# Write an equation of each horizontal tangent line to the curve

### Write an equation of each horizontal tangent line to the curve

Explain 9 The solution to subject to Has at least one critical point. Similar presentations More Presentation on theme: "Consider the curve defined by Find Write an equation of each horizontal tangent line to the curve The line through the origin with slope —1 is tangent. On what intervals, if any, is the graph of g concave up? Find the x and y coordinates of point P 2 Let Be the fourth degree Taylor polynomial for the function f about 4. Horizontal tangent lines are important in calculus because they indicate local maximum or minimum points in the original function. The first factor, 3, doesn't give us a value. Photo Credits. I have written many software troubleshooting documents as well as user guides for software packages such as MS Office and popular media software. Assume f has derivatives of all orders for all real numbers. Justify 10 Is on the graph of the solution. Updated March 13, By Kristy Wedel A horizontal tangent line is a mathematical feature on a graph, located where a function's derivative is zero. If jello is flowing into the cone in part 1 at a rate of J cubic centimeters per hour, how fast is the jello rising when the cone is one third full of jello?

I have written many software troubleshooting documents as well as user guides for software packages such as MS Office and popular media software. Find both coordinates of any critical points on the graph of the solution.

Horizontal tangent lines are important in calculus because they indicate local maximum or minimum points in the original function. Plug the value s obtained in the previous step back into the original function.

Take the derivative of the function. Similar presentations More Presentation on theme: "Consider the curve defined by Find Write an equation of each horizontal tangent line to the curve The line through the origin with slope —1 is tangent. Find the x and y coordinates of point P 2 Let Be the fourth degree Taylor polynomial for the function f about 4.

This is because, by definition, the derivative gives the slope of the tangent line. Therefore, when the derivative is zero, the tangent line is horizontal.

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