9dentify the definite integral that represents the area of the surface formed by revolving the graph of f(x) = x³ on the interval [0, 1] about the y-axis. (b) 2π [√1 + 9x² dx (a) 2π (d) 2π So Jo 2πT S'> x√1 + 9xª dx • (a) 2π x√1 + 3x² dx 2π7 √ ² x √I + 4x² dx (c). 2π (e) None of these 10 Identify the definite integral that represents the area of the surface formed by revolving the graph of f(x) = 49x² on the interval [0, 7] about the y-axis. 2π7 (49 (49 - x²)√1 + 4x² dx [10] invest sit an 2πT S. ~ (b) 2π C (c) 27 277 [ * √1 + 4x² dx (d) None of these x³√1 + 3x² dx

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(a) 2π 277 S ' x 9Adentify the definite integral that represents the area of the surface formed by revolving the graph of f(x) = x³ on the interval [0, 1] about the y-axis. (d) 2π Jo 2π7 [₁ XV + 3x²³ dx • (a) 2π }' (c). 2π x√1 + 9xª dx [x 1 (e) None of these x√1 + 4x² dx (49 - x²)√1 + 4x² dx 277 (49 - x²). (b) 2π So 10 Identify the definite integral that represents the area of the surface formed by revolving the graph of f(x): = 49 - x² on the interval [0, 7] about the y-axis. √1 + 9x dx (e) None of these [10] leven sit no (c) 2π (b) 2π 2πT S -S √₁ + 4x² dx √ x²√ Jo (d) None of these x³√√1 + 3x² dx onto the area of the surface formed by revolving the graph of