515 results found
A worksheet covering the calculation of gradient between two points using the formula m = (y₂ - y₁) / (x₂ - x₁). Includes a variety of question types to reinforce procedural skills and application.
A mixed review worksheet focusing on understanding when the gradient (slope) of a graph is zero, including procedures, reasoning, and real-world contexts suitable for GCSE Foundation students.
A mixed review worksheet focusing on the concept of negative gradients (slopes) in graphs for GCSE Higher students.
A worksheet reviewing the concept of positive gradients from graphs, suitable for Year 9 students. Includes procedural questions, problem-solving, real-world applications, and extension challenges.
A worksheet reviewing how to select x-values for plotting linear graphs. Focuses on procedural mastery, problem-solving, and real-world applications.
A worksheet covering various aspects of y = mx + c, including plotting, calculations, and problem solving for Year 9 students.
A worksheet covering Pythagoras Application for Grade 6 students, including procedural practice, reasoning, real-world scenarios, and extension questions.
A worksheet providing mixed practice questions on finding the midpoint of line segments, including procedural, reasoning, real-world, and challenge problems.
A worksheet focused on understanding and applying the formula for finding the midpoint of a line segment. Suitable for Grade 6 students to review procedural skills and problem-solving involving midpoints.
A mixed review worksheet for Year 9 students focusing on reading and interpreting coordinates on a Cartesian plane. Covers procedural skills, problem solving, and real-world applications.
A worksheet covering Plotting Points to reinforce understanding of coordinates for Year 9 students. Includes procedural practice, problem solving, and extension questions.
A worksheet covering Numerical Solutions in iteration for Grade 6 students, including procedural questions, problem-solving, real-world applications, and extension challenges.
A worksheet covering the iterative process defined by xₙ₊₁ = f(xₙ), designed to reinforce procedural skills, reasoning, and real-world applications for GCSE Foundation students.
A worksheet covering the process of finding and verifying inverse functions, with a mix of procedural, reasoning, and real-world questions suitable for Grade 8 students.
A worksheet covering various aspects of inverse functions, designed to reinforce procedural skills and conceptual understanding for Year 9 students.
A worksheet reviewing the importance of order in composite functions, with a variety of question types suitable for Grade 6 students.
A worksheet covering composite functions f(g(x)) designed for GCSE Foundation students, including practice, problem solving, real-world applications, and extension questions.
A comprehensive worksheet reviewing the concepts of domain and range in functions, designed for Grade 8 students. Includes procedural practice, problem solving, real-world applications, and extension questions.
A worksheet providing a mixed review on evaluating functions in algebra, suitable for GCSE Higher students. Covers procedural questions, problem solving, real-world contexts, challenges, and error analysis.
A worksheet covering recognizing patterns in Fibonacci and special sequences, designed for Grade 7 students to build procedural skills and reasoning.
A worksheet covering strategies for finding the nth term of quadratic sequences, designed for Grade 6 students to develop procedural skills and problem-solving abilities.
A worksheet focused on understanding and applying formulas related to geometric sequences, designed for Grade 7 students. Includes procedural practice, problem-solving, and real-world applications.
A worksheet covering the use of the nth term formula for Arithmetic Sequences, including practice, problem solving, real-world applications, and extension questions.
A worksheet focused on finding the formula for arithmetic sequences, helping students understand the nth term rule through various exercises.