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Practise dividing by 10, 100 and 1000 using this interactive worksheet. “Check answer” buttons provide instant feedback to students on their progress. Saved in web page .html format with alternative link for compatibility and sharing.

Also known as “partitioning”, breaking numbers apart by place value is an important skill if you want to master multiplication using the grid method. Interactive downloadable web page. Buttons allow students to check their own progress. A good starter before moving on to multiplication using the grid method. Saved in web page .html format with alternative link for compatibility / shareability. More maths worksheets at esheets.io

Practise a variety of questions rounding to the nearest integer, one decimal place and two decimal places. Interactive worksheet providing instant feedback to students. Rounding is a valuable skill that helps you simplify numbers for easier estimation, whether you’re dealing with large figures, decimals, or measurements. It’s commonly used in everyday tasks like budgeting, measuring, or comparing values, allowing you to focus on the most relevant digits without sacrificing too much accuracy. Saved in web page .html format with alternative link for compatibility / shareability. More maths resources at www/esheets.io

Practise identifying coordinates in the first quadrant with this interactive worksheet. Buttons allow students to assess their own progress. Coordinates in the first quadrant help us describe positions on a grid using pairs of numbers, like a treasure map! They’re used in video game design, navigation, and even plotting the flight path of a drone. Learning to plot and read these coordinates can make math feel more like solving a real-world puzzle! Saved in web page .html format with alternative links for compatibility and sharing.

Practise identifying coordinates in all four quadrants with this interactive worksheet. Buttons allow students to assess their own progress. Coordinates in all four quadrants help us map points on a grid, just like using a GPS to find a location. Whether it’s tracking the path of a video game character or plotting a route on a city map, understanding coordinates allows us to navigate space accurately in every direction! Saved in web page .html format with alternative links for compatibility and sharing.

Pracitse rounding smaller numbers to one significant figure. Interactive buttons allows students to assess their own progress. Rounding small numbers to one significant figure helps simplify calculations and make values easier to understand, especially when dealing with tiny measurements in science or engineering. For example, estimating the thickness of a hair or the diameter of a bacterium often requires rounding to make comparisons more practical! Saved in web page .html format with alternative link for sharing and compatibility. More maths worksheets at esheets.io

Practise rounding large numbers to two significiant figures. Interactive buttons allows student to assess their own understanding. Rounding to two significant figures is a way to simplify numbers while keeping their most important digits. It’s especially useful in science and engineering when working with large or small measurements, like calculating distances in space or reporting lab results. By focusing on just two key digits, you can quickly estimate and communicate values without losing their essential meaning. Saved in web page .html format with alternative links for sharing and compatibility. More maths worksheets at esheets.io

Practise rounding small numbers to two significant figures. Interactive buttons allow students to assess their own understanding. Rounding small numbers to two significant figures is a crucial skill in science, engineering, and everyday problem-solving. It helps simplify calculations while keeping the results precise enough for practical use. For instance, when dealing with measurements like 0.00456 grams, rounding makes the data easier to interpret and communicate accurately. Save in web page .html format with alternative links for sharing and compatibility. More maths worksheets at esheets.io

Practise rounding larger numbers to three significant figures interactive worksheet. Buttons allow students to assess their own progress. Rounding large numbers to three significant figures is a vital skill in science, engineering, and everyday life. It helps simplify complex calculations while maintaining accuracy. For example, if you’re estimating the population of a city or the distance between planets, using significant figures ensures clarity without overwhelming you with unnecessary detail. Saved in web page .html format with alternative link for sharing and compatibility. More maths worksheets at esheets.io

Practise rounding large numbers to one significant figure with this interactive worksheet. Buttons allow students to assess their own progress. Rounding larger numbers to one significant figure helps simplify complex calculations, especially when estimating in real-world situations. For example, when budgeting for a big event or calculating the population of a city, using rounded numbers gives a quick and clear idea without unnecessary detail. Saved in .html format with alternative link for sharing and compatibility. More maths worksheets at esheets.io

Interactive worksheet on trunction. Buttons allow students to assess their own progress. Truncation is a way of simplifying numbers by cutting off extra decimal places or digits, often used in calculations to save time or achieve a specific level of accuracy. You might see truncation in action when rounding financial figures, measuring distances, or programming computers to work with manageable numbers. Saved in web page .html format with alternative links for compatibility and sharing. More maths worksheets at esheets.io

