2. Express the region between y = e* and y = 4 – e-* as both a type I region and a type IlI region. The intersection points are (In(2 + V3),2+ v3) and (- In(2+ V3),), or approximately (1.317, 3.732) and (-1.317, 0.268). 2+V3)

2. Express the region between y = e* and y = 4 – e-* as both a type I region and a type IlI region. The intersection points are (In(2 + V3),2+ v3) and (- In(2+ V3),), or approximately (1.317, 3.732) and (-1.317, 0.268). 2+V3)

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter9: Systems Of Equations And Inequalities

Section: Chapter Questions

Problem 12T

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Question

Did I get my type 1 and type 2 regions correct? Thanks!

2. Express the region between y = e* and y = 4 – e-x as both a type I region
and a type II region. The intersection points are (In(2+ v3),2 + v3) and
(- In(2 + v3),), or approximately (1.317, 3.732) and (-1.317, 0.268).
Type
1:
gz (2)= 4- e
Tgpe 2: y: [ .2b8,3.232] x: [-In(-9+), Iny] hi(y)= -In (-y+4)
hz (4)= Inly)
1.317
9-4-e"
リー4= -e
In y = Ine
「リ+4= e"?
In (-g+ 4)= In(e")
Iny = X
K= -In (-y+4)

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