![]() ![]() The fundamental theorem of calculus can be used to find the area under a continuous graph and find the tangent line at any given point of a continuous graph.The integral is concave down when the line is decreasing and the integral is concave up when the line is increasing.The integral is decreasing when the line is below the x-axis and the integral is increasing when the line is above the x-axis.When you apply the fundamental theorem of calculus, all the variables of the original function turn into x.The fundamental theorem of calculus states: the derivative of the integral of a function is equal to the original equation. ![]() Knowledge of derivative and integral concepts are encouraged to ensure success on this exercise.įind the integral properties by using a given graph Define the integral when it is concave down/concave up: The student is asked to define when the integral function is concave down/concave up without the equation by using the given graph.Define the integral when it is decreasing/increasing on the interval(s): The student is asked to define when the integral function is decreasing/increasing without the equation by using the given graph.Find the tangent line from the graph of a defined integral: The student is asked to find the tangent line in slope-intercept form or point-slope form using the graph of the integral.Find the derivative of the integral: The student is asked to find the derivative of a given integral using the fundamental theorem of calculus.There are four types of problems in this exercise: This exercise shows the connection between differential calculus and integral calculus.įind the derivative of the integral Types of Problems The fundamental theorem of calculus exercise appears under the Integral calculus Math Mission.
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