Max/min of area functions Suppose Ζ is continuous on [0 ,β) and A(π) is the net area of the region bounded by the graph of Ζ and the t-axis on [0, x]. Show that the local maxima and minima of A occur at the zeros of Ζ. Verify this fact with the function Ζ(π) = πΒ² - 10π.
Definite integrals Use geometry (not Riemann sums) to evaluate the following definite integrals. Sketch a graph of the integrand, show the region in question, and interpret your result.
β«ββ΄ (8β2π) dπ
Verified step by step guidance
Verified video answer for a similar problem:
Key Concepts
Definite Integrals
Geometric Interpretation
Sketching Graphs
Definite integrals from graphs The figure shows the areas of regions bounded by the graph of Ζ and the π-axis. Evaluate the following integrals.
β«βα΅ Ζ(π) dπ
Explain the statement that a continuous function on an interval [a,b] equals its average value at some point on (a,b).
Average values Find the average value of the following functions on the given interval. Draw a graph of the function and indicate the average value.
Ζ(π) = cos π on [βΟ/2 , Ο/2]
Average values Find the average value of the following functions on the given interval. Draw a graph of the function and indicate the average value.
Ζ(π) = 1/(πΒ² + 1) on [β1, 1]
Integrals with sinΒ² π and cosΒ² π Evaluate the following integrals.
β«β^Ο/β΄ cosΒ² 8ΞΈ dΞΈ
