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1. How to solve the values of x to find the critical values of the graph of a polynomial function? A) equate the first derivative to zero B) equate the function to zero C) solve for x in terms of y D) always let x equal to zero 2. In an interval, in which of the following conditions a continuous function is increasing? A) the value of the first derivative is negative B) the value of the first derivative is positive C) the value of the function is negative D) the value of the function is positive 3. In an interval, in which of the following conditions a continuous function is decreasing? A) the value of the function is negative B)) the value of the function is positive C) the value of the first derivative is negative D) the value of the first derivative is positive