AP Calculus AB: 8.2.1 Critical Points

• Critical points are the places on a graph where the derivative equals zero or is undefined. Interesting things happen at critical points.

• To find critical points, take the derivative, set the derivative equal to zero and solve, and find values where the derivative is undefined.

• Consider this graph of some complicated function. There seem to be several interesting points.

• At x 1 , x 2 , x 4 , and x 5 , the tangent lines are horizontal, so the derivative of the function is 0 at each of those values.

• At x 3 , the tangent line is vertical. Its slope is undefined, so the derivative of the function at that point is undefined, too.

• These points are called critical points. To identify them you need to solve for values that make the derivative equal to zero or undefined.

• Here is an example of a function that you might want to graph.

• To find its critical points, first take the derivative.

• Next, set the derivative equal to zero and solve.

• Finally, look for places where the derivative is undefined. In this case, the derivative is defined for all real numbers.

• You will need to use the power rule to take the derivative of this function.

• First, notice that there are no values of x that make the derivative equal to zero.

• Next, look for values of x for which the derivative is
  undefined. One way to do this is to set the denominator equal to zero and solve. In this case, the derivative is undefined for x = 0, even though the function itself is defined at that point. Therefore, you may have a cusp point at that x-value.

Yes.

t=−5/2

x = 0