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COMPARING and ARRANGING NUMBERS (DRILL)
QuizΒ by Rachel Ann Advincula
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What are INTEGERS? Integers are whole numbers that describe opposite ideas in mathematics. Integers can either be negative (-), positive (+) or zero. The integer zero is neutral. It is neither positive nor negative, but is an integer. Integers can be represented on a number line, which can help us understand the value of the integer. POSITIVE INTEGERS Are numbers to the right of zero. Are valued greater than zero. Express ideas of up, a gain or a profit. The sign for a positive integer is (+), however the sign is not always needed. Meaning +3 is the same value as 3. NEGATIVE INTEGERS Are numbers to the left of zero. Are valued less than zero. Express ideas of down or a loss. The sign for a negative integer is (-). This sign is always needed. Opposite Numbers/Integers β are the pairs of integers that have the same absolute value or have the same distance away from zero. ABSOLUTE VALUE The distance of a number from the origin (0) regardless of direction is called absolute value. The absolute value of a number is never negative. The symbol for absolute value is two straight lines surrounding the number or expression for which you wish to indicate absolute value. Examples: I 4 I = 4, +4 is read β the absolute value of 4 is 4 β I -3 I = 3, -3 is read β the absolute value of -3 is 3β - I 3 I = -3, means β the negative of the absolute value of 3 is -3 β COMPARING AND ARRANGING INTEGERS Integers can be compared using a number line. As you move to the left along the number line, the integers decrease in value. On the other hand, integers increase in value as you move to the right along the number line. To arrange integers in ascending order is to arrange them from least to greatest. This means that when you use the number line, the smallest the integer is to the left of 0 on the number line. To arrange integers in descending order is to arrange them from greatest to least. This means that when you use the number line, the largest the integer is to the right of 0 on the number line. This is read as βnine is greater than negative 12.β This is read as βnegative thirteen is less than negative 5.β This is read as βnegative eight is greater than negative 18.β RWhat are INTEGERS? Integers are whole numbers that describe opposite ideas in mathematics. Integers can either be negative (-), positive (+) or zero. The integer zero is neutral. It is neither positive nor negative, but is an integer. Integers can be represented on a number line, which can help us understand the value of the integer. POSITIVE INTEGERS Are numbers to the right of zero. Are valued greater than zero. Express ideas of up, a gain or a profit. The sign for a positive integer is (+), however the sign is not always needed. Meaning +3 is the same value as 3. NEGATIVE INTEGERS Are numbers to the left of zero. Are valued less than zero. Express ideas of down or a loss. The sign for a negative integer is (-). This sign is always needed. Opposite Numbers/Integers β are the pairs of integers that have the same absolute value or have the same distance away from zero. ABSOLUTE VALUE The distance of a number from the origin (0) regardless of direction is called absolute value. The absolute value of a number is never negative. The symbol for absolute value is two straight lines surrounding the number or expression for which you wish to indicate absolute value. Examples: I 4 I = 4, +4 is read β the absolute value of 4 is 4 β I -3 I = 3, -3 is read β the absolute value of -3 is 3β - I 3 I = -3, means β the negative of the absolute value of 3 is -3 β COMPARING AND ARRANGING INTEGERS Integers can be compared using a number line. As you move to the left along the number line, the integers decrease in value. On the other hand, integers increase in value as you move to the right along the number line. To arrange integers in ascending order is to arrange them from least to greatest. This means that when you use the number line, the smallest the integer is to the left of 0 on the number line. To arrange integers in descending order is to arrange them from greatest to least. This means that when you use the number line, the largest the integer is to the right of 0 on the number line. This is read as βnine is greater than negative 12.β This is read as βnegative thirteen is less than negative 5.β This is read as βnegative eight is greater than negative 18.