36x – 270x + 4. Differentiate r and use the Consider the function r(x): derivative to determine each of the following. All intervals on which r is increasing. If there are more than one intervals, separate them by a comma. Use open intervals and exact values. r increases on: All intervals on which r is decreasing. If there are more than one intervals, separate them by a comma. Use open intervals and exact values. r decreases on: The value(s) of x at whichr has a relative maximum. If there are more than one solutions, separate them by a comma. Use exact values. r has relative maximum(s) at x = The value(s) of x at whichr has a relative minimum. If there are more than one solutions, separate them by a comma. Use exact values. r has relative minimum(s) at r

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Consider the function r(x) = 36x' – 270x + 4. Differentiate r and use the derivative to determine each of the following. All intervals on which r is increasing. If there are more than one intervals, separate them by a comma. Use open intervals and exact values. r increases on: All intervals on which r is decreasing. If there are more than one intervals, separate them by a comma. Use open intervals and exact values. r decreases on: The value(s) of x at which r has a relative maximum. If there are more than one solutions, separate them by a comma. Use exact values. r has relative maximum(s) at x = The value(s) of x at which r has a relative minimum. If there are more than one solutions, separate them by a comma. Use exact values. r has relative minimum(s) at x =