Find the formula for the Riemann sum obtained by dividing the interval [ – 1, 0] into n equal subintervals and using the right endpoint for each ck. Then take the limit of these sums as n → to calculate the area under the curve f(æ) = 8a² + 8a* over [ – 1, 0]. The area under the curve over [– 1, 0] is square units.

Find the formula for the Riemann sum obtained by dividing the interval [ – 1, 0] into n equal subintervals and using the right endpoint for each ck. Then take the limit of these sums as n → to calculate the area under the curve f(æ) = 8a² + 8a* over [ – 1, 0]. The area under the curve over [– 1, 0] is square units.

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter6: The Trigonometric Functions

Section6.3: Trigonometric Functions Of Real Numbers

Problem 65E

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Question

PLEASE PLEASE PLEASE answer both of the questions, and I will give you a thumbs up!

Find the formula for the Riemann sum obtained by dividing the interval [– 1, 0] into n equal
subintervals and using the right endpoint for each cr. Then take the limit of these sums as n → ∞
to calculate the area under the curve f(x) = 822 + 8x° over [– 1, 0].
The area under the curve over [– 1, 0] is
square units.

Find the values of c guaranteed by the Mean Value Theorem (MVT) for f(x)
1
x + 7 over the
interval (0, 8].
1
In other words, find c e [0, 8] such that f(c)
8.
(0), f(z)dz.
c =

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