Could you help me solve 12 please? Thanks! e tnterval and find its area.© [+][0, π]In Exercises 7 and 8, let f(x) = 20+ x - x² and g(x) = = x2 – 5x.Sketch the region enclosed by the graphs of f and g, and compute itsarea.6.8.Sketch the region between the graphs of f and g over [4, 8], and com-pute its area as a sum of two integrals.Find the area between y = e* and y = e2x over [0, 1].10. Find the area of the region bounded by y = e* and y = 12 - e* andthe y-axis.11. Sketch the region bounded by the line y = 2 and the graph ofy = sec² x for - < x < and find its area.12. Sketch the region bounded byy = √√4x² and y == -√4x²for -2 ≤ x ≤ 2. Give a definite integral for the area of the region, but donot compute the integral. Instead, find the area using geometry.In Exercises 13-16, determine whether or not the region bounded by thecurves is vertically simple and/or horizontally simple.13. x = y², x = 2 - y²14, y = x², x = y²In Exercisesx = 1 - cos21. 0 ≤ y ≤23.to th

We have to sketch the region bounded by…

12. Sketch the region bounded by y = √4-x2 and y = -√4-x² for-2 ≤ x ≤ 2. Give a definite integral for the area not compute the integral. Instead, find the area using geometry. of the region, but do

12. Sketch the region bounded by y = √4-x2 and y = -√4-x² for-2 ≤ x ≤ 2. Give a definite integral for the area not compute the integral. Instead, find the area using geometry. of the region, but do

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

Could you help me solve 12 please? Thanks!

e tnterval and find its area.
© [+]
[0, π]
In Exercises 7 and 8, let f(x) = 20+ x - x² and g(x) = = x2 – 5x.
Sketch the region enclosed by the graphs of f and g, and compute its
area.
6.
8.
Sketch the region between the graphs of f and g over [4, 8], and com-
pute its area as a sum of two integrals.
Find the area between y = e* and y = e2x over [0, 1].
10. Find the area of the region bounded by y = e* and y = 12 - e* and
the y-axis.
11. Sketch the region bounded by the line y = 2 and the graph of
y = sec² x for - < x < and find its area.
12. Sketch the region bounded by
y = √√4x² and y =
= -√4x²
for -2 ≤ x ≤ 2. Give a definite integral for the area of the region, but do
not compute the integral. Instead, find the area using geometry.
In Exercises 13-16, determine whether or not the region bounded by the
curves is vertically simple and/or horizontally simple.
13. x = y², x = 2 - y²
14, y = x², x = y²
In Exercises
x = 1 - cos
21. 0 ≤ y ≤
23.
to th

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