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Unformatted text preview: Version PREVIEW – FinalReview01 – Van Ligten – (56650) 1 This printout should have 18 questions. Multiplechoice questions may continue on the next column or page – find all choices before answering. CalC5b00Ex7 001 10.0 points Use properties of integrals to determine the value of I = integraldisplay 5 f ( x ) dx when integraldisplay 7 f ( x ) dx = 12 , integraldisplay 7 5 f ( x ) dx = 9 . 1. I = 1 2. I = 4 3. I = 5 4. I = 2 5. I = 3 correct Explanation: Since integraldisplay 7 f ( x ) dx = integraldisplay 5 f ( x ) dx + integraldisplay 7 5 f ( x ) dx , we see that I = 12 9 = 3 . keywords: definite integral, conceptual, prop erties of integrals, CalC5b63a 002 10.0 points If f and g are continuous functions such that f ( x ) ≥ 0 for all x , which of the following must be true? I . integraldisplay b a f ( x ) g ( x ) dx = parenleftBig integraldisplay b a f ( x ) dx parenrightBigparenleftBig integraldisplay b a g ( x ) dx parenrightBig II . integraldisplay b a braceleftBig f ( x ) + g ( x ) bracerightBig dx = integraldisplay b a f ( x ) dx + integraldisplay b a g ( x ) dx III . integraldisplay b a radicalbig f ( x ) dx = radicalBigg integraldisplay b a f ( x ) dx 1. II and III only 2. II only correct 3. I only 4. III only 5. I and II only Explanation: Property II is a special case of the linearity property of integrals, i.e. “ integral of the sum = sum of the integrals ”. But there is no product rule or square root rule for integrals. For example, we know that integraldisplay 2 f ( x ) dx = 2 when f ( x ) = 1, because the value of the inte gral is the area of a rectangle of height 1 and base length 2. So when f ( x ) = g ( x ) = 1 in I, integraldisplay 2 f ( x ) g ( x ) dx = integraldisplay 2 1 dx = 2 , while parenleftBig integraldisplay 2 f ( x ) dx parenrightBigparenleftBig integraldisplay 2 g ( x ) dx parenrightBig = 2 × 2 = 4 . On the other hand, in III, integraldisplay 2 radicalbig f ( x ) dx = integraldisplay 2 1 dx = 2 , Version PREVIEW – FinalReview01 – Van Ligten – (56650) 2 while radicalBigg integraldisplay 2 f ( x ) dx = radicalBigg integraldisplay 2 1 dx = √ 2 . Consequently, only II is true . CalC4j39a 003 10.0 points If the graph of f is which one of the following contains only graphs of antiderivatives of f ? 1. 2. 3. correct 4. 5. 6. Explanation: If F 1 and F 2 are antiderivatives of f then F 1 ( x ) F 2 ( x ) = constant independently of x ; this means that for any two antiderivatives of f the graph of one is just a vertical translation of the graph of the other. But no horizontal translation of the graph of an antiderivative of f will be Version PREVIEW – FinalReview01 – Van Ligten – (56650) 3 the graph of an antiderivative of f , nor can a horizontal and vertical translation be the graph of an antiderivative. This rules out two sets of graphs....
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