β CONCEPT OF INTEGERS What are INTEGERS? Integers are whole numbers that describe opposite ideas in mathematics. Integers can either be negative (-), positive (+) or zero. The integer zero is neutral. It is neither positive nor negative, but is an integer. Integers can be represented on a number line, which can help us understand the value of the integer. POSITIVE INTEGERS Are numbers to the right of zero. Are valued greater than zero. Express ideas of up, a gain or a profit. The sign for a positive integer is (+), however the sign is not always needed. Meaning +3 is the same value as 3. NEGATIVE INTEGERS Are numbers to the left of zero. Are valued less than zero. Express ideas of down or a loss. The sign for a negative integer is (-). This sign is always needed. Opposite Numbers/Integers β are the pairs of integers that have the same absolute value or have the same distance away from zero. ABSOLUTE VALUE The distance of a number from the origin (0) regardless of direction is called absolute value. The absolute value of a number is never negative. The symbol for absolute value is two straight lines surrounding the number or expression for which you wish to indicate absolute value. Examples: I 4 I = 4, +4 is read β the absolute value of 4 is 4 β I -3 I = 3, -3 is read β the absolute value of -3 is 3β - I 3 I = -3, means β the negative of the absolute value of 3 is -3 β COMPARING AND ARRANGING INTEGERS Integers can be compared using a number line. As you move to the left along the number line, the integers decrease in value. On the other hand, integers increase in value as you move to the right along the number line. To arrange integers in ascending order is to arrange them from least to greatest. This means that when you use the number line, the smallest the integer is to the left of 0 on the number line. To arrange integers in descending order is to arrange them from greatest to least. This means that when you use the number line, the largest the integer is to the right of 0 on the number line. This is read as βnine is greater than negative 12.β This is read as βnegative thirteen is less than negative 5.β This is read as βnegative eight is greater than negative 18.βResearch: Scientific Attitudes These are the traits that scientists and researchers practice to ensure reliable results and good research work: Curiosity β Desire to ask questions and seek answers. Drives exploration and discovery. Example: Wondering why leaves change color in autumn. Intellectual Honesty β Reporting observations and results truthfully, even if they donβt support your hypothesis. Open-Mindedness β Willingness to accept new ideas and consider other perspectives. Perseverance β Continuing research despite difficulties or failures. Objectivity β Avoiding bias; basing conclusions only on evidence and facts. Positive Attitude Towards Failure β Viewing mistakes as opportunities to learn and improve. Skepticism β Questioning results and not accepting claims without sufficient evidence. Observation and Inference Observation β Using the senses (or tools) to gather information. Qualitative Observation β Describes qualities (color, shape, texture). Quantitative Observation β Uses numbers or measurements (height, mass, temperature). Inference β Logical explanation or conclusion based on observations and prior knowledge. Example: Seeing smoke and inferring there is fire. π Science Process Skills These are steps used in scientific investigations: Observing β Using senses and instruments to gather data. Inferring β Making explanations based on observations. Predicting β Stating what you think will happen based on patterns or evidence. Communicating β Sharing results through words, graphs, charts, or reports. Classifying β Grouping objects or data according to similarities and differences. Ordering/Sequencing β Arranging objects or events in correct order (time, size, importance). Measuring β Using standard units and instruments to describe length, mass, volume, time, etc. π Measurement and Measuring Instruments Measurement β The process of comparing an unknown quantity with a standard unit. Common Quantities and Instruments: Length/Distance β Ruler, Meter Stick, Vernier Caliper, Tape Measure. Mass β Balance (triple beam, electronic). Volume β Graduated Cylinder, Measuring Cup, Pipette, Burette. Temperature β Thermometer. Time β Stopwatch, Clock. Electric Current β Ammeter. Voltage β Voltmeter. Key Idea: Accurate measurement requires using the correct instrument and unit (SI Units).Arranging and Comparing IntegersComparing and Ordering Whole Numbers - Starter QuizComparing and evaluating non-fiction textsComparing and ordering lengths - Starter Quiz