Not exact matches
The PowerPoint has clear examples on how to find the
nth term of a quadratic sequence and includes a starter on
linear sequences.
Indices Rearranging formulae Inverse functions Composite functions Equation of a straight line Parallel and perpendicular lines Solving
linear equations Solving quadratic equations by factorising Quadratic formula Completing the square and solving quadratic equations by com - pleting the square Simultaneous Equations - Elimination Simultaneous Equations - Substitution Simultaneous Equations One
Linear, One Quadratic
Linear inequalities Quadratic inequalities The
nth term of
linear and quadratic sequences Designed for the GCSE / IGCSE specification.
Generate terms of a sequence from either a position - to - term rule Recognise and apply sequences of triangular, square and cube numbers, simple arithmetic progressions, Fibonacci type sequences, quadratic sequences, and simple geometric progressions (rn where n is an integer, and r is a rational number > 0) Deduce expressions to calculate the
nth term of
linear sequences Full lesson PowerPoint and workbook to accompany, I have used quite a few of AQA's helpful resources to help me put this lesson together.
Finding the
nth term of
linear and quadratic sequences.
Finding the
nth term from a linear sequence Solving Inequalities and Inequations Solving linear equations involving fractions Factorising Expressions Solving Simultaneous Equations Nth term from geometric sequen
nth term from a
linear sequence Solving Inequalities and Inequations Solving
linear equations involving fractions Factorising Expressions Solving Simultaneous Equations
Nth term from geometric sequen
Nth term from geometric sequences
If you know the first number, a, and the common difference d, (where d is negative), then the
nth term is a + (n - 1) * d: exactly the same as in an increasing
linear sequence.