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AP CALCULUS 1001 - Limits 1: Local Behavior
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You have 5 minutes to read a paragraph out of the provided magazine and write a thesis statement regarding what you read
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C CONVERSATION: Voice level 0. No talking! H HELP: Raise your hand and wait to be called on. A ACTIVITY: Whole class instruction; students in seats. M MOVEMENT: Remain in seat during instruction. P PARTICIPATION: Look at teacher or materials being discussed. Raise hand to contribute; respond to questions, write or perform other actions as directed. NO SLEEPING OR PUTTING HEAD DOWN, TEXTING, DOING OTHER WORK. S Activity: Teacher-Directed Instruction
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Objectives(SWBAT): Content: evaluate limits using basic limit laws, direct substitution, factoring, and rationalizing Language: SW verbally describe limit laws in their own words
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REVIEW: ALGEBRA is a _________________ machine that ___________________ a function ___________ a point. CALCULUS is a ________________________ machine that ___________________________ a function ___________ a point function evaluates Limit Describes the behavior of near
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Limits Review: PART 1: LOCAL BEHAVIOR (1). General Idea: Behavior of a function very near the point where (2). Layman’s Description of Limit (Local Behavior) (3). Notation (4). Mantra x a y L L a
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G N A W Graphically “We Don’t Care” Postulate”: What is the y value? 0 3
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G N A W Numerically 21.999 1.9 1.99 x y 2.0001 2.001 2.01 40.268 40.561 40.204 39.914 37.165 40.239 err or 40.2
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(5). Formal Definition ( Equation Part) Graphically: Find a If 3 2 1 1 2 3 4
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Analytically Find a if given and for ------------------------------------------
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Find a for any
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C CONVERSATION: Voice level 0. No talking! H HELP: Raise your hand and wait to be called on. A ACTIVITY: Whole class instruction; students in seats. M MOVEMENT: Remain in seat during instruction. P PARTICIPATION: Look at teacher or materials being discussed. Raise hand to contribute; respond to questions, write or perform other actions as directed. NO SLEEPING OR PUTTING HEAD DOWN, TEXTING, DOING OTHER WORK. S Activity: Teacher-Directed Instruction
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Objectives(SWBAT): Content: evaluate limits using basic limit laws, direct substitution, factoring, and rationalizing Language: SW verbally describe limit laws in their own words
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G – Graphically N – Numerically A – Analytically W -- Words
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The Formal Definition Layman’s definition of a limit As x approaches a from both sides (but x≠a) If f(x) approaches a single # L then L is the limit
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FINDING LIMITS
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G N A W -.1-.01-.001 0.001.01.1 X Mantra: Numerically Words Verify these also: x a, y L.9999.99999.9834.99834.999.99999 Must write every time
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(6). FINDING LIMITS “We Don’t Care” Postulate….. The existence or non-existence of f(x) at x = 2 has no bearing on the limit as Graphically
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FINDING LIMITS Analytically A.“a” in the Domain Use _______________________________ B.“a” not in the Domain This produces ______ called the _____________________ Rem: Always start with Direct Substitution Direct substitution 13 Indeterminate form
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Rem: Always start with Direct Substitution Method 1: Algebraic - Factorization Method 2: Algebraic - Rationalization Method 3: Numeric – Chart (last resort!) Method 4: Calculus To be Learned Later ! Creates a hole so you either factor or rationalize
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Do All Functions have Limits? Where LIMITS fail to exist. Why? f(x) approaches two different numbers Approaches ∞Oscillates At an endpoint not coming from both sides
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Review : 1) Write the Layman’s description of a Limit. 2) Write the formal definition. ( equation part) 3) Find each limit. 4) Does f(x) reach L at either point in #3?
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Homework Problems 1.From the figure, determine a such that
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Review: (5). The graph of the function displays the graph of a function with Estimate how close x must be to 2 in order to insure that f(x) is within 0.5 of 4. (6). Find a such that
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Last Update: 08/12/10
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Using Direct Substitution BASIC (k is a constant. x is a variable ) 1) 2) 3) 4) IMPORTANT: Goes BOTH ways! Properties of Limits
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Properties of Limits: cont. POLYNOMIAL, RADICAL, and RATIONAL FUNCTIONS all us Direct Substitution as long as a is in the domain OPERATIONS Take the limits of each part and then perform the operations. EX:
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Composite Functions REM: Notation THEOREM: and Use Direct Substitution. EX:
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Limits of TRIG Functions Squeeze Theorem: if f(x) ≤ g(x) ≤ h(x) for x in the interval about a, except possibly at a and the Then exists and also equals L f g h a This theorem allow us to use DIRECT SUBSTIUTION with Trig Functions.
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Limits of TRIG Functions:cont. In a UNIT CIRCLE measured in RADIANS: THEREFORE: Defn. of radians!
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Exponential and Logarithmic Limits Use DIRECT SUBSTITUTION. REM: the Domain of the functions REM: Special Exponential Limit For a > 0
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