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The formula for finding the area of a curve revolved about the x-axis is given by A = ∫2πy(x)dx, where y(x) is the equation of the curve being revolved.
The shape of the curve greatly affects the area when revolved about the x-axis. A curve that is closer to the x-axis will have a larger area compared to a curve that is farther from the x-axis.
No, the area of a curve revolved about the x-axis cannot be negative. The area is always a positive value, as it represents the space enclosed by the curve and the x-axis.
Yes, there are limitations to using the formula. The curve must be continuous and have a finite length, and the boundaries of integration must be clearly defined.
No, the formula may not be applicable to all types of curves. It is specifically designed for finding the area of a curve revolved about the x-axis, and may not work for other types of curves or shapes.