749 results found
A worksheet focusing on the formula for the circumference of a circle, C = 2πr, aiming to develop procedural fluency and problem-solving skills.
A worksheet focusing on understanding, applying, and correcting misconceptions related to the formula C = πd for the circumference of a circle.
A worksheet covering the formula C = πd for calculating the circumference of circles, including practice, reasoning, real-world applications, and challenging problems.
A challenging worksheet focusing on the formula C = πd for GCSE Higher students, including practice, reasoning, real-world applications, and extension questions.
A worksheet exploring the formula C = πd through real-world travel and map scenarios, designed for GCSE Foundation students.
A worksheet focusing on solving problems using the formula C = πd for the circumference of circles, suitable for Grade 6 students.
A worksheet focusing on calculating the circumference of circles using the formula C = πd. Designed to develop procedural skills and application in various contexts.
A worksheet focusing on subtracting errors and misconceptions related to the area of compound shapes, designed for Grade 7 students to enhance procedural understanding and problem-solving skills.
A worksheet focusing on subtracting in the context of geometry and measures, designed for GCSE Foundation students to develop procedural skills and problem-solving ability.
A worksheet focusing on subtracting areas within compound shapes, including procedural practice, real-world problems, and extension challenges for Grade 8 students.
A worksheet focusing on subtracting areas within architectural and design contexts, aimed at GCSE Higher students.
A worksheet focusing on subtraction skills applied to geometric contexts, including problem solving, real-world applications, and extension challenges.
A worksheet focusing on subtracting to find areas of compound shapes, designed for Grade 6 students to develop procedural mastery and problem-solving skills.
This worksheet focuses on breaking down complex shapes into simpler parts to find the total area. Mastery of decomposing shapes is essential for accurate measurement and problem-solving in geometry.
This worksheet focuses on breaking down complex shapes into simpler components to find their total area. It emphasizes understanding how to decompose shapes and apply area formulas effectively.
This worksheet explores the concept of breaking down complex shapes into simpler parts to calculate area, using real-world cooking scenarios. Designed for GCSE Foundation students to develop procedural skills and problem-solving abilities.
This worksheet focuses on breaking down complex shapes into simpler parts to find the total area. It develops understanding of additive methods for compound shapes through problem solving and reasoning tasks.
A worksheet focusing on breaking down complex shapes into simpler parts to find their total area, aimed at GCSE Higher students. It includes procedural practice and real-world applications.
A worksheet focusing on understanding and applying the formula for the area of a trapezium, ½(a+b)h, with an emphasis on common errors and misconceptions.
This worksheet reviews the formula for the area of a trapezium, ½(a+b)h, through various question types including procedural practice, problem solving, and real-world applications.
A worksheet focusing on calculating the area of trapeziums using the formula ½(a+b)h, with a range of questions from basic to challenging, including real-world and extension problems.
A worksheet focusing on the formula ½(a+b)h for calculating the area of trapeziums, with applications in engineering contexts. Includes practice, problem solving, and extension questions.
A worksheet focusing on calculating the area of trapeziums using the formula ½(a+b)h. Designed to develop procedural skills and application in real-world contexts.
This worksheet focuses on calculating the area of trapeziums using the formula ½(a+b)h, helping students develop procedural mastery and problem-solving skills.