Function a(e) represents the surface area of a cube in terms of its edge length, e, and the difference quotient is 12e 6h. what is the average rate of change in surface area of a cube as the edge length increases from 3 inches to 5 inches?
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48 square inches per inch is the average rate of change in surface area.What is an area in math?The region that an object’s shape defines as its area. The area of a figure or any other two-dimensional geometric shape in a plane is how much space it occupies.The surface area of a cube of side length e is:A(e) = 6 *e².The rate of change is:A'(e) = 2 * 6 * eThe average rate of change between 3 in and 5 in is:r = (A(5in) + A(3in))/2 = (2*6*5in + 2*6*3in)/2 = 48inNow, the options are given in:“squere inches per inch”This is written as:in^2/in = in.Then we can write our above rate as:r = 48in = 48in^2/in = 48 square inches per inch.Learn more about areabrainly.com/question/27683633#SPJ4