Students are presented with a graph and are asked for the equation of any line parallel to it. Interactive buttons allow students to check their own progress. In everyday life, parallel lines can be seen in things like train tracks or the edges of a road – they never meet, no matter how far they go. When we talk about the equation of a parallel line, we’re finding another line that has the same slope (or steepness) as the original, but is shifted either up or down. This concept is important when designing things like roads, buildings, and even in creating patterns in art and architecture! Saved in web page .html format with alternative links for compatibility and sharing. More maths worksheets at esheets.io

Students are presented with a graph and asked to enter the equation of any perpendicular line. Interactive buttons allow the student to assess their own progress. In geometry, finding the equation of a perpendicular line is useful when working with shapes like squares and rectangles or analyzing graphs. Perpendicular lines meet at a right angle (90 degrees), and their slopes are opposite reciprocals. This concept helps in tasks such as determining how to build structures with perfect corners or understanding angles in real-world designs like roads and bridges. Save in web page .html format with links for compatibility and sharing. More maths worksheets at esheets.io

Practise converting larger numbers from standard form to ordinary. Interactive buttons allow students to assess their own progress. Converting larger numbers in standard form to ordinary numbers is a crucial skill in science and engineering. It helps us easily work with extremely large values, like the distance between planets or the speed of light. By mastering this, you’ll be able to translate massive numbers back into their full form and understand the scale of the world around you! Save in web page .html format with alternative link for compatibility and sharing. More maths worksheets at esheets.io

Students are presented with a diagram and a series of prompts to help them determine the equation of a tangent. Interactive buttons allow students to assess their own progress. The equation of a tangent is crucial in understanding how straight lines can “just touch” curves at a single point. In real life, this concept helps in designing roads, bridges, and even roller coasters, where smooth transitions between curved and straight sections are essential for safety and comfort. Saved in web page .html format with alternative links for compatibility and sharing. More maths worksheets at esheets.io

Practise finding the hypotenuse using Pythagoras’ Theorem. Interactive buttons allow students to monitor their own progress. The hypotenuse is the longest side of a right-angled triangle, and Pythagoras’ Theorem helps us find it. Whether you’re measuring the diagonal of a TV screen or figuring out the shortest distance across a park, the formula a² + b² = c² is a practical tool for solving real-world problems involving right-angled triangles! Saved in web page .html format with alternative links for sharing and compatibility. More maths worksheets at esheets.io

Practise finding the range from a set of values. Interactive buttons allow students to assess their own progress. The range is a measure of how spread out a set of numbers is, found by subtracting the smallest number from the largest. It’s used in real life to compare variations, like tracking the temperature highs and lows in a week or analyzing the fastest and slowest times in a race. Saved in web page .html format with alternative links for compatibility and sharing. More maths worksheets at esheets.io

Practise finding missing sides on a right-angled triangle using trigonometry. Interactive buttons allows students to assess their own progress. Trigonometry helps us solve real-world problems, like finding the height of a building or the distance across a river, without measuring them directly. By using the angles and a known side of a right triangle, we can calculate the missing sides with tools like sine, cosine, and tangent. Saved in web page .html format with alternative links for compatibility and sharing.

Practise finding the hypotenuse or a shorter side with this interactive worksheet. Buttons allow students to assess their own progress. The Pythagorean Theorem is a cornerstone of geometry, showing up wherever right-angled triangles are involved. It states that the square of the hypotenuse (the longest side) is equal to the sum of the squares of the other two sides. From designing ramps to navigating directly across a park, it’s a real-world tool for finding the shortest path or calculating distances. Saved in web page .html format with alternative links for compatibility and sharing. More maths worksheets at esheets.io

Practise finding missing angles using trigonometry with this interactive worksheet. Buttons allow students to assess their own understanding. Trigonometry helps us find missing angles in triangles, a skill that’s used in real life to design bridges, measure the height of buildings, or even track the path of a rocket. By applying sine, cosine, and tangent, we can unlock the secrets hidden within the angles of any right-angled triangle! Saved in web page .html format with alternative links for compatibility and sharing. More maths worksheets at esheets.io