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1. A. solid is created when the region bounded hjr the curves '3; = a: and y = 3:3 is rotated about the line 3;
1. A. solid is created when the region bounded hjr the curves '3; = a: and y = 3:3\" is rotated about the line 3; = 3. Which of the following integrals gives the volume of this solid? 0 of: [mg-"'3 c2]2 dr 0 at} [22 332 {mg-"'3 + 3F] dr 0 of: [:e'1 1:453] d3: 0 wt: [(3 as o was] a O M? [1:4 a";3 + Q] {is 2. A solid is created when the region bounded by the semicircles y _ m y = f4 3:2 and the x-axis is rotated about the x-axis. What is the volume of this solid? 0 44:7: 0 Such a solid does not exist. 3. Find the volume of the solid created when the region boundedhyy 2, y mlauda: [Iis is rotated about the yaxis. 4. R denotes the region hounded by the curves 3; [at 3): and 3; 111(2). A solid is ereatezl when. R is rotated atmut the line y = U. \"'hat is the volume of this solid? [You may set up and evaluate the integral using a. ealeulaton) 5. A solid is created when the region in the first quadrant hounded by the curves y = 1'3, 3; = 4:2 and y = 4 is rotated about the line i = 5. What is the volume of this solid? If} 301.593 \\ I") 180.956 \\ 6. A solid is created when the region bounded by the curves 3; = eh! y = l. :c = Band I = l is rotated about the line 5.! = 1. What is the volume of this solid? {You may evaluate the integral 011 a calcul amt after Set up.) {j} 35.954 1'. A solid is created when the region bounded by the curves y {at 1}3 and y lu[.1=) is rotated about the line. :1? = 1. What is the volume of this solid? [You may set up and evaluate the integral using a calculator.)
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