Solving for
Discontinuities
Algebraically
16 – 17 November 2010
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Solving Discontinuities in Rational Equations: Factoring & Identifying Asymptotes, Exercises of Mathematics
Instructions and examples for solving for discontinuities in rational equations by factoring the numerator and denominator, identifying vertical asymptotes and removable discontinuities, and determining the type of discontinuity based on the multiplicity of common factors. Students are encouraged to complete problems on the handout.
Typology: Exercises
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Solving for
Discontinuities
Algebraically
16 – 17 November 2010
Always Factor! The 1st^ step → always factor the numerator and the denominator!!! Goal: Get matching factors in numerator and denominator 1 ( 5 )( 1 ) 1 4 5
x x x y x x x y
Example:
x
x
x
x x
y
x
x x
y
2
Your Turn: Complete problems 1 – 5 on the “Solving for the Discontinuities of Rational Equations” handout.
Removable Discontinuities, cont. Step 1: Factor the numerator and the denominator Step 2: Identify factors that occur in both the numerator and the denominator Step 3: Set the common factors equal to zero Step 4: Solve for x Step 5: Write your answers in the form x =
Example: ( 2 ) ( 2 )( 2 ) 2 4 2 x x x y x x y : 2 2 0 Hole x x
Vertical Asymptote vs. Removable Discontinuity Algebraically, they act similarly Consider:
( 2 ) ( 2 )( 2 ) ( 2 ) 4 4 x x x y x x x y
Vertical Asymptote vs. Removable Discontinuity, cont. 3 3 2 ( 2 )
x x x y x x x y !!! 0 0 0 4 8 4 ( 2 2 ) ( 2 ) 4 ( 2 ) 4 2 3 3 2 y y y x
Vertical Asymptote vs. Removable Discontinuity, cont. ( 2 )( 2 )( 2 ) ( 2 )( 2 ) ( 2 ) ( 2 )( 2 ) ( 2 ) 4 4 3 3 2 x x x x x y x x x y x x x y : 2 2 0 2 1 VA x x x y
Vertical Asymptote vs. Removable Discontinuity, cont. Depends on: (^) How many times a factor occurs Where the factor occurs Removable Discontinuity → the multiplicity of the factor in the numerator ≥ the multiplicity of the factor in the denominator Vertical Asymptote → the multiplicity of the factor in the numerator < the multiplicity of the factor in the denominator
Your Turn: Complete problems 11 – 15 on the “Solving for the Discontinuities of Rational Equations” handout.
Homework In Precalculus textbook, pg. 290: 7 – 12 Hint! You will need to use the quadratic formula for #8.
Example 1 If n = m → HA: If n < m → HA: y = 0 If n > m → HA doesn’t exist b a y
x
x
y
HA : y 0
Example 2 If n = m → HA: If n < m → HA: y = 0 If n > m → HA doesn’t exist b a y 2 7 13
x x x y HA: none