equals 11. The third is 3 × 2 + 7, which equals 13. The fourth is 3 × 5 : 2, which equals 7.5. The fifth is (2 + 3) × 4, which equals 20.
The document is a series of math problems involving calculating powers. It contains 5 word problems that ask the user to calculate various numbers raised to different powers, such as 3^3, 4*10^10, 0.5^1, -2^5, and -3^10. The answers are provided in a correction section at the end.
This document contains a series of math problems involving relative numbers. The problems include subtracting 7 from 7 multiplied by 2, dividing -9 by 5, multiplying -9.8 by 10 and 4.6 by 5, and dividing 32 by -8. The corrections provided show the step-by-step work and solutions to each problem.
This document contains a series of math word problems involving relative numbers. The problems are presented across 5 slides and include operations like addition, multiplication, and division. The solutions to each problem are then shown, such as 5 + 5 x 3 equals 20, -4.8 x 10 equals -48, and 35:(-5) equals -7.
This document provides examples for solving two-step linear equations and inequalities. It begins with examples of solving two-step inequalities by using the reverse order of operations to isolate the variable. It then discusses multiplying or dividing both sides of an inequality by a negative number. Additional examples include solving inequalities containing fractions and a word problem about a school club selling bumper stickers.
This document contains a math worksheet on relative numbers with 5 problems: 7-7x2 = -7, -9:5 = -1.8, -98/10 = -9.8, 23/5 = 4.6, and 32:-8 = -4. The document provides the problems, spaces for solutions, and then the corrected answers.
The document contains the 12 multiplication tables from 1 × 1 to 12 × 12. Each table lists the multiplication of that number from 1 to 12. For example, the 5 × table contains the multiplications: 1 × 5 = 5, 2 × 5 = 10, up to 12 × 5 = 60. The full document provides all 12 multiplication tables in Mandarin characters.
The document is a series of math problems involving exponents. It contains 5 word problems that ask the reader to calculate various powers. The problems include calculating 4^3, 5^10, 0^4.2, (-2)^6, and (-1)^10. The answers are provided in a correction section.
This document contains step-by-step workings and solutions for factorizing and developing several mathematical expressions. It shows the factorizations of 14 × 101, 25 × 102, and 60 × 99. It also shows the developments of the expressions 9.4 × 2 + 9.4 × 8 and 37 × 18 - 37 × 8. The document provides the full calculations and solutions to these examples.
This document contains a series of math word problems involving negative numbers. The problems ask the reader to solve for the unknown variable ?, where the variable is being multiplied by a negative number on the left side of the equation. The document then provides the solutions to each problem by showing the calculations needed to solve for ?.
This document provides instructions for multiplying two-digit numbers. It explains that the place values must be lined up and then each digit of the top number is multiplied by each digit of the bottom number. When multiplying, you carry numbers to the next place value if the result is greater than 9. Several examples of multiplying two-digit numbers are shown step-by-step to demonstrate the process.
This document contains instructions and solutions for calculating powers. It includes 5 slides where students are asked to calculate expressions like 32, 310, 05, -24, and -210. The solutions provided show the step-by-step work for calculating each expression, such as 32 = 2 x 2 x 2 = 8.
Multiplication is a way of adding the same number multiple times, also known as repeated addition. It involves a multiplicand, multiplier and product. The document provides examples of multiplication number sentences and defines a multiplication table as a way to represent the product of multiplying different numbers.
The document contains a series of math problems involving powers and their calculations. For each problem shown on a slide, the correct calculation is shown on the following slide. The first problem is 4^2 which equals 16, the second is 2^10 which equals 100, the third is 0^53 which equals 1, the fourth is -2^3 which equals -9, and the fifth is -4^10 which equals -10,000.
The document is a math worksheet on relative numbers with 5 problems: 1) -5 + 5 x 3, 2) -8:5, 3) ? x 10 = - 38, 4) ? x 5 = 13, 5) -36 : ?= -4. The correction section provides the answers: for problem 1 the answer is 10, for problem 2 the answer is -1.6, for problem 3 the answer is -3.8, for problem 4 the answer is 2.6, and for problem 5 the answer is 9.
This document contains a series of multiplication problems without solutions. There are 30 problems total with missing multiplicands or multipliers to be solved. The problems range from simple single digit multiplications like 1 x __ = 8 to more complex multiplications like _____ x 10 = 100. The document is from a 5th grade math class worksheet for practicing multiplication calculations.
ShareLex & l'économie collaborative - Collège des Bernardins 13 juin 2014Anne-Laure Brun-Buisson
Intervention lors de la table ronde de clôture du colloque conclusif de la Chaire Andréa Riccardi dont le thème était "les voies d'un nouvel humanisme pour la globalisation"
8547 interviews de e lecteurs de la presse magazine française,sur leur lectures print et digitales, sur leur attitude à l'égard des différents devices (pdf, applis, sites, newsletter,...),l'efficacité du print,du digital,du print to digital et du print+digital. En un mot, l'insight des marques médias natives magazine.
