749 results found
A challenging worksheet exploring coordinates change through reflection across the x-axis, including procedural, reasoning, and real-world questions tailored for GCSE Foundation students.
A worksheet exploring the reflection of points across the x-axis within real-world contexts such as gaming and technology, focusing on coordinates change.
A worksheet focusing on the reflection of points across the x-axis, including procedural practice, reasoning, real-world scenarios, and extension challenges.
A worksheet focused on understanding and applying the reflection of points across the x-axis, including procedural mastery, problem solving, real-world contexts, and extensions.
A worksheet focusing on understanding and correcting common misconceptions related to angles of elevation and depression in three-dimensional contexts for Grade 8 students.
A worksheet reviewing angles of elevation and depression in three-dimensional contexts, combining procedural questions, problem-solving, real-world applications, and extension challenges.
A worksheet exploring angles of elevation and depression in three-dimensional contexts, designed to develop procedural mastery, reasoning skills, and real-world applications for Year 9 students.
A worksheet covering angles of elevation and depression in 3D space, focusing on problem solving and reasoning skills required for GCSE Higher students.
A worksheet focusing on understanding and calculating angles of elevation and depression in three-dimensional contexts for Grade 7 students.
A worksheet focusing on understanding and applying the formula for the area of non-right-angled triangles, highlighting common errors and misconceptions.
A worksheet covering the area of non-right-angled triangles using the formula ½abSinC, with a variety of question types including practice, reasoning, real-world applications, and challenging problems.
A worksheet exploring the area of non-right-angled triangles using the formula ½abSinC, including practice, problem solving, real-world applications, and extension challenges.
A worksheet exploring the area of non-right-angled triangles with real-world contexts related to art and patterns. Students will apply the formula ½abSinC to various problems, enhancing procedural skills and problem-solving abilities.
A worksheet focusing on calculating the area of non-right-angled triangles using the formula ½abSinC, aimed at developing procedural fluency and problem-solving skills for Grade 7 students.
A worksheet focusing on understanding and common misconceptions when rearranging the Cosine Rule formula to find angles. Designed to develop procedural fluency, reasoning, and real-world application skills.
A worksheet focusing on rearranging the Cosine Rule to find angles and sides, including procedural practice and real-world applications.
A worksheet focused on rearranging the Cosine Rule formula to find angles, designed for challenge and extension for Grade 8 students.
A worksheet focused on rearranging the Cosine Rule formula within real-world business and finance contexts. Designed to develop procedural mastery, problem-solving, and extension skills.
A worksheet focused on rearranging the Cosine Rule formula to find angles, including procedural practice, problem solving, real-world contexts, and extension questions.
A worksheet focused on mastering the skill of rearranging the Cosine Rule formula to find angles. Designed for procedural practice and applying formulas effectively.
This worksheet explores common errors and misconceptions when applying the Cosine Rule a² = b² + c² - 2bc cosA, focusing on identifying and correcting mistakes in calculations and understanding.
A worksheet exploring the use of the Cosine Rule to find side lengths in triangles, including procedural practice, problem solving, real-world applications, and extension questions.
A worksheet exploring the use of the cosine rule a² = b² + c² - 2bc cosA for solving for sides in triangles. Includes practice, reasoning, and extension questions.
This worksheet explores the cosine rule a² = b² + c² - 2bc cosA with a focus on space and astronomy contexts, helping students apply the formula to real-world scenarios.