Search results for 11 x1 t01 01 algebra & indices (2013)

1. Methods In Algebra Like terms can be added or subtracted, unlike terms cannot. 2. Index Laws a m  a n  a mn 3. Index Laws a m  a n  a mn a m  a n…

1. Methods In Algebra Like terms can be added or subtracted, unlike terms cannot. 2. Index Lawsa m  a n  a m n 3. Index Lawsa m  a n  a m na m  a n …

1. Methods In AlgebraLike terms can be added or subtracted, unliketerms cannot. 2. Index Laws a m  a n  a m n 3. Index Laws a m  a n  a m na m  a n …

1. Factorising 2. Factorising 1) Look for a common factor 3. Factorising 1) Look for a common factor 2) (i) 2 terms  difference of two squares 4. Factorising 1) Look for…

1. Factorising 2. Factorising1) Look for a common factor 3. Factorising1) Look for a common factor2) (i) 2 terms difference of two squares 4. Factorising1) Look for a…

1. Factorising 2. Factorising1) Look for a common factor 3. Factorising1) Look for a common factor2) (i) 2 terms difference of two squares 4. Factorising1) Look for a…

1. Factorising 2. Factorising 1) Look for a common factor 3. Factorising 1) Look for a common factor 2) (i) 2 terms  difference of two squares 4. Factorising 1) Look for…

1. Using Matrices to SolveSimultaneous Equations 2. Using Matrices to SolveSimultaneous Equationsa b2  2 matrix: A   c d  3. Using Matrices to SolveSimultaneous…

1. Cubics 2. Cubics  a  b   a 3  3a 2b  3ab 2  b3 3 3. Cubics  a  b   a 3  3a 2b  3ab 2  b3 3  a  b   a3  3a 2b …

Cubics Cubics  3 3 2 2 33 3a b a a b ab b     Cubics  3 3 2 2 33 3a b a a b ab b      3 3 2 2 33 3a b a a b ab b  …

1. Cubics 2. Cubics a  b   a 3  3a 2b  3ab 2  b3 3 3. Cubics a  b   a 3  3a 2b  3ab 2  b3 3 a  b   a3  3a 2b …

1. Logarithms 2. Logarithms Logarithms are the inverse of exponentials. 3. Logarithms Logarithms are the inverse of exponentials. If y  a x 4. Logarithms Logarithms are…

1. Differentiating Logarithms 2. Differentiating Logarithms y  log f  x  3. Differentiating Logarithms y  log f  x dy f  x   dx f  x …

1. Equations/Inequations 2. Equations/Inequations Make the pronumeral the subject of the formula 3. Equations/Inequations Make the pronumeral the subject of the formulae.g.…

1. Binomial Products 2. Binomial Products Bi  2 nomial  terms 3. Binomial ProductsBi  2 nomial  terms e.g.  x  6  x  1  4. Binomial ProductsBi…

1. Algebraic Fractions 2. Algebraic Fractions1) Always FACTORISE FIRST2) Only cancel ( ), not parts of them 3. Algebraic Fractions 1) Always FACTORISE FIRST 2) Only cancel…

1. Algebraic Fractions 2. Algebraic Fractions1) Always FACTORISE FIRST2) Only cancel ( ), not parts of them 3. Algebraic Fractions 1) Always FACTORISE FIRST 2) Only cancel…

1. Binomial Products 2. Binomial ProductsBi  2 nomial  terms 3. Binomial Products Bi  2 nomial  termse.g.  x  6  x  1  4. Binomial Products…

1. Logarithms 2. LogarithmsLogarithms are the inverse of exponentials. 3. LogarithmsLogarithms are the inverse of exponentials. If y  a x 4. LogarithmsLogarithms…

1. Logarithms 2. LogarithmsLogarithms are the inverse of exponentials. 3. LogarithmsLogarithms are the inverse of exponentials. If y  a x 4. LogarithmsLogarithms…