This document discusses calculating the area of geometric shapes. It contains 5 slides that explain how to find the area of different figures, followed by a correction section that likely provides the answers. The goal is to teach students how to compute areas for geometric shapes.
This document provides instructions to calculate the area of different figures shown across 5 slides. It includes the area calculations for: a rectangle that is 9mm by 3mm, yielding an area of 27mm^2; a square that is 8dm by 8dm, yielding an area of 64dm^2; a triangle that is 5m by 12m by 5m by 6m, yielding an area of 30m^2; a rectangle that is 7cm by 6cm, yielding an area of 42cm^2; and a square that is 6dam by 6dam, yielding an area of 18dam^2.
This document provides the area in cm^2 of 5 different figures shown on slides. The first figure has an area of 8cm^2, the second 3cm^2, the third 15cm^2, the fourth 3.5cm^2, and the fifth 4cm^2. The document tests calculating the area of different shapes and provides the correct areas.
The document provides instructions and examples for calculating percentages of prices. It lists 5 examples of calculating percentages for different prices, such as 50% of 101€, 25% of 36€, 30% of 40€, 10% of 65€, and 20% of 500€. For each example, it shows the calculation to find the percentage of the price. The calculations are then checked in the correction section.
This document provides examples of calculating percentages of various prices. It lists the price, percentage and calculation for 5 examples: 50% of 144€, 25% of 28€, 30% of 200€, 10% of 32.50€, and 20% of 800€. The calculations are shown step-by-step using division and multiplication. The correct answers are provided.
This document is about comparing areas and contains 5 slides: the first slide introduces the topic of comparing areas, the second and third slides show different shapes with areas to compare, the fourth slide has questions about the comparisons, and the fifth slide reviews the answers and comparisons made in the previous slides.
This document is about comparing areas and contains 5 slides: the first slide introduces the topic of comparing areas, the second and third slides show different shapes with areas to compare, the fourth slide has exercises comparing areas, and the fifth slide ends the document. The document also has a correction section that repeats the 5 slides.
The document provides instructions and examples for calculating percentages of prices. It lists 5 examples of calculating percentages for different prices: 50% of 110€, 25% of 16€, 30% of 300€, 10% of 35€, and 20% of 200€. For each example, it shows the calculation and solution. The document is intended to teach how to calculate percentages of monetary values.
The document provides instructions to calculate percentages of given prices on 5 slides. It lists the prices and percentages to calculate for each slide, then shows the calculations and solutions. The percentages listed are 50% of 90€, 25% of 40€, 30% of 100€, 10% of 30€, and 20% of 300€. The calculations use division to find the percentages by dividing the given price by 100 and multiplying the result by the percentage value.
This document contains a series of word problems asking the reader to calculate fractions of durations of time. For each problem, it provides the number to divide the duration by and the full duration, then shows the step-by-step work and solution to find the fraction of the duration. It demonstrates calculating fractions of minutes, seconds, hours to show how to solve these types of time calculation word problems.
Chapter wise All Notes of First year Basic Civil Engineering.pptxDenish Jangid
Chapter wise All Notes of First year Basic Civil Engineering
Syllabus
Chapter-1
Introduction to objective, scope and outcome the subject
Chapter 2
Introduction: Scope and Specialization of Civil Engineering, Role of civil Engineer in Society, Impact of infrastructural development on economy of country.
Chapter 3
Surveying: Object Principles & Types of Surveying; Site Plans, Plans & Maps; Scales & Unit of different Measurements.
Linear Measurements: Instruments used. Linear Measurement by Tape, Ranging out Survey Lines and overcoming Obstructions; Measurements on sloping ground; Tape corrections, conventional symbols. Angular Measurements: Instruments used; Introduction to Compass Surveying, Bearings and Longitude & Latitude of a Line, Introduction to total station.
Levelling: Instrument used Object of levelling, Methods of levelling in brief, and Contour maps.
Chapter 4
Buildings: Selection of site for Buildings, Layout of Building Plan, Types of buildings, Plinth area, carpet area, floor space index, Introduction to building byelaws, concept of sun light & ventilation. Components of Buildings & their functions, Basic concept of R.C.C., Introduction to types of foundation
Chapter 5
Transportation: Introduction to Transportation Engineering; Traffic and Road Safety: Types and Characteristics of Various Modes of Transportation; Various Road Traffic Signs, Causes of Accidents and Road Safety Measures.
Chapter 6
Environmental Engineering: Environmental Pollution, Environmental Acts and Regulations, Functional Concepts of Ecology, Basics of Species, Biodiversity, Ecosystem, Hydrological Cycle; Chemical Cycles: Carbon, Nitrogen & Phosphorus; Energy Flow in Ecosystems.
