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Section 2.3-problems

Section 2.3-problems - 1 limit does not exist 2 limit = 0 3...

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to (aqt73) – Section 2.3 – isaacson – (55826) 1 This print-out should have 6 questions. Multiple-choice questions may continue on the next column or page – find all choices before answering. 001 10.0points Determine the value of lim x 2 2 f ( x ) g ( x ) 2 f ( x ) - 5 g ( x ) when lim x 2 f ( x ) = 4 , lim x 2 g ( x ) = - 2 . 1. limit = - 8 9 2. limit = - 5 6 3. limit = - 17 18 4. limit = - 1 5. limit = - 19 18 002 10.0points Determine lim x 0 braceleftBig 1 x - x 2 - 1 x bracerightBig . 1. limit = - 1 3 2. limit = 1 3. limit = - 1 2 4. limit = 1 3 5. limit = 1 2 6. limit = - 1 003 10.0points Determine if lim x 1 x 2 - 6 x + 5 x 2 + 3 x - 4 exists, and if it does, find its value. 1. limit = - 1 2. limit = 2 3 3. limit = 4 5 4. limit = - 2 3 5. limit = - 4 5 6. limit does not exist 004 10.0points Determine if lim x 6 x - 6 x 2 - 12 x + 36 exists, and if it does, find its value.

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Unformatted text preview: 1. limit does not exist 2. limit = 0 3. limit = 1 6 4. limit = 6 5. limit = 1 3 005 10.0 points Determine the value oF lim x → 1 f ( x ) when f satisfes the inequalities 4 ≤ f ( x ) ≤ x 2-2 x + 5 on [-5 , 1) ∪ (1 , 5]. to (aqt73) – Section 2.3 – isaacson – (55826) 2 1. limit = 5 2. limit = 3 3. limit does not exist 4. limit = 6 5. limit = 2 6. limit = 4 006 10.0 points Determine if lim x → x 4 cos p 10 x P exists, and if it does, Fnd its value. 1. limit does not exist 2. limit = 4 3. limit = 10 4. limit = 3 5. limit = 0...
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