Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN: 9781133382119

Author: Swokowski

Publisher: Cengage

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Suppose you want to approximate the area of the region boundedby the graph of ƒ(x) = cos x and the x-axis between x = 0 andx =∏/2. Explain a possible strategy.

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Consider the function f(x)=5sin(pi*x-pi/2) / (x2+4x+5) +5*1.1-(x+2), which is graphed the interval below on the interval [-2,8].
As a step in estimating the area under the curve from x= -2 to x=8, estimate the area under the curve from x=-2 to x=2 using the trapezoid rule and 10 equal subdivisions.
Use a lot of subdivisions on this interval because the function is changing quickly.
You get (from -2 to 2) Area=
A. 65.223
B. 21.164
C. 20.384
D. 16.307
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Consider the region bounded by f(x)=7x+15 and g(x)=6x−3. Find the area, in square units, between the two functions over the interval [−7,12]. Do not include any units in your answer.

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THE AREA OF REGION BOUNDED BY ( Y=X^2 - 2X ) & ( Y = - X^2 + 4 )

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Area under the curve
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Fast pls solve this question correctly in 5 min pls I will give u like for sure
Question is complete and correct so please solve this
Set-up the definite integral required to find the area of the region bounded by y=15+6x+x^(2), the x axis between

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Enter an exact answer.

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Find the approximate area under the curve by dividing the intervals into n subintervals and then adding up the areas of the inscribed rectangles. The height of each rectangle may be found by evaluating the function for each value of x. The n1=12 and n2=6 • Y=2x√x^2 1 between x=0 and x =6 for n1 and n2 • Find the exact area under the curve using integration Y=2x√x^2 1 between x=0 and x=6 Please explain the difference in your answers Please give thorough explanations of the work Please write clearly so I can understand (thank you.) If you can also sketch out the solution that would be good visual

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Q1:- Find the area bounded by the curve F(X)=(-X^2)+8X-7 and the x-axis between the function’s x-intercepts using a Riemann sum. Use of the Fundamental Theorem of Calculus without a Riemann sum will be awarded no credit.

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Find the area of the region bounded by (1/(x^2)) – 1, the x-axis, between x = ½ and x = 2. Your answer should be correct to 2 places after the decimal point. The area is __________

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