Algebra Flashcards
Modulus properties
|a x b|=|a|x|b|
|a/b| = |a| / |b|
Note:
|a+b|≠|a|+|b|
y =|sin(x)|≠ sin|x|
Division of polynomials
f(x) ≡ (x – a) * q(x) + R
dividend ≡ divisor x quotient + remainder
Where the degree of the remainder is less than the degree of the divisor.
Steps for polynomial division
- Lay out equation as long division
- Ensure all powers of x are written including 0 values
- To begin filling in the quotient or the answer multiply the divisor by a value that when subtracted by the dividend will cancel that power
- Continue to do this till you are left with the remainder
- To check remainder, if its degree is less than the degree of the divisor it is correct
Remainder theorem
Set divisor equal to 0
Solve for the divisor
Sub answer for divisor into the dividend
Solve and then answer is the remainder
Factor theorem
Use factors of the constant in the dividend as the trial inputs to find factors of the dividend
Partial fractions Type 1
Denominator contains linear factors only
ax + b A B ------------------ = --------- + --------- (px + q)(rx+s) (px + q) (rx + s)
ax + b = A(rx+s) + B(px + q)
Partial fractions Type 2
Denominator contains repeated linear factors
ax² + bx + c A B C
—————— = —— + —— + ——(px + q)(rx+s)² (px+q) (rx+s) (rx+s)²
ax² + bx + c =
A(rx+s)² + B(px+q)(rx+s) + C(px + q)
Partial fractions Type 3
Denominator contains a quadratic factor that cannot be factorised
ax² + bx + c A Bx + C
—————— = ——— + ———
(px + q)(rx²+s) (px + q) (rx² + s)
ax² + bx + c =
A(rx²+s) + (Bx + c)(px + q)
Binomial Expansion
Given in formula sheet
Note:
(a + x)ⁿ
= aⁿ (1 + x/a)ⁿ
= aⁿ[ 1 + n(x/a) + (n(n-1) / 2!)(x/a)² + …]
Binomial expansion for complex equations
Split into partial fractions
Binomially expand each part of the fraction
Add the expansions to obtain answer
Note:
For rational functions where the degree of the numerator is greater than or equal to the degree of the denominator (improper fractions), try express them in another way using long division to then expand.
