Chapter 7 Algebraic Methods Flashcards
how do you simplify an algebraic fraction using division?
- factorise the numerator and denominator
- cancel common factors
how do you divide a polynominal by (x ± p) where p is a constant?
using long division
what is the factor theorem?
if f(x) is a polynominal then:
- if f(p) = 0, then (x - p) is a factor
- if (x - p) is a factor, then f(p) = 0
how can you use the factor theorem to quickly factorise a cubic function, g(x)?
- substitute values into the function until you find a value, p, such that g(p) = 0
- divide the function by (x - p)
- write g(x) as (x - p)(ax^2 + bx + c)
- factorise (ax^2 + bx + c) if possible to write g(x) as a product of 3 linear factors
what must you do in mathematical proof?
- state any information or assumptions youre using
- show every step of your proof clearly
- make sure every step follows logically from the previous step
- make sure you have covered all possible cases
- write a statement of proof at the end of your working
how do you prove an identity?
- start with the expression on one side of the identity
- manipulate that expression algebraically until it matches the other side
- show every step of your working
what does proving by deduction mean?
starting from known facts or definitions, then using logical steps to reach the desired conclusion
what does proving by exhaustion mean?
breaking the statement into smaller cases and proving each case separately
this is better suited to a small number of results
what does proving by counter-example mean?
you can prove a mathematical statement is not true by counter-example
a counter-example is one example that doesn’t work for the statement
