mid1 - 2004

# mid1 - 2004 - MATH 1300-MIDTERM-2004 NAME and I.D...

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MATH 1300-MIDTERM-2004 NAME and I.D.# Instructions – This exam consists of 6 multiple choice questions and 2 long answer questions. The multiple choice questions are worth 6 points each, and the long answer questions are as indicated. The total value of the exam is 60 points. Place your answers to the multiple choice questions in the boxes below. All your work on the long answer questions must be clearly marked. You may use the backs of pages. If you need additional scrap paper, it will be provided by the proctors. NO CALCULATORS. NO BOOKS. NO NOTES. On the long answer questions, you must show your work. Answers: #1 #2 #3 #4 #5 #6 1

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- Consider the following function: f ( x ) = ± x 2 - x + 1 if x < 4 ax 2 + 2 x - 3 otherwise What value must the constant a be for the function to be continuous at x = 4? A) 1 3 B) 1 2 C) - 1 4 D) - 1 2 E) 2 3 Question 2 - Find the equation of the tangent line of the function f ( x ) = ( x 3 +7) 2 3 at x = 1. A)
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## This note was uploaded on 10/24/2010 for the course MAT mat 1300 taught by Professor Blute during the Fall '10 term at University of Ottawa.

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mid1 - 2004 - MATH 1300-MIDTERM-2004 NAME and I.D...

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