Question: A cube is shown with all sides equal to x. Let x change with respect to t such that x(t) = 3t - 2. What

A cube is shown with all sides equal to x. Let x change with respect to t such that x(t) = 3t - 2. What is the formula for the rate of change of the volume of the cube? Responses The rate of change of V(t) is V'(t) = 3(3t - 2). The rate of change of V(t) is V'(t) = 3(3t - 2). The rate of change of V(t) is V'(t) = 27(3t - 2). The rate of change of V(t) is V'(t) = 27(3t - 2). The rate of change of V(t) is V'(t) = -9(3t - 2). The rate of change of V(t) is V'(t) = -9(3t - 2). The rate of change of V(t) is V'(t) = 9(3t - 2). The rate of change of V(t) is V'(t) = 9(3t - 2)

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