Water Pollution: Water Quality standards, Introduction to Treatment & Disposal of Waste Water. Reuse and Saving of Water, Rain Water Harvesting. Solid Waste Management: Classification of Solid Waste, Collection, Transportation and Disposal of Solid. Recycling of Solid Waste: Energy Recovery, Sanitary Landfill, On-Site Sanitation. Air & Noise Pollution: Primary and Secondary air pollutants, Harmful effects of Air Pollution, Control of Air Pollution. . Noise Pollution Harmful Effects of noise pollution, control of noise pollution, Global warming & Climate Change, Ozone depletion, Greenhouse effect
Text Books:
1. Palancharmy, Basic Civil Engineering, McGraw Hill publishers.
2. Satheesh Gopi, Basic Civil Engineering, Pearson Publishers.
3. Ketki Rangwala Dalal, Essentials of Civil Engineering, Charotar Publishing House.
4. BCP, Surveying volume 1
ISO/IEC 27001, ISO/IEC 42001, and GDPR: Best Practices for Implementation and...PECB
Denis is a dynamic and results-driven Chief Information Officer (CIO) with a distinguished career spanning information systems analysis and technical project management. With a proven track record of spearheading the design and delivery of cutting-edge Information Management solutions, he has consistently elevated business operations, streamlined reporting functions, and maximized process efficiency.
Certified as an ISO/IEC 27001: Information Security Management Systems (ISMS) Lead Implementer, Data Protection Officer, and Cyber Risks Analyst, Denis brings a heightened focus on data security, privacy, and cyber resilience to every endeavor.
His expertise extends across a diverse spectrum of reporting, database, and web development applications, underpinned by an exceptional grasp of data storage and virtualization technologies. His proficiency in application testing, database administration, and data cleansing ensures seamless execution of complex projects.
What sets Denis apart is his comprehensive understanding of Business and Systems Analysis technologies, honed through involvement in all phases of the Software Development Lifecycle (SDLC). From meticulous requirements gathering to precise analysis, innovative design, rigorous development, thorough testing, and successful implementation, he has consistently delivered exceptional results.
Throughout his career, he has taken on multifaceted roles, from leading technical project management teams to owning solutions that drive operational excellence. His conscientious and proactive approach is unwavering, whether he is working independently or collaboratively within a team. His ability to connect with colleagues on a personal level underscores his commitment to fostering a harmonious and productive workplace environment.
Date: May 29, 2024
Tags: Information Security, ISO/IEC 27001, ISO/IEC 42001, Artificial Intelligence, GDPR
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Main Java[All of the Base Concepts}.docxadhitya5119
This is part 1 of my Java Learning Journey. This Contains Custom methods, classes, constructors, packages, multithreading , try- catch block, finally block and more.
LAND USE LAND COVER AND NDVI OF MIRZAPUR DISTRICT, UPRAHUL
This Dissertation explores the particular circumstances of Mirzapur, a region located in the
core of India. Mirzapur, with its varied terrains and abundant biodiversity, offers an optimal
environment for investigating the changes in vegetation cover dynamics. Our study utilizes
advanced technologies such as GIS (Geographic Information Systems) and Remote sensing to
analyze the transformations that have taken place over the course of a decade.
The complex relationship between human activities and the environment has been the focus
of extensive research and worry. As the global community grapples with swift urbanization,
population expansion, and economic progress, the effects on natural ecosystems are becoming
more evident. A crucial element of this impact is the alteration of vegetation cover, which plays a
significant role in maintaining the ecological equilibrium of our planet.Land serves as the foundation for all human activities and provides the necessary materials for
these activities. As the most crucial natural resource, its utilization by humans results in different
'Land uses,' which are determined by both human activities and the physical characteristics of the
land.
The utilization of land is impacted by human needs and environmental factors. In countries
like India, rapid population growth and the emphasis on extensive resource exploitation can lead
to significant land degradation, adversely affecting the region's land cover.
Therefore, human intervention has significantly influenced land use patterns over many
centuries, evolving its structure over time and space. In the present era, these changes have
accelerated due to factors such as agriculture and urbanization. Information regarding land use and
cover is essential for various planning and management tasks related to the Earth's surface,
providing crucial environmental data for scientific, resource management, policy purposes, and
diverse human activities.
Accurate understanding of land use and cover is imperative for the development planning
of any area. Consequently, a wide range of professionals, including earth system scientists, land
and water managers, and urban planners, are interested in obtaining data on land use and cover
changes, conversion trends, and other related patterns. The spatial dimensions of land use and
cover support policymakers and scientists in making well-informed decisions, as alterations in
these patterns indicate shifts in economic and social conditions. Monitoring such changes with the
help of Advanced technologies like Remote Sensing and Geographic Information Systems is
crucial for coordinated efforts across different administrative levels. Advanced technologies like
Remote Sensing and Geographic Information Systems
9
Changes in vegetation cover refer to variations in the distribution, composition, and overall
structure of plant communities across different temporal and spatial scales. These changes can
occur natural